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._|\| |/|_. Copyright (c) Maplesoft, a division of Waterloo Maple Inc. 2008
\ MAPLE / All rights reserved. Maple is a trademark of
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> #BEGIN OUTFILE1
>
> # Begin Function number 3
> display_alot := proc(iter)
> global
> DEBUGMASSIVE,
> glob_max_terms,
> INFO,
> DEBUGL,
> glob_iolevel,
> ALWAYS,
> #Top Generate Globals Decl
> glob_iter,
> glob_warned,
> glob_large_float,
> glob_hmin,
> glob_disp_incr,
> glob_current_iter,
> glob_unchanged_h_cnt,
> glob_not_yet_start_msg,
> glob_initial_pass,
> days_in_year,
> glob_normmax,
> glob_orig_start_sec,
> glob_smallish_float,
> glob_max_iter,
> glob_hmin_init,
> glob_h,
> glob_clock_start_sec,
> djd_debug,
> glob_max_minutes,
> MAX_UNCHANGED,
> glob_log10_abserr,
> glob_look_poles,
> centuries_in_millinium,
> hours_in_day,
> djd_debug2,
> glob_optimal_expect_sec,
> glob_small_float,
> glob_max_trunc_err,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_last_good_h,
> glob_optimal_done,
> glob_reached_optimal_h,
> glob_not_yet_finished,
> glob_almost_1,
> glob_percent_done,
> glob_optimal_start,
> glob_no_eqs,
> glob_max_hours,
> glob_relerr,
> glob_log10_relerr,
> min_in_hour,
> glob_log10relerr,
> glob_log10abserr,
> glob_start,
> glob_max_rel_trunc_err,
> glob_clock_sec,
> glob_max_opt_iter,
> glob_max_sec,
> glob_abserr,
> years_in_century,
> glob_dump,
> glob_html_log,
> glob_log10normmin,
> glob_warned2,
> glob_optimal_clock_start_sec,
> sec_in_min,
> glob_subiter_method,
> glob_dump_analytic,
> glob_hmax,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_3D0,
> array_const_4D0,
> array_const_0D0,
> array_const_2,
> array_const_1,
> array_const_2D0,
> #END CONST
> array_fact_1,
> array_x1_init,
> array_t,
> array_type_pole,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_last_rel_error,
> array_pole,
> array_norms,
> array_x2_init,
> array_m1,
> array_x1,
> array_x2,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_1st_rel_error,
> array_fact_2,
> array_x1_higher,
> array_x2_set_initial,
> array_x1_set_initial,
> array_complex_pole,
> array_x1_higher_work2,
> array_x2_higher_work2,
> array_real_pole,
> array_poles,
> array_x2_higher,
> array_x1_higher_work,
> array_x2_higher_work,
> glob_last;
>
> local abserr, analytic_val_y, ind_var, numeric_val, relerr, term_no;
> #TOP DISPLAY ALOT
> if (iter >= 0) then # if number 1
> ind_var := array_t[1];
> omniout_float(ALWAYS,"t[1] ",33,ind_var,20," ");
> analytic_val_y := exact_soln_x1(ind_var);
> omniout_float(ALWAYS,"x1[1] (analytic) ",33,analytic_val_y,20," ");
> term_no := 1;
> numeric_val := array_x1[term_no];
> abserr := abs(numeric_val - analytic_val_y);
> omniout_float(ALWAYS,"x1[1] (numeric) ",33,numeric_val,20," ");
> if (abs(analytic_val_y) <> 0.0) then # if number 2
> relerr := abserr*100.0/abs(analytic_val_y);
> else
> relerr := -1.0 ;
> fi;# end if 2
> ;
> if glob_iter = 1 then # if number 2
> array_1st_rel_error[1] := relerr;
> else
> array_last_rel_error[1] := relerr;
> fi;# end if 2
> ;
> omniout_float(ALWAYS,"absolute error ",4,abserr,20," ");
> omniout_float(ALWAYS,"relative error ",4,relerr,20,"%");
> omniout_float(ALWAYS,"h ",4,glob_h,20," ");
> ;
> analytic_val_y := exact_soln_x2(ind_var);
> omniout_float(ALWAYS,"x2[1] (analytic) ",33,analytic_val_y,20," ");
> term_no := 1;
> numeric_val := array_x2[term_no];
> abserr := abs(numeric_val - analytic_val_y);
> omniout_float(ALWAYS,"x2[1] (numeric) ",33,numeric_val,20," ");
> if (abs(analytic_val_y) <> 0.0) then # if number 2
> relerr := abserr*100.0/abs(analytic_val_y);
> else
> relerr := -1.0 ;
> fi;# end if 2
> ;
> if glob_iter = 1 then # if number 2
> array_1st_rel_error[2] := relerr;
> else
> array_last_rel_error[2] := relerr;
> fi;# end if 2
> ;
> omniout_float(ALWAYS,"absolute error ",4,abserr,20," ");
> omniout_float(ALWAYS,"relative error ",4,relerr,20,"%");
> omniout_float(ALWAYS,"h ",4,glob_h,20," ");
> #BOTTOM DISPLAY ALOT
> fi;# end if 1
> ;
> # End Function number 3
> end;
display_alot := proc(iter)
local abserr, analytic_val_y, ind_var, numeric_val, relerr, term_no;
global DEBUGMASSIVE, glob_max_terms, INFO, DEBUGL, glob_iolevel, ALWAYS,
glob_iter, glob_warned, glob_large_float, glob_hmin, glob_disp_incr,
glob_current_iter, glob_unchanged_h_cnt, glob_not_yet_start_msg,
glob_initial_pass, days_in_year, glob_normmax, glob_orig_start_sec,
glob_smallish_float, glob_max_iter, glob_hmin_init, glob_h,
glob_clock_start_sec, djd_debug, glob_max_minutes, MAX_UNCHANGED,
glob_log10_abserr, glob_look_poles, centuries_in_millinium, hours_in_day,
djd_debug2, glob_optimal_expect_sec, glob_small_float, glob_max_trunc_err,
glob_display_flag, glob_curr_iter_when_opt, glob_last_good_h,
glob_optimal_done, glob_reached_optimal_h, glob_not_yet_finished,
glob_almost_1, glob_percent_done, glob_optimal_start, glob_no_eqs,
glob_max_hours, glob_relerr, glob_log10_relerr, min_in_hour,
glob_log10relerr, glob_log10abserr, glob_start, glob_max_rel_trunc_err,
glob_clock_sec, glob_max_opt_iter, glob_max_sec, glob_abserr,
years_in_century, glob_dump, glob_html_log, glob_log10normmin, glob_warned2,
glob_optimal_clock_start_sec, sec_in_min, glob_subiter_method,
glob_dump_analytic, glob_hmax, array_const_3D0, array_const_4D0,
array_const_0D0, array_const_2, array_const_1, array_const_2D0,
array_fact_1, array_x1_init, array_t, array_type_pole, array_tmp0,
array_tmp1, array_tmp2, array_tmp3, array_tmp4, array_tmp5, array_tmp6,
array_tmp7, array_tmp8, array_tmp9, array_last_rel_error, array_pole,
array_norms, array_x2_init, array_m1, array_x1, array_x2, array_tmp10,
array_tmp11, array_tmp12, array_tmp13, array_tmp14, array_tmp15,
array_tmp16, array_tmp17, array_1st_rel_error, array_fact_2,
array_x1_higher, array_x2_set_initial, array_x1_set_initial,
array_complex_pole, array_x1_higher_work2, array_x2_higher_work2,
array_real_pole, array_poles, array_x2_higher, array_x1_higher_work,
array_x2_higher_work, glob_last;
if 0 <= iter then
ind_var := array_t[1];
omniout_float(ALWAYS, "t[1] ", 33,
ind_var, 20, " ");
analytic_val_y := exact_soln_x1(ind_var);
omniout_float(ALWAYS, "x1[1] (analytic) ", 33,
analytic_val_y, 20, " ");
term_no := 1;
numeric_val := array_x1[term_no];
abserr := abs(numeric_val - analytic_val_y);
omniout_float(ALWAYS, "x1[1] (numeric) ", 33,
numeric_val, 20, " ");
if abs(analytic_val_y) <> 0. then
relerr := abserr*100.0/abs(analytic_val_y)
else relerr := -1.0
end if;
if glob_iter = 1 then array_1st_rel_error[1] := relerr
else array_last_rel_error[1] := relerr
end if;
omniout_float(ALWAYS, "absolute error ", 4,
abserr, 20, " ");
omniout_float(ALWAYS, "relative error ", 4,
relerr, 20, "%");
omniout_float(ALWAYS, "h ", 4,
glob_h, 20, " ");
analytic_val_y := exact_soln_x2(ind_var);
omniout_float(ALWAYS, "x2[1] (analytic) ", 33,
analytic_val_y, 20, " ");
term_no := 1;
numeric_val := array_x2[term_no];
abserr := abs(numeric_val - analytic_val_y);
omniout_float(ALWAYS, "x2[1] (numeric) ", 33,
numeric_val, 20, " ");
if abs(analytic_val_y) <> 0. then
relerr := abserr*100.0/abs(analytic_val_y)
else relerr := -1.0
end if;
if glob_iter = 1 then array_1st_rel_error[2] := relerr
else array_last_rel_error[2] := relerr
end if;
omniout_float(ALWAYS, "absolute error ", 4,
abserr, 20, " ");
omniout_float(ALWAYS, "relative error ", 4,
relerr, 20, "%");
omniout_float(ALWAYS, "h ", 4,
glob_h, 20, " ")
end if
end proc
> # Begin Function number 4
> adjust_for_pole := proc(h_param)
> global
> DEBUGMASSIVE,
> glob_max_terms,
> INFO,
> DEBUGL,
> glob_iolevel,
> ALWAYS,
> #Top Generate Globals Decl
> glob_iter,
> glob_warned,
> glob_large_float,
> glob_hmin,
> glob_disp_incr,
> glob_current_iter,
> glob_unchanged_h_cnt,
> glob_not_yet_start_msg,
> glob_initial_pass,
> days_in_year,
> glob_normmax,
> glob_orig_start_sec,
> glob_smallish_float,
> glob_max_iter,
> glob_hmin_init,
> glob_h,
> glob_clock_start_sec,
> djd_debug,
> glob_max_minutes,
> MAX_UNCHANGED,
> glob_log10_abserr,
> glob_look_poles,
> centuries_in_millinium,
> hours_in_day,
> djd_debug2,
> glob_optimal_expect_sec,
> glob_small_float,
> glob_max_trunc_err,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_last_good_h,
> glob_optimal_done,
> glob_reached_optimal_h,
> glob_not_yet_finished,
> glob_almost_1,
> glob_percent_done,
> glob_optimal_start,
> glob_no_eqs,
> glob_max_hours,
> glob_relerr,
> glob_log10_relerr,
> min_in_hour,
> glob_log10relerr,
> glob_log10abserr,
> glob_start,
> glob_max_rel_trunc_err,
> glob_clock_sec,
> glob_max_opt_iter,
> glob_max_sec,
> glob_abserr,
> years_in_century,
> glob_dump,
> glob_html_log,
> glob_log10normmin,
> glob_warned2,
> glob_optimal_clock_start_sec,
> sec_in_min,
> glob_subiter_method,
> glob_dump_analytic,
> glob_hmax,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_3D0,
> array_const_4D0,
> array_const_0D0,
> array_const_2,
> array_const_1,
> array_const_2D0,
> #END CONST
> array_fact_1,
> array_x1_init,
> array_t,
> array_type_pole,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_last_rel_error,
> array_pole,
> array_norms,
> array_x2_init,
> array_m1,
> array_x1,
> array_x2,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_1st_rel_error,
> array_fact_2,
> array_x1_higher,
> array_x2_set_initial,
> array_x1_set_initial,
> array_complex_pole,
> array_x1_higher_work2,
> array_x2_higher_work2,
> array_real_pole,
> array_poles,
> array_x2_higher,
> array_x1_higher_work,
> array_x2_higher_work,
> glob_last;
>
> local hnew, sz2, tmp;
> #TOP ADJUST FOR POLE
>
> hnew := h_param;
> glob_normmax := glob_small_float;
> if (abs(array_x1_higher[1,1]) > glob_small_float) then # if number 1
> tmp := abs(array_x1_higher[1,1]);
> if (tmp < glob_normmax) then # if number 2
> glob_normmax := tmp;
> fi;# end if 2
> fi;# end if 1
> ;
> if (abs(array_x2_higher[1,1]) > glob_small_float) then # if number 1
> tmp := abs(array_x2_higher[1,1]);
> if (tmp < glob_normmax) then # if number 2
> glob_normmax := tmp;
> fi;# end if 2
> fi;# end if 1
> ;
> if (glob_look_poles and (abs(array_pole[1]) > glob_small_float) and (array_pole[1] <> glob_large_float)) then # if number 1
> sz2 := array_pole[1]/10.0;
> if (sz2 < hnew) then # if number 2
> omniout_float(INFO,"glob_h adjusted to ",20,h_param,12,"due to singularity.");
> omniout_str(INFO,"Reached Optimal");
> newline();
> return(hnew);
> fi;# end if 2
> fi;# end if 1
> ;
> if (not glob_reached_optimal_h) then # if number 1
> glob_reached_optimal_h := true;
> glob_curr_iter_when_opt := glob_current_iter;
> glob_optimal_clock_start_sec := elapsed_time_seconds();
> glob_optimal_start := array_t[1];
> fi;# end if 1
> ;
> hnew := sz2;
> #END block
> #BOTTOM ADJUST FOR POLE
> # End Function number 4
> end;
adjust_for_pole := proc(h_param)
local hnew, sz2, tmp;
global DEBUGMASSIVE, glob_max_terms, INFO, DEBUGL, glob_iolevel, ALWAYS,
glob_iter, glob_warned, glob_large_float, glob_hmin, glob_disp_incr,
glob_current_iter, glob_unchanged_h_cnt, glob_not_yet_start_msg,
glob_initial_pass, days_in_year, glob_normmax, glob_orig_start_sec,
glob_smallish_float, glob_max_iter, glob_hmin_init, glob_h,
glob_clock_start_sec, djd_debug, glob_max_minutes, MAX_UNCHANGED,
glob_log10_abserr, glob_look_poles, centuries_in_millinium, hours_in_day,
djd_debug2, glob_optimal_expect_sec, glob_small_float, glob_max_trunc_err,
glob_display_flag, glob_curr_iter_when_opt, glob_last_good_h,
glob_optimal_done, glob_reached_optimal_h, glob_not_yet_finished,
glob_almost_1, glob_percent_done, glob_optimal_start, glob_no_eqs,
glob_max_hours, glob_relerr, glob_log10_relerr, min_in_hour,
glob_log10relerr, glob_log10abserr, glob_start, glob_max_rel_trunc_err,
glob_clock_sec, glob_max_opt_iter, glob_max_sec, glob_abserr,
years_in_century, glob_dump, glob_html_log, glob_log10normmin, glob_warned2,
glob_optimal_clock_start_sec, sec_in_min, glob_subiter_method,
glob_dump_analytic, glob_hmax, array_const_3D0, array_const_4D0,
array_const_0D0, array_const_2, array_const_1, array_const_2D0,
array_fact_1, array_x1_init, array_t, array_type_pole, array_tmp0,
array_tmp1, array_tmp2, array_tmp3, array_tmp4, array_tmp5, array_tmp6,
array_tmp7, array_tmp8, array_tmp9, array_last_rel_error, array_pole,
array_norms, array_x2_init, array_m1, array_x1, array_x2, array_tmp10,
array_tmp11, array_tmp12, array_tmp13, array_tmp14, array_tmp15,
array_tmp16, array_tmp17, array_1st_rel_error, array_fact_2,
array_x1_higher, array_x2_set_initial, array_x1_set_initial,
array_complex_pole, array_x1_higher_work2, array_x2_higher_work2,
array_real_pole, array_poles, array_x2_higher, array_x1_higher_work,
array_x2_higher_work, glob_last;
hnew := h_param;
glob_normmax := glob_small_float;
if glob_small_float < abs(array_x1_higher[1, 1]) then
tmp := abs(array_x1_higher[1, 1]);
if tmp < glob_normmax then glob_normmax := tmp end if
end if;
if glob_small_float < abs(array_x2_higher[1, 1]) then
tmp := abs(array_x2_higher[1, 1]);
if tmp < glob_normmax then glob_normmax := tmp end if
end if;
if glob_look_poles and glob_small_float < abs(array_pole[1]) and
array_pole[1] <> glob_large_float then
sz2 := array_pole[1]/10.0;
if sz2 < hnew then
omniout_float(INFO, "glob_h adjusted to ", 20, h_param, 12,
"due to singularity.");
omniout_str(INFO, "Reached Optimal");
newline();
return hnew
end if
end if;
if not glob_reached_optimal_h then
glob_reached_optimal_h := true;
glob_curr_iter_when_opt := glob_current_iter;
glob_optimal_clock_start_sec := elapsed_time_seconds();
glob_optimal_start := array_t[1]
end if;
hnew := sz2
end proc
> # Begin Function number 5
> prog_report := proc(t_start,t_end)
> global
> DEBUGMASSIVE,
> glob_max_terms,
> INFO,
> DEBUGL,
> glob_iolevel,
> ALWAYS,
> #Top Generate Globals Decl
> glob_iter,
> glob_warned,
> glob_large_float,
> glob_hmin,
> glob_disp_incr,
> glob_current_iter,
> glob_unchanged_h_cnt,
> glob_not_yet_start_msg,
> glob_initial_pass,
> days_in_year,
> glob_normmax,
> glob_orig_start_sec,
> glob_smallish_float,
> glob_max_iter,
> glob_hmin_init,
> glob_h,
> glob_clock_start_sec,
> djd_debug,
> glob_max_minutes,
> MAX_UNCHANGED,
> glob_log10_abserr,
> glob_look_poles,
> centuries_in_millinium,
> hours_in_day,
> djd_debug2,
> glob_optimal_expect_sec,
> glob_small_float,
> glob_max_trunc_err,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_last_good_h,
> glob_optimal_done,
> glob_reached_optimal_h,
> glob_not_yet_finished,
> glob_almost_1,
> glob_percent_done,
> glob_optimal_start,
> glob_no_eqs,
> glob_max_hours,
> glob_relerr,
> glob_log10_relerr,
> min_in_hour,
> glob_log10relerr,
> glob_log10abserr,
> glob_start,
> glob_max_rel_trunc_err,
> glob_clock_sec,
> glob_max_opt_iter,
> glob_max_sec,
> glob_abserr,
> years_in_century,
> glob_dump,
> glob_html_log,
> glob_log10normmin,
> glob_warned2,
> glob_optimal_clock_start_sec,
> sec_in_min,
> glob_subiter_method,
> glob_dump_analytic,
> glob_hmax,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_3D0,
> array_const_4D0,
> array_const_0D0,
> array_const_2,
> array_const_1,
> array_const_2D0,
> #END CONST
> array_fact_1,
> array_x1_init,
> array_t,
> array_type_pole,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_last_rel_error,
> array_pole,
> array_norms,
> array_x2_init,
> array_m1,
> array_x1,
> array_x2,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_1st_rel_error,
> array_fact_2,
> array_x1_higher,
> array_x2_set_initial,
> array_x1_set_initial,
> array_complex_pole,
> array_x1_higher_work2,
> array_x2_higher_work2,
> array_real_pole,
> array_poles,
> array_x2_higher,
> array_x1_higher_work,
> array_x2_higher_work,
> glob_last;
>
> local clock_sec, opt_clock_sec, clock_sec1, expect_sec, left_sec, percent_done, total_clock_sec;
> #TOP PROGRESS REPORT
> clock_sec1 := elapsed_time_seconds();
> total_clock_sec := convfloat(clock_sec1) - convfloat(glob_orig_start_sec);
> glob_clock_sec := convfloat(clock_sec1) - convfloat(glob_clock_start_sec);
> left_sec := convfloat(glob_max_sec) + convfloat(glob_orig_start_sec) - convfloat(clock_sec1);
> expect_sec := comp_expect_sec(convfloat(t_end),convfloat(t_start),convfloat(array_t[1]) + convfloat(glob_h) ,convfloat( clock_sec1) - convfloat(glob_orig_start_sec));
> opt_clock_sec := convfloat( clock_sec1) - convfloat(glob_optimal_clock_start_sec);
> glob_optimal_expect_sec := comp_expect_sec(convfloat(t_end),convfloat(t_start),convfloat(array_t[1]) +convfloat( glob_h) ,convfloat( opt_clock_sec));
> percent_done := comp_percent(convfloat(t_end),convfloat(t_start),convfloat(array_t[1]) + convfloat(glob_h));
> glob_percent_done := percent_done;
> omniout_str_noeol(INFO,"Total Elapsed Time ");
> omniout_timestr(convfloat(total_clock_sec));
> omniout_str_noeol(INFO,"Elapsed Time(since restart) ");
> omniout_timestr(convfloat(glob_clock_sec));
> if convfloat(percent_done) < convfloat(100.0) then # if number 1
> omniout_str_noeol(INFO,"Expected Time Remaining ");
> omniout_timestr(convfloat(expect_sec));
> omniout_str_noeol(INFO,"Optimized Time Remaining ");
> omniout_timestr(convfloat(glob_optimal_expect_sec));
> fi;# end if 1
> ;
> omniout_str_noeol(INFO,"Time to Timeout ");
> omniout_timestr(convfloat(left_sec));
> omniout_float(INFO, "Percent Done ",33,percent_done,4,"%");
> #BOTTOM PROGRESS REPORT
> # End Function number 5
> end;
prog_report := proc(t_start, t_end)
local clock_sec, opt_clock_sec, clock_sec1, expect_sec, left_sec,
percent_done, total_clock_sec;
global DEBUGMASSIVE, glob_max_terms, INFO, DEBUGL, glob_iolevel, ALWAYS,
glob_iter, glob_warned, glob_large_float, glob_hmin, glob_disp_incr,
glob_current_iter, glob_unchanged_h_cnt, glob_not_yet_start_msg,
glob_initial_pass, days_in_year, glob_normmax, glob_orig_start_sec,
glob_smallish_float, glob_max_iter, glob_hmin_init, glob_h,
glob_clock_start_sec, djd_debug, glob_max_minutes, MAX_UNCHANGED,
glob_log10_abserr, glob_look_poles, centuries_in_millinium, hours_in_day,
djd_debug2, glob_optimal_expect_sec, glob_small_float, glob_max_trunc_err,
glob_display_flag, glob_curr_iter_when_opt, glob_last_good_h,
glob_optimal_done, glob_reached_optimal_h, glob_not_yet_finished,
glob_almost_1, glob_percent_done, glob_optimal_start, glob_no_eqs,
glob_max_hours, glob_relerr, glob_log10_relerr, min_in_hour,
glob_log10relerr, glob_log10abserr, glob_start, glob_max_rel_trunc_err,
glob_clock_sec, glob_max_opt_iter, glob_max_sec, glob_abserr,
years_in_century, glob_dump, glob_html_log, glob_log10normmin, glob_warned2,
glob_optimal_clock_start_sec, sec_in_min, glob_subiter_method,
glob_dump_analytic, glob_hmax, array_const_3D0, array_const_4D0,
array_const_0D0, array_const_2, array_const_1, array_const_2D0,
array_fact_1, array_x1_init, array_t, array_type_pole, array_tmp0,
array_tmp1, array_tmp2, array_tmp3, array_tmp4, array_tmp5, array_tmp6,
array_tmp7, array_tmp8, array_tmp9, array_last_rel_error, array_pole,
array_norms, array_x2_init, array_m1, array_x1, array_x2, array_tmp10,
array_tmp11, array_tmp12, array_tmp13, array_tmp14, array_tmp15,
array_tmp16, array_tmp17, array_1st_rel_error, array_fact_2,
array_x1_higher, array_x2_set_initial, array_x1_set_initial,
array_complex_pole, array_x1_higher_work2, array_x2_higher_work2,
array_real_pole, array_poles, array_x2_higher, array_x1_higher_work,
array_x2_higher_work, glob_last;
clock_sec1 := elapsed_time_seconds();
total_clock_sec :=
convfloat(clock_sec1) - convfloat(glob_orig_start_sec);
glob_clock_sec :=
convfloat(clock_sec1) - convfloat(glob_clock_start_sec);
left_sec := convfloat(glob_max_sec) + convfloat(glob_orig_start_sec)
- convfloat(clock_sec1);
expect_sec := comp_expect_sec(convfloat(t_end), convfloat(t_start),
convfloat(array_t[1]) + convfloat(glob_h),
convfloat(clock_sec1) - convfloat(glob_orig_start_sec));
opt_clock_sec :=
convfloat(clock_sec1) - convfloat(glob_optimal_clock_start_sec);
glob_optimal_expect_sec := comp_expect_sec(convfloat(t_end),
convfloat(t_start), convfloat(array_t[1]) + convfloat(glob_h),
convfloat(opt_clock_sec));
percent_done := comp_percent(convfloat(t_end), convfloat(t_start),
convfloat(array_t[1]) + convfloat(glob_h));
glob_percent_done := percent_done;
omniout_str_noeol(INFO, "Total Elapsed Time ");
omniout_timestr(convfloat(total_clock_sec));
omniout_str_noeol(INFO, "Elapsed Time(since restart) ");
omniout_timestr(convfloat(glob_clock_sec));
if convfloat(percent_done) < convfloat(100.0) then
omniout_str_noeol(INFO, "Expected Time Remaining ");
omniout_timestr(convfloat(expect_sec));
omniout_str_noeol(INFO, "Optimized Time Remaining ");
omniout_timestr(convfloat(glob_optimal_expect_sec))
end if;
omniout_str_noeol(INFO, "Time to Timeout ");
omniout_timestr(convfloat(left_sec));
omniout_float(INFO, "Percent Done ", 33,
percent_done, 4, "%")
end proc
> # Begin Function number 6
> check_for_pole := proc()
> global
> DEBUGMASSIVE,
> glob_max_terms,
> INFO,
> DEBUGL,
> glob_iolevel,
> ALWAYS,
> #Top Generate Globals Decl
> glob_iter,
> glob_warned,
> glob_large_float,
> glob_hmin,
> glob_disp_incr,
> glob_current_iter,
> glob_unchanged_h_cnt,
> glob_not_yet_start_msg,
> glob_initial_pass,
> days_in_year,
> glob_normmax,
> glob_orig_start_sec,
> glob_smallish_float,
> glob_max_iter,
> glob_hmin_init,
> glob_h,
> glob_clock_start_sec,
> djd_debug,
> glob_max_minutes,
> MAX_UNCHANGED,
> glob_log10_abserr,
> glob_look_poles,
> centuries_in_millinium,
> hours_in_day,
> djd_debug2,
> glob_optimal_expect_sec,
> glob_small_float,
> glob_max_trunc_err,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_last_good_h,
> glob_optimal_done,
> glob_reached_optimal_h,
> glob_not_yet_finished,
> glob_almost_1,
> glob_percent_done,
> glob_optimal_start,
> glob_no_eqs,
> glob_max_hours,
> glob_relerr,
> glob_log10_relerr,
> min_in_hour,
> glob_log10relerr,
> glob_log10abserr,
> glob_start,
> glob_max_rel_trunc_err,
> glob_clock_sec,
> glob_max_opt_iter,
> glob_max_sec,
> glob_abserr,
> years_in_century,
> glob_dump,
> glob_html_log,
> glob_log10normmin,
> glob_warned2,
> glob_optimal_clock_start_sec,
> sec_in_min,
> glob_subiter_method,
> glob_dump_analytic,
> glob_hmax,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_3D0,
> array_const_4D0,
> array_const_0D0,
> array_const_2,
> array_const_1,
> array_const_2D0,
> #END CONST
> array_fact_1,
> array_x1_init,
> array_t,
> array_type_pole,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_last_rel_error,
> array_pole,
> array_norms,
> array_x2_init,
> array_m1,
> array_x1,
> array_x2,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_1st_rel_error,
> array_fact_2,
> array_x1_higher,
> array_x2_set_initial,
> array_x1_set_initial,
> array_complex_pole,
> array_x1_higher_work2,
> array_x2_higher_work2,
> array_real_pole,
> array_poles,
> array_x2_higher,
> array_x1_higher_work,
> array_x2_higher_work,
> glob_last;
>
> local cnt, dr1, dr2, ds1, ds2, hdrc, m, n, nr1, nr2, ord_no, rad_c, rcs, rm0, rm1, rm2, rm3, rm4, found;
> #TOP CHECK FOR POLE
> #IN RADII REAL EQ = 1
> #Computes radius of convergence and r_order of pole from 3 adjacent Taylor series terms. EQUATUON NUMBER 1
> #Applies to pole of arbitrary r_order on the real axis,
> #Due to Prof. George Corliss.
> n := glob_max_terms;
> m := n - 1 - 1;
> while ((m >= 10) and ((abs(array_x1_higher[1,m]) < glob_small_float) or (abs(array_x1_higher[1,m-1]) < glob_small_float) or (abs(array_x1_higher[1,m-2]) < glob_small_float ))) do # do number 2
> m := m - 1;
> od;# end do number 2
> ;
> if (m > 10) then # if number 1
> rm0 := array_x1_higher[1,m]/array_x1_higher[1,m-1];
> rm1 := array_x1_higher[1,m-1]/array_x1_higher[1,m-2];
> hdrc := convfloat(m-1)*rm0-convfloat(m-2)*rm1;
> if (abs(hdrc) > glob_small_float) then # if number 2
> rcs := glob_h/hdrc;
> ord_no := convfloat(m-1)*rm0/hdrc - convfloat(m) + 2.0;
> array_real_pole[1,1] := rcs;
> array_real_pole[1,2] := ord_no;
> else
> array_real_pole[1,1] := glob_large_float;
> array_real_pole[1,2] := glob_large_float;
> fi;# end if 2
> else
> array_real_pole[1,1] := glob_large_float;
> array_real_pole[1,2] := glob_large_float;
> fi;# end if 1
> ;
> #BOTTOM RADII REAL EQ = 1
> #IN RADII REAL EQ = 2
> #Computes radius of convergence and r_order of pole from 3 adjacent Taylor series terms. EQUATUON NUMBER 2
> #Applies to pole of arbitrary r_order on the real axis,
> #Due to Prof. George Corliss.
> n := glob_max_terms;
> m := n - 2 - 1;
> while ((m >= 10) and ((abs(array_x2_higher[1,m]) < glob_small_float) or (abs(array_x2_higher[1,m-1]) < glob_small_float) or (abs(array_x2_higher[1,m-2]) < glob_small_float ))) do # do number 2
> m := m - 1;
> od;# end do number 2
> ;
> if (m > 10) then # if number 1
> rm0 := array_x2_higher[1,m]/array_x2_higher[1,m-1];
> rm1 := array_x2_higher[1,m-1]/array_x2_higher[1,m-2];
> hdrc := convfloat(m-1)*rm0-convfloat(m-2)*rm1;
> if (abs(hdrc) > glob_small_float) then # if number 2
> rcs := glob_h/hdrc;
> ord_no := convfloat(m-1)*rm0/hdrc - convfloat(m) + 2.0;
> array_real_pole[2,1] := rcs;
> array_real_pole[2,2] := ord_no;
> else
> array_real_pole[2,1] := glob_large_float;
> array_real_pole[2,2] := glob_large_float;
> fi;# end if 2
> else
> array_real_pole[2,1] := glob_large_float;
> array_real_pole[2,2] := glob_large_float;
> fi;# end if 1
> ;
> #BOTTOM RADII REAL EQ = 2
> #TOP RADII COMPLEX EQ = 1
> #Computes radius of convergence for complex conjugate pair of poles.
> #from 6 adjacent Taylor series terms
> #Also computes r_order of poles.
> #Due to Manuel Prieto.
> #With a correction by Dennis J. Darland
> n := glob_max_terms - 1 - 1;
> cnt := 0;
> while ((cnt < 5) and (n >= 10)) do # do number 2
> if (abs(array_x1_higher[1,n]) > glob_small_float) then # if number 1
> cnt := cnt + 1;
> else
> cnt := 0;
> fi;# end if 1
> ;
> n := n - 1;
> od;# end do number 2
> ;
> m := n + cnt;
> if (m <= 10) then # if number 1
> array_complex_pole[1,1] := glob_large_float;
> array_complex_pole[1,2] := glob_large_float;
> elif (abs(array_x1_higher[1,m]) >= (glob_large_float)) or (abs(array_x1_higher[1,m-1]) >=(glob_large_float)) or (abs(array_x1_higher[1,m-2]) >= (glob_large_float)) or (abs(array_x1_higher[1,m-3]) >= (glob_large_float)) or (abs(array_x1_higher[1,m-4]) >= (glob_large_float)) or (abs(array_x1_higher[1,m-5]) >= (glob_large_float)) then # if number 2
> array_complex_pole[1,1] := glob_large_float;
> array_complex_pole[1,2] := glob_large_float;
> else
> rm0 := (array_x1_higher[1,m])/(array_x1_higher[1,m-1]);
> rm1 := (array_x1_higher[1,m-1])/(array_x1_higher[1,m-2]);
> rm2 := (array_x1_higher[1,m-2])/(array_x1_higher[1,m-3]);
> rm3 := (array_x1_higher[1,m-3])/(array_x1_higher[1,m-4]);
> rm4 := (array_x1_higher[1,m-4])/(array_x1_higher[1,m-5]);
> nr1 := convfloat(m-1)*rm0 - 2.0*convfloat(m-2)*rm1 + convfloat(m-3)*rm2;
> nr2 := convfloat(m-2)*rm1 - 2.0*convfloat(m-3)*rm2 + convfloat(m-4)*rm3;
> dr1 := (-1.0)/rm1 + 2.0/rm2 - 1.0/rm3;
> dr2 := (-1.0)/rm2 + 2.0/rm3 - 1.0/rm4;
> ds1 := 3.0/rm1 - 8.0/rm2 + 5.0/rm3;
> ds2 := 3.0/rm2 - 8.0/rm3 + 5.0/rm4;
> if ((abs(nr1 * dr2 - nr2 * dr1) <= glob_small_float) or (abs(dr1) <= glob_small_float)) then # if number 3
> array_complex_pole[1,1] := glob_large_float;
> array_complex_pole[1,2] := glob_large_float;
> else
> if (abs(nr1*dr2 - nr2 * dr1) > glob_small_float) then # if number 4
> rcs := ((ds1*dr2 - ds2*dr1 +dr1*dr2)/(nr1*dr2 - nr2 * dr1));
> #(Manuels) rcs := (ds1*dr2 - ds2*dr1)/(nr1*dr2 - nr2 * dr1)
> ord_no := (rcs*nr1 - ds1)/(2.0*dr1) -convfloat(m)/2.0;
> if (abs(rcs) > glob_small_float) then # if number 5
> if (rcs > 0.0) then # if number 6
> rad_c := sqrt(rcs) * glob_h;
> else
> rad_c := glob_large_float;
> fi;# end if 6
> else
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> fi;# end if 5
> else
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> fi;# end if 4
> fi;# end if 3
> ;
> array_complex_pole[1,1] := rad_c;
> array_complex_pole[1,2] := ord_no;
> fi;# end if 2
> ;
> #BOTTOM RADII COMPLEX EQ = 1
> #TOP RADII COMPLEX EQ = 2
> #Computes radius of convergence for complex conjugate pair of poles.
> #from 6 adjacent Taylor series terms
> #Also computes r_order of poles.
> #Due to Manuel Prieto.
> #With a correction by Dennis J. Darland
> n := glob_max_terms - 2 - 1;
> cnt := 0;
> while ((cnt < 5) and (n >= 10)) do # do number 2
> if (abs(array_x2_higher[1,n]) > glob_small_float) then # if number 2
> cnt := cnt + 1;
> else
> cnt := 0;
> fi;# end if 2
> ;
> n := n - 1;
> od;# end do number 2
> ;
> m := n + cnt;
> if (m <= 10) then # if number 2
> array_complex_pole[2,1] := glob_large_float;
> array_complex_pole[2,2] := glob_large_float;
> elif (abs(array_x2_higher[1,m]) >= (glob_large_float)) or (abs(array_x2_higher[1,m-1]) >=(glob_large_float)) or (abs(array_x2_higher[1,m-2]) >= (glob_large_float)) or (abs(array_x2_higher[1,m-3]) >= (glob_large_float)) or (abs(array_x2_higher[1,m-4]) >= (glob_large_float)) or (abs(array_x2_higher[1,m-5]) >= (glob_large_float)) then # if number 3
> array_complex_pole[2,1] := glob_large_float;
> array_complex_pole[2,2] := glob_large_float;
> else
> rm0 := (array_x2_higher[1,m])/(array_x2_higher[1,m-1]);
> rm1 := (array_x2_higher[1,m-1])/(array_x2_higher[1,m-2]);
> rm2 := (array_x2_higher[1,m-2])/(array_x2_higher[1,m-3]);
> rm3 := (array_x2_higher[1,m-3])/(array_x2_higher[1,m-4]);
> rm4 := (array_x2_higher[1,m-4])/(array_x2_higher[1,m-5]);
> nr1 := convfloat(m-1)*rm0 - 2.0*convfloat(m-2)*rm1 + convfloat(m-3)*rm2;
> nr2 := convfloat(m-2)*rm1 - 2.0*convfloat(m-3)*rm2 + convfloat(m-4)*rm3;
> dr1 := (-1.0)/rm1 + 2.0/rm2 - 1.0/rm3;
> dr2 := (-1.0)/rm2 + 2.0/rm3 - 1.0/rm4;
> ds1 := 3.0/rm1 - 8.0/rm2 + 5.0/rm3;
> ds2 := 3.0/rm2 - 8.0/rm3 + 5.0/rm4;
> if ((abs(nr1 * dr2 - nr2 * dr1) <= glob_small_float) or (abs(dr1) <= glob_small_float)) then # if number 4
> array_complex_pole[2,1] := glob_large_float;
> array_complex_pole[2,2] := glob_large_float;
> else
> if (abs(nr1*dr2 - nr2 * dr1) > glob_small_float) then # if number 5
> rcs := ((ds1*dr2 - ds2*dr1 +dr1*dr2)/(nr1*dr2 - nr2 * dr1));
> #(Manuels) rcs := (ds1*dr2 - ds2*dr1)/(nr1*dr2 - nr2 * dr1)
> ord_no := (rcs*nr1 - ds1)/(2.0*dr1) -convfloat(m)/2.0;
> if (abs(rcs) > glob_small_float) then # if number 6
> if (rcs > 0.0) then # if number 7
> rad_c := sqrt(rcs) * glob_h;
> else
> rad_c := glob_large_float;
> fi;# end if 7
> else
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> fi;# end if 6
> else
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> fi;# end if 5
> fi;# end if 4
> ;
> array_complex_pole[2,1] := rad_c;
> array_complex_pole[2,2] := ord_no;
> fi;# end if 3
> ;
> #BOTTOM RADII COMPLEX EQ = 2
> found := false;
> #TOP WHICH RADII EQ = 1
> if not found and ((array_real_pole[1,1] = glob_large_float) or (array_real_pole[1,2] = glob_large_float)) and ((array_complex_pole[1,1] <> glob_large_float) and (array_complex_pole[1,2] <> glob_large_float)) and ((array_complex_pole[1,1] > 0.0) and (array_complex_pole[1,2] > 0.0)) then # if number 3
> array_poles[1,1] := array_complex_pole[1,1];
> array_poles[1,2] := array_complex_pole[1,2];
> found := true;
> array_type_pole[1] := 2;
> if (glob_display_flag) then # if number 4
> omniout_str(ALWAYS,"Complex estimate of poles used");
> fi;# end if 4
> ;
> fi;# end if 3
> ;
> if not found and ((array_real_pole[1,1] <> glob_large_float) and (array_real_pole[1,2] <> glob_large_float) and (array_real_pole[1,1] > 0.0) and (array_real_pole[1,2] > 0.0) and ((array_complex_pole[1,1] = glob_large_float) or (array_complex_pole[1,2] = glob_large_float) or (array_complex_pole[1,1] <= 0.0 ) or (array_complex_pole[1,2] <= 0.0))) then # if number 3
> array_poles[1,1] := array_real_pole[1,1];
> array_poles[1,2] := array_real_pole[1,2];
> found := true;
> array_type_pole[1] := 1;
> if (glob_display_flag) then # if number 4
> omniout_str(ALWAYS,"Real estimate of pole used");
> fi;# end if 4
> ;
> fi;# end if 3
> ;
> if not found and (((array_real_pole[1,1] = glob_large_float) or (array_real_pole[1,2] = glob_large_float)) and ((array_complex_pole[1,1] = glob_large_float) or (array_complex_pole[1,2] = glob_large_float))) then # if number 3
> array_poles[1,1] := glob_large_float;
> array_poles[1,2] := glob_large_float;
> found := true;
> array_type_pole[1] := 3;
> if (glob_display_flag) then # if number 4
> omniout_str(ALWAYS,"NO POLE");
> fi;# end if 4
> ;
> fi;# end if 3
> ;
> if not found and ((array_real_pole[1,1] < array_complex_pole[1,1]) and (array_real_pole[1,1] > 0.0) and (array_real_pole[1,2] > 0.0)) then # if number 3
> array_poles[1,1] := array_real_pole[1,1];
> array_poles[1,2] := array_real_pole[1,2];
> found := true;
> array_type_pole[1] := 1;
> if (glob_display_flag) then # if number 4
> omniout_str(ALWAYS,"Real estimate of pole used");
> fi;# end if 4
> ;
> fi;# end if 3
> ;
> if not found and ((array_complex_pole[1,1] <> glob_large_float) and (array_complex_pole[1,2] <> glob_large_float) and (array_complex_pole[1,1] > 0.0) and (array_complex_pole[1,2] > 0.0)) then # if number 3
> array_poles[1,1] := array_complex_pole[1,1];
> array_poles[1,2] := array_complex_pole[1,2];
> array_type_pole[1] := 2;
> found := true;
> if (glob_display_flag) then # if number 4
> omniout_str(ALWAYS,"Complex estimate of poles used");
> fi;# end if 4
> ;
> fi;# end if 3
> ;
> if not found then # if number 3
> array_poles[1,1] := glob_large_float;
> array_poles[1,2] := glob_large_float;
> array_type_pole[1] := 3;
> if (glob_display_flag) then # if number 4
> omniout_str(ALWAYS,"NO POLE");
> fi;# end if 4
> ;
> fi;# end if 3
> ;
> #BOTTOM WHICH RADII EQ = 1
> found := false;
> #TOP WHICH RADII EQ = 2
> if not found and ((array_real_pole[2,1] = glob_large_float) or (array_real_pole[2,2] = glob_large_float)) and ((array_complex_pole[2,1] <> glob_large_float) and (array_complex_pole[2,2] <> glob_large_float)) and ((array_complex_pole[2,1] > 0.0) and (array_complex_pole[2,2] > 0.0)) then # if number 3
> array_poles[2,1] := array_complex_pole[2,1];
> array_poles[2,2] := array_complex_pole[2,2];
> found := true;
> array_type_pole[2] := 2;
> if (glob_display_flag) then # if number 4
> omniout_str(ALWAYS,"Complex estimate of poles used");
> fi;# end if 4
> ;
> fi;# end if 3
> ;
> if not found and ((array_real_pole[2,1] <> glob_large_float) and (array_real_pole[2,2] <> glob_large_float) and (array_real_pole[2,1] > 0.0) and (array_real_pole[2,2] > 0.0) and ((array_complex_pole[2,1] = glob_large_float) or (array_complex_pole[2,2] = glob_large_float) or (array_complex_pole[2,1] <= 0.0 ) or (array_complex_pole[2,2] <= 0.0))) then # if number 3
> array_poles[2,1] := array_real_pole[2,1];
> array_poles[2,2] := array_real_pole[2,2];
> found := true;
> array_type_pole[2] := 1;
> if (glob_display_flag) then # if number 4
> omniout_str(ALWAYS,"Real estimate of pole used");
> fi;# end if 4
> ;
> fi;# end if 3
> ;
> if not found and (((array_real_pole[2,1] = glob_large_float) or (array_real_pole[2,2] = glob_large_float)) and ((array_complex_pole[2,1] = glob_large_float) or (array_complex_pole[2,2] = glob_large_float))) then # if number 3
> array_poles[2,1] := glob_large_float;
> array_poles[2,2] := glob_large_float;
> found := true;
> array_type_pole[2] := 3;
> if (glob_display_flag) then # if number 4
> omniout_str(ALWAYS,"NO POLE");
> fi;# end if 4
> ;
> fi;# end if 3
> ;
> if not found and ((array_real_pole[2,1] < array_complex_pole[2,1]) and (array_real_pole[2,1] > 0.0) and (array_real_pole[2,2] > 0.0)) then # if number 3
> array_poles[2,1] := array_real_pole[2,1];
> array_poles[2,2] := array_real_pole[2,2];
> found := true;
> array_type_pole[2] := 1;
> if (glob_display_flag) then # if number 4
> omniout_str(ALWAYS,"Real estimate of pole used");
> fi;# end if 4
> ;
> fi;# end if 3
> ;
> if not found and ((array_complex_pole[2,1] <> glob_large_float) and (array_complex_pole[2,2] <> glob_large_float) and (array_complex_pole[2,1] > 0.0) and (array_complex_pole[2,2] > 0.0)) then # if number 3
> array_poles[2,1] := array_complex_pole[2,1];
> array_poles[2,2] := array_complex_pole[2,2];
> array_type_pole[2] := 2;
> found := true;
> if (glob_display_flag) then # if number 4
> omniout_str(ALWAYS,"Complex estimate of poles used");
> fi;# end if 4
> ;
> fi;# end if 3
> ;
> if not found then # if number 3
> array_poles[2,1] := glob_large_float;
> array_poles[2,2] := glob_large_float;
> array_type_pole[2] := 3;
> if (glob_display_flag) then # if number 4
> omniout_str(ALWAYS,"NO POLE");
> fi;# end if 4
> ;
> fi;# end if 3
> ;
> #BOTTOM WHICH RADII EQ = 2
> array_pole[1] := glob_large_float;
> array_pole[2] := glob_large_float;
> #TOP WHICH RADIUS EQ = 1
> if array_pole[1] > array_poles[1,1] then # if number 3
> array_pole[1] := array_poles[1,1];
> array_pole[2] := array_poles[1,2];
> fi;# end if 3
> ;
> #BOTTOM WHICH RADIUS EQ = 1
> #TOP WHICH RADIUS EQ = 2
> if array_pole[1] > array_poles[2,1] then # if number 3
> array_pole[1] := array_poles[2,1];
> array_pole[2] := array_poles[2,2];
> fi;# end if 3
> ;
> #BOTTOM WHICH RADIUS EQ = 2
> #BOTTOM CHECK FOR POLE
> display_pole();
> # End Function number 6
> end;
check_for_pole := proc()
local cnt, dr1, dr2, ds1, ds2, hdrc, m, n, nr1, nr2, ord_no, rad_c, rcs,
rm0, rm1, rm2, rm3, rm4, found;
global DEBUGMASSIVE, glob_max_terms, INFO, DEBUGL, glob_iolevel, ALWAYS,
glob_iter, glob_warned, glob_large_float, glob_hmin, glob_disp_incr,
glob_current_iter, glob_unchanged_h_cnt, glob_not_yet_start_msg,
glob_initial_pass, days_in_year, glob_normmax, glob_orig_start_sec,
glob_smallish_float, glob_max_iter, glob_hmin_init, glob_h,
glob_clock_start_sec, djd_debug, glob_max_minutes, MAX_UNCHANGED,
glob_log10_abserr, glob_look_poles, centuries_in_millinium, hours_in_day,
djd_debug2, glob_optimal_expect_sec, glob_small_float, glob_max_trunc_err,
glob_display_flag, glob_curr_iter_when_opt, glob_last_good_h,
glob_optimal_done, glob_reached_optimal_h, glob_not_yet_finished,
glob_almost_1, glob_percent_done, glob_optimal_start, glob_no_eqs,
glob_max_hours, glob_relerr, glob_log10_relerr, min_in_hour,
glob_log10relerr, glob_log10abserr, glob_start, glob_max_rel_trunc_err,
glob_clock_sec, glob_max_opt_iter, glob_max_sec, glob_abserr,
years_in_century, glob_dump, glob_html_log, glob_log10normmin, glob_warned2,
glob_optimal_clock_start_sec, sec_in_min, glob_subiter_method,
glob_dump_analytic, glob_hmax, array_const_3D0, array_const_4D0,
array_const_0D0, array_const_2, array_const_1, array_const_2D0,
array_fact_1, array_x1_init, array_t, array_type_pole, array_tmp0,
array_tmp1, array_tmp2, array_tmp3, array_tmp4, array_tmp5, array_tmp6,
array_tmp7, array_tmp8, array_tmp9, array_last_rel_error, array_pole,
array_norms, array_x2_init, array_m1, array_x1, array_x2, array_tmp10,
array_tmp11, array_tmp12, array_tmp13, array_tmp14, array_tmp15,
array_tmp16, array_tmp17, array_1st_rel_error, array_fact_2,
array_x1_higher, array_x2_set_initial, array_x1_set_initial,
array_complex_pole, array_x1_higher_work2, array_x2_higher_work2,
array_real_pole, array_poles, array_x2_higher, array_x1_higher_work,
array_x2_higher_work, glob_last;
n := glob_max_terms;
m := n - 2;
while 10 <= m and (abs(array_x1_higher[1, m]) < glob_small_float or
abs(array_x1_higher[1, m - 1]) < glob_small_float or
abs(array_x1_higher[1, m - 2]) < glob_small_float) do m := m - 1
end do;
if 10 < m then
rm0 := array_x1_higher[1, m]/array_x1_higher[1, m - 1];
rm1 := array_x1_higher[1, m - 1]/array_x1_higher[1, m - 2];
hdrc := convfloat(m - 1)*rm0 - convfloat(m - 2)*rm1;
if glob_small_float < abs(hdrc) then
rcs := glob_h/hdrc;
ord_no := convfloat(m - 1)*rm0/hdrc - convfloat(m) + 2.0;
array_real_pole[1, 1] := rcs;
array_real_pole[1, 2] := ord_no
else
array_real_pole[1, 1] := glob_large_float;
array_real_pole[1, 2] := glob_large_float
end if
else
array_real_pole[1, 1] := glob_large_float;
array_real_pole[1, 2] := glob_large_float
end if;
n := glob_max_terms;
m := n - 3;
while 10 <= m and (abs(array_x2_higher[1, m]) < glob_small_float or
abs(array_x2_higher[1, m - 1]) < glob_small_float or
abs(array_x2_higher[1, m - 2]) < glob_small_float) do m := m - 1
end do;
if 10 < m then
rm0 := array_x2_higher[1, m]/array_x2_higher[1, m - 1];
rm1 := array_x2_higher[1, m - 1]/array_x2_higher[1, m - 2];
hdrc := convfloat(m - 1)*rm0 - convfloat(m - 2)*rm1;
if glob_small_float < abs(hdrc) then
rcs := glob_h/hdrc;
ord_no := convfloat(m - 1)*rm0/hdrc - convfloat(m) + 2.0;
array_real_pole[2, 1] := rcs;
array_real_pole[2, 2] := ord_no
else
array_real_pole[2, 1] := glob_large_float;
array_real_pole[2, 2] := glob_large_float
end if
else
array_real_pole[2, 1] := glob_large_float;
array_real_pole[2, 2] := glob_large_float
end if;
n := glob_max_terms - 2;
cnt := 0;
while cnt < 5 and 10 <= n do
if glob_small_float < abs(array_x1_higher[1, n]) then
cnt := cnt + 1
else cnt := 0
end if;
n := n - 1
end do;
m := n + cnt;
if m <= 10 then
array_complex_pole[1, 1] := glob_large_float;
array_complex_pole[1, 2] := glob_large_float
elif glob_large_float <= abs(array_x1_higher[1, m]) or
glob_large_float <= abs(array_x1_higher[1, m - 1]) or
glob_large_float <= abs(array_x1_higher[1, m - 2]) or
glob_large_float <= abs(array_x1_higher[1, m - 3]) or
glob_large_float <= abs(array_x1_higher[1, m - 4]) or
glob_large_float <= abs(array_x1_higher[1, m - 5]) then
array_complex_pole[1, 1] := glob_large_float;
array_complex_pole[1, 2] := glob_large_float
else
rm0 := array_x1_higher[1, m]/array_x1_higher[1, m - 1];
rm1 := array_x1_higher[1, m - 1]/array_x1_higher[1, m - 2];
rm2 := array_x1_higher[1, m - 2]/array_x1_higher[1, m - 3];
rm3 := array_x1_higher[1, m - 3]/array_x1_higher[1, m - 4];
rm4 := array_x1_higher[1, m - 4]/array_x1_higher[1, m - 5];
nr1 := convfloat(m - 1)*rm0 - 2.0*convfloat(m - 2)*rm1
+ convfloat(m - 3)*rm2;
nr2 := convfloat(m - 2)*rm1 - 2.0*convfloat(m - 3)*rm2
+ convfloat(m - 4)*rm3;
dr1 := (-1)*(1.0)/rm1 + 2.0/rm2 - 1.0/rm3;
dr2 := (-1)*(1.0)/rm2 + 2.0/rm3 - 1.0/rm4;
ds1 := 3.0/rm1 - 8.0/rm2 + 5.0/rm3;
ds2 := 3.0/rm2 - 8.0/rm3 + 5.0/rm4;
if abs(nr1*dr2 - nr2*dr1) <= glob_small_float or
abs(dr1) <= glob_small_float then
array_complex_pole[1, 1] := glob_large_float;
array_complex_pole[1, 2] := glob_large_float
else
if glob_small_float < abs(nr1*dr2 - nr2*dr1) then
rcs := (ds1*dr2 - ds2*dr1 + dr1*dr2)/(nr1*dr2 - nr2*dr1);
ord_no := (rcs*nr1 - ds1)/(2.0*dr1) - convfloat(m)/2.0;
if glob_small_float < abs(rcs) then
if 0. < rcs then rad_c := sqrt(rcs)*glob_h
else rad_c := glob_large_float
end if
else rad_c := glob_large_float; ord_no := glob_large_float
end if
else rad_c := glob_large_float; ord_no := glob_large_float
end if
end if;
array_complex_pole[1, 1] := rad_c;
array_complex_pole[1, 2] := ord_no
end if;
n := glob_max_terms - 3;
cnt := 0;
while cnt < 5 and 10 <= n do
if glob_small_float < abs(array_x2_higher[1, n]) then
cnt := cnt + 1
else cnt := 0
end if;
n := n - 1
end do;
m := n + cnt;
if m <= 10 then
array_complex_pole[2, 1] := glob_large_float;
array_complex_pole[2, 2] := glob_large_float
elif glob_large_float <= abs(array_x2_higher[1, m]) or
glob_large_float <= abs(array_x2_higher[1, m - 1]) or
glob_large_float <= abs(array_x2_higher[1, m - 2]) or
glob_large_float <= abs(array_x2_higher[1, m - 3]) or
glob_large_float <= abs(array_x2_higher[1, m - 4]) or
glob_large_float <= abs(array_x2_higher[1, m - 5]) then
array_complex_pole[2, 1] := glob_large_float;
array_complex_pole[2, 2] := glob_large_float
else
rm0 := array_x2_higher[1, m]/array_x2_higher[1, m - 1];
rm1 := array_x2_higher[1, m - 1]/array_x2_higher[1, m - 2];
rm2 := array_x2_higher[1, m - 2]/array_x2_higher[1, m - 3];
rm3 := array_x2_higher[1, m - 3]/array_x2_higher[1, m - 4];
rm4 := array_x2_higher[1, m - 4]/array_x2_higher[1, m - 5];
nr1 := convfloat(m - 1)*rm0 - 2.0*convfloat(m - 2)*rm1
+ convfloat(m - 3)*rm2;
nr2 := convfloat(m - 2)*rm1 - 2.0*convfloat(m - 3)*rm2
+ convfloat(m - 4)*rm3;
dr1 := (-1)*(1.0)/rm1 + 2.0/rm2 - 1.0/rm3;
dr2 := (-1)*(1.0)/rm2 + 2.0/rm3 - 1.0/rm4;
ds1 := 3.0/rm1 - 8.0/rm2 + 5.0/rm3;
ds2 := 3.0/rm2 - 8.0/rm3 + 5.0/rm4;
if abs(nr1*dr2 - nr2*dr1) <= glob_small_float or
abs(dr1) <= glob_small_float then
array_complex_pole[2, 1] := glob_large_float;
array_complex_pole[2, 2] := glob_large_float
else
if glob_small_float < abs(nr1*dr2 - nr2*dr1) then
rcs := (ds1*dr2 - ds2*dr1 + dr1*dr2)/(nr1*dr2 - nr2*dr1);
ord_no := (rcs*nr1 - ds1)/(2.0*dr1) - convfloat(m)/2.0;
if glob_small_float < abs(rcs) then
if 0. < rcs then rad_c := sqrt(rcs)*glob_h
else rad_c := glob_large_float
end if
else rad_c := glob_large_float; ord_no := glob_large_float
end if
else rad_c := glob_large_float; ord_no := glob_large_float
end if
end if;
array_complex_pole[2, 1] := rad_c;
array_complex_pole[2, 2] := ord_no
end if;
found := false;
if not found and (array_real_pole[1, 1] = glob_large_float or
array_real_pole[1, 2] = glob_large_float) and
array_complex_pole[1, 1] <> glob_large_float and
array_complex_pole[1, 2] <> glob_large_float and
0. < array_complex_pole[1, 1] and 0. < array_complex_pole[1, 2] then
array_poles[1, 1] := array_complex_pole[1, 1];
array_poles[1, 2] := array_complex_pole[1, 2];
found := true;
array_type_pole[1] := 2;
if glob_display_flag then
omniout_str(ALWAYS, "Complex estimate of poles used")
end if
end if;
if not found and array_real_pole[1, 1] <> glob_large_float and
array_real_pole[1, 2] <> glob_large_float and
0. < array_real_pole[1, 1] and 0. < array_real_pole[1, 2] and (
array_complex_pole[1, 1] = glob_large_float or
array_complex_pole[1, 2] = glob_large_float or
array_complex_pole[1, 1] <= 0. or array_complex_pole[1, 2] <= 0.) then
array_poles[1, 1] := array_real_pole[1, 1];
array_poles[1, 2] := array_real_pole[1, 2];
found := true;
array_type_pole[1] := 1;
if glob_display_flag then
omniout_str(ALWAYS, "Real estimate of pole used")
end if
end if;
if not found and (array_real_pole[1, 1] = glob_large_float or
array_real_pole[1, 2] = glob_large_float) and (
array_complex_pole[1, 1] = glob_large_float or
array_complex_pole[1, 2] = glob_large_float) then
array_poles[1, 1] := glob_large_float;
array_poles[1, 2] := glob_large_float;
found := true;
array_type_pole[1] := 3;
if glob_display_flag then omniout_str(ALWAYS, "NO POLE") end if
end if;
if not found and array_real_pole[1, 1] < array_complex_pole[1, 1] and
0. < array_real_pole[1, 1] and 0. < array_real_pole[1, 2] then
array_poles[1, 1] := array_real_pole[1, 1];
array_poles[1, 2] := array_real_pole[1, 2];
found := true;
array_type_pole[1] := 1;
if glob_display_flag then
omniout_str(ALWAYS, "Real estimate of pole used")
end if
end if;
if not found and array_complex_pole[1, 1] <> glob_large_float and
array_complex_pole[1, 2] <> glob_large_float and
0. < array_complex_pole[1, 1] and 0. < array_complex_pole[1, 2] then
array_poles[1, 1] := array_complex_pole[1, 1];
array_poles[1, 2] := array_complex_pole[1, 2];
array_type_pole[1] := 2;
found := true;
if glob_display_flag then
omniout_str(ALWAYS, "Complex estimate of poles used")
end if
end if;
if not found then
array_poles[1, 1] := glob_large_float;
array_poles[1, 2] := glob_large_float;
array_type_pole[1] := 3;
if glob_display_flag then omniout_str(ALWAYS, "NO POLE") end if
end if;
found := false;
if not found and (array_real_pole[2, 1] = glob_large_float or
array_real_pole[2, 2] = glob_large_float) and
array_complex_pole[2, 1] <> glob_large_float and
array_complex_pole[2, 2] <> glob_large_float and
0. < array_complex_pole[2, 1] and 0. < array_complex_pole[2, 2] then
array_poles[2, 1] := array_complex_pole[2, 1];
array_poles[2, 2] := array_complex_pole[2, 2];
found := true;
array_type_pole[2] := 2;
if glob_display_flag then
omniout_str(ALWAYS, "Complex estimate of poles used")
end if
end if;
if not found and array_real_pole[2, 1] <> glob_large_float and
array_real_pole[2, 2] <> glob_large_float and
0. < array_real_pole[2, 1] and 0. < array_real_pole[2, 2] and (
array_complex_pole[2, 1] = glob_large_float or
array_complex_pole[2, 2] = glob_large_float or
array_complex_pole[2, 1] <= 0. or array_complex_pole[2, 2] <= 0.) then
array_poles[2, 1] := array_real_pole[2, 1];
array_poles[2, 2] := array_real_pole[2, 2];
found := true;
array_type_pole[2] := 1;
if glob_display_flag then
omniout_str(ALWAYS, "Real estimate of pole used")
end if
end if;
if not found and (array_real_pole[2, 1] = glob_large_float or
array_real_pole[2, 2] = glob_large_float) and (
array_complex_pole[2, 1] = glob_large_float or
array_complex_pole[2, 2] = glob_large_float) then
array_poles[2, 1] := glob_large_float;
array_poles[2, 2] := glob_large_float;
found := true;
array_type_pole[2] := 3;
if glob_display_flag then omniout_str(ALWAYS, "NO POLE") end if
end if;
if not found and array_real_pole[2, 1] < array_complex_pole[2, 1] and
0. < array_real_pole[2, 1] and 0. < array_real_pole[2, 2] then
array_poles[2, 1] := array_real_pole[2, 1];
array_poles[2, 2] := array_real_pole[2, 2];
found := true;
array_type_pole[2] := 1;
if glob_display_flag then
omniout_str(ALWAYS, "Real estimate of pole used")
end if
end if;
if not found and array_complex_pole[2, 1] <> glob_large_float and
array_complex_pole[2, 2] <> glob_large_float and
0. < array_complex_pole[2, 1] and 0. < array_complex_pole[2, 2] then
array_poles[2, 1] := array_complex_pole[2, 1];
array_poles[2, 2] := array_complex_pole[2, 2];
array_type_pole[2] := 2;
found := true;
if glob_display_flag then
omniout_str(ALWAYS, "Complex estimate of poles used")
end if
end if;
if not found then
array_poles[2, 1] := glob_large_float;
array_poles[2, 2] := glob_large_float;
array_type_pole[2] := 3;
if glob_display_flag then omniout_str(ALWAYS, "NO POLE") end if
end if;
array_pole[1] := glob_large_float;
array_pole[2] := glob_large_float;
if array_poles[1, 1] < array_pole[1] then
array_pole[1] := array_poles[1, 1];
array_pole[2] := array_poles[1, 2]
end if;
if array_poles[2, 1] < array_pole[1] then
array_pole[1] := array_poles[2, 1];
array_pole[2] := array_poles[2, 2]
end if;
display_pole()
end proc
> # Begin Function number 7
> get_norms := proc()
> global
> DEBUGMASSIVE,
> glob_max_terms,
> INFO,
> DEBUGL,
> glob_iolevel,
> ALWAYS,
> #Top Generate Globals Decl
> glob_iter,
> glob_warned,
> glob_large_float,
> glob_hmin,
> glob_disp_incr,
> glob_current_iter,
> glob_unchanged_h_cnt,
> glob_not_yet_start_msg,
> glob_initial_pass,
> days_in_year,
> glob_normmax,
> glob_orig_start_sec,
> glob_smallish_float,
> glob_max_iter,
> glob_hmin_init,
> glob_h,
> glob_clock_start_sec,
> djd_debug,
> glob_max_minutes,
> MAX_UNCHANGED,
> glob_log10_abserr,
> glob_look_poles,
> centuries_in_millinium,
> hours_in_day,
> djd_debug2,
> glob_optimal_expect_sec,
> glob_small_float,
> glob_max_trunc_err,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_last_good_h,
> glob_optimal_done,
> glob_reached_optimal_h,
> glob_not_yet_finished,
> glob_almost_1,
> glob_percent_done,
> glob_optimal_start,
> glob_no_eqs,
> glob_max_hours,
> glob_relerr,
> glob_log10_relerr,
> min_in_hour,
> glob_log10relerr,
> glob_log10abserr,
> glob_start,
> glob_max_rel_trunc_err,
> glob_clock_sec,
> glob_max_opt_iter,
> glob_max_sec,
> glob_abserr,
> years_in_century,
> glob_dump,
> glob_html_log,
> glob_log10normmin,
> glob_warned2,
> glob_optimal_clock_start_sec,
> sec_in_min,
> glob_subiter_method,
> glob_dump_analytic,
> glob_hmax,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_3D0,
> array_const_4D0,
> array_const_0D0,
> array_const_2,
> array_const_1,
> array_const_2D0,
> #END CONST
> array_fact_1,
> array_x1_init,
> array_t,
> array_type_pole,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_last_rel_error,
> array_pole,
> array_norms,
> array_x2_init,
> array_m1,
> array_x1,
> array_x2,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_1st_rel_error,
> array_fact_2,
> array_x1_higher,
> array_x2_set_initial,
> array_x1_set_initial,
> array_complex_pole,
> array_x1_higher_work2,
> array_x2_higher_work2,
> array_real_pole,
> array_poles,
> array_x2_higher,
> array_x1_higher_work,
> array_x2_higher_work,
> glob_last;
>
> local iii;
> if (not glob_initial_pass) then # if number 3
> set_z(array_norms,glob_max_terms+1);
> #TOP GET NORMS
> iii := 1;
> while (iii <= glob_max_terms) do # do number 2
> if (abs(array_x1[iii]) > array_norms[iii]) then # if number 4
> array_norms[iii] := abs(array_x1[iii]);
> fi;# end if 4
> ;
> iii := iii + 1;
> od;# end do number 2
> ;
> iii := 1;
> while (iii <= glob_max_terms) do # do number 2
> if (abs(array_x2[iii]) > array_norms[iii]) then # if number 4
> array_norms[iii] := abs(array_x2[iii]);
> fi;# end if 4
> ;
> iii := iii + 1;
> od;# end do number 2
> #GET NORMS
> ;
> fi;# end if 3
> ;
> # End Function number 7
> end;
get_norms := proc()
local iii;
global DEBUGMASSIVE, glob_max_terms, INFO, DEBUGL, glob_iolevel, ALWAYS,
glob_iter, glob_warned, glob_large_float, glob_hmin, glob_disp_incr,
glob_current_iter, glob_unchanged_h_cnt, glob_not_yet_start_msg,
glob_initial_pass, days_in_year, glob_normmax, glob_orig_start_sec,
glob_smallish_float, glob_max_iter, glob_hmin_init, glob_h,
glob_clock_start_sec, djd_debug, glob_max_minutes, MAX_UNCHANGED,
glob_log10_abserr, glob_look_poles, centuries_in_millinium, hours_in_day,
djd_debug2, glob_optimal_expect_sec, glob_small_float, glob_max_trunc_err,
glob_display_flag, glob_curr_iter_when_opt, glob_last_good_h,
glob_optimal_done, glob_reached_optimal_h, glob_not_yet_finished,
glob_almost_1, glob_percent_done, glob_optimal_start, glob_no_eqs,
glob_max_hours, glob_relerr, glob_log10_relerr, min_in_hour,
glob_log10relerr, glob_log10abserr, glob_start, glob_max_rel_trunc_err,
glob_clock_sec, glob_max_opt_iter, glob_max_sec, glob_abserr,
years_in_century, glob_dump, glob_html_log, glob_log10normmin, glob_warned2,
glob_optimal_clock_start_sec, sec_in_min, glob_subiter_method,
glob_dump_analytic, glob_hmax, array_const_3D0, array_const_4D0,
array_const_0D0, array_const_2, array_const_1, array_const_2D0,
array_fact_1, array_x1_init, array_t, array_type_pole, array_tmp0,
array_tmp1, array_tmp2, array_tmp3, array_tmp4, array_tmp5, array_tmp6,
array_tmp7, array_tmp8, array_tmp9, array_last_rel_error, array_pole,
array_norms, array_x2_init, array_m1, array_x1, array_x2, array_tmp10,
array_tmp11, array_tmp12, array_tmp13, array_tmp14, array_tmp15,
array_tmp16, array_tmp17, array_1st_rel_error, array_fact_2,
array_x1_higher, array_x2_set_initial, array_x1_set_initial,
array_complex_pole, array_x1_higher_work2, array_x2_higher_work2,
array_real_pole, array_poles, array_x2_higher, array_x1_higher_work,
array_x2_higher_work, glob_last;
if not glob_initial_pass then
set_z(array_norms, glob_max_terms + 1);
iii := 1;
while iii <= glob_max_terms do
if array_norms[iii] < abs(array_x1[iii]) then
array_norms[iii] := abs(array_x1[iii])
end if;
iii := iii + 1
end do;
iii := 1;
while iii <= glob_max_terms do
if array_norms[iii] < abs(array_x2[iii]) then
array_norms[iii] := abs(array_x2[iii])
end if;
iii := iii + 1
end do
end if
end proc
> # Begin Function number 8
> atomall := proc()
> global
> DEBUGMASSIVE,
> glob_max_terms,
> INFO,
> DEBUGL,
> glob_iolevel,
> ALWAYS,
> #Top Generate Globals Decl
> glob_iter,
> glob_warned,
> glob_large_float,
> glob_hmin,
> glob_disp_incr,
> glob_current_iter,
> glob_unchanged_h_cnt,
> glob_not_yet_start_msg,
> glob_initial_pass,
> days_in_year,
> glob_normmax,
> glob_orig_start_sec,
> glob_smallish_float,
> glob_max_iter,
> glob_hmin_init,
> glob_h,
> glob_clock_start_sec,
> djd_debug,
> glob_max_minutes,
> MAX_UNCHANGED,
> glob_log10_abserr,
> glob_look_poles,
> centuries_in_millinium,
> hours_in_day,
> djd_debug2,
> glob_optimal_expect_sec,
> glob_small_float,
> glob_max_trunc_err,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_last_good_h,
> glob_optimal_done,
> glob_reached_optimal_h,
> glob_not_yet_finished,
> glob_almost_1,
> glob_percent_done,
> glob_optimal_start,
> glob_no_eqs,
> glob_max_hours,
> glob_relerr,
> glob_log10_relerr,
> min_in_hour,
> glob_log10relerr,
> glob_log10abserr,
> glob_start,
> glob_max_rel_trunc_err,
> glob_clock_sec,
> glob_max_opt_iter,
> glob_max_sec,
> glob_abserr,
> years_in_century,
> glob_dump,
> glob_html_log,
> glob_log10normmin,
> glob_warned2,
> glob_optimal_clock_start_sec,
> sec_in_min,
> glob_subiter_method,
> glob_dump_analytic,
> glob_hmax,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_3D0,
> array_const_4D0,
> array_const_0D0,
> array_const_2,
> array_const_1,
> array_const_2D0,
> #END CONST
> array_fact_1,
> array_x1_init,
> array_t,
> array_type_pole,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_last_rel_error,
> array_pole,
> array_norms,
> array_x2_init,
> array_m1,
> array_x1,
> array_x2,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_1st_rel_error,
> array_fact_2,
> array_x1_higher,
> array_x2_set_initial,
> array_x1_set_initial,
> array_complex_pole,
> array_x1_higher_work2,
> array_x2_higher_work2,
> array_real_pole,
> array_poles,
> array_x2_higher,
> array_x1_higher_work,
> array_x2_higher_work,
> glob_last;
>
> local kkk, order_d, adj2, temporary, term;
> #TOP ATOMALL
> #END OUTFILE1
> #BEGIN ATOMHDR1
> # emit pre mult $eq_no = 1 i = 1
> array_tmp1[1] := (array_const_4D0[1] * (array_x2[1]));
> #emit pre add $eq_no = 1 i = 1
> array_tmp2[1] := array_const_0D0[1] + array_tmp1[1];
> #emit pre diff $eq_no = 1 i = 1
> array_tmp3[1] := array_x2_higher[2,1];
> # emit pre mult $eq_no = 1 i = 1
> array_tmp4[1] := (array_const_2D0[1] * (array_tmp3[1]));
> #emit pre sub $eq_no = 1 i = 1
> array_tmp5[1] := (array_tmp2[1] - (array_tmp4[1]));
> # emit pre mult $eq_no = 1 i = 1
> array_tmp6[1] := (array_const_2D0[1] * (array_x1[1]));
> #emit pre sub $eq_no = 1 i = 1
> array_tmp7[1] := (array_tmp5[1] - (array_tmp6[1]));
> #emit pre assign xxx $eq_no = 1 i = 1 $min_hdrs = 5
> if not array_x1_set_initial[1,2] then # if number 1
> if (1 <= glob_max_terms) then # if number 2
> temporary := array_tmp7[1] * (glob_h ^ (1)) * factorial_3(0,1);
> array_x1[2] := temporary;
> array_x1_higher[1,2] := temporary;
> temporary := temporary / glob_h * (2.0);
> array_x1_higher[2,1] := temporary
> ;
> fi;# end if 2
> ;
> fi;# end if 1
> ;
> kkk := 2;
> #emit pre diff $eq_no = 2 i = 1
> array_tmp9[1] := array_x2_higher[2,1];
> # emit pre mult $eq_no = 2 i = 1
> array_tmp10[1] := (array_const_3D0[1] * (array_tmp9[1]));
> # emit pre mult $eq_no = 2 i = 1
> array_tmp11[1] := (array_const_2D0[1] * (array_x2[1]));
> #emit pre sub $eq_no = 2 i = 1
> array_tmp12[1] := (array_tmp10[1] - (array_tmp11[1]));
> #emit pre diff $eq_no = 2 i = 1
> array_tmp13[1] := array_x1_higher[3,1];
> #emit pre sub $eq_no = 2 i = 1
> array_tmp14[1] := (array_tmp12[1] - (array_tmp13[1]));
> #emit pre diff $eq_no = 2 i = 1
> array_tmp15[1] := array_x1_higher[2,1];
> #emit pre sub $eq_no = 2 i = 1
> array_tmp16[1] := (array_tmp14[1] - (array_tmp15[1]));
> #emit pre add $eq_no = 2 i = 1
> array_tmp17[1] := array_tmp16[1] + array_x1[1];
> #emit pre assign xxx $eq_no = 2 i = 1 $min_hdrs = 5
> if not array_x2_set_initial[2,3] then # if number 1
> if (1 <= glob_max_terms) then # if number 2
> temporary := array_tmp17[1] * (glob_h ^ (2)) * factorial_3(0,2);
> array_x2[3] := temporary;
> array_x2_higher[1,3] := temporary;
> temporary := temporary / glob_h * (2.0);
> array_x2_higher[2,2] := temporary
> ;
> temporary := temporary / glob_h * (3.0);
> array_x2_higher[3,1] := temporary
> ;
> fi;# end if 2
> ;
> fi;# end if 1
> ;
> kkk := 2;
> #END ATOMHDR1
> #BEGIN ATOMHDR2
> # emit pre mult $eq_no = 1 i = 2
> array_tmp1[2] := ats(2,array_const_4D0,array_x2,1);
> #emit pre add $eq_no = 1 i = 2
> array_tmp2[2] := array_const_0D0[2] + array_tmp1[2];
> #emit pre diff $eq_no = 1 i = 2
> array_tmp3[2] := array_x2_higher[2,2];
> # emit pre mult $eq_no = 1 i = 2
> array_tmp4[2] := ats(2,array_const_2D0,array_tmp3,1);
> #emit pre sub $eq_no = 1 i = 2
> array_tmp5[2] := (array_tmp2[2] - (array_tmp4[2]));
> # emit pre mult $eq_no = 1 i = 2
> array_tmp6[2] := ats(2,array_const_2D0,array_x1,1);
> #emit pre sub $eq_no = 1 i = 2
> array_tmp7[2] := (array_tmp5[2] - (array_tmp6[2]));
> #emit pre assign xxx $eq_no = 1 i = 2 $min_hdrs = 5
> if not array_x1_set_initial[1,3] then # if number 1
> if (2 <= glob_max_terms) then # if number 2
> temporary := array_tmp7[2] * (glob_h ^ (1)) * factorial_3(1,2);
> array_x1[3] := temporary;
> array_x1_higher[1,3] := temporary;
> temporary := temporary / glob_h * (2.0);
> array_x1_higher[2,2] := temporary
> ;
> fi;# end if 2
> ;
> fi;# end if 1
> ;
> kkk := 3;
> #emit pre diff $eq_no = 2 i = 2
> array_tmp9[2] := array_x2_higher[2,2];
> # emit pre mult $eq_no = 2 i = 2
> array_tmp10[2] := ats(2,array_const_3D0,array_tmp9,1);
> # emit pre mult $eq_no = 2 i = 2
> array_tmp11[2] := ats(2,array_const_2D0,array_x2,1);
> #emit pre sub $eq_no = 2 i = 2
> array_tmp12[2] := (array_tmp10[2] - (array_tmp11[2]));
> #emit pre diff $eq_no = 2 i = 2
> array_tmp13[2] := array_x1_higher[3,2];
> #emit pre sub $eq_no = 2 i = 2
> array_tmp14[2] := (array_tmp12[2] - (array_tmp13[2]));
> #emit pre diff $eq_no = 2 i = 2
> array_tmp15[2] := array_x1_higher[2,2];
> #emit pre sub $eq_no = 2 i = 2
> array_tmp16[2] := (array_tmp14[2] - (array_tmp15[2]));
> #emit pre add $eq_no = 2 i = 2
> array_tmp17[2] := array_tmp16[2] + array_x1[2];
> #emit pre assign xxx $eq_no = 2 i = 2 $min_hdrs = 5
> if not array_x2_set_initial[2,4] then # if number 1
> if (2 <= glob_max_terms) then # if number 2
> temporary := array_tmp17[2] * (glob_h ^ (2)) * factorial_3(1,3);
> array_x2[4] := temporary;
> array_x2_higher[1,4] := temporary;
> temporary := temporary / glob_h * (2.0);
> array_x2_higher[2,3] := temporary
> ;
> temporary := temporary / glob_h * (3.0);
> array_x2_higher[3,2] := temporary
> ;
> fi;# end if 2
> ;
> fi;# end if 1
> ;
> kkk := 3;
> #END ATOMHDR2
> #BEGIN ATOMHDR3
> # emit pre mult $eq_no = 1 i = 3
> array_tmp1[3] := ats(3,array_const_4D0,array_x2,1);
> #emit pre add $eq_no = 1 i = 3
> array_tmp2[3] := array_const_0D0[3] + array_tmp1[3];
> #emit pre diff $eq_no = 1 i = 3
> array_tmp3[3] := array_x2_higher[2,3];
> # emit pre mult $eq_no = 1 i = 3
> array_tmp4[3] := ats(3,array_const_2D0,array_tmp3,1);
> #emit pre sub $eq_no = 1 i = 3
> array_tmp5[3] := (array_tmp2[3] - (array_tmp4[3]));
> # emit pre mult $eq_no = 1 i = 3
> array_tmp6[3] := ats(3,array_const_2D0,array_x1,1);
> #emit pre sub $eq_no = 1 i = 3
> array_tmp7[3] := (array_tmp5[3] - (array_tmp6[3]));
> #emit pre assign xxx $eq_no = 1 i = 3 $min_hdrs = 5
> if not array_x1_set_initial[1,4] then # if number 1
> if (3 <= glob_max_terms) then # if number 2
> temporary := array_tmp7[3] * (glob_h ^ (1)) * factorial_3(2,3);
> array_x1[4] := temporary;
> array_x1_higher[1,4] := temporary;
> temporary := temporary / glob_h * (2.0);
> array_x1_higher[2,3] := temporary
> ;
> fi;# end if 2
> ;
> fi;# end if 1
> ;
> kkk := 4;
> #emit pre diff $eq_no = 2 i = 3
> array_tmp9[3] := array_x2_higher[2,3];
> # emit pre mult $eq_no = 2 i = 3
> array_tmp10[3] := ats(3,array_const_3D0,array_tmp9,1);
> # emit pre mult $eq_no = 2 i = 3
> array_tmp11[3] := ats(3,array_const_2D0,array_x2,1);
> #emit pre sub $eq_no = 2 i = 3
> array_tmp12[3] := (array_tmp10[3] - (array_tmp11[3]));
> #emit pre diff $eq_no = 2 i = 3
> array_tmp13[3] := array_x1_higher[3,3];
> #emit pre sub $eq_no = 2 i = 3
> array_tmp14[3] := (array_tmp12[3] - (array_tmp13[3]));
> #emit pre diff $eq_no = 2 i = 3
> array_tmp15[3] := array_x1_higher[2,3];
> #emit pre sub $eq_no = 2 i = 3
> array_tmp16[3] := (array_tmp14[3] - (array_tmp15[3]));
> #emit pre add $eq_no = 2 i = 3
> array_tmp17[3] := array_tmp16[3] + array_x1[3];
> #emit pre assign xxx $eq_no = 2 i = 3 $min_hdrs = 5
> if not array_x2_set_initial[2,5] then # if number 1
> if (3 <= glob_max_terms) then # if number 2
> temporary := array_tmp17[3] * (glob_h ^ (2)) * factorial_3(2,4);
> array_x2[5] := temporary;
> array_x2_higher[1,5] := temporary;
> temporary := temporary / glob_h * (2.0);
> array_x2_higher[2,4] := temporary
> ;
> temporary := temporary / glob_h * (3.0);
> array_x2_higher[3,3] := temporary
> ;
> fi;# end if 2
> ;
> fi;# end if 1
> ;
> kkk := 4;
> #END ATOMHDR3
> #BEGIN ATOMHDR4
> # emit pre mult $eq_no = 1 i = 4
> array_tmp1[4] := ats(4,array_const_4D0,array_x2,1);
> #emit pre add $eq_no = 1 i = 4
> array_tmp2[4] := array_const_0D0[4] + array_tmp1[4];
> #emit pre diff $eq_no = 1 i = 4
> array_tmp3[4] := array_x2_higher[2,4];
> # emit pre mult $eq_no = 1 i = 4
> array_tmp4[4] := ats(4,array_const_2D0,array_tmp3,1);
> #emit pre sub $eq_no = 1 i = 4
> array_tmp5[4] := (array_tmp2[4] - (array_tmp4[4]));
> # emit pre mult $eq_no = 1 i = 4
> array_tmp6[4] := ats(4,array_const_2D0,array_x1,1);
> #emit pre sub $eq_no = 1 i = 4
> array_tmp7[4] := (array_tmp5[4] - (array_tmp6[4]));
> #emit pre assign xxx $eq_no = 1 i = 4 $min_hdrs = 5
> if not array_x1_set_initial[1,5] then # if number 1
> if (4 <= glob_max_terms) then # if number 2
> temporary := array_tmp7[4] * (glob_h ^ (1)) * factorial_3(3,4);
> array_x1[5] := temporary;
> array_x1_higher[1,5] := temporary;
> temporary := temporary / glob_h * (2.0);
> array_x1_higher[2,4] := temporary
> ;
> fi;# end if 2
> ;
> fi;# end if 1
> ;
> kkk := 5;
> #emit pre diff $eq_no = 2 i = 4
> array_tmp9[4] := array_x2_higher[2,4];
> # emit pre mult $eq_no = 2 i = 4
> array_tmp10[4] := ats(4,array_const_3D0,array_tmp9,1);
> # emit pre mult $eq_no = 2 i = 4
> array_tmp11[4] := ats(4,array_const_2D0,array_x2,1);
> #emit pre sub $eq_no = 2 i = 4
> array_tmp12[4] := (array_tmp10[4] - (array_tmp11[4]));
> #emit pre diff $eq_no = 2 i = 4
> array_tmp13[4] := array_x1_higher[3,4];
> #emit pre sub $eq_no = 2 i = 4
> array_tmp14[4] := (array_tmp12[4] - (array_tmp13[4]));
> #emit pre diff $eq_no = 2 i = 4
> array_tmp15[4] := array_x1_higher[2,4];
> #emit pre sub $eq_no = 2 i = 4
> array_tmp16[4] := (array_tmp14[4] - (array_tmp15[4]));
> #emit pre add $eq_no = 2 i = 4
> array_tmp17[4] := array_tmp16[4] + array_x1[4];
> #emit pre assign xxx $eq_no = 2 i = 4 $min_hdrs = 5
> if not array_x2_set_initial[2,6] then # if number 1
> if (4 <= glob_max_terms) then # if number 2
> temporary := array_tmp17[4] * (glob_h ^ (2)) * factorial_3(3,5);
> array_x2[6] := temporary;
> array_x2_higher[1,6] := temporary;
> temporary := temporary / glob_h * (2.0);
> array_x2_higher[2,5] := temporary
> ;
> temporary := temporary / glob_h * (3.0);
> array_x2_higher[3,4] := temporary
> ;
> fi;# end if 2
> ;
> fi;# end if 1
> ;
> kkk := 5;
> #END ATOMHDR4
> #BEGIN ATOMHDR5
> # emit pre mult $eq_no = 1 i = 5
> array_tmp1[5] := ats(5,array_const_4D0,array_x2,1);
> #emit pre add $eq_no = 1 i = 5
> array_tmp2[5] := array_const_0D0[5] + array_tmp1[5];
> #emit pre diff $eq_no = 1 i = 5
> array_tmp3[5] := array_x2_higher[2,5];
> # emit pre mult $eq_no = 1 i = 5
> array_tmp4[5] := ats(5,array_const_2D0,array_tmp3,1);
> #emit pre sub $eq_no = 1 i = 5
> array_tmp5[5] := (array_tmp2[5] - (array_tmp4[5]));
> # emit pre mult $eq_no = 1 i = 5
> array_tmp6[5] := ats(5,array_const_2D0,array_x1,1);
> #emit pre sub $eq_no = 1 i = 5
> array_tmp7[5] := (array_tmp5[5] - (array_tmp6[5]));
> #emit pre assign xxx $eq_no = 1 i = 5 $min_hdrs = 5
> if not array_x1_set_initial[1,6] then # if number 1
> if (5 <= glob_max_terms) then # if number 2
> temporary := array_tmp7[5] * (glob_h ^ (1)) * factorial_3(4,5);
> array_x1[6] := temporary;
> array_x1_higher[1,6] := temporary;
> temporary := temporary / glob_h * (2.0);
> array_x1_higher[2,5] := temporary
> ;
> fi;# end if 2
> ;
> fi;# end if 1
> ;
> kkk := 6;
> #emit pre diff $eq_no = 2 i = 5
> array_tmp9[5] := array_x2_higher[2,5];
> # emit pre mult $eq_no = 2 i = 5
> array_tmp10[5] := ats(5,array_const_3D0,array_tmp9,1);
> # emit pre mult $eq_no = 2 i = 5
> array_tmp11[5] := ats(5,array_const_2D0,array_x2,1);
> #emit pre sub $eq_no = 2 i = 5
> array_tmp12[5] := (array_tmp10[5] - (array_tmp11[5]));
> #emit pre diff $eq_no = 2 i = 5
> array_tmp13[5] := array_x1_higher[3,5];
> #emit pre sub $eq_no = 2 i = 5
> array_tmp14[5] := (array_tmp12[5] - (array_tmp13[5]));
> #emit pre diff $eq_no = 2 i = 5
> array_tmp15[5] := array_x1_higher[2,5];
> #emit pre sub $eq_no = 2 i = 5
> array_tmp16[5] := (array_tmp14[5] - (array_tmp15[5]));
> #emit pre add $eq_no = 2 i = 5
> array_tmp17[5] := array_tmp16[5] + array_x1[5];
> #emit pre assign xxx $eq_no = 2 i = 5 $min_hdrs = 5
> if not array_x2_set_initial[2,7] then # if number 1
> if (5 <= glob_max_terms) then # if number 2
> temporary := array_tmp17[5] * (glob_h ^ (2)) * factorial_3(4,6);
> array_x2[7] := temporary;
> array_x2_higher[1,7] := temporary;
> temporary := temporary / glob_h * (2.0);
> array_x2_higher[2,6] := temporary
> ;
> temporary := temporary / glob_h * (3.0);
> array_x2_higher[3,5] := temporary
> ;
> fi;# end if 2
> ;
> fi;# end if 1
> ;
> kkk := 6;
> #END ATOMHDR5
> #BEGIN OUTFILE3
> #Top Atomall While Loop-- outfile3
> while (kkk <= glob_max_terms) do # do number 1
> #END OUTFILE3
> #BEGIN OUTFILE4
> #emit mult $eq_no = 1
> array_tmp1[kkk] := ats(kkk,array_const_4D0,array_x2,1);
> #emit add $eq_no = 1
> array_tmp2[kkk] := array_const_0D0[kkk] + array_tmp1[kkk];
> #emit diff $eq_no = 1
> array_tmp3[kkk] := array_x2_higher[2,kkk];
> #emit mult $eq_no = 1
> array_tmp4[kkk] := ats(kkk,array_const_2D0,array_tmp3,1);
> #emit sub $eq_no = 1
> array_tmp5[kkk] := (array_tmp2[kkk] - (array_tmp4[kkk]));
> #emit mult $eq_no = 1
> array_tmp6[kkk] := ats(kkk,array_const_2D0,array_x1,1);
> #emit sub $eq_no = 1
> array_tmp7[kkk] := (array_tmp5[kkk] - (array_tmp6[kkk]));
> #emit assign $eq_no = 1
> order_d := 1;
> if (kkk + order_d + 1 <= glob_max_terms) then # if number 1
> if not array_x1_set_initial[1,kkk + order_d] then # if number 2
> temporary := array_tmp7[kkk] * (glob_h ^ (order_d)) / factorial_3((kkk - 1),(kkk + order_d - 1));
> array_x1[kkk + order_d] := temporary;
> array_x1_higher[1,kkk + order_d] := temporary;
> term := kkk + order_d - 1;
> adj2 := 2;
> while (adj2 <= order_d + 1) and (term >= 1) do # do number 2
> temporary := temporary / glob_h * convfp(adj2);
> array_x1_higher[adj2,term] := temporary;
> adj2 := adj2 + 1;
> term := term - 1;
> od;# end do number 2
> fi;# end if 2
> fi;# end if 1
> ;
> #emit diff $eq_no = 2
> array_tmp9[kkk] := array_x2_higher[2,kkk];
> #emit mult $eq_no = 2
> array_tmp10[kkk] := ats(kkk,array_const_3D0,array_tmp9,1);
> #emit mult $eq_no = 2
> array_tmp11[kkk] := ats(kkk,array_const_2D0,array_x2,1);
> #emit sub $eq_no = 2
> array_tmp12[kkk] := (array_tmp10[kkk] - (array_tmp11[kkk]));
> #emit diff $eq_no = 2
> array_tmp13[kkk] := array_x1_higher[3,kkk];
> #emit sub $eq_no = 2
> array_tmp14[kkk] := (array_tmp12[kkk] - (array_tmp13[kkk]));
> #emit diff $eq_no = 2
> array_tmp15[kkk] := array_x1_higher[2,kkk];
> #emit sub $eq_no = 2
> array_tmp16[kkk] := (array_tmp14[kkk] - (array_tmp15[kkk]));
> #emit add $eq_no = 2
> array_tmp17[kkk] := array_tmp16[kkk] + array_x1[kkk];
> #emit assign $eq_no = 2
> order_d := 2;
> if (kkk + order_d + 1 <= glob_max_terms) then # if number 1
> if not array_x2_set_initial[2,kkk + order_d] then # if number 2
> temporary := array_tmp17[kkk] * (glob_h ^ (order_d)) / factorial_3((kkk - 1),(kkk + order_d - 1));
> array_x2[kkk + order_d] := temporary;
> array_x2_higher[1,kkk + order_d] := temporary;
> term := kkk + order_d - 1;
> adj2 := 2;
> while (adj2 <= order_d + 1) and (term >= 1) do # do number 2
> temporary := temporary / glob_h * convfp(adj2);
> array_x2_higher[adj2,term] := temporary;
> adj2 := adj2 + 1;
> term := term - 1;
> od;# end do number 2
> fi;# end if 2
> fi;# end if 1
> ;
> kkk := kkk + 1;
> od;# end do number 1
> ;
> #BOTTOM ATOMALL
> #END OUTFILE4
> #BEGIN OUTFILE5
> # End Function number 8
> end;
atomall := proc()
local kkk, order_d, adj2, temporary, term;
global DEBUGMASSIVE, glob_max_terms, INFO, DEBUGL, glob_iolevel, ALWAYS,
glob_iter, glob_warned, glob_large_float, glob_hmin, glob_disp_incr,
glob_current_iter, glob_unchanged_h_cnt, glob_not_yet_start_msg,
glob_initial_pass, days_in_year, glob_normmax, glob_orig_start_sec,
glob_smallish_float, glob_max_iter, glob_hmin_init, glob_h,
glob_clock_start_sec, djd_debug, glob_max_minutes, MAX_UNCHANGED,
glob_log10_abserr, glob_look_poles, centuries_in_millinium, hours_in_day,
djd_debug2, glob_optimal_expect_sec, glob_small_float, glob_max_trunc_err,
glob_display_flag, glob_curr_iter_when_opt, glob_last_good_h,
glob_optimal_done, glob_reached_optimal_h, glob_not_yet_finished,
glob_almost_1, glob_percent_done, glob_optimal_start, glob_no_eqs,
glob_max_hours, glob_relerr, glob_log10_relerr, min_in_hour,
glob_log10relerr, glob_log10abserr, glob_start, glob_max_rel_trunc_err,
glob_clock_sec, glob_max_opt_iter, glob_max_sec, glob_abserr,
years_in_century, glob_dump, glob_html_log, glob_log10normmin, glob_warned2,
glob_optimal_clock_start_sec, sec_in_min, glob_subiter_method,
glob_dump_analytic, glob_hmax, array_const_3D0, array_const_4D0,
array_const_0D0, array_const_2, array_const_1, array_const_2D0,
array_fact_1, array_x1_init, array_t, array_type_pole, array_tmp0,
array_tmp1, array_tmp2, array_tmp3, array_tmp4, array_tmp5, array_tmp6,
array_tmp7, array_tmp8, array_tmp9, array_last_rel_error, array_pole,
array_norms, array_x2_init, array_m1, array_x1, array_x2, array_tmp10,
array_tmp11, array_tmp12, array_tmp13, array_tmp14, array_tmp15,
array_tmp16, array_tmp17, array_1st_rel_error, array_fact_2,
array_x1_higher, array_x2_set_initial, array_x1_set_initial,
array_complex_pole, array_x1_higher_work2, array_x2_higher_work2,
array_real_pole, array_poles, array_x2_higher, array_x1_higher_work,
array_x2_higher_work, glob_last;
array_tmp1[1] := array_const_4D0[1]*array_x2[1];
array_tmp2[1] := array_const_0D0[1] + array_tmp1[1];
array_tmp3[1] := array_x2_higher[2, 1];
array_tmp4[1] := array_const_2D0[1]*array_tmp3[1];
array_tmp5[1] := array_tmp2[1] - array_tmp4[1];
array_tmp6[1] := array_const_2D0[1]*array_x1[1];
array_tmp7[1] := array_tmp5[1] - array_tmp6[1];
if not array_x1_set_initial[1, 2] then
if 1 <= glob_max_terms then
temporary := array_tmp7[1]*glob_h*factorial_3(0, 1);
array_x1[2] := temporary;
array_x1_higher[1, 2] := temporary;
temporary := temporary*2.0/glob_h;
array_x1_higher[2, 1] := temporary
end if
end if;
kkk := 2;
array_tmp9[1] := array_x2_higher[2, 1];
array_tmp10[1] := array_const_3D0[1]*array_tmp9[1];
array_tmp11[1] := array_const_2D0[1]*array_x2[1];
array_tmp12[1] := array_tmp10[1] - array_tmp11[1];
array_tmp13[1] := array_x1_higher[3, 1];
array_tmp14[1] := array_tmp12[1] - array_tmp13[1];
array_tmp15[1] := array_x1_higher[2, 1];
array_tmp16[1] := array_tmp14[1] - array_tmp15[1];
array_tmp17[1] := array_tmp16[1] + array_x1[1];
if not array_x2_set_initial[2, 3] then
if 1 <= glob_max_terms then
temporary := array_tmp17[1]*glob_h^2*factorial_3(0, 2);
array_x2[3] := temporary;
array_x2_higher[1, 3] := temporary;
temporary := temporary*2.0/glob_h;
array_x2_higher[2, 2] := temporary;
temporary := temporary*3.0/glob_h;
array_x2_higher[3, 1] := temporary
end if
end if;
kkk := 2;
array_tmp1[2] := ats(2, array_const_4D0, array_x2, 1);
array_tmp2[2] := array_const_0D0[2] + array_tmp1[2];
array_tmp3[2] := array_x2_higher[2, 2];
array_tmp4[2] := ats(2, array_const_2D0, array_tmp3, 1);
array_tmp5[2] := array_tmp2[2] - array_tmp4[2];
array_tmp6[2] := ats(2, array_const_2D0, array_x1, 1);
array_tmp7[2] := array_tmp5[2] - array_tmp6[2];
if not array_x1_set_initial[1, 3] then
if 2 <= glob_max_terms then
temporary := array_tmp7[2]*glob_h*factorial_3(1, 2);
array_x1[3] := temporary;
array_x1_higher[1, 3] := temporary;
temporary := temporary*2.0/glob_h;
array_x1_higher[2, 2] := temporary
end if
end if;
kkk := 3;
array_tmp9[2] := array_x2_higher[2, 2];
array_tmp10[2] := ats(2, array_const_3D0, array_tmp9, 1);
array_tmp11[2] := ats(2, array_const_2D0, array_x2, 1);
array_tmp12[2] := array_tmp10[2] - array_tmp11[2];
array_tmp13[2] := array_x1_higher[3, 2];
array_tmp14[2] := array_tmp12[2] - array_tmp13[2];
array_tmp15[2] := array_x1_higher[2, 2];
array_tmp16[2] := array_tmp14[2] - array_tmp15[2];
array_tmp17[2] := array_tmp16[2] + array_x1[2];
if not array_x2_set_initial[2, 4] then
if 2 <= glob_max_terms then
temporary := array_tmp17[2]*glob_h^2*factorial_3(1, 3);
array_x2[4] := temporary;
array_x2_higher[1, 4] := temporary;
temporary := temporary*2.0/glob_h;
array_x2_higher[2, 3] := temporary;
temporary := temporary*3.0/glob_h;
array_x2_higher[3, 2] := temporary
end if
end if;
kkk := 3;
array_tmp1[3] := ats(3, array_const_4D0, array_x2, 1);
array_tmp2[3] := array_const_0D0[3] + array_tmp1[3];
array_tmp3[3] := array_x2_higher[2, 3];
array_tmp4[3] := ats(3, array_const_2D0, array_tmp3, 1);
array_tmp5[3] := array_tmp2[3] - array_tmp4[3];
array_tmp6[3] := ats(3, array_const_2D0, array_x1, 1);
array_tmp7[3] := array_tmp5[3] - array_tmp6[3];
if not array_x1_set_initial[1, 4] then
if 3 <= glob_max_terms then
temporary := array_tmp7[3]*glob_h*factorial_3(2, 3);
array_x1[4] := temporary;
array_x1_higher[1, 4] := temporary;
temporary := temporary*2.0/glob_h;
array_x1_higher[2, 3] := temporary
end if
end if;
kkk := 4;
array_tmp9[3] := array_x2_higher[2, 3];
array_tmp10[3] := ats(3, array_const_3D0, array_tmp9, 1);
array_tmp11[3] := ats(3, array_const_2D0, array_x2, 1);
array_tmp12[3] := array_tmp10[3] - array_tmp11[3];
array_tmp13[3] := array_x1_higher[3, 3];
array_tmp14[3] := array_tmp12[3] - array_tmp13[3];
array_tmp15[3] := array_x1_higher[2, 3];
array_tmp16[3] := array_tmp14[3] - array_tmp15[3];
array_tmp17[3] := array_tmp16[3] + array_x1[3];
if not array_x2_set_initial[2, 5] then
if 3 <= glob_max_terms then
temporary := array_tmp17[3]*glob_h^2*factorial_3(2, 4);
array_x2[5] := temporary;
array_x2_higher[1, 5] := temporary;
temporary := temporary*2.0/glob_h;
array_x2_higher[2, 4] := temporary;
temporary := temporary*3.0/glob_h;
array_x2_higher[3, 3] := temporary
end if
end if;
kkk := 4;
array_tmp1[4] := ats(4, array_const_4D0, array_x2, 1);
array_tmp2[4] := array_const_0D0[4] + array_tmp1[4];
array_tmp3[4] := array_x2_higher[2, 4];
array_tmp4[4] := ats(4, array_const_2D0, array_tmp3, 1);
array_tmp5[4] := array_tmp2[4] - array_tmp4[4];
array_tmp6[4] := ats(4, array_const_2D0, array_x1, 1);
array_tmp7[4] := array_tmp5[4] - array_tmp6[4];
if not array_x1_set_initial[1, 5] then
if 4 <= glob_max_terms then
temporary := array_tmp7[4]*glob_h*factorial_3(3, 4);
array_x1[5] := temporary;
array_x1_higher[1, 5] := temporary;
temporary := temporary*2.0/glob_h;
array_x1_higher[2, 4] := temporary
end if
end if;
kkk := 5;
array_tmp9[4] := array_x2_higher[2, 4];
array_tmp10[4] := ats(4, array_const_3D0, array_tmp9, 1);
array_tmp11[4] := ats(4, array_const_2D0, array_x2, 1);
array_tmp12[4] := array_tmp10[4] - array_tmp11[4];
array_tmp13[4] := array_x1_higher[3, 4];
array_tmp14[4] := array_tmp12[4] - array_tmp13[4];
array_tmp15[4] := array_x1_higher[2, 4];
array_tmp16[4] := array_tmp14[4] - array_tmp15[4];
array_tmp17[4] := array_tmp16[4] + array_x1[4];
if not array_x2_set_initial[2, 6] then
if 4 <= glob_max_terms then
temporary := array_tmp17[4]*glob_h^2*factorial_3(3, 5);
array_x2[6] := temporary;
array_x2_higher[1, 6] := temporary;
temporary := temporary*2.0/glob_h;
array_x2_higher[2, 5] := temporary;
temporary := temporary*3.0/glob_h;
array_x2_higher[3, 4] := temporary
end if
end if;
kkk := 5;
array_tmp1[5] := ats(5, array_const_4D0, array_x2, 1);
array_tmp2[5] := array_const_0D0[5] + array_tmp1[5];
array_tmp3[5] := array_x2_higher[2, 5];
array_tmp4[5] := ats(5, array_const_2D0, array_tmp3, 1);
array_tmp5[5] := array_tmp2[5] - array_tmp4[5];
array_tmp6[5] := ats(5, array_const_2D0, array_x1, 1);
array_tmp7[5] := array_tmp5[5] - array_tmp6[5];
if not array_x1_set_initial[1, 6] then
if 5 <= glob_max_terms then
temporary := array_tmp7[5]*glob_h*factorial_3(4, 5);
array_x1[6] := temporary;
array_x1_higher[1, 6] := temporary;
temporary := temporary*2.0/glob_h;
array_x1_higher[2, 5] := temporary
end if
end if;
kkk := 6;
array_tmp9[5] := array_x2_higher[2, 5];
array_tmp10[5] := ats(5, array_const_3D0, array_tmp9, 1);
array_tmp11[5] := ats(5, array_const_2D0, array_x2, 1);
array_tmp12[5] := array_tmp10[5] - array_tmp11[5];
array_tmp13[5] := array_x1_higher[3, 5];
array_tmp14[5] := array_tmp12[5] - array_tmp13[5];
array_tmp15[5] := array_x1_higher[2, 5];
array_tmp16[5] := array_tmp14[5] - array_tmp15[5];
array_tmp17[5] := array_tmp16[5] + array_x1[5];
if not array_x2_set_initial[2, 7] then
if 5 <= glob_max_terms then
temporary := array_tmp17[5]*glob_h^2*factorial_3(4, 6);
array_x2[7] := temporary;
array_x2_higher[1, 7] := temporary;
temporary := temporary*2.0/glob_h;
array_x2_higher[2, 6] := temporary;
temporary := temporary*3.0/glob_h;
array_x2_higher[3, 5] := temporary
end if
end if;
kkk := 6;
while kkk <= glob_max_terms do
array_tmp1[kkk] := ats(kkk, array_const_4D0, array_x2, 1);
array_tmp2[kkk] := array_const_0D0[kkk] + array_tmp1[kkk];
array_tmp3[kkk] := array_x2_higher[2, kkk];
array_tmp4[kkk] := ats(kkk, array_const_2D0, array_tmp3, 1);
array_tmp5[kkk] := array_tmp2[kkk] - array_tmp4[kkk];
array_tmp6[kkk] := ats(kkk, array_const_2D0, array_x1, 1);
array_tmp7[kkk] := array_tmp5[kkk] - array_tmp6[kkk];
order_d := 1;
if kkk + order_d + 1 <= glob_max_terms then
if not array_x1_set_initial[1, kkk + order_d] then
temporary := array_tmp7[kkk]*glob_h^order_d/
factorial_3(kkk - 1, kkk + order_d - 1);
array_x1[kkk + order_d] := temporary;
array_x1_higher[1, kkk + order_d] := temporary;
term := kkk + order_d - 1;
adj2 := 2;
while adj2 <= order_d + 1 and 1 <= term do
temporary := temporary*convfp(adj2)/glob_h;
array_x1_higher[adj2, term] := temporary;
adj2 := adj2 + 1;
term := term - 1
end do
end if
end if;
array_tmp9[kkk] := array_x2_higher[2, kkk];
array_tmp10[kkk] := ats(kkk, array_const_3D0, array_tmp9, 1);
array_tmp11[kkk] := ats(kkk, array_const_2D0, array_x2, 1);
array_tmp12[kkk] := array_tmp10[kkk] - array_tmp11[kkk];
array_tmp13[kkk] := array_x1_higher[3, kkk];
array_tmp14[kkk] := array_tmp12[kkk] - array_tmp13[kkk];
array_tmp15[kkk] := array_x1_higher[2, kkk];
array_tmp16[kkk] := array_tmp14[kkk] - array_tmp15[kkk];
array_tmp17[kkk] := array_tmp16[kkk] + array_x1[kkk];
order_d := 2;
if kkk + order_d + 1 <= glob_max_terms then
if not array_x2_set_initial[2, kkk + order_d] then
temporary := array_tmp17[kkk]*glob_h^order_d/
factorial_3(kkk - 1, kkk + order_d - 1);
array_x2[kkk + order_d] := temporary;
array_x2_higher[1, kkk + order_d] := temporary;
term := kkk + order_d - 1;
adj2 := 2;
while adj2 <= order_d + 1 and 1 <= term do
temporary := temporary*convfp(adj2)/glob_h;
array_x2_higher[adj2, term] := temporary;
adj2 := adj2 + 1;
term := term - 1
end do
end if
end if;
kkk := kkk + 1
end do
end proc
> #BEGIN ATS LIBRARY BLOCK
> omniout_str := proc(iolevel,str)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then
> printf("%s\n",str);
> fi;
> # End Function number 1
> end;
omniout_str := proc(iolevel, str)
global glob_iolevel;
if iolevel <= glob_iolevel then printf("%s\n", str) end if
end proc
> omniout_str_noeol := proc(iolevel,str)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then
> printf("%s",str);
> fi;
> # End Function number 1
> end;
omniout_str_noeol := proc(iolevel, str)
global glob_iolevel;
if iolevel <= glob_iolevel then printf("%s", str) end if
end proc
> omniout_labstr := proc(iolevel,label,str)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then
> print(label,str);
> fi;
> # End Function number 1
> end;
omniout_labstr := proc(iolevel, label, str)
global glob_iolevel;
if iolevel <= glob_iolevel then print(label, str) end if
end proc
> omniout_float := proc(iolevel,prelabel,prelen,value,vallen,postlabel)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then
> if vallen = 4 then
> printf("%-30s = %-42.4g %s \n",prelabel,value, postlabel);
> else
> printf("%-30s = %-42.32g %s \n",prelabel,value, postlabel);
> fi;
> fi;
> # End Function number 1
> end;
omniout_float := proc(iolevel, prelabel, prelen, value, vallen, postlabel)
global glob_iolevel;
if iolevel <= glob_iolevel then
if vallen = 4 then
printf("%-30s = %-42.4g %s \n", prelabel, value, postlabel)
else printf("%-30s = %-42.32g %s \n", prelabel, value, postlabel)
end if
end if
end proc
> omniout_int := proc(iolevel,prelabel,prelen,value,vallen,postlabel)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then
> if vallen = 5 then
> printf("%-30s = %-32d %s\n",prelabel,value, postlabel);
> else
> printf("%-30s = %-32d %s \n",prelabel,value, postlabel);
> fi;
> fi;
> # End Function number 1
> end;
omniout_int := proc(iolevel, prelabel, prelen, value, vallen, postlabel)
global glob_iolevel;
if iolevel <= glob_iolevel then
if vallen = 5 then
printf("%-30s = %-32d %s\n", prelabel, value, postlabel)
else printf("%-30s = %-32d %s \n", prelabel, value, postlabel)
end if
end if
end proc
> omniout_float_arr := proc(iolevel,prelabel,elemnt,prelen,value,vallen,postlabel)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then
> print(prelabel,"[",elemnt,"]",value, postlabel);
> fi;
> # End Function number 1
> end;
omniout_float_arr := proc(
iolevel, prelabel, elemnt, prelen, value, vallen, postlabel)
global glob_iolevel;
if iolevel <= glob_iolevel then
print(prelabel, "[", elemnt, "]", value, postlabel)
end if
end proc
> dump_series := proc(iolevel,dump_label,series_name,
> array_series,numb)
> global glob_iolevel;
> local i;
> if (glob_iolevel >= iolevel) then
> i := 1;
> while (i <= numb) do
> print(dump_label,series_name
> ,i,array_series[i]);
> i := i + 1;
> od;
> fi;
> # End Function number 1
> end;
dump_series := proc(iolevel, dump_label, series_name, array_series, numb)
local i;
global glob_iolevel;
if iolevel <= glob_iolevel then
i := 1;
while i <= numb do
print(dump_label, series_name, i, array_series[i]); i := i + 1
end do
end if
end proc
> dump_series_2 := proc(iolevel,dump_label,series_name2,
> array_series2,numb,subnum,array_x)
> global glob_iolevel;
> local i,sub,ts_term;
> if (glob_iolevel >= iolevel) then
> sub := 1;
> while (sub <= subnum) do
> i := 1;
> while (i <= numb) do
> print(dump_label,series_name2,sub,i,array_series2[sub,i]);
> od;
> sub := sub + 1;
> od;
> fi;
> # End Function number 1
> end;
dump_series_2 := proc(
iolevel, dump_label, series_name2, array_series2, numb, subnum, array_x)
local i, sub, ts_term;
global glob_iolevel;
if iolevel <= glob_iolevel then
sub := 1;
while sub <= subnum do
i := 1;
while i <= numb do print(dump_label, series_name2, sub, i,
array_series2[sub, i])
end do;
sub := sub + 1
end do
end if
end proc
> cs_info := proc(iolevel,str)
> global glob_iolevel,glob_correct_start_flag,glob_h,glob_reached_optimal_h;
> if (glob_iolevel >= iolevel) then
> print("cs_info " , str , " glob_correct_start_flag = " , glob_correct_start_flag , "glob_h := " , glob_h , "glob_reached_optimal_h := " , glob_reached_optimal_h)
> fi;
> # End Function number 1
> end;
cs_info := proc(iolevel, str)
global
glob_iolevel, glob_correct_start_flag, glob_h, glob_reached_optimal_h;
if iolevel <= glob_iolevel then print("cs_info ", str,
" glob_correct_start_flag = ", glob_correct_start_flag,
"glob_h := ", glob_h, "glob_reached_optimal_h := ",
glob_reached_optimal_h)
end if
end proc
> # Begin Function number 2
> logitem_time := proc(fd,secs_in)
> global centuries_in_millinium, days_in_year, hours_in_day, min_in_hour, sec_in_min, years_in_century;
> local cent_int, centuries, days, days_int, hours, hours_int, millinium_int, milliniums, minutes, minutes_int, sec_in_millinium, sec_int, seconds, secs, years, years_int;
> secs := (secs_in);
> if (secs > 0.0) then # if number 1
> sec_in_millinium := convfloat(sec_in_min * min_in_hour * hours_in_day * days_in_year * years_in_century * centuries_in_millinium);
> milliniums := convfloat(secs / sec_in_millinium);
> millinium_int := floor(milliniums);
> centuries := (milliniums - millinium_int)*centuries_in_millinium;
> cent_int := floor(centuries);
> years := (centuries - cent_int) * years_in_century;
> years_int := floor(years);
> days := (years - years_int) * days_in_year;
> days_int := floor(days);
> hours := (days - days_int) * hours_in_day;
> hours_int := floor(hours);
> minutes := (hours - hours_int) * min_in_hour;
> minutes_int := floor(minutes);
> seconds := (minutes - minutes_int) * sec_in_min;
> sec_int := floor(seconds);
> fprintf(fd,"| ");
> if (millinium_int > 0) then # if number 2
> fprintf(fd,"%d Millinia %d Centuries %d Years %d Days %d Hours %d Minutes %d Seconds",millinium_int,cent_int,years_int,days_int,hours_int,minutes_int,sec_int);
> elif (cent_int > 0) then # if number 3
> fprintf(fd,"%d Centuries %d Years %d Days %d Hours %d Minutes %d Seconds",cent_int,years_int,days_int,hours_int,minutes_int,sec_int);
> elif (years_int > 0) then # if number 4
> fprintf(fd,"%d Years %d Days %d Hours %d Minutes %d Seconds",years_int,days_int,hours_int,minutes_int,sec_int);
> elif (days_int > 0) then # if number 5
> fprintf(fd,"%d Days %d Hours %d Minutes %d Seconds",days_int,hours_int,minutes_int,sec_int);
> elif (hours_int > 0) then # if number 6
> fprintf(fd,"%d Hours %d Minutes %d Seconds",hours_int,minutes_int,sec_int);
> elif (minutes_int > 0) then # if number 7
> fprintf(fd,"%d Minutes %d Seconds",minutes_int,sec_int);
> else
> fprintf(fd,"%d Seconds",sec_int);
> fi;# end if 7
> else
> fprintf(fd,"Unknown");
> fi;# end if 6
> fprintf(fd," | ");
> # End Function number 2
> end;
logitem_time := proc(fd, secs_in)
local cent_int, centuries, days, days_int, hours, hours_int, millinium_int,
milliniums, minutes, minutes_int, sec_in_millinium, sec_int, seconds, secs,
years, years_int;
global centuries_in_millinium, days_in_year, hours_in_day, min_in_hour,
sec_in_min, years_in_century;
secs := secs_in;
if 0. < secs then
sec_in_millinium := convfloat(sec_in_min*min_in_hour*hours_in_day*
days_in_year*years_in_century*centuries_in_millinium);
milliniums := convfloat(secs/sec_in_millinium);
millinium_int := floor(milliniums);
centuries := (milliniums - millinium_int)*centuries_in_millinium;
cent_int := floor(centuries);
years := (centuries - cent_int)*years_in_century;
years_int := floor(years);
days := (years - years_int)*days_in_year;
days_int := floor(days);
hours := (days - days_int)*hours_in_day;
hours_int := floor(hours);
minutes := (hours - hours_int)*min_in_hour;
minutes_int := floor(minutes);
seconds := (minutes - minutes_int)*sec_in_min;
sec_int := floor(seconds);
fprintf(fd, "");
if 0 < millinium_int then fprintf(fd, "%d Millinia %d Centuries %\
d Years %d Days %d Hours %d Minutes %d Seconds", millinium_int,
cent_int, years_int, days_int, hours_int, minutes_int, sec_int)
elif 0 < cent_int then fprintf(fd,
"%d Centuries %d Years %d Days %d Hours %d Minutes %d Seconds",
cent_int, years_int, days_int, hours_int, minutes_int, sec_int)
elif 0 < years_int then fprintf(fd,
"%d Years %d Days %d Hours %d Minutes %d Seconds", years_int,
days_int, hours_int, minutes_int, sec_int)
elif 0 < days_int then fprintf(fd,
"%d Days %d Hours %d Minutes %d Seconds", days_int, hours_int,
minutes_int, sec_int)
elif 0 < hours_int then fprintf(fd,
"%d Hours %d Minutes %d Seconds", hours_int, minutes_int,
sec_int)
elif 0 < minutes_int then
fprintf(fd, "%d Minutes %d Seconds", minutes_int, sec_int)
else fprintf(fd, "%d Seconds", sec_int)
end if
else fprintf(fd, "Unknown")
end if;
fprintf(fd, " | ")
end proc
> omniout_timestr := proc (secs_in)
> global centuries_in_millinium, days_in_year, hours_in_day, min_in_hour, sec_in_min, years_in_century;
> local cent_int, centuries, days, days_int, hours, hours_int, millinium_int, milliniums, minutes, minutes_int, sec_in_millinium, sec_int, seconds, secs, years, years_int;
> secs := convfloat(secs_in);
> if (secs > 0.0) then # if number 6
> sec_in_millinium := convfloat(sec_in_min * min_in_hour * hours_in_day * days_in_year * years_in_century * centuries_in_millinium);
> milliniums := convfloat(secs / sec_in_millinium);
> millinium_int := floor(milliniums);
> centuries := (milliniums - millinium_int)*centuries_in_millinium;
> cent_int := floor(centuries);
> years := (centuries - cent_int) * years_in_century;
> years_int := floor(years);
> days := (years - years_int) * days_in_year;
> days_int := floor(days);
> hours := (days - days_int) * hours_in_day;
> hours_int := floor(hours);
> minutes := (hours - hours_int) * min_in_hour;
> minutes_int := floor(minutes);
> seconds := (minutes - minutes_int) * sec_in_min;
> sec_int := floor(seconds);
>
> if (millinium_int > 0) then # if number 7
> printf(" = %d Millinia %d Centuries %d Years %d Days %d Hours %d Minutes %d Seconds\n",millinium_int,cent_int,years_int,days_int,hours_int,minutes_int,sec_int);
> elif (cent_int > 0) then # if number 8
> printf(" = %d Centuries %d Years %d Days %d Hours %d Minutes %d Seconds\n",cent_int,years_int,days_int,hours_int,minutes_int,sec_int);
> elif (years_int > 0) then # if number 9
> printf(" = %d Years %d Days %d Hours %d Minutes %d Seconds\n",years_int,days_int,hours_int,minutes_int,sec_int);
> elif (days_int > 0) then # if number 10
> printf(" = %d Days %d Hours %d Minutes %d Seconds\n",days_int,hours_int,minutes_int,sec_int);
> elif (hours_int > 0) then # if number 11
> printf(" = %d Hours %d Minutes %d Seconds\n",hours_int,minutes_int,sec_int);
> elif (minutes_int > 0) then # if number 12
> printf(" = %d Minutes %d Seconds\n",minutes_int,sec_int);
> else
> printf(" = %d Seconds\n",sec_int);
> fi;# end if 12
> else
> printf(" Unknown\n");
> fi;# end if 11
> # End Function number 2
> end;
omniout_timestr := proc(secs_in)
local cent_int, centuries, days, days_int, hours, hours_int, millinium_int,
milliniums, minutes, minutes_int, sec_in_millinium, sec_int, seconds, secs,
years, years_int;
global centuries_in_millinium, days_in_year, hours_in_day, min_in_hour,
sec_in_min, years_in_century;
secs := convfloat(secs_in);
if 0. < secs then
sec_in_millinium := convfloat(sec_in_min*min_in_hour*hours_in_day*
days_in_year*years_in_century*centuries_in_millinium);
milliniums := convfloat(secs/sec_in_millinium);
millinium_int := floor(milliniums);
centuries := (milliniums - millinium_int)*centuries_in_millinium;
cent_int := floor(centuries);
years := (centuries - cent_int)*years_in_century;
years_int := floor(years);
days := (years - years_int)*days_in_year;
days_int := floor(days);
hours := (days - days_int)*hours_in_day;
hours_int := floor(hours);
minutes := (hours - hours_int)*min_in_hour;
minutes_int := floor(minutes);
seconds := (minutes - minutes_int)*sec_in_min;
sec_int := floor(seconds);
if 0 < millinium_int then printf(" = %d Millinia %d Centuries %d\
Years %d Days %d Hours %d Minutes %d Seconds\n", millinium_int,
cent_int, years_int, days_int, hours_int, minutes_int, sec_int)
elif 0 < cent_int then printf(" = %d Centuries %d Years %d Days \
%d Hours %d Minutes %d Seconds\n", cent_int, years_int,
days_int, hours_int, minutes_int, sec_int)
elif 0 < years_int then printf(
" = %d Years %d Days %d Hours %d Minutes %d Seconds\n",
years_int, days_int, hours_int, minutes_int, sec_int)
elif 0 < days_int then printf(
" = %d Days %d Hours %d Minutes %d Seconds\n", days_int,
hours_int, minutes_int, sec_int)
elif 0 < hours_int then printf(
" = %d Hours %d Minutes %d Seconds\n", hours_int, minutes_int,
sec_int)
elif 0 < minutes_int then
printf(" = %d Minutes %d Seconds\n", minutes_int, sec_int)
else printf(" = %d Seconds\n", sec_int)
end if
else printf(" Unknown\n")
end if
end proc
>
> # Begin Function number 3
> ats := proc(
> mmm_ats,array_a,array_b,jjj_ats)
> local iii_ats, lll_ats,ma_ats, ret_ats;
> ret_ats := 0.0;
> if (jjj_ats <= mmm_ats) then # if number 11
> ma_ats := mmm_ats + 1;
> iii_ats := jjj_ats;
> while (iii_ats <= mmm_ats) do # do number 1
> lll_ats := ma_ats - iii_ats;
> ret_ats := ret_ats + array_a[iii_ats]*array_b[lll_ats];
> iii_ats := iii_ats + 1;
> od;# end do number 1
> fi;# end if 11
> ;
> ret_ats
> # End Function number 3
> end;
ats := proc(mmm_ats, array_a, array_b, jjj_ats)
local iii_ats, lll_ats, ma_ats, ret_ats;
ret_ats := 0.;
if jjj_ats <= mmm_ats then
ma_ats := mmm_ats + 1;
iii_ats := jjj_ats;
while iii_ats <= mmm_ats do
lll_ats := ma_ats - iii_ats;
ret_ats := ret_ats + array_a[iii_ats]*array_b[lll_ats];
iii_ats := iii_ats + 1
end do
end if;
ret_ats
end proc
>
> # Begin Function number 4
> att := proc(
> mmm_att,array_aa,array_bb,jjj_att)
> global glob_max_terms;
> local al_att, iii_att,lll_att, ma_att, ret_att;
> ret_att := 0.0;
> if (jjj_att <= mmm_att) then # if number 11
> ma_att := mmm_att + 2;
> iii_att := jjj_att;
> while (iii_att <= mmm_att) do # do number 1
> lll_att := ma_att - iii_att;
> al_att := (lll_att - 1);
> if (lll_att <= glob_max_terms) then # if number 12
> ret_att := ret_att + array_aa[iii_att]*array_bb[lll_att]* convfp(al_att);
> fi;# end if 12
> ;
> iii_att := iii_att + 1;
> od;# end do number 1
> ;
> ret_att := ret_att / convfp(mmm_att) ;
> fi;# end if 11
> ;
> ret_att;
> # End Function number 4
> end;
att := proc(mmm_att, array_aa, array_bb, jjj_att)
local al_att, iii_att, lll_att, ma_att, ret_att;
global glob_max_terms;
ret_att := 0.;
if jjj_att <= mmm_att then
ma_att := mmm_att + 2;
iii_att := jjj_att;
while iii_att <= mmm_att do
lll_att := ma_att - iii_att;
al_att := lll_att - 1;
if lll_att <= glob_max_terms then ret_att := ret_att
+ array_aa[iii_att]*array_bb[lll_att]*convfp(al_att)
end if;
iii_att := iii_att + 1
end do;
ret_att := ret_att/convfp(mmm_att)
end if;
ret_att
end proc
> # Begin Function number 5
> display_pole := proc()
> global ALWAYS,glob_display_flag, glob_large_float, array_pole;
> if ((array_pole[1] <> glob_large_float) and (array_pole[1] > 0.0) and (array_pole[2] <> glob_large_float) and (array_pole[2]> 0.0) and glob_display_flag) then # if number 11
> omniout_float(ALWAYS,"Radius of convergence ",4, array_pole[1],4," ");
> omniout_float(ALWAYS,"Order of pole ",4, array_pole[2],4," ");
> fi;# end if 11
> # End Function number 5
> end;
display_pole := proc()
global ALWAYS, glob_display_flag, glob_large_float, array_pole;
if array_pole[1] <> glob_large_float and 0. < array_pole[1] and
array_pole[2] <> glob_large_float and 0. < array_pole[2] and
glob_display_flag then
omniout_float(ALWAYS, "Radius of convergence ", 4,
array_pole[1], 4, " ");
omniout_float(ALWAYS, "Order of pole ", 4,
array_pole[2], 4, " ")
end if
end proc
> # Begin Function number 6
> logditto := proc(file)
> fprintf(file,"");
> fprintf(file,"ditto");
> fprintf(file," | ");
> # End Function number 6
> end;
logditto := proc(file)
fprintf(file, ""); fprintf(file, "ditto"); fprintf(file, " | ")
end proc
> # Begin Function number 7
> logitem_integer := proc(file,n)
> fprintf(file,"");
> fprintf(file,"%d",n);
> fprintf(file," | ");
> # End Function number 7
> end;
logitem_integer := proc(file, n)
fprintf(file, ""); fprintf(file, "%d", n); fprintf(file, " | ")
end proc
> # Begin Function number 8
> logitem_str := proc(file,str)
> fprintf(file,"");
> fprintf(file,str);
> fprintf(file," | ");
> # End Function number 8
> end;
logitem_str := proc(file, str)
fprintf(file, ""); fprintf(file, str); fprintf(file, " | ")
end proc
> # Begin Function number 9
> log_revs := proc(file,revs)
> fprintf(file,revs);
> # End Function number 9
> end;
log_revs := proc(file, revs) fprintf(file, revs) end proc
> # Begin Function number 10
> logitem_float := proc(file,x)
> fprintf(file,"");
> fprintf(file,"%g",x);
> fprintf(file," | ");
> # End Function number 10
> end;
logitem_float := proc(file, x)
fprintf(file, ""); fprintf(file, "%g", x); fprintf(file, " | ")
end proc
> # Begin Function number 11
> logitem_pole := proc(file,pole)
> fprintf(file,"");
> if pole = 0 then # if number 11
> fprintf(file,"NA");
> elif pole = 1 then # if number 12
> fprintf(file,"Real");
> elif pole = 2 then # if number 13
> fprintf(file,"Complex");
> else
> fprintf(file,"No Pole");
> fi;# end if 13
> fprintf(file," | ");
> # End Function number 11
> end;
logitem_pole := proc(file, pole)
fprintf(file, "");
if pole = 0 then fprintf(file, "NA")
elif pole = 1 then fprintf(file, "Real")
elif pole = 2 then fprintf(file, "Complex")
else fprintf(file, "No Pole")
end if;
fprintf(file, " | ")
end proc
> # Begin Function number 12
> logstart := proc(file)
> fprintf(file,"");
> # End Function number 12
> end;
logstart := proc(file) fprintf(file, "
") end proc
> # Begin Function number 13
> logend := proc(file)
> fprintf(file,"
\n");
> # End Function number 13
> end;
logend := proc(file) fprintf(file, "\n") end proc
> # Begin Function number 14
> chk_data := proc()
> global glob_max_iter,ALWAYS, glob_max_terms;
> local errflag;
> errflag := false;
>
> if ((glob_max_terms < 15) or (glob_max_terms > 512)) then # if number 13
> omniout_str(ALWAYS,"Illegal max_terms = -- Using 30");
> glob_max_terms := 30;
> fi;# end if 13
> ;
> if (glob_max_iter < 2) then # if number 13
> omniout_str(ALWAYS,"Illegal max_iter");
> errflag := true;
> fi;# end if 13
> ;
> if (errflag) then # if number 13
>
> quit;
> fi;# end if 13
> # End Function number 14
> end;
chk_data := proc()
local errflag;
global glob_max_iter, ALWAYS, glob_max_terms;
errflag := false;
if glob_max_terms < 15 or 512 < glob_max_terms then
omniout_str(ALWAYS, "Illegal max_terms = -- Using 30");
glob_max_terms := 30
end if;
if glob_max_iter < 2 then
omniout_str(ALWAYS, "Illegal max_iter"); errflag := true
end if;
if errflag then quit end if
end proc
>
> # Begin Function number 15
> comp_expect_sec := proc(t_end2,t_start2,t2,clock_sec)
> global glob_small_float;
> local ms2, rrr, sec_left, sub1, sub2;
> ;
> ms2 := clock_sec;
> sub1 := (t_end2-t_start2);
> sub2 := (t2-t_start2);
> if (sub1 = 0.0) then # if number 13
> sec_left := 0.0;
> else
> if (abs(sub2) > 0.0) then # if number 14
> rrr := (sub1/sub2);
> sec_left := rrr * ms2 - ms2;
> else
> sec_left := 0.0;
> fi;# end if 14
> fi;# end if 13
> ;
> sec_left;
> # End Function number 15
> end;
comp_expect_sec := proc(t_end2, t_start2, t2, clock_sec)
local ms2, rrr, sec_left, sub1, sub2;
global glob_small_float;
ms2 := clock_sec;
sub1 := t_end2 - t_start2;
sub2 := t2 - t_start2;
if sub1 = 0. then sec_left := 0.
else
if 0. < abs(sub2) then rrr := sub1/sub2; sec_left := rrr*ms2 - ms2
else sec_left := 0.
end if
end if;
sec_left
end proc
>
> # Begin Function number 16
> comp_percent := proc(t_end2,t_start2,t2)
> global glob_small_float;
> local rrr, sub1, sub2;
> sub1 := (t_end2-t_start2);
> sub2 := (t2-t_start2);
> if (abs(sub2) > glob_small_float) then # if number 13
> rrr := (100.0*sub2)/sub1;
> else
> rrr := 0.0;
> fi;# end if 13
> ;
> rrr
> # End Function number 16
> end;
comp_percent := proc(t_end2, t_start2, t2)
local rrr, sub1, sub2;
global glob_small_float;
sub1 := t_end2 - t_start2;
sub2 := t2 - t_start2;
if glob_small_float < abs(sub2) then rrr := 100.0*sub2/sub1
else rrr := 0.
end if;
rrr
end proc
> # Begin Function number 17
> factorial_1 := proc(nnn)
> global glob_max_terms,array_fact_1;
> local ret;
> if (nnn <= glob_max_terms) then # if number 13
> if array_fact_1[nnn] = 0 then # if number 14
> ret := nnn!;
> array_fact_1[nnn] := ret;
> else
> ret := array_fact_1[nnn];
> fi;# end if 14
> ;
> else
> ret := nnn!;
> fi;# end if 13
> ;
> ret;
> # End Function number 17
> end;
factorial_1 := proc(nnn)
local ret;
global glob_max_terms, array_fact_1;
if nnn <= glob_max_terms then
if array_fact_1[nnn] = 0 then ret := nnn!; array_fact_1[nnn] := ret
else ret := array_fact_1[nnn]
end if
else ret := nnn!
end if;
ret
end proc
> # Begin Function number 18
> factorial_3 := proc(mmm,nnn)
> global glob_max_terms,array_fact_2;
> local ret;
> if (nnn <= glob_max_terms) and (mmm <= glob_max_terms) then # if number 13
> if array_fact_2[mmm,nnn] = 0 then # if number 14
> ret := factorial_1(mmm)/factorial_1(nnn);
> array_fact_2[mmm,nnn] := ret;
> else
> ret := array_fact_2[mmm,nnn];
> fi;# end if 14
> ;
> else
> ret := (mmm!)/(nnn!);
> fi;# end if 13
> ;
> ret;
> # End Function number 18
> end;
factorial_3 := proc(mmm, nnn)
local ret;
global glob_max_terms, array_fact_2;
if nnn <= glob_max_terms and mmm <= glob_max_terms then
if array_fact_2[mmm, nnn] = 0 then
ret := factorial_1(mmm)/factorial_1(nnn);
array_fact_2[mmm, nnn] := ret
else ret := array_fact_2[mmm, nnn]
end if
else ret := mmm!/nnn!
end if;
ret
end proc
> # Begin Function number 19
> convfp := proc(mmm)
> (mmm);
>
> # End Function number 19
> end;
convfp := proc(mmm) mmm end proc
> # Begin Function number 20
> convfloat := proc(mmm)
> (mmm);
>
> # End Function number 20
> end;
convfloat := proc(mmm) mmm end proc
> elapsed_time_seconds := proc()
> time();
> end;
elapsed_time_seconds := proc() time() end proc
>
>
>
> #END ATS LIBRARY BLOCK
> #BEGIN USER DEF BLOCK
> #BEGIN USER DEF BLOCK
> exact_soln_x1 := proc(t)
> local c1,c2,c3;
> c1 := 1.0;
> c2 := 0.0002;
> c3 := 0.0003;
> 2.0 * c1 + 6.0 * c3 * exp(-t);
> end;
exact_soln_x1 := proc(t)
local c1, c2, c3;
c1 := 1.0; c2 := 0.0002; c3 := 0.0003; 2.0*c1 + 6.0*c3*exp(-t)
end proc
> exact_soln_x1p := proc(t)
> local c1,c2,c3;
> c1 := 1.0;
> c2 := 0.0002;
> c3 := 0.0003;
> - 6.0 * c3 * exp(-t);
> end;
exact_soln_x1p := proc(t)
local c1, c2, c3;
c1 := 1.0; c2 := 0.0002; c3 := 0.0003; -6.0*c3*exp(-t)
end proc
> exact_soln_x2 := proc(t)
> local c1,c2,c3;
> c1 := 1.0;
> c2 := 0.0002;
> c3 := 0.0003;
> c1 + c2 * exp(2.0 * t) + c3 * exp(-t);
> end;
exact_soln_x2 := proc(t)
local c1, c2, c3;
c1 := 1.0; c2 := 0.0002; c3 := 0.0003; c1 + c2*exp(2.0*t) + c3*exp(-t)
end proc
> exact_soln_x2p := proc(t)
> local c1,c2,c3;
> c1 := 1.0;
> c2 := 0.0002;
> c3 := 0.0003;
> 2.0 * c2 * exp(2.0 * t) - c3 * exp(-t);
> end;
exact_soln_x2p := proc(t)
local c1, c2, c3;
c1 := 1.0; c2 := 0.0002; c3 := 0.0003; 2.0*c2*exp(2.0*t) - c3*exp(-t)
end proc
> #END USER DEF BLOCK
> #END USER DEF BLOCK
> #END OUTFILE5
> # Begin Function number 2
> mainprog := proc()
> #BEGIN OUTFIEMAIN
> local d1,d2,d3,d4,est_err_2,niii,done_once,
> term,ord,order_diff,term_no,html_log_file,iiif,jjjf,
> rows,r_order,sub_iter,calc_term,iii,temp_sum,current_iter,
> t_start,t_end
> ,it, log10norm, max_terms, opt_iter, tmp;
> #Top Generate Globals Definition
> #Bottom Generate Globals Deninition
> global
> DEBUGMASSIVE,
> glob_max_terms,
> INFO,
> DEBUGL,
> glob_iolevel,
> ALWAYS,
> #Top Generate Globals Decl
> glob_iter,
> glob_warned,
> glob_large_float,
> glob_hmin,
> glob_disp_incr,
> glob_current_iter,
> glob_unchanged_h_cnt,
> glob_not_yet_start_msg,
> glob_initial_pass,
> days_in_year,
> glob_normmax,
> glob_orig_start_sec,
> glob_smallish_float,
> glob_max_iter,
> glob_hmin_init,
> glob_h,
> glob_clock_start_sec,
> djd_debug,
> glob_max_minutes,
> MAX_UNCHANGED,
> glob_log10_abserr,
> glob_look_poles,
> centuries_in_millinium,
> hours_in_day,
> djd_debug2,
> glob_optimal_expect_sec,
> glob_small_float,
> glob_max_trunc_err,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_last_good_h,
> glob_optimal_done,
> glob_reached_optimal_h,
> glob_not_yet_finished,
> glob_almost_1,
> glob_percent_done,
> glob_optimal_start,
> glob_no_eqs,
> glob_max_hours,
> glob_relerr,
> glob_log10_relerr,
> min_in_hour,
> glob_log10relerr,
> glob_log10abserr,
> glob_start,
> glob_max_rel_trunc_err,
> glob_clock_sec,
> glob_max_opt_iter,
> glob_max_sec,
> glob_abserr,
> years_in_century,
> glob_dump,
> glob_html_log,
> glob_log10normmin,
> glob_warned2,
> glob_optimal_clock_start_sec,
> sec_in_min,
> glob_subiter_method,
> glob_dump_analytic,
> glob_hmax,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_3D0,
> array_const_4D0,
> array_const_0D0,
> array_const_2,
> array_const_1,
> array_const_2D0,
> #END CONST
> array_fact_1,
> array_x1_init,
> array_t,
> array_type_pole,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_last_rel_error,
> array_pole,
> array_norms,
> array_x2_init,
> array_m1,
> array_x1,
> array_x2,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_1st_rel_error,
> array_fact_2,
> array_x1_higher,
> array_x2_set_initial,
> array_x1_set_initial,
> array_complex_pole,
> array_x1_higher_work2,
> array_x2_higher_work2,
> array_real_pole,
> array_poles,
> array_x2_higher,
> array_x1_higher_work,
> array_x2_higher_work,
> glob_last;
> glob_last;
> ALWAYS := 1;
> INFO := 2;
> DEBUGL := 3;
> DEBUGMASSIVE := 4;
> glob_iolevel := INFO;
> DEBUGMASSIVE := 4;
> glob_max_terms := 30;
> INFO := 2;
> DEBUGL := 3;
> glob_iolevel := 5;
> ALWAYS := 1;
> glob_iter := 0;
> glob_warned := false;
> glob_large_float := 9.0e100;
> glob_hmin := 0.00000000001;
> glob_disp_incr := 0.1;
> glob_current_iter := 0;
> glob_unchanged_h_cnt := 0;
> glob_not_yet_start_msg := true;
> glob_initial_pass := true;
> days_in_year := 365.0;
> glob_normmax := 0.0;
> glob_orig_start_sec := 0.0;
> glob_smallish_float := 0.1e-100;
> glob_max_iter := 1000;
> glob_hmin_init := 0.001;
> glob_h := 0.1;
> glob_clock_start_sec := 0.0;
> djd_debug := true;
> glob_max_minutes := 0.0;
> MAX_UNCHANGED := 10;
> glob_log10_abserr := 0.1e-10;
> glob_look_poles := false;
> centuries_in_millinium := 10.0;
> hours_in_day := 24.0;
> djd_debug2 := true;
> glob_optimal_expect_sec := 0.1;
> glob_small_float := 0.1e-50;
> glob_max_trunc_err := 0.1e-10;
> glob_display_flag := true;
> glob_curr_iter_when_opt := 0;
> glob_last_good_h := 0.1;
> glob_optimal_done := false;
> glob_reached_optimal_h := false;
> glob_not_yet_finished := true;
> glob_almost_1 := 0.9990;
> glob_percent_done := 0.0;
> glob_optimal_start := 0.0;
> glob_no_eqs := 0;
> glob_max_hours := 0.0;
> glob_relerr := 0.1e-10;
> glob_log10_relerr := 0.1e-10;
> min_in_hour := 60.0;
> glob_log10relerr := 0.0;
> glob_log10abserr := 0.0;
> glob_start := 0;
> glob_max_rel_trunc_err := 0.1e-10;
> glob_clock_sec := 0.0;
> glob_max_opt_iter := 10;
> glob_max_sec := 10000.0;
> glob_abserr := 0.1e-10;
> years_in_century := 100.0;
> glob_dump := false;
> glob_html_log := true;
> glob_log10normmin := 0.1;
> glob_warned2 := false;
> glob_optimal_clock_start_sec := 0.0;
> sec_in_min := 60.0;
> glob_subiter_method := 3;
> glob_dump_analytic := false;
> glob_hmax := 1.0;
> #Write Set Defaults
> glob_orig_start_sec := elapsed_time_seconds();
> MAX_UNCHANGED := 10;
> glob_curr_iter_when_opt := 0;
> glob_display_flag := true;
> glob_no_eqs := 2;
> glob_iter := -1;
> opt_iter := -1;
> glob_max_iter := 50000;
> glob_max_hours := 0.0;
> glob_max_minutes := 15.0;
> omniout_str(ALWAYS,"##############ECHO OF PROBLEM#################");
> omniout_str(ALWAYS,"##############temp/mtest6postode.ode#################");
> omniout_str(ALWAYS,"diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * x1;");
> omniout_str(ALWAYS,"diff (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - diff(x1,t,2) - diff (x1,t,1) + x1;");
> omniout_str(ALWAYS,"!");
> omniout_str(ALWAYS,"#BEGIN FIRST INPUT BLOCK");
> omniout_str(ALWAYS,"Digits := 32;");
> omniout_str(ALWAYS,"max_terms:=30;");
> omniout_str(ALWAYS,"!");
> omniout_str(ALWAYS,"#END FIRST INPUT BLOCK");
> omniout_str(ALWAYS,"#BEGIN SECOND INPUT BLOCK");
> omniout_str(ALWAYS,"#");
> omniout_str(ALWAYS,"# was complicated.ode");
> omniout_str(ALWAYS,"#");
> omniout_str(ALWAYS,"t_start := 0.5;");
> omniout_str(ALWAYS,"t_end := 5.0;");
> omniout_str(ALWAYS,"array_x1_init[0 + 1] := exact_soln_x1(t_start);");
> omniout_str(ALWAYS,"array_x1_init[1 + 1] := exact_soln_x1p(t_start);");
> omniout_str(ALWAYS,"array_x2_init[0 + 1] := exact_soln_x2(t_start);");
> omniout_str(ALWAYS,"array_x2_init[1 + 1] := exact_soln_x2p(t_start);");
> omniout_str(ALWAYS,"glob_h := 0.00001 ;");
> omniout_str(ALWAYS,"glob_look_poles := true;");
> omniout_str(ALWAYS,"glob_max_iter := 10;");
> omniout_str(ALWAYS,"#END SECOND INPUT BLOCK");
> omniout_str(ALWAYS,"#BEGIN OVERRIDE BLOCK");
> omniout_str(ALWAYS,"glob_h := 0.001 ;");
> omniout_str(ALWAYS,"glob_look_poles := true;");
> omniout_str(ALWAYS,"glob_max_iter := 1000;");
> omniout_str(ALWAYS,"glob_max_minutes := 15;");
> omniout_str(ALWAYS,"#END OVERRIDE BLOCK");
> omniout_str(ALWAYS,"!");
> omniout_str(ALWAYS,"#BEGIN USER DEF BLOCK");
> omniout_str(ALWAYS,"exact_soln_x1 := proc(t)");
> omniout_str(ALWAYS,"local c1,c2,c3;");
> omniout_str(ALWAYS,"c1 := 1.0;");
> omniout_str(ALWAYS,"c2 := 0.0002;");
> omniout_str(ALWAYS,"c3 := 0.0003;");
> omniout_str(ALWAYS,"2.0 * c1 + 6.0 * c3 * exp(-t);");
> omniout_str(ALWAYS,"end;");
> omniout_str(ALWAYS,"exact_soln_x1p := proc(t)");
> omniout_str(ALWAYS,"local c1,c2,c3;");
> omniout_str(ALWAYS,"c1 := 1.0;");
> omniout_str(ALWAYS,"c2 := 0.0002;");
> omniout_str(ALWAYS,"c3 := 0.0003;");
> omniout_str(ALWAYS,"- 6.0 * c3 * exp(-t);");
> omniout_str(ALWAYS,"end;");
> omniout_str(ALWAYS,"exact_soln_x2 := proc(t)");
> omniout_str(ALWAYS,"local c1,c2,c3;");
> omniout_str(ALWAYS,"c1 := 1.0;");
> omniout_str(ALWAYS,"c2 := 0.0002;");
> omniout_str(ALWAYS,"c3 := 0.0003;");
> omniout_str(ALWAYS,"c1 + c2 * exp(2.0 * t) + c3 * exp(-t);");
> omniout_str(ALWAYS,"end;");
> omniout_str(ALWAYS,"exact_soln_x2p := proc(t)");
> omniout_str(ALWAYS,"local c1,c2,c3;");
> omniout_str(ALWAYS,"c1 := 1.0;");
> omniout_str(ALWAYS,"c2 := 0.0002;");
> omniout_str(ALWAYS,"c3 := 0.0003;");
> omniout_str(ALWAYS,"2.0 * c2 * exp(2.0 * t) - c3 * exp(-t);");
> omniout_str(ALWAYS,"end;");
> omniout_str(ALWAYS,"#END USER DEF BLOCK");
> omniout_str(ALWAYS,"#######END OF ECHO OF PROBLEM#################");
> glob_unchanged_h_cnt := 0;
> glob_warned := false;
> glob_warned2 := false;
> glob_small_float := 1.0e-200;
> glob_smallish_float := 1.0e-64;
> glob_large_float := 1.0e100;
> glob_almost_1 := 0.99;
> glob_log10_abserr := -8.0;
> glob_log10_relerr := -8.0;
> glob_hmax := 0.01;
> #BEGIN FIRST INPUT BLOCK
> #BEGIN FIRST INPUT BLOCK
> Digits := 32;
> max_terms:=30;
> #END FIRST INPUT BLOCK
> #START OF INITS AFTER INPUT BLOCK
> glob_max_terms := max_terms;
> glob_html_log := true;
> #END OF INITS AFTER INPUT BLOCK
> array_fact_1:= Array(0..(max_terms + 1),[]);
> array_x1_init:= Array(0..(max_terms + 1),[]);
> array_t:= Array(0..(max_terms + 1),[]);
> array_type_pole:= Array(0..(max_terms + 1),[]);
> array_tmp0:= Array(0..(max_terms + 1),[]);
> array_tmp1:= Array(0..(max_terms + 1),[]);
> array_tmp2:= Array(0..(max_terms + 1),[]);
> array_tmp3:= Array(0..(max_terms + 1),[]);
> array_tmp4:= Array(0..(max_terms + 1),[]);
> array_tmp5:= Array(0..(max_terms + 1),[]);
> array_tmp6:= Array(0..(max_terms + 1),[]);
> array_tmp7:= Array(0..(max_terms + 1),[]);
> array_tmp8:= Array(0..(max_terms + 1),[]);
> array_tmp9:= Array(0..(max_terms + 1),[]);
> array_last_rel_error:= Array(0..(max_terms + 1),[]);
> array_pole:= Array(0..(max_terms + 1),[]);
> array_norms:= Array(0..(max_terms + 1),[]);
> array_x2_init:= Array(0..(max_terms + 1),[]);
> array_m1:= Array(0..(max_terms + 1),[]);
> array_x1:= Array(0..(max_terms + 1),[]);
> array_x2:= Array(0..(max_terms + 1),[]);
> array_tmp10:= Array(0..(max_terms + 1),[]);
> array_tmp11:= Array(0..(max_terms + 1),[]);
> array_tmp12:= Array(0..(max_terms + 1),[]);
> array_tmp13:= Array(0..(max_terms + 1),[]);
> array_tmp14:= Array(0..(max_terms + 1),[]);
> array_tmp15:= Array(0..(max_terms + 1),[]);
> array_tmp16:= Array(0..(max_terms + 1),[]);
> array_tmp17:= Array(0..(max_terms + 1),[]);
> array_1st_rel_error:= Array(0..(max_terms + 1),[]);
> array_fact_2 := Array(0..(max_terms+ 1) ,(0..max_terms+ 1),[]);
> array_x1_higher := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_x2_set_initial := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_x1_set_initial := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_complex_pole := Array(0..(2+ 1) ,(0..3+ 1),[]);
> array_x1_higher_work2 := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_x2_higher_work2 := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_real_pole := Array(0..(2+ 1) ,(0..3+ 1),[]);
> array_poles := Array(0..(2+ 1) ,(0..3+ 1),[]);
> array_x2_higher := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_x1_higher_work := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_x2_higher_work := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> term := 1;
> while term <= max_terms do # do number 2
> array_fact_1[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_x1_init[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_t[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_type_pole[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp0[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp1[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp2[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp3[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp4[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp5[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp6[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp7[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp8[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp9[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_last_rel_error[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_pole[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_norms[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_x2_init[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_m1[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_x1[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_x2[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp10[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp11[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp12[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp13[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp14[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp15[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp16[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_tmp17[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_1st_rel_error[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> ord := 1;
> while ord <=max_terms do # do number 2
> term := 1;
> while term <= max_terms do # do number 3
> array_fact_2[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3
> ;
> ord := ord + 1;
> od;# end do number 2
> ;
> ord := 1;
> while ord <=3 do # do number 2
> term := 1;
> while term <= max_terms do # do number 3
> array_x1_higher[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3
> ;
> ord := ord + 1;
> od;# end do number 2
> ;
> ord := 1;
> while ord <=3 do # do number 2
> term := 1;
> while term <= max_terms do # do number 3
> array_x2_set_initial[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3
> ;
> ord := ord + 1;
> od;# end do number 2
> ;
> ord := 1;
> while ord <=3 do # do number 2
> term := 1;
> while term <= max_terms do # do number 3
> array_x1_set_initial[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3
> ;
> ord := ord + 1;
> od;# end do number 2
> ;
> ord := 1;
> while ord <=2 do # do number 2
> term := 1;
> while term <= 3 do # do number 3
> array_complex_pole[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3
> ;
> ord := ord + 1;
> od;# end do number 2
> ;
> ord := 1;
> while ord <=3 do # do number 2
> term := 1;
> while term <= max_terms do # do number 3
> array_x1_higher_work2[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3
> ;
> ord := ord + 1;
> od;# end do number 2
> ;
> ord := 1;
> while ord <=3 do # do number 2
> term := 1;
> while term <= max_terms do # do number 3
> array_x2_higher_work2[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3
> ;
> ord := ord + 1;
> od;# end do number 2
> ;
> ord := 1;
> while ord <=2 do # do number 2
> term := 1;
> while term <= 3 do # do number 3
> array_real_pole[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3
> ;
> ord := ord + 1;
> od;# end do number 2
> ;
> ord := 1;
> while ord <=2 do # do number 2
> term := 1;
> while term <= 3 do # do number 3
> array_poles[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3
> ;
> ord := ord + 1;
> od;# end do number 2
> ;
> ord := 1;
> while ord <=3 do # do number 2
> term := 1;
> while term <= max_terms do # do number 3
> array_x2_higher[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3
> ;
> ord := ord + 1;
> od;# end do number 2
> ;
> ord := 1;
> while ord <=3 do # do number 2
> term := 1;
> while term <= max_terms do # do number 3
> array_x1_higher_work[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3
> ;
> ord := ord + 1;
> od;# end do number 2
> ;
> ord := 1;
> while ord <=3 do # do number 2
> term := 1;
> while term <= max_terms do # do number 3
> array_x2_higher_work[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3
> ;
> ord := ord + 1;
> od;# end do number 2
> ;
> #BEGIN ARRAYS DEFINED AND INITIALIZATED
> array_t := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_t[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp9 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp9[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp8 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp8[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp7 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp7[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp6 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp6[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp5 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp5[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp4 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp4[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp3 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp3[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp2 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp2[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp1[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp0 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp0[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp17 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp17[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp16 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp16[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp15 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp15[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp14 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp14[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp13 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp13[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp12 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp12[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp11 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp11[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_tmp10 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_tmp10[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_x2 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_x2[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_x1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_x1[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_const_3D0 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_const_3D0[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_const_3D0[1] := 3.0;
> array_const_4D0 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_const_4D0[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_const_4D0[1] := 4.0;
> array_const_0D0 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_const_0D0[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_const_0D0[1] := 0.0;
> array_const_2 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_const_2[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_const_2[1] := 2;
> array_const_1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_const_1[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_const_1[1] := 1;
> array_const_2D0 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms + 1 do # do number 2
> array_const_2D0[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_const_2D0[1] := 2.0;
> array_m1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while term <= max_terms do # do number 2
> array_m1[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> array_m1[1] := -1.0;
> #END ARRAYS DEFINED AND INITIALIZATED
> #Initing Factorial Tables
> iiif := 0;
> while iiif <= glob_max_terms do # do number 2
> jjjf := 0;
> while jjjf <= glob_max_terms do # do number 3
> array_fact_1[iiif] := 0;
> array_fact_2[iiif,jjjf] := 0;
> jjjf := jjjf + 1;
> od;# end do number 3
> ;
> iiif := iiif + 1;
> od;# end do number 2
> ;
> #Done Initing Factorial Tables
> #TOP SECOND INPUT BLOCK
> #BEGIN SECOND INPUT BLOCK
> #END FIRST INPUT BLOCK
> #BEGIN SECOND INPUT BLOCK
> #
> # was complicated.ode
> #
> t_start := 0.5;
> t_end := 5.0;
> array_x1_init[0 + 1] := exact_soln_x1(t_start);
> array_x1_init[1 + 1] := exact_soln_x1p(t_start);
> array_x2_init[0 + 1] := exact_soln_x2(t_start);
> array_x2_init[1 + 1] := exact_soln_x2p(t_start);
> glob_h := 0.00001 ;
> glob_look_poles := true;
> glob_max_iter := 10;
> #END SECOND INPUT BLOCK
> #BEGIN OVERRIDE BLOCK
> glob_h := 0.001 ;
> glob_look_poles := true;
> glob_max_iter := 1000;
> glob_max_minutes := 15;
> #END OVERRIDE BLOCK
> #END SECOND INPUT BLOCK
> #BEGIN INITS AFTER SECOND INPUT BLOCK
> glob_last_good_h := glob_h;
> glob_max_terms := max_terms;
> glob_max_sec := convfloat(60.0) * convfloat(glob_max_minutes) + convfloat(3600.0) * convfloat(glob_max_hours);
> glob_abserr := 10.0 ^ (glob_log10_abserr);
> glob_relerr := 10.0 ^ (glob_log10_relerr);
> chk_data();
> #AFTER INITS AFTER SECOND INPUT BLOCK
> array_x1_set_initial[1,1] := true;
> array_x1_set_initial[1,2] := true;
> array_x1_set_initial[1,3] := false;
> array_x1_set_initial[1,4] := false;
> array_x1_set_initial[1,5] := false;
> array_x1_set_initial[1,6] := false;
> array_x1_set_initial[1,7] := false;
> array_x1_set_initial[1,8] := false;
> array_x1_set_initial[1,9] := false;
> array_x1_set_initial[1,10] := false;
> array_x1_set_initial[1,11] := false;
> array_x1_set_initial[1,12] := false;
> array_x1_set_initial[1,13] := false;
> array_x1_set_initial[1,14] := false;
> array_x1_set_initial[1,15] := false;
> array_x1_set_initial[1,16] := false;
> array_x1_set_initial[1,17] := false;
> array_x1_set_initial[1,18] := false;
> array_x1_set_initial[1,19] := false;
> array_x1_set_initial[1,20] := false;
> array_x1_set_initial[1,21] := false;
> array_x1_set_initial[1,22] := false;
> array_x1_set_initial[1,23] := false;
> array_x1_set_initial[1,24] := false;
> array_x1_set_initial[1,25] := false;
> array_x1_set_initial[1,26] := false;
> array_x1_set_initial[1,27] := false;
> array_x1_set_initial[1,28] := false;
> array_x1_set_initial[1,29] := false;
> array_x1_set_initial[1,30] := false;
> array_x2_set_initial[2,1] := true;
> array_x2_set_initial[2,2] := true;
> array_x2_set_initial[2,3] := false;
> array_x2_set_initial[2,4] := false;
> array_x2_set_initial[2,5] := false;
> array_x2_set_initial[2,6] := false;
> array_x2_set_initial[2,7] := false;
> array_x2_set_initial[2,8] := false;
> array_x2_set_initial[2,9] := false;
> array_x2_set_initial[2,10] := false;
> array_x2_set_initial[2,11] := false;
> array_x2_set_initial[2,12] := false;
> array_x2_set_initial[2,13] := false;
> array_x2_set_initial[2,14] := false;
> array_x2_set_initial[2,15] := false;
> array_x2_set_initial[2,16] := false;
> array_x2_set_initial[2,17] := false;
> array_x2_set_initial[2,18] := false;
> array_x2_set_initial[2,19] := false;
> array_x2_set_initial[2,20] := false;
> array_x2_set_initial[2,21] := false;
> array_x2_set_initial[2,22] := false;
> array_x2_set_initial[2,23] := false;
> array_x2_set_initial[2,24] := false;
> array_x2_set_initial[2,25] := false;
> array_x2_set_initial[2,26] := false;
> array_x2_set_initial[2,27] := false;
> array_x2_set_initial[2,28] := false;
> array_x2_set_initial[2,29] := false;
> array_x2_set_initial[2,30] := false;
> if glob_html_log then # if number 3
> html_log_file := fopen("html/entry.html",WRITE,TEXT);
> fi;# end if 3
> ;
> #BEGIN SOLUTION CODE
> omniout_str(ALWAYS,"START of Soultion");
> #Start Series -- INITIALIZE FOR SOLUTION
> array_t[1] := t_start;
> array_t[2] := glob_h;
> order_diff := 2;
> #Start Series array_x1
> term_no := 1;
> while (term_no <= order_diff) do # do number 2
> array_x1[term_no] := array_x1_init[term_no] * glob_h ^ (term_no - 1) / factorial_1(term_no - 1);
> term_no := term_no + 1;
> od;# end do number 2
> ;
> rows := order_diff;
> r_order := 1;
> while (r_order <= rows) do # do number 2
> term_no := 1;
> while (term_no <= (rows - r_order + 1)) do # do number 3
> it := term_no + r_order - 1;
> array_x1_higher[r_order,term_no] := array_x1_init[it]* (glob_h ^ (term_no - 1)) / ((factorial_1(term_no - 1)));
> term_no := term_no + 1;
> od;# end do number 3
> ;
> r_order := r_order + 1;
> od;# end do number 2
> ;
> order_diff := 2;
> #Start Series array_x2
> term_no := 1;
> while (term_no <= order_diff) do # do number 2
> array_x2[term_no] := array_x2_init[term_no] * glob_h ^ (term_no - 1) / factorial_1(term_no - 1);
> term_no := term_no + 1;
> od;# end do number 2
> ;
> rows := order_diff;
> r_order := 1;
> while (r_order <= rows) do # do number 2
> term_no := 1;
> while (term_no <= (rows - r_order + 1)) do # do number 3
> it := term_no + r_order - 1;
> array_x2_higher[r_order,term_no] := array_x2_init[it]* (glob_h ^ (term_no - 1)) / ((factorial_1(term_no - 1)));
> term_no := term_no + 1;
> od;# end do number 3
> ;
> r_order := r_order + 1;
> od;# end do number 2
> ;
> current_iter := 1;
> glob_clock_start_sec := elapsed_time_seconds();
> start_array_x1();
> if (abs(array_x1_higher[1,1]) > glob_small_float) then # if number 3
> tmp := abs(array_x1_higher[1,1]);
> log10norm := (log10(tmp));
> if (log10norm < glob_log10normmin) then # if number 4
> glob_log10normmin := log10norm;
> fi;# end if 4
> fi;# end if 3
> ;
> display_alot(current_iter)
> ;
> start_array_x2();
> if (abs(array_x2_higher[1,1]) > glob_small_float) then # if number 3
> tmp := abs(array_x2_higher[1,1]);
> log10norm := (log10(tmp));
> if (log10norm < glob_log10normmin) then # if number 4
> glob_log10normmin := log10norm;
> fi;# end if 4
> fi;# end if 3
> ;
> display_alot(current_iter)
> ;
> glob_clock_sec := elapsed_time_seconds();
> glob_current_iter := 0;
> glob_iter := 0;
> omniout_str(DEBUGL," ");
> glob_reached_optimal_h := true;
> glob_optimal_clock_start_sec := elapsed_time_seconds();
> while ((glob_current_iter < glob_max_iter) and (array_t[1] <= t_end ) and ((convfloat(glob_clock_sec) - convfloat(glob_orig_start_sec)) < convfloat(glob_max_sec))) do # do number 2
> #left paren 0001C
> omniout_str(INFO," ");
> omniout_str(INFO,"TOP MAIN SOLVE Loop");
> glob_iter := glob_iter + 1;
> glob_clock_sec := elapsed_time_seconds();
> glob_current_iter := glob_current_iter + 1;
> if glob_subiter_method = 1 then # if number 3
> atomall();
> elif glob_subiter_method = 2 then # if number 4
> subiter := 1;
> while subiter <= 3 do # do number 3
> atomall();
> subiter := subiter + 1;
> od;# end do number 3
> ;
> else
> subiter := 1;
> while subiter <= 3 + glob_max_terms do # do number 3
> atomall();
> subiter := subiter + 1;
> od;# end do number 3
> ;
> fi;# end if 4
> ;
> if (glob_look_poles) then # if number 4
> #left paren 0004C
> check_for_pole();
> fi;# end if 4
> ;#was right paren 0004C
> array_t[1] := array_t[1] + glob_h;
> array_t[2] := glob_h;
> #Jump Series array_x1
> order_diff := 2;
> #START PART 1 SUM AND ADJUST
> #START SUM AND ADJUST EQ =1
> #sum_and_adjust array_x1
> #BEFORE ADJUST SUBSERIES EQ =1
> ord := 3;
> calc_term := 1;
> #adjust_subseriesarray_x1
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_x1_higher_work[3,iii] := array_x1_higher[3,iii] / (glob_h ^ (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3
> ;
> #AFTER ADJUST SUBSERIES EQ =1
> #BEFORE SUM SUBSERIES EQ =1
> temp_sum := 0.0;
> ord := 3;
> calc_term := 1;
> #sum_subseriesarray_x1
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_x1_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3
> ;
> array_x1_higher_work2[ord,calc_term] := temp_sum * (glob_h ^ (calc_term - 1)) / (factorial_1(calc_term - 1)!);
> #AFTER SUM SUBSERIES EQ =1
> #BEFORE ADJUST SUBSERIES EQ =1
> ord := 2;
> calc_term := 2;
> #adjust_subseriesarray_x1
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_x1_higher_work[2,iii] := array_x1_higher[2,iii] / (glob_h ^ (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3
> ;
> #AFTER ADJUST SUBSERIES EQ =1
> #BEFORE SUM SUBSERIES EQ =1
> temp_sum := 0.0;
> ord := 2;
> calc_term := 2;
> #sum_subseriesarray_x1
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_x1_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3
> ;
> array_x1_higher_work2[ord,calc_term] := temp_sum * (glob_h ^ (calc_term - 1)) / (factorial_1(calc_term - 1)!);
> #AFTER SUM SUBSERIES EQ =1
> #BEFORE ADJUST SUBSERIES EQ =1
> ord := 2;
> calc_term := 1;
> #adjust_subseriesarray_x1
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_x1_higher_work[2,iii] := array_x1_higher[2,iii] / (glob_h ^ (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3
> ;
> #AFTER ADJUST SUBSERIES EQ =1
> #BEFORE SUM SUBSERIES EQ =1
> temp_sum := 0.0;
> ord := 2;
> calc_term := 1;
> #sum_subseriesarray_x1
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_x1_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3
> ;
> array_x1_higher_work2[ord,calc_term] := temp_sum * (glob_h ^ (calc_term - 1)) / (factorial_1(calc_term - 1)!);
> #AFTER SUM SUBSERIES EQ =1
> #BEFORE ADJUST SUBSERIES EQ =1
> ord := 1;
> calc_term := 3;
> #adjust_subseriesarray_x1
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_x1_higher_work[1,iii] := array_x1_higher[1,iii] / (glob_h ^ (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3
> ;
> #AFTER ADJUST SUBSERIES EQ =1
> #BEFORE SUM SUBSERIES EQ =1
> temp_sum := 0.0;
> ord := 1;
> calc_term := 3;
> #sum_subseriesarray_x1
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_x1_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3
> ;
> array_x1_higher_work2[ord,calc_term] := temp_sum * (glob_h ^ (calc_term - 1)) / (factorial_1(calc_term - 1)!);
> #AFTER SUM SUBSERIES EQ =1
> #BEFORE ADJUST SUBSERIES EQ =1
> ord := 1;
> calc_term := 2;
> #adjust_subseriesarray_x1
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_x1_higher_work[1,iii] := array_x1_higher[1,iii] / (glob_h ^ (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3
> ;
> #AFTER ADJUST SUBSERIES EQ =1
> #BEFORE SUM SUBSERIES EQ =1
> temp_sum := 0.0;
> ord := 1;
> calc_term := 2;
> #sum_subseriesarray_x1
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_x1_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3
> ;
> array_x1_higher_work2[ord,calc_term] := temp_sum * (glob_h ^ (calc_term - 1)) / (factorial_1(calc_term - 1)!);
> #AFTER SUM SUBSERIES EQ =1
> #BEFORE ADJUST SUBSERIES EQ =1
> ord := 1;
> calc_term := 1;
> #adjust_subseriesarray_x1
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_x1_higher_work[1,iii] := array_x1_higher[1,iii] / (glob_h ^ (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3
> ;
> #AFTER ADJUST SUBSERIES EQ =1
> #BEFORE SUM SUBSERIES EQ =1
> temp_sum := 0.0;
> ord := 1;
> calc_term := 1;
> #sum_subseriesarray_x1
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_x1_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3
> ;
> array_x1_higher_work2[ord,calc_term] := temp_sum * (glob_h ^ (calc_term - 1)) / (factorial_1(calc_term - 1)!);
> #AFTER SUM SUBSERIES EQ =1
> #END SUM AND ADJUST EQ =1
> #END PART 1
> #START PART 2 MOVE TERMS to REGULAR Array
> term_no := glob_max_terms;
> while (term_no >= 1) do # do number 3
> array_x1[term_no] := array_x1_higher_work2[1,term_no];
> ord := 1;
> while ord <= order_diff do # do number 4
> array_x1_higher[ord,term_no] := array_x1_higher_work2[ord,term_no];
> ord := ord + 1;
> od;# end do number 4
> ;
> term_no := term_no - 1;
> od;# end do number 3
> ;
> #END PART 2 HEVE MOVED TERMS to REGULAR Array
> #Jump Series array_x2
> order_diff := 2;
> #START PART 1 SUM AND ADJUST
> #START SUM AND ADJUST EQ =2
> #sum_and_adjust array_x2
> #BEFORE ADJUST SUBSERIES EQ =2
> ord := 3;
> calc_term := 1;
> #adjust_subseriesarray_x2
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_x2_higher_work[3,iii] := array_x2_higher[3,iii] / (glob_h ^ (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3
> ;
> #AFTER ADJUST SUBSERIES EQ =2
> #BEFORE SUM SUBSERIES EQ =2
> temp_sum := 0.0;
> ord := 3;
> calc_term := 1;
> #sum_subseriesarray_x2
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_x2_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3
> ;
> array_x2_higher_work2[ord,calc_term] := temp_sum * (glob_h ^ (calc_term - 1)) / (factorial_1(calc_term - 1)!);
> #AFTER SUM SUBSERIES EQ =2
> #BEFORE ADJUST SUBSERIES EQ =2
> ord := 2;
> calc_term := 2;
> #adjust_subseriesarray_x2
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_x2_higher_work[2,iii] := array_x2_higher[2,iii] / (glob_h ^ (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3
> ;
> #AFTER ADJUST SUBSERIES EQ =2
> #BEFORE SUM SUBSERIES EQ =2
> temp_sum := 0.0;
> ord := 2;
> calc_term := 2;
> #sum_subseriesarray_x2
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_x2_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3
> ;
> array_x2_higher_work2[ord,calc_term] := temp_sum * (glob_h ^ (calc_term - 1)) / (factorial_1(calc_term - 1)!);
> #AFTER SUM SUBSERIES EQ =2
> #BEFORE ADJUST SUBSERIES EQ =2
> ord := 2;
> calc_term := 1;
> #adjust_subseriesarray_x2
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_x2_higher_work[2,iii] := array_x2_higher[2,iii] / (glob_h ^ (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3
> ;
> #AFTER ADJUST SUBSERIES EQ =2
> #BEFORE SUM SUBSERIES EQ =2
> temp_sum := 0.0;
> ord := 2;
> calc_term := 1;
> #sum_subseriesarray_x2
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_x2_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3
> ;
> array_x2_higher_work2[ord,calc_term] := temp_sum * (glob_h ^ (calc_term - 1)) / (factorial_1(calc_term - 1)!);
> #AFTER SUM SUBSERIES EQ =2
> #BEFORE ADJUST SUBSERIES EQ =2
> ord := 1;
> calc_term := 3;
> #adjust_subseriesarray_x2
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_x2_higher_work[1,iii] := array_x2_higher[1,iii] / (glob_h ^ (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3
> ;
> #AFTER ADJUST SUBSERIES EQ =2
> #BEFORE SUM SUBSERIES EQ =2
> temp_sum := 0.0;
> ord := 1;
> calc_term := 3;
> #sum_subseriesarray_x2
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_x2_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3
> ;
> array_x2_higher_work2[ord,calc_term] := temp_sum * (glob_h ^ (calc_term - 1)) / (factorial_1(calc_term - 1)!);
> #AFTER SUM SUBSERIES EQ =2
> #BEFORE ADJUST SUBSERIES EQ =2
> ord := 1;
> calc_term := 2;
> #adjust_subseriesarray_x2
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_x2_higher_work[1,iii] := array_x2_higher[1,iii] / (glob_h ^ (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3
> ;
> #AFTER ADJUST SUBSERIES EQ =2
> #BEFORE SUM SUBSERIES EQ =2
> temp_sum := 0.0;
> ord := 1;
> calc_term := 2;
> #sum_subseriesarray_x2
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_x2_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3
> ;
> array_x2_higher_work2[ord,calc_term] := temp_sum * (glob_h ^ (calc_term - 1)) / (factorial_1(calc_term - 1)!);
> #AFTER SUM SUBSERIES EQ =2
> #BEFORE ADJUST SUBSERIES EQ =2
> ord := 1;
> calc_term := 1;
> #adjust_subseriesarray_x2
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_x2_higher_work[1,iii] := array_x2_higher[1,iii] / (glob_h ^ (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3
> ;
> #AFTER ADJUST SUBSERIES EQ =2
> #BEFORE SUM SUBSERIES EQ =2
> temp_sum := 0.0;
> ord := 1;
> calc_term := 1;
> #sum_subseriesarray_x2
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_x2_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3
> ;
> array_x2_higher_work2[ord,calc_term] := temp_sum * (glob_h ^ (calc_term - 1)) / (factorial_1(calc_term - 1)!);
> #AFTER SUM SUBSERIES EQ =2
> #END SUM AND ADJUST EQ =2
> #END PART 1
> #START PART 2 MOVE TERMS to REGULAR Array
> term_no := glob_max_terms;
> while (term_no >= 1) do # do number 3
> array_x2[term_no] := array_x2_higher_work2[1,term_no];
> ord := 1;
> while ord <= order_diff do # do number 4
> array_x2_higher[ord,term_no] := array_x2_higher_work2[ord,term_no];
> ord := ord + 1;
> od;# end do number 4
> ;
> term_no := term_no - 1;
> od;# end do number 3
> ;
> #END PART 2 HEVE MOVED TERMS to REGULAR Array
> display_alot(current_iter)
> ;
> od;# end do number 2
> ;#right paren 0001C
> omniout_str(ALWAYS,"Finished!");
> if (glob_iter >= glob_max_iter) then # if number 4
> omniout_str(ALWAYS,"Maximum Iterations Reached before Solution Completed!")
> fi;# end if 4
> ;
> if (elapsed_time_seconds() - convfloat(glob_orig_start_sec) >= convfloat(glob_max_sec )) then # if number 4
> omniout_str(ALWAYS,"Maximum Time Reached before Solution Completed!")
> fi;# end if 4
> ;
> glob_clock_sec := elapsed_time_seconds();
> omniout_str(INFO,"diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * x1;");
> omniout_str(INFO,"diff (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - diff(x1,t,2) - diff (x1,t,1) + x1;");
> omniout_int(INFO,"Iterations ",32,glob_iter,4," ")
> ;
> prog_report(t_start,t_end);
> if glob_html_log then # if number 4
> logstart(html_log_file);
> logitem_str(html_log_file,"2012-06-17T22:42:15-05:00")
> ;
> logitem_str(html_log_file,"Maple")
> ;
> logitem_str(html_log_file,"mtest6")
> ;
> logitem_str(html_log_file,"diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * x1;")
> ;
> logitem_float(html_log_file,t_start)
> ;
> logitem_float(html_log_file,t_end)
> ;
> logitem_float(html_log_file,array_t[1])
> ;
> logitem_float(html_log_file,glob_h)
> ;
> logitem_integer(html_log_file,Digits)
> ;
> ;
> logitem_integer(html_log_file,glob_max_terms)
> ;
> logitem_float(html_log_file,array_1st_rel_error[1])
> ;
> logitem_float(html_log_file,array_last_rel_error[1])
> ;
> logitem_integer(html_log_file,glob_iter)
> ;
> logitem_pole(html_log_file,array_type_pole[1])
> ;
> if array_type_pole[1] = 1 or array_type_pole[1] = 2 then # if number 5
> logitem_float(html_log_file,array_pole[1])
> ;
> logitem_float(html_log_file,array_pole[2])
> ;
> 0;
> else
> logitem_str(html_log_file,"NA")
> ;
> logitem_str(html_log_file,"NA")
> ;
> 0;
> fi;# end if 5
> ;
> logitem_time(html_log_file,convfloat(glob_clock_sec))
> ;
> if glob_percent_done < 100.0 then # if number 5
> logitem_time(html_log_file,convfloat(glob_optimal_expect_sec))
> ;
> 0
> else
> logitem_str(html_log_file,"Done")
> ;
> 0
> fi;# end if 5
> ;
> log_revs(html_log_file," 092 | ")
> ;
> logitem_str(html_log_file,"mtest6 diffeq.mxt")
> ;
> logitem_str(html_log_file,"mtest6 maple results")
> ;
> logitem_str(html_log_file,"Mostly affecting speed of factorials")
> ;
> logend(html_log_file)
> ;
> logditto(html_log_file)
> ;
> logditto(html_log_file)
> ;
> logditto(html_log_file)
> ;
> logitem_str(html_log_file,"diff (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - diff(x1,t,2) - diff (x1,t,1) + x1;")
> ;
> logditto(html_log_file)
> ;
> logditto(html_log_file)
> ;
> logditto(html_log_file)
> ;
> logditto(html_log_file)
> ;
> logditto(html_log_file)
> ;
> ;
> logditto(html_log_file)
> ;
> logitem_float(html_log_file,array_1st_rel_error[2])
> ;
> logitem_float(html_log_file,array_last_rel_error[2])
> ;
> logditto(html_log_file)
> ;
> logitem_pole(html_log_file,array_type_pole[2])
> ;
> if array_type_pole[2] = 1 or array_type_pole[2] = 2 then # if number 5
> logitem_float(html_log_file,array_pole[1])
> ;
> logitem_float(html_log_file,array_pole[2])
> ;
> 0;
> else
> logitem_str(html_log_file,"NA")
> ;
> logitem_str(html_log_file,"NA")
> ;
> 0;
> fi;# end if 5
> ;
> logditto(html_log_file)
> ;
> if glob_percent_done < 100.0 then # if number 5
> logditto(html_log_file)
> ;
> 0
> else
> logditto(html_log_file)
> ;
> 0
> fi;# end if 5
> ;
> logditto(html_log_file);
> ;
> logditto(html_log_file)
> ;
> logditto(html_log_file)
> ;
> logditto(html_log_file)
> ;
> logend(html_log_file)
> ;
> ;
> fi;# end if 4
> ;
> if glob_html_log then # if number 4
> fclose(html_log_file);
> fi;# end if 4
> ;
> ;;
> #END OUTFILEMAIN
> # End Function number 8
> end;
Warning, `subiter` is implicitly declared local to procedure `mainprog`
mainprog := proc()
local d1, d2, d3, d4, est_err_2, niii, done_once, term, ord, order_diff,
term_no, html_log_file, iiif, jjjf, rows, r_order, sub_iter, calc_term, iii,
temp_sum, current_iter, t_start, t_end, it, log10norm, max_terms, opt_iter,
tmp, subiter;
global DEBUGMASSIVE, glob_max_terms, INFO, DEBUGL, glob_iolevel, ALWAYS,
glob_iter, glob_warned, glob_large_float, glob_hmin, glob_disp_incr,
glob_current_iter, glob_unchanged_h_cnt, glob_not_yet_start_msg,
glob_initial_pass, days_in_year, glob_normmax, glob_orig_start_sec,
glob_smallish_float, glob_max_iter, glob_hmin_init, glob_h,
glob_clock_start_sec, djd_debug, glob_max_minutes, MAX_UNCHANGED,
glob_log10_abserr, glob_look_poles, centuries_in_millinium, hours_in_day,
djd_debug2, glob_optimal_expect_sec, glob_small_float, glob_max_trunc_err,
glob_display_flag, glob_curr_iter_when_opt, glob_last_good_h,
glob_optimal_done, glob_reached_optimal_h, glob_not_yet_finished,
glob_almost_1, glob_percent_done, glob_optimal_start, glob_no_eqs,
glob_max_hours, glob_relerr, glob_log10_relerr, min_in_hour,
glob_log10relerr, glob_log10abserr, glob_start, glob_max_rel_trunc_err,
glob_clock_sec, glob_max_opt_iter, glob_max_sec, glob_abserr,
years_in_century, glob_dump, glob_html_log, glob_log10normmin, glob_warned2,
glob_optimal_clock_start_sec, sec_in_min, glob_subiter_method,
glob_dump_analytic, glob_hmax, array_const_3D0, array_const_4D0,
array_const_0D0, array_const_2, array_const_1, array_const_2D0,
array_fact_1, array_x1_init, array_t, array_type_pole, array_tmp0,
array_tmp1, array_tmp2, array_tmp3, array_tmp4, array_tmp5, array_tmp6,
array_tmp7, array_tmp8, array_tmp9, array_last_rel_error, array_pole,
array_norms, array_x2_init, array_m1, array_x1, array_x2, array_tmp10,
array_tmp11, array_tmp12, array_tmp13, array_tmp14, array_tmp15,
array_tmp16, array_tmp17, array_1st_rel_error, array_fact_2,
array_x1_higher, array_x2_set_initial, array_x1_set_initial,
array_complex_pole, array_x1_higher_work2, array_x2_higher_work2,
array_real_pole, array_poles, array_x2_higher, array_x1_higher_work,
array_x2_higher_work, glob_last;
glob_last;
ALWAYS := 1;
INFO := 2;
DEBUGL := 3;
DEBUGMASSIVE := 4;
glob_iolevel := INFO;
DEBUGMASSIVE := 4;
glob_max_terms := 30;
INFO := 2;
DEBUGL := 3;
glob_iolevel := 5;
ALWAYS := 1;
glob_iter := 0;
glob_warned := false;
glob_large_float := 0.90*10^101;
glob_hmin := 0.1*10^(-10);
glob_disp_incr := 0.1;
glob_current_iter := 0;
glob_unchanged_h_cnt := 0;
glob_not_yet_start_msg := true;
glob_initial_pass := true;
days_in_year := 365.0;
glob_normmax := 0.;
glob_orig_start_sec := 0.;
glob_smallish_float := 0.1*10^(-100);
glob_max_iter := 1000;
glob_hmin_init := 0.001;
glob_h := 0.1;
glob_clock_start_sec := 0.;
djd_debug := true;
glob_max_minutes := 0.;
MAX_UNCHANGED := 10;
glob_log10_abserr := 0.1*10^(-10);
glob_look_poles := false;
centuries_in_millinium := 10.0;
hours_in_day := 24.0;
djd_debug2 := true;
glob_optimal_expect_sec := 0.1;
glob_small_float := 0.1*10^(-50);
glob_max_trunc_err := 0.1*10^(-10);
glob_display_flag := true;
glob_curr_iter_when_opt := 0;
glob_last_good_h := 0.1;
glob_optimal_done := false;
glob_reached_optimal_h := false;
glob_not_yet_finished := true;
glob_almost_1 := 0.9990;
glob_percent_done := 0.;
glob_optimal_start := 0.;
glob_no_eqs := 0;
glob_max_hours := 0.;
glob_relerr := 0.1*10^(-10);
glob_log10_relerr := 0.1*10^(-10);
min_in_hour := 60.0;
glob_log10relerr := 0.;
glob_log10abserr := 0.;
glob_start := 0;
glob_max_rel_trunc_err := 0.1*10^(-10);
glob_clock_sec := 0.;
glob_max_opt_iter := 10;
glob_max_sec := 10000.0;
glob_abserr := 0.1*10^(-10);
years_in_century := 100.0;
glob_dump := false;
glob_html_log := true;
glob_log10normmin := 0.1;
glob_warned2 := false;
glob_optimal_clock_start_sec := 0.;
sec_in_min := 60.0;
glob_subiter_method := 3;
glob_dump_analytic := false;
glob_hmax := 1.0;
glob_orig_start_sec := elapsed_time_seconds();
MAX_UNCHANGED := 10;
glob_curr_iter_when_opt := 0;
glob_display_flag := true;
glob_no_eqs := 2;
glob_iter := -1;
opt_iter := -1;
glob_max_iter := 50000;
glob_max_hours := 0.;
glob_max_minutes := 15.0;
omniout_str(ALWAYS, "##############ECHO OF PROBLEM#################");
omniout_str(ALWAYS,
"##############temp/mtest6postode.ode#################");
omniout_str(ALWAYS,
"diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * x1;");
omniout_str(ALWAYS, "diff (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - \
diff(x1,t,2) - diff (x1,t,1) + x1;");
omniout_str(ALWAYS, "!");
omniout_str(ALWAYS, "#BEGIN FIRST INPUT BLOCK");
omniout_str(ALWAYS, "Digits := 32;");
omniout_str(ALWAYS, "max_terms:=30;");
omniout_str(ALWAYS, "!");
omniout_str(ALWAYS, "#END FIRST INPUT BLOCK");
omniout_str(ALWAYS, "#BEGIN SECOND INPUT BLOCK");
omniout_str(ALWAYS, "#");
omniout_str(ALWAYS, "# was complicated.ode");
omniout_str(ALWAYS, "#");
omniout_str(ALWAYS, "t_start := 0.5;");
omniout_str(ALWAYS, "t_end := 5.0;");
omniout_str(ALWAYS, "array_x1_init[0 + 1] := exact_soln_x1(t_start);");
omniout_str(ALWAYS, "array_x1_init[1 + 1] := exact_soln_x1p(t_start);")
;
omniout_str(ALWAYS, "array_x2_init[0 + 1] := exact_soln_x2(t_start);");
omniout_str(ALWAYS, "array_x2_init[1 + 1] := exact_soln_x2p(t_start);")
;
omniout_str(ALWAYS, "glob_h := 0.00001 ;");
omniout_str(ALWAYS, "glob_look_poles := true;");
omniout_str(ALWAYS, "glob_max_iter := 10;");
omniout_str(ALWAYS, "#END SECOND INPUT BLOCK");
omniout_str(ALWAYS, "#BEGIN OVERRIDE BLOCK");
omniout_str(ALWAYS, "glob_h := 0.001 ;");
omniout_str(ALWAYS, "glob_look_poles := true;");
omniout_str(ALWAYS, "glob_max_iter := 1000;");
omniout_str(ALWAYS, "glob_max_minutes := 15;");
omniout_str(ALWAYS, "#END OVERRIDE BLOCK");
omniout_str(ALWAYS, "!");
omniout_str(ALWAYS, "#BEGIN USER DEF BLOCK");
omniout_str(ALWAYS, "exact_soln_x1 := proc(t)");
omniout_str(ALWAYS, "local c1,c2,c3;");
omniout_str(ALWAYS, "c1 := 1.0;");
omniout_str(ALWAYS, "c2 := 0.0002;");
omniout_str(ALWAYS, "c3 := 0.0003;");
omniout_str(ALWAYS, "2.0 * c1 + 6.0 * c3 * exp(-t);");
omniout_str(ALWAYS, "end;");
omniout_str(ALWAYS, "exact_soln_x1p := proc(t)");
omniout_str(ALWAYS, "local c1,c2,c3;");
omniout_str(ALWAYS, "c1 := 1.0;");
omniout_str(ALWAYS, "c2 := 0.0002;");
omniout_str(ALWAYS, "c3 := 0.0003;");
omniout_str(ALWAYS, "- 6.0 * c3 * exp(-t);");
omniout_str(ALWAYS, "end;");
omniout_str(ALWAYS, "exact_soln_x2 := proc(t)");
omniout_str(ALWAYS, "local c1,c2,c3;");
omniout_str(ALWAYS, "c1 := 1.0;");
omniout_str(ALWAYS, "c2 := 0.0002;");
omniout_str(ALWAYS, "c3 := 0.0003;");
omniout_str(ALWAYS, "c1 + c2 * exp(2.0 * t) + c3 * exp(-t);");
omniout_str(ALWAYS, "end;");
omniout_str(ALWAYS, "exact_soln_x2p := proc(t)");
omniout_str(ALWAYS, "local c1,c2,c3;");
omniout_str(ALWAYS, "c1 := 1.0;");
omniout_str(ALWAYS, "c2 := 0.0002;");
omniout_str(ALWAYS, "c3 := 0.0003;");
omniout_str(ALWAYS, "2.0 * c2 * exp(2.0 * t) - c3 * exp(-t);");
omniout_str(ALWAYS, "end;");
omniout_str(ALWAYS, "#END USER DEF BLOCK");
omniout_str(ALWAYS, "#######END OF ECHO OF PROBLEM#################");
glob_unchanged_h_cnt := 0;
glob_warned := false;
glob_warned2 := false;
glob_small_float := 0.10*10^(-199);
glob_smallish_float := 0.10*10^(-63);
glob_large_float := 0.10*10^101;
glob_almost_1 := 0.99;
glob_log10_abserr := -8.0;
glob_log10_relerr := -8.0;
glob_hmax := 0.01;
Digits := 32;
max_terms := 30;
glob_max_terms := max_terms;
glob_html_log := true;
array_fact_1 := Array(0 .. max_terms + 1, []);
array_x1_init := Array(0 .. max_terms + 1, []);
array_t := Array(0 .. max_terms + 1, []);
array_type_pole := Array(0 .. max_terms + 1, []);
array_tmp0 := Array(0 .. max_terms + 1, []);
array_tmp1 := Array(0 .. max_terms + 1, []);
array_tmp2 := Array(0 .. max_terms + 1, []);
array_tmp3 := Array(0 .. max_terms + 1, []);
array_tmp4 := Array(0 .. max_terms + 1, []);
array_tmp5 := Array(0 .. max_terms + 1, []);
array_tmp6 := Array(0 .. max_terms + 1, []);
array_tmp7 := Array(0 .. max_terms + 1, []);
array_tmp8 := Array(0 .. max_terms + 1, []);
array_tmp9 := Array(0 .. max_terms + 1, []);
array_last_rel_error := Array(0 .. max_terms + 1, []);
array_pole := Array(0 .. max_terms + 1, []);
array_norms := Array(0 .. max_terms + 1, []);
array_x2_init := Array(0 .. max_terms + 1, []);
array_m1 := Array(0 .. max_terms + 1, []);
array_x1 := Array(0 .. max_terms + 1, []);
array_x2 := Array(0 .. max_terms + 1, []);
array_tmp10 := Array(0 .. max_terms + 1, []);
array_tmp11 := Array(0 .. max_terms + 1, []);
array_tmp12 := Array(0 .. max_terms + 1, []);
array_tmp13 := Array(0 .. max_terms + 1, []);
array_tmp14 := Array(0 .. max_terms + 1, []);
array_tmp15 := Array(0 .. max_terms + 1, []);
array_tmp16 := Array(0 .. max_terms + 1, []);
array_tmp17 := Array(0 .. max_terms + 1, []);
array_1st_rel_error := Array(0 .. max_terms + 1, []);
array_fact_2 := Array(0 .. max_terms + 1, 0 .. max_terms + 1, []);
array_x1_higher := Array(0 .. 4, 0 .. max_terms + 1, []);
array_x2_set_initial := Array(0 .. 4, 0 .. max_terms + 1, []);
array_x1_set_initial := Array(0 .. 4, 0 .. max_terms + 1, []);
array_complex_pole := Array(0 .. 3, 0 .. 4, []);
array_x1_higher_work2 := Array(0 .. 4, 0 .. max_terms + 1, []);
array_x2_higher_work2 := Array(0 .. 4, 0 .. max_terms + 1, []);
array_real_pole := Array(0 .. 3, 0 .. 4, []);
array_poles := Array(0 .. 3, 0 .. 4, []);
array_x2_higher := Array(0 .. 4, 0 .. max_terms + 1, []);
array_x1_higher_work := Array(0 .. 4, 0 .. max_terms + 1, []);
array_x2_higher_work := Array(0 .. 4, 0 .. max_terms + 1, []);
term := 1;
while term <= max_terms do array_fact_1[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_x1_init[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_t[term] := 0.; term := term + 1 end do
;
term := 1;
while term <= max_terms do
array_type_pole[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp0[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp1[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp2[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp3[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp4[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp5[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp6[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp7[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp8[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp9[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do
array_last_rel_error[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_pole[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_norms[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_x2_init[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_m1[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_x1[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_x2[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp10[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp11[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp12[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp13[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp14[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp15[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp16[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp17[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do
array_1st_rel_error[term] := 0.; term := term + 1
end do;
ord := 1;
while ord <= max_terms do
term := 1;
while term <= max_terms do
array_fact_2[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 3 do
term := 1;
while term <= max_terms do
array_x1_higher[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 3 do
term := 1;
while term <= max_terms do
array_x2_set_initial[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 3 do
term := 1;
while term <= max_terms do
array_x1_set_initial[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 2 do
term := 1;
while term <= 3 do
array_complex_pole[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 3 do
term := 1;
while term <= max_terms do
array_x1_higher_work2[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 3 do
term := 1;
while term <= max_terms do
array_x2_higher_work2[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 2 do
term := 1;
while term <= 3 do
array_real_pole[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 2 do
term := 1;
while term <= 3 do array_poles[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 3 do
term := 1;
while term <= max_terms do
array_x2_higher[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 3 do
term := 1;
while term <= max_terms do
array_x1_higher_work[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 3 do
term := 1;
while term <= max_terms do
array_x2_higher_work[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
array_t := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_t[term] := 0.; term := term + 1
end do;
array_tmp9 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp9[term] := 0.; term := term + 1
end do;
array_tmp8 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp8[term] := 0.; term := term + 1
end do;
array_tmp7 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp7[term] := 0.; term := term + 1
end do;
array_tmp6 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp6[term] := 0.; term := term + 1
end do;
array_tmp5 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp5[term] := 0.; term := term + 1
end do;
array_tmp4 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp4[term] := 0.; term := term + 1
end do;
array_tmp3 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp3[term] := 0.; term := term + 1
end do;
array_tmp2 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp2[term] := 0.; term := term + 1
end do;
array_tmp1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp1[term] := 0.; term := term + 1
end do;
array_tmp0 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp0[term] := 0.; term := term + 1
end do;
array_tmp17 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp17[term] := 0.; term := term + 1
end do;
array_tmp16 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp16[term] := 0.; term := term + 1
end do;
array_tmp15 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp15[term] := 0.; term := term + 1
end do;
array_tmp14 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp14[term] := 0.; term := term + 1
end do;
array_tmp13 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp13[term] := 0.; term := term + 1
end do;
array_tmp12 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp12[term] := 0.; term := term + 1
end do;
array_tmp11 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp11[term] := 0.; term := term + 1
end do;
array_tmp10 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp10[term] := 0.; term := term + 1
end do;
array_x2 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_x2[term] := 0.; term := term + 1
end do;
array_x1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_x1[term] := 0.; term := term + 1
end do;
array_const_3D0 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_3D0[term] := 0.; term := term + 1
end do;
array_const_3D0[1] := 3.0;
array_const_4D0 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_4D0[term] := 0.; term := term + 1
end do;
array_const_4D0[1] := 4.0;
array_const_0D0 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_0D0[term] := 0.; term := term + 1
end do;
array_const_0D0[1] := 0.;
array_const_2 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_2[term] := 0.; term := term + 1
end do;
array_const_2[1] := 2;
array_const_1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_1[term] := 0.; term := term + 1
end do;
array_const_1[1] := 1;
array_const_2D0 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_2D0[term] := 0.; term := term + 1
end do;
array_const_2D0[1] := 2.0;
array_m1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms do array_m1[term] := 0.; term := term + 1
end do;
array_m1[1] := -1.0;
iiif := 0;
while iiif <= glob_max_terms do
jjjf := 0;
while jjjf <= glob_max_terms do
array_fact_1[iiif] := 0;
array_fact_2[iiif, jjjf] := 0;
jjjf := jjjf + 1
end do;
iiif := iiif + 1
end do;
t_start := 0.5;
t_end := 5.0;
array_x1_init[1] := exact_soln_x1(t_start);
array_x1_init[2] := exact_soln_x1p(t_start);
array_x2_init[1] := exact_soln_x2(t_start);
array_x2_init[2] := exact_soln_x2p(t_start);
glob_h := 0.00001;
glob_look_poles := true;
glob_max_iter := 10;
glob_h := 0.001;
glob_look_poles := true;
glob_max_iter := 1000;
glob_max_minutes := 15;
glob_last_good_h := glob_h;
glob_max_terms := max_terms;
glob_max_sec := convfloat(60.0)*convfloat(glob_max_minutes)
+ convfloat(3600.0)*convfloat(glob_max_hours);
glob_abserr := 10.0^glob_log10_abserr;
glob_relerr := 10.0^glob_log10_relerr;
chk_data();
array_x1_set_initial[1, 1] := true;
array_x1_set_initial[1, 2] := true;
array_x1_set_initial[1, 3] := false;
array_x1_set_initial[1, 4] := false;
array_x1_set_initial[1, 5] := false;
array_x1_set_initial[1, 6] := false;
array_x1_set_initial[1, 7] := false;
array_x1_set_initial[1, 8] := false;
array_x1_set_initial[1, 9] := false;
array_x1_set_initial[1, 10] := false;
array_x1_set_initial[1, 11] := false;
array_x1_set_initial[1, 12] := false;
array_x1_set_initial[1, 13] := false;
array_x1_set_initial[1, 14] := false;
array_x1_set_initial[1, 15] := false;
array_x1_set_initial[1, 16] := false;
array_x1_set_initial[1, 17] := false;
array_x1_set_initial[1, 18] := false;
array_x1_set_initial[1, 19] := false;
array_x1_set_initial[1, 20] := false;
array_x1_set_initial[1, 21] := false;
array_x1_set_initial[1, 22] := false;
array_x1_set_initial[1, 23] := false;
array_x1_set_initial[1, 24] := false;
array_x1_set_initial[1, 25] := false;
array_x1_set_initial[1, 26] := false;
array_x1_set_initial[1, 27] := false;
array_x1_set_initial[1, 28] := false;
array_x1_set_initial[1, 29] := false;
array_x1_set_initial[1, 30] := false;
array_x2_set_initial[2, 1] := true;
array_x2_set_initial[2, 2] := true;
array_x2_set_initial[2, 3] := false;
array_x2_set_initial[2, 4] := false;
array_x2_set_initial[2, 5] := false;
array_x2_set_initial[2, 6] := false;
array_x2_set_initial[2, 7] := false;
array_x2_set_initial[2, 8] := false;
array_x2_set_initial[2, 9] := false;
array_x2_set_initial[2, 10] := false;
array_x2_set_initial[2, 11] := false;
array_x2_set_initial[2, 12] := false;
array_x2_set_initial[2, 13] := false;
array_x2_set_initial[2, 14] := false;
array_x2_set_initial[2, 15] := false;
array_x2_set_initial[2, 16] := false;
array_x2_set_initial[2, 17] := false;
array_x2_set_initial[2, 18] := false;
array_x2_set_initial[2, 19] := false;
array_x2_set_initial[2, 20] := false;
array_x2_set_initial[2, 21] := false;
array_x2_set_initial[2, 22] := false;
array_x2_set_initial[2, 23] := false;
array_x2_set_initial[2, 24] := false;
array_x2_set_initial[2, 25] := false;
array_x2_set_initial[2, 26] := false;
array_x2_set_initial[2, 27] := false;
array_x2_set_initial[2, 28] := false;
array_x2_set_initial[2, 29] := false;
array_x2_set_initial[2, 30] := false;
if glob_html_log then
html_log_file := fopen("html/entry.html", WRITE, TEXT)
end if;
omniout_str(ALWAYS, "START of Soultion");
array_t[1] := t_start;
array_t[2] := glob_h;
order_diff := 2;
term_no := 1;
while term_no <= order_diff do
array_x1[term_no] := array_x1_init[term_no]*glob_h^(term_no - 1)/
factorial_1(term_no - 1);
term_no := term_no + 1
end do;
rows := order_diff;
r_order := 1;
while r_order <= rows do
term_no := 1;
while term_no <= rows - r_order + 1 do
it := term_no + r_order - 1;
array_x1_higher[r_order, term_no] := array_x1_init[it]*
glob_h^(term_no - 1)/factorial_1(term_no - 1);
term_no := term_no + 1
end do;
r_order := r_order + 1
end do;
order_diff := 2;
term_no := 1;
while term_no <= order_diff do
array_x2[term_no] := array_x2_init[term_no]*glob_h^(term_no - 1)/
factorial_1(term_no - 1);
term_no := term_no + 1
end do;
rows := order_diff;
r_order := 1;
while r_order <= rows do
term_no := 1;
while term_no <= rows - r_order + 1 do
it := term_no + r_order - 1;
array_x2_higher[r_order, term_no] := array_x2_init[it]*
glob_h^(term_no - 1)/factorial_1(term_no - 1);
term_no := term_no + 1
end do;
r_order := r_order + 1
end do;
current_iter := 1;
glob_clock_start_sec := elapsed_time_seconds();
start_array_x1();
if glob_small_float < abs(array_x1_higher[1, 1]) then
tmp := abs(array_x1_higher[1, 1]);
log10norm := log10(tmp);
if log10norm < glob_log10normmin then
glob_log10normmin := log10norm
end if
end if;
display_alot(current_iter);
start_array_x2();
if glob_small_float < abs(array_x2_higher[1, 1]) then
tmp := abs(array_x2_higher[1, 1]);
log10norm := log10(tmp);
if log10norm < glob_log10normmin then
glob_log10normmin := log10norm
end if
end if;
display_alot(current_iter);
glob_clock_sec := elapsed_time_seconds();
glob_current_iter := 0;
glob_iter := 0;
omniout_str(DEBUGL, " ");
glob_reached_optimal_h := true;
glob_optimal_clock_start_sec := elapsed_time_seconds();
while glob_current_iter < glob_max_iter and array_t[1] <= t_end and
convfloat(glob_clock_sec) - convfloat(glob_orig_start_sec) <
convfloat(glob_max_sec) do
omniout_str(INFO, " ");
omniout_str(INFO, "TOP MAIN SOLVE Loop");
glob_iter := glob_iter + 1;
glob_clock_sec := elapsed_time_seconds();
glob_current_iter := glob_current_iter + 1;
if glob_subiter_method = 1 then atomall()
elif glob_subiter_method = 2 then
subiter := 1;
while subiter <= 3 do atomall(); subiter := subiter + 1 end do
else
subiter := 1;
while subiter <= 3 + glob_max_terms do
atomall(); subiter := subiter + 1
end do
end if;
if glob_look_poles then check_for_pole() end if;
array_t[1] := array_t[1] + glob_h;
array_t[2] := glob_h;
order_diff := 2;
ord := 3;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
array_x1_higher_work[3, iii] := array_x1_higher[3, iii]/(
glob_h^(calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 3;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_x1_higher_work[ord, iii];
iii := iii - 1
end do;
array_x1_higher_work2[ord, calc_term] :=
temp_sum*glob_h^(calc_term - 1)/factorial_1(calc_term - 1)!;
ord := 2;
calc_term := 2;
iii := glob_max_terms;
while calc_term <= iii do
array_x1_higher_work[2, iii] := array_x1_higher[2, iii]/(
glob_h^(calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 2;
calc_term := 2;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_x1_higher_work[ord, iii];
iii := iii - 1
end do;
array_x1_higher_work2[ord, calc_term] :=
temp_sum*glob_h^(calc_term - 1)/factorial_1(calc_term - 1)!;
ord := 2;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
array_x1_higher_work[2, iii] := array_x1_higher[2, iii]/(
glob_h^(calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 2;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_x1_higher_work[ord, iii];
iii := iii - 1
end do;
array_x1_higher_work2[ord, calc_term] :=
temp_sum*glob_h^(calc_term - 1)/factorial_1(calc_term - 1)!;
ord := 1;
calc_term := 3;
iii := glob_max_terms;
while calc_term <= iii do
array_x1_higher_work[1, iii] := array_x1_higher[1, iii]/(
glob_h^(calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 1;
calc_term := 3;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_x1_higher_work[ord, iii];
iii := iii - 1
end do;
array_x1_higher_work2[ord, calc_term] :=
temp_sum*glob_h^(calc_term - 1)/factorial_1(calc_term - 1)!;
ord := 1;
calc_term := 2;
iii := glob_max_terms;
while calc_term <= iii do
array_x1_higher_work[1, iii] := array_x1_higher[1, iii]/(
glob_h^(calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 1;
calc_term := 2;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_x1_higher_work[ord, iii];
iii := iii - 1
end do;
array_x1_higher_work2[ord, calc_term] :=
temp_sum*glob_h^(calc_term - 1)/factorial_1(calc_term - 1)!;
ord := 1;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
array_x1_higher_work[1, iii] := array_x1_higher[1, iii]/(
glob_h^(calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 1;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_x1_higher_work[ord, iii];
iii := iii - 1
end do;
array_x1_higher_work2[ord, calc_term] :=
temp_sum*glob_h^(calc_term - 1)/factorial_1(calc_term - 1)!;
term_no := glob_max_terms;
while 1 <= term_no do
array_x1[term_no] := array_x1_higher_work2[1, term_no];
ord := 1;
while ord <= order_diff do
array_x1_higher[ord, term_no] :=
array_x1_higher_work2[ord, term_no];
ord := ord + 1
end do;
term_no := term_no - 1
end do;
order_diff := 2;
ord := 3;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
array_x2_higher_work[3, iii] := array_x2_higher[3, iii]/(
glob_h^(calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 3;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_x2_higher_work[ord, iii];
iii := iii - 1
end do;
array_x2_higher_work2[ord, calc_term] :=
temp_sum*glob_h^(calc_term - 1)/factorial_1(calc_term - 1)!;
ord := 2;
calc_term := 2;
iii := glob_max_terms;
while calc_term <= iii do
array_x2_higher_work[2, iii] := array_x2_higher[2, iii]/(
glob_h^(calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 2;
calc_term := 2;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_x2_higher_work[ord, iii];
iii := iii - 1
end do;
array_x2_higher_work2[ord, calc_term] :=
temp_sum*glob_h^(calc_term - 1)/factorial_1(calc_term - 1)!;
ord := 2;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
array_x2_higher_work[2, iii] := array_x2_higher[2, iii]/(
glob_h^(calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 2;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_x2_higher_work[ord, iii];
iii := iii - 1
end do;
array_x2_higher_work2[ord, calc_term] :=
temp_sum*glob_h^(calc_term - 1)/factorial_1(calc_term - 1)!;
ord := 1;
calc_term := 3;
iii := glob_max_terms;
while calc_term <= iii do
array_x2_higher_work[1, iii] := array_x2_higher[1, iii]/(
glob_h^(calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 1;
calc_term := 3;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_x2_higher_work[ord, iii];
iii := iii - 1
end do;
array_x2_higher_work2[ord, calc_term] :=
temp_sum*glob_h^(calc_term - 1)/factorial_1(calc_term - 1)!;
ord := 1;
calc_term := 2;
iii := glob_max_terms;
while calc_term <= iii do
array_x2_higher_work[1, iii] := array_x2_higher[1, iii]/(
glob_h^(calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 1;
calc_term := 2;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_x2_higher_work[ord, iii];
iii := iii - 1
end do;
array_x2_higher_work2[ord, calc_term] :=
temp_sum*glob_h^(calc_term - 1)/factorial_1(calc_term - 1)!;
ord := 1;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
array_x2_higher_work[1, iii] := array_x2_higher[1, iii]/(
glob_h^(calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 1;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_x2_higher_work[ord, iii];
iii := iii - 1
end do;
array_x2_higher_work2[ord, calc_term] :=
temp_sum*glob_h^(calc_term - 1)/factorial_1(calc_term - 1)!;
term_no := glob_max_terms;
while 1 <= term_no do
array_x2[term_no] := array_x2_higher_work2[1, term_no];
ord := 1;
while ord <= order_diff do
array_x2_higher[ord, term_no] :=
array_x2_higher_work2[ord, term_no];
ord := ord + 1
end do;
term_no := term_no - 1
end do;
display_alot(current_iter)
end do;
omniout_str(ALWAYS, "Finished!");
if glob_max_iter <= glob_iter then omniout_str(ALWAYS,
"Maximum Iterations Reached before Solution Completed!")
end if;
if convfloat(glob_max_sec) <=
elapsed_time_seconds() - convfloat(glob_orig_start_sec) then
omniout_str(ALWAYS,
"Maximum Time Reached before Solution Completed!")
end if;
glob_clock_sec := elapsed_time_seconds();
omniout_str(INFO,
"diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * x1;");
omniout_str(INFO, "diff (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - di\
ff(x1,t,2) - diff (x1,t,1) + x1;");
omniout_int(INFO, "Iterations ", 32, glob_iter, 4,
" ");
prog_report(t_start, t_end);
if glob_html_log then
logstart(html_log_file);
logitem_str(html_log_file, "2012-06-17T22:42:15-05:00");
logitem_str(html_log_file, "Maple");
logitem_str(html_log_file, "mtest6")
;
logitem_str(html_log_file,
"diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * x1;")
;
logitem_float(html_log_file, t_start);
logitem_float(html_log_file, t_end);
logitem_float(html_log_file, array_t[1]);
logitem_float(html_log_file, glob_h);
logitem_integer(html_log_file, Digits);
logitem_integer(html_log_file, glob_max_terms);
logitem_float(html_log_file, array_1st_rel_error[1]);
logitem_float(html_log_file, array_last_rel_error[1]);
logitem_integer(html_log_file, glob_iter);
logitem_pole(html_log_file, array_type_pole[1]);
if array_type_pole[1] = 1 or array_type_pole[1] = 2 then
logitem_float(html_log_file, array_pole[1]);
logitem_float(html_log_file, array_pole[2]);
0
else
logitem_str(html_log_file, "NA");
logitem_str(html_log_file, "NA");
0
end if;
logitem_time(html_log_file, convfloat(glob_clock_sec));
if glob_percent_done < 100.0 then
logitem_time(html_log_file, convfloat(glob_optimal_expect_sec))
;
0
else logitem_str(html_log_file, "Done"); 0
end if;
log_revs(html_log_file, " 092 | ");
logitem_str(html_log_file,
"mtest6 diffeq.mxt");
logitem_str(html_log_file,
"mtest6 maple results");
logitem_str(html_log_file, "Mostly affecting speed of factorials");
logend(html_log_file);
logditto(html_log_file);
logditto(html_log_file);
logditto(html_log_file);
logitem_str(html_log_file, "diff (x2,t,2) = 3.0 * diff(x2,t,1) - \
2.0 * x2 - diff(x1,t,2) - diff (x1,t,1) + x1;");
logditto(html_log_file);
logditto(html_log_file);
logditto(html_log_file);
logditto(html_log_file);
logditto(html_log_file);
logditto(html_log_file);
logitem_float(html_log_file, array_1st_rel_error[2]);
logitem_float(html_log_file, array_last_rel_error[2]);
logditto(html_log_file);
logitem_pole(html_log_file, array_type_pole[2]);
if array_type_pole[2] = 1 or array_type_pole[2] = 2 then
logitem_float(html_log_file, array_pole[1]);
logitem_float(html_log_file, array_pole[2]);
0
else
logitem_str(html_log_file, "NA");
logitem_str(html_log_file, "NA");
0
end if;
logditto(html_log_file);
if glob_percent_done < 100.0 then logditto(html_log_file); 0
else logditto(html_log_file); 0
end if;
logditto(html_log_file);
logditto(html_log_file);
logditto(html_log_file);
logditto(html_log_file);
logend(html_log_file)
end if;
if glob_html_log then fclose(html_log_file) end if
end proc
> mainprog();
##############ECHO OF PROBLEM#################
##############temp/mtest6postode.ode#################
diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * x1;
diff (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - diff(x1,t,2) - diff (x1,t,1) + x1;
!
#BEGIN FIRST INPUT BLOCK
Digits := 32;
max_terms:=30;
!
#END FIRST INPUT BLOCK
#BEGIN SECOND INPUT BLOCK
#
# was complicated.ode
#
t_start := 0.5;
t_end := 5.0;
array_x1_init[0 + 1] := exact_soln_x1(t_start);
array_x1_init[1 + 1] := exact_soln_x1p(t_start);
array_x2_init[0 + 1] := exact_soln_x2(t_start);
array_x2_init[1 + 1] := exact_soln_x2p(t_start);
glob_h := 0.00001 ;
glob_look_poles := true;
glob_max_iter := 10;
#END SECOND INPUT BLOCK
#BEGIN OVERRIDE BLOCK
glob_h := 0.001 ;
glob_look_poles := true;
glob_max_iter := 1000;
glob_max_minutes := 15;
#END OVERRIDE BLOCK
!
#BEGIN USER DEF BLOCK
exact_soln_x1 := proc(t)
local c1,c2,c3;
c1 := 1.0;
c2 := 0.0002;
c3 := 0.0003;
2.0 * c1 + 6.0 * c3 * exp(-t);
end;
exact_soln_x1p := proc(t)
local c1,c2,c3;
c1 := 1.0;
c2 := 0.0002;
c3 := 0.0003;
- 6.0 * c3 * exp(-t);
end;
exact_soln_x2 := proc(t)
local c1,c2,c3;
c1 := 1.0;
c2 := 0.0002;
c3 := 0.0003;
c1 + c2 * exp(2.0 * t) + c3 * exp(-t);
end;
exact_soln_x2p := proc(t)
local c1,c2,c3;
c1 := 1.0;
c2 := 0.0002;
c3 := 0.0003;
2.0 * c2 * exp(2.0 * t) - c3 * exp(-t);
end;
#END USER DEF BLOCK
#######END OF ECHO OF PROBLEM#################
START of Soultion
t[1] = 0.5
x1[1] (analytic) = 2.001091755187482740162486839163
x1[1] (numeric) = 2.001091755187482740162486839163
absolute error = 0
relative error = 0 %
h = 0.001
x2[1] (analytic) = 1.0007256155636055990741531973548
x2[1] (numeric) = 1.0007256155636055990741531973548
absolute error = 0
relative error = 0 %
h = 0.001
t[1] = 0.5
x1[1] (analytic) = 2.001091755187482740162486839163
x1[1] (numeric) = 2.001091755187482740162486839163
absolute error = 0
relative error = 0 %
h = 0.001
x2[1] (analytic) = 1.0007256155636055990741531973548
x2[1] (numeric) = 1.0007256155636055990741531973548
absolute error = 0
relative error = 0 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3.8MB, alloc=3.1MB, time=0.21
NO POLE
NO POLE
t[1] = 0.501
x1[1] (analytic) = 2.001090663977990937446483678202
x1[1] (numeric) = -6887401218394.045192519354508461
absolute error = 6887401218396.0462831833324993984
relative error = 344182367264884.58574372891240799 %
h = 0.001
x2[1] (analytic) = 1.0007265220961263180267211517279
x2[1] (numeric) = 61528016421.583551352895846202119
absolute error = 61528016420.582824830799719884092
relative error = 6148334741014.5543263921496337774 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=7.6MB, alloc=4.4MB, time=0.47
memory used=11.4MB, alloc=4.5MB, time=0.76
NO POLE
NO POLE
t[1] = 0.502
x1[1] (analytic) = 2.0010895738591632036100858259251
x1[1] (numeric) = 5.5070453269065236923657695273495e+32
absolute error = 5.5070453269065236923657695273495e+32
relative error = 2.7520233970766317386250751800655e+34 %
h = 0.001
x2[1] (analytic) = 1.0007274309894041739636559251805
x2[1] (numeric) = -4919672377990312117584036762313.5
absolute error = 4919672377990312117584036762314.5
relative error = 4.9160962572259121158271964466392e+32 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=15.2MB, alloc=4.5MB, time=1.04
NO POLE
NO POLE
t[1] = 0.503
x1[1] (analytic) = 2.0010884848299094197347162072617
x1[1] (numeric) = -4.4033369439258148912256941153413e+52
absolute error = 4.4033369439258148912256941153413e+52
relative error = 2.2004708823758456940327967300840e+54 %
h = 0.001
x2[1] (analytic) = 1.0007283422476198008492141699459
x2[1] (numeric) = 3.9336838264566936313598939202060e+50
absolute error = 3.9336838264566936313598939202060e+50
relative error = 3.9308208435684981897929721593436e+52 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=19.0MB, alloc=4.5MB, time=1.31
NO POLE
NO POLE
memory used=22.8MB, alloc=4.5MB, time=1.59
t[1] = 0.504
x1[1] (analytic) = 2.0010873968891405564758385060019
x1[1] (numeric) = 3.5208310610789075430244684040744e+72
absolute error = 3.5208310610789075430244684040744e+72
relative error = 1.7594589154638307780499271139696e+74 %
h = 0.001
x2[1] (analytic) = 1.0007292558749627476146876084142
x2[1] (numeric) = -3.1453046580406753907085661618327e+70
absolute error = 3.1453046580406753907085661618327e+70
relative error = 3.1430125976387653946331122113520e+72 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=26.7MB, alloc=4.5MB, time=1.86
NO POLE
NO POLE
t[1] = 0.505
x1[1] (analytic) = 2.0010863100357686729739277295073
x1[1] (numeric) = -2.8151948212271242243358308171649e+92
absolute error = 2.8151948212271242243358308171649e+92
relative error = 1.4068332820570861157613403863751e+94 %
h = 0.001
x2[1] (analytic) = 1.0007301718756314954611192435145
x2[1] (numeric) = 2.5149304896737313981009535349343e+90
absolute error = 2.5149304896737313981009535349343e+90
relative error = 2.5130954980203008478424612904585e+92 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=30.5MB, alloc=4.5MB, time=2.14
NO POLE
NO POLE
t[1] = 0.506
x1[1] (analytic) = 2.0010852242687069157665292585244
x1[1] (numeric) = 2.2509804486431167009636841117929e+112
absolute error = 2.2509804486431167009636841117929e+112
relative error = 1.1248798508647894077048530292438e+114 %
h = 0.001
x2[1] (analytic) = 1.0007310902538334751972044172794
x2[1] (numeric) = -2.0108943506383731928550811996649e+110
absolute error = 2.0108943506383731928550811996649e+110
relative error = 2.0094252794007966626036006573325e+112 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=34.3MB, alloc=4.5MB, time=2.42
memory used=38.1MB, alloc=4.6MB, time=2.70
NO POLE
NO POLE
t[1] = 0.507
x1[1] (analytic) = 2.0010841395868695177014052941589
x1[1] (numeric) = -1.7998445230035391048001499051798e+132
absolute error = 1.7998445230035391048001499051798e+132
relative error = 8.9943470511695874933135664193653e+133 %
h = 0.001
x2[1] (analytic) = 1.00073201101378508461244661319
x2[1] (numeric) = 1.6078758860464266792449459806155e+130
absolute error = 1.6078758860464266792449459806155e+130
relative error = 1.6066997641232425681341666070787e+132 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=41.9MB, alloc=4.6MB, time=2.98
NO POLE
NO POLE
t[1] = 0.508
x1[1] (analytic) = 2.0010830559891717968507676151575
x1[1] (numeric) = 1.4391241420770938812045804695536e+152
absolute error = 1.4391241420770938812045804695536e+152
relative error = 7.1917261893245535952494047029285e+153 %
h = 0.001
x2[1] (analytic) = 1.0007329341597117058856380383748
x2[1] (numeric) = -1.2856293838156491600254680143083e+150
absolute error = 1.2856293838156491600254680143083e+150
relative error = 1.2846877922481458786436446756240e+152 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=45.7MB, alloc=4.6MB, time=3.26
NO POLE
NO POLE
t[1] = 0.509
x1[1] (analytic) = 2.0010819734745301554265955597291
x1[1] (numeric) = -1.1506984463596687306167336733694e+172
absolute error = 1.1506984463596687306167336733694e+172
relative error = 5.7503813517528289429839714728591e+173 %
h = 0.001
x2[1] (analytic) = 1.0007338596958477230287351624915
x2[1] (numeric) = 1.0279667273289032091604669618846e+170
absolute error = 1.0279667273289032091604669618846e+170
relative error = 1.0272128971846044569466393065738e+172 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=49.5MB, alloc=4.6MB, time=3.53
memory used=53.4MB, alloc=4.6MB, time=3.81
NO POLE
NO POLE
t[1] = 0.51
x1[1] (analytic) = 2.0010808920418620786970381472244
x1[1] (numeric) = 9.2007831412199532587124504940965e+191
absolute error = 9.2007831412199532587124504940965e+191
relative error = 4.5979066502562332840854436601989e+193 %
h = 0.001
x2[1] (analytic) = 1.0007347876264365393661995311595
x2[1] (numeric) = -8.2194418220206278386545545846207e+189
absolute error = 8.2194418220206278386545545846207e+189
relative error = 8.2134067123974673634815605243606e+191 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=57.2MB, alloc=4.6MB, time=4.09
NO POLE
NO POLE
t[1] = 0.511
x1[1] (analytic) = 2.0010798116900861339038992560756
x1[1] (numeric) = -7.3567849752095046468541785759582e+211
absolute error = 7.3567849752095046468541785759582e+211
relative error = 3.6764075736669689271515644151990e+213 %
h = 0.001
x2[1] (analytic) = 1.0007357179557305950498743131264
x2[1] (numeric) = 6.5721216523349455939161258865592e+209
absolute error = 6.5721216523349455939161258865592e+209
relative error = 6.5672899791767756344130059889596e+211 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=61.0MB, alloc=4.6MB, time=4.37
memory used=64.8MB, alloc=4.6MB, time=4.65
NO POLE
NO POLE
t[1] = 0.512
x1[1] (analytic) = 2.001078732418121969181204775481
x1[1] (numeric) = 5.8823563538844707624044323873974e+231
absolute error = 5.8823563538844707624044323873974e+231
relative error = 2.9395926599930314440109347610562e+233 %
h = 0.001
x2[1] (analytic) = 1.0007366506879913846094671819592
x2[1] (numeric) = -5.2549533105000444585082820208425e+229
absolute error = 5.2549533105000444585082820208425e+229
relative error = 5.2510850950520730436536632293429e+231 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=68.6MB, alloc=4.6MB, time=4.93
NO POLE
NO POLE
t[1] = 0.513
x1[1] (analytic) = 2.0010776542248903124748506494008
x1[1] (numeric) = -4.7034290645554194386595971851036e+251
absolute error = 4.7034290645554194386595971851036e+251
relative error = 2.3504480471435150226716736907349e+253 %
h = 0.001
x2[1] (analytic) = 1.000737585827489474538710274928
x2[1] (numeric) = 4.2017685849933218477225237063817e+249
absolute error = 4.2017685849933218477225237063817e+249
relative error = 4.1986717042499859795034595963197e+251 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=72.4MB, alloc=4.6MB, time=5.21
NO POLE
NO POLE
t[1] = 0.514
x1[1] (analytic) = 2.0010765771093129704633307325147
x1[1] (numeric) = 3.7607794622466267437817898473624e+271
absolute error = 3.7607794622466267437817898473624e+271
relative error = 1.8793780834111409135045993189694e+273 %
h = 0.001
x2[1] (analytic) = 1.0007385233785045209172681139251
x2[1] (numeric) = -3.3596605333410283890692060012416e+269
absolute error = 3.3596605333410283890692060012416e+269
relative error = 3.3571811765562662727677426851198e+271 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=76.2MB, alloc=4.6MB, time=5.49
memory used=80.1MB, alloc=4.6MB, time=5.78
NO POLE
NO POLE
t[1] = 0.515
x1[1] (analytic) = 2.0010755010703128274795433788656
x1[1] (numeric) = -3.0070533582062015215321768947883e+291
absolute error = 3.0070533582062015215321768947883e+291
relative error = 1.5027185913763986101923826094726e+293 %
h = 0.001
x2[1] (analytic) = 1.0007394633453252870684645157082
x2[1] (numeric) = 2.6863256914248320079548817415938e+289
absolute error = 2.6863256914248320079548817415938e+289
relative error = 2.6843407198561343016418984546311e+291 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=83.9MB, alloc=4.6MB, time=6.06
NO POLE
NO POLE
t[1] = 0.516
x1[1] (analytic) = 2.0010744261068138444336756849985
x1[1] (numeric) = 2.4043871728913967197945983129573e+311
absolute error = 2.4043871728913967197945983129573e+311
relative error = 1.2015480991225534497212864570143e+313 %
h = 0.001
x2[1] (analytic) = 1.0007404057322496612528996614975
x2[1] (numeric) = -2.1479389506155780399167135778783e+309
absolute error = 2.1479389506155780399167135778783e+309
relative error = 2.1463497809343614340197366384066e+311 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=87.7MB, alloc=4.6MB, time=6.33
NO POLE
NO POLE
memory used=91.5MB, alloc=4.6MB, time=6.61
t[1] = 0.517
x1[1] (analytic) = 2.0010733522177410577371643104778
x1[1] (numeric) = -1.9225058515799903639482748309379e+331
absolute error = 1.9225058515799903639482748309379e+331
relative error = 9.6073732102290191482254998416219e+332 %
h = 0.001
x2[1] (analytic) = 1.0007413505435846743980286389765
x2[1] (numeric) = 1.7174543467677840181420751553793e+329
absolute error = 1.7174543467677840181420751553793e+329
relative error = 1.7161820542689614603858847486619e+331 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=95.3MB, alloc=4.6MB, time=6.90
NO POLE
NO POLE
t[1] = 0.518
x1[1] (analytic) = 2.0010722794020205782277317997435
x1[1] (numeric) = 1.5372019910232024500690258400424e+351
absolute error = 1.5372019910232024500690258400424e+351
relative error = 7.6818913881639685054764313547406e+352 %
h = 0.001
x2[1] (analytic) = 1.000742297783646517863772913053
x2[1] (numeric) = -1.3732464008747620067652409015036e+349
absolute error = 1.3732464008747620067652409015036e+349
relative error = 1.3722277992207423108349318345621e+351 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=99.1MB, alloc=4.6MB, time=7.17
NO POLE
NO POLE
t[1] = 0.519
x1[1] (analytic) = 2.0010712076585795900954973303432
x1[1] (numeric) = -1.2291197757674965639423145182858e+371
absolute error = 1.2291197757674965639423145182858e+371
relative error = 6.1423090345978708958445422469430e+372 %
h = 0.001
x2[1] (analytic) = 1.0007432474567605612442363253337
x2[1] (numeric) = 1.0980237588641220629356591613589e+369
absolute error = 1.0980237588641220629356591613589e+369
relative error = 1.0972082616141406763437009598495e+371 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=102.9MB, alloc=4.6MB, time=7.46
memory used=106.8MB, alloc=4.6MB, time=7.74
NO POLE
NO POLE
t[1] = 0.52
x1[1] (analytic) = 2.0010701369863463498101608136496
x1[1] (numeric) = 9.8278263494646883302475591857381e+390
absolute error = 9.8278263494646883302475591857381e+390
relative error = 4.9112853007069513334733809268942e+392 %
h = 0.001
x2[1] (analytic) = 1.000744199567261370205597366143
x2[1] (numeric) = -8.7796055701445067386498689396484e+388
absolute error = 8.7796055701445067386498689396484e+388
relative error = 8.7730766502978042814347646522785e+390 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=110.6MB, alloc=4.6MB, time=8.01
NO POLE
NO POLE
t[1] = 0.521
x1[1] (analytic) = 2.0010690673842501850492592752488
x1[1] (numeric) = -7.8581577368992644849039621092139e+410
absolute error = 7.8581577368992644849039621092139e+410
relative error = 3.9269797654567021415770690760770e+412 %
h = 0.001
x2[1] (analytic) = 1.0007451541194927243602496070893
x2[1] (numeric) = 7.0200187696349388302112509848710e+408
absolute error = 7.0200187696349388302112509848710e+408
relative error = 7.0147916687256047036483045790629e+410 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=114.4MB, alloc=4.6MB, time=8.29
NO POLE
NO POLE
t[1] = 0.522
x1[1] (analytic) = 2.0010679988512214936274944432543
x1[1] (numeric) = 6.2832452286210027031177746060234e+430
absolute error = 6.2832452286210027031177746060234e+430
relative error = 3.1399458850114564057751813425538e+432 %
h = 0.001
x2[1] (analytic) = 1.0007461111178076351772623266334
x2[1] (numeric) = -5.6130839970315103699725915390467e+428
absolute error = 5.6130839970315103699725915390467e+428
relative error = 5.6088991350282041984644061570591e+430 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=118.2MB, alloc=4.6MB, time=8.57
memory used=122.0MB, alloc=4.6MB, time=8.86
NO POLE
NO POLE
t[1] = 0.523
x1[1] (analytic) = 2.0010669313861917424271304738756
x1[1] (numeric) = -5.0239727840544223237568688878810e+450
absolute error = 5.0239727840544223237568688878810e+450
relative error = 2.5106470479596522629686090052135e+452 %
h = 0.001
x2[1] (analytic) = 1.0007470705665683639292335058661
x2[1] (numeric) = 4.4881236064515075890308602512370e+448
absolute error = 4.4881236064515075890308602512370e+448
relative error = 4.4847731644226317791469511206096e+450 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=125.8MB, alloc=4.6MB, time=9.13
NO POLE
NO POLE
t[1] = 0.524
x1[1] (analytic) = 2.0010658649880934663294607446376
x1[1] (numeric) = 4.0170806034987570422074483092387e+470
absolute error = 4.0170806034987570422074483092387e+470
relative error = 2.0074704555127969547262374607065e+472 %
h = 0.001
x2[1] (analytic) = 1.0007480324701464396756075167266
x2[1] (numeric) = -3.5886249907252560347331498372768e+468
absolute error = 3.5886249907252560347331498372768e+468
relative error = 3.5859425892324291810592276504688e+470 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=129.7MB, alloc=4.6MB, time=9.41
memory used=133.5MB, alloc=4.6MB, time=9.69
NO POLE
NO POLE
t[1] = 0.525
x1[1] (analytic) = 2.0010647996558602671473426467186
x1[1] (numeric) = -3.2119872596091544190231737761841e+490
absolute error = 3.2119872596091544190231737761841e+490
relative error = 1.6051390540483979050927069247061e+492 %
h = 0.001
x2[1] (analytic) = 1.0007489968329226772825299702296
x2[1] (numeric) = 2.8694016594253057958451213585527e+488
absolute error = 2.8694016594253057958451213585527e+488
relative error = 2.8672540951888247894191715784757e+490 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=137.3MB, alloc=4.6MB, time=9.97
NO POLE
NO POLE
t[1] = 0.526
x1[1] (analytic) = 2.0010637353884268125587993089415
x1[1] (numeric) = 2.5682487294145522543220904759057e+510
absolute error = 2.5682487294145522543220904759057e+510
relative error = 1.2834417435065000909563495662269e+512 %
h = 0.001
x2[1] (analytic) = 1.0007499636592871954793123378719
x2[1] (numeric) = -2.2943232866047468460343668618313e+508
absolute error = 2.2943232866047468460343668618313e+508
relative error = 2.2926039169818709643684522870355e+510 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=141.1MB, alloc=4.6MB, time=10.25
NO POLE
NO POLE
t[1] = 0.527
x1[1] (analytic) = 2.0010626721847288350416871870186
x1[1] (numeric) = -2.0535266808443299586223939629965e+530
absolute error = 2.0535266808443299586223939629965e+530
relative error = 1.0262180737209603444969946941848e+532 %
h = 0.001
x2[1] (analytic) = 1.000750932953639434951579105303
x2[1] (numeric) = 1.8345006967449388930396489233001e+528
absolute error = 1.8345006967449388930396489233001e+528
relative error = 1.8331241434175346046191379065067e+530 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=144.9MB, alloc=4.6MB, time=10.53
memory used=148.7MB, alloc=4.6MB, time=10.82
NO POLE
NO POLE
t[1] = 0.528
x1[1] (analytic) = 2.0010616100437031308094284527197
x1[1] (numeric) = 1.6419639502365546530892447143550e+550
absolute error = 1.6419639502365546530892447143550e+550
relative error = 8.2054642495524873186898858736668e+551 %
h = 0.001
x2[1] (analytic) = 1.0007519047203881764711703635398
x2[1] (numeric) = -1.4668346113236470229593978153837e+548
absolute error = 1.4668346113236470229593978153837e+548
relative error = 1.4657325201229401264207237097556e+550 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=152.5MB, alloc=4.6MB, time=11.10
NO POLE
NO POLE
t[1] = 0.529
x1[1] (analytic) = 2.0010605489642875587478071186937
x1[1] (numeric) = -1.3128856026199388257641338749975e+570
absolute error = 1.3128856026199388257641338749975e+570
relative error = 6.5609489093144356223695005703351e+571 %
h = 0.001
x2[1] (analytic) = 1.0007528789639515590628728894916
x2[1] (numeric) = 1.1728552520011086101169927227945e+568
absolute error = 1.1728552520011086101169927227945e+568
relative error = 1.1719728982596875506164002248370e+570 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=156.4MB, alloc=4.6MB, time=11.38
NO POLE
NO POLE
t[1] = 0.53
x1[1] (analytic) = 2.0010594889454210393528278357407
x1[1] (numeric) = 1.0497603222764995738514168266668e+590
absolute error = 1.0497603222764995738514168266668e+590
relative error = 5.2460225599276614996060406879838e+591 %
h = 0.001
x2[1] (analytic) = 1.0007538556887570982080529143471
x2[1] (numeric) = -9.3779450766114325198730160534606e+587
absolute error = 9.3779450766114325198730160534606e+587
relative error = 9.3708807848231290229350515038112e+589 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=160.2MB, alloc=4.6MB, time=11.66
memory used=164.0MB, alloc=4.6MB, time=11.94
NO POLE
NO POLE
t[1] = 0.531
x1[1] (analytic) = 2.0010584299860435536696363003938
x1[1] (numeric) = -8.3936995883492232918317364078611e+609
absolute error = 8.3936995883492232918317364078611e+609
relative error = 4.1946299331238245848568830347342e+611 %
h = 0.001
x2[1] (analytic) = 1.0007548348992417040852639254503
x2[1] (numeric) = 7.4984405543555922520497375503097e+607
absolute error = 7.4984405543555922520497375503097e+607
relative error = 7.4927847389421330889712738520652e+609 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=167.8MB, alloc=4.6MB, time=12.22
NO POLE
NO POLE
t[1] = 0.532
x1[1] (analytic) = 2.0010573720850961422325002117293
x1[1] (numeric) = 6.7114551087878491725495517121599e+629
absolute error = 6.7114551087878491725495517121599e+629
relative error = 3.3539543655335238408240880569434e+631 %
h = 0.001
x2[1] (analytic) = 1.0007558165998516998479029946599
x2[1] (numeric) = -5.9956216727514862207395828794427e+627
absolute error = 5.9956216727514862207395828794427e+627
relative error = 5.9910935048292725564534844606767e+629 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=171.6MB, alloc=4.6MB, time=12.50
memory used=175.4MB, alloc=4.6MB, time=12.78
NO POLE
NO POLE
t[1] = 0.533
x1[1] (analytic) = 2.0010563152415209040058497173883
x1[1] (numeric) = -5.3663619007519407309245988319476e+649
absolute error = 5.3663619007519407309245988319476e+649
relative error = 2.6817645559886396955456880253741e+651 %
h = 0.001
x2[1] (analytic) = 1.000756800795042839938989273852
x2[1] (numeric) = 4.7939940287833110151116252481218e+647
absolute error = 4.7939940287833110151116252481218e+647
relative error = 4.7903686739623080254961661953150e+649 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=179.2MB, alloc=4.6MB, time=13.06
NO POLE
NO POLE
t[1] = 0.534
x1[1] (analytic) = 2.0010552594542609953263762898481
x1[1] (numeric) = 4.2908489415558555787645077935288e+669
absolute error = 4.2908489415558555787645077935288e+669
relative error = 2.1442930780062915148501207754934e+671 %
h = 0.001
x2[1] (analytic) = 1.0007577874892803284431384461841
x2[1] (numeric) = -3.8331936206813833223245016616899e+667
absolute error = 3.8331936206813833223245016616899e+667
relative error = 3.8302910740251849247840403428753e+669 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=183.1MB, alloc=4.6MB, time=13.33
NO POLE
NO POLE
t[1] = 0.535
x1[1] (analytic) = 2.0010542047222606288461889750434
x1[1] (numeric) = -3.4308876255012137693230663672286e+689
absolute error = 3.4308876255012137693230663672286e+689
relative error = 1.7145400746290173840985671250440e+691 %
h = 0.001
x2[1] (analytic) = 1.0007587766870388374758070699952
x2[1] (numeric) = 3.0649544503837333996947303374206e+687
absolute error = 3.0649544503837333996947303374206e+687
relative error = 3.0626305976851980504073597907592e+689 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=186.9MB, alloc=4.6MB, time=13.61
memory used=190.7MB, alloc=4.6MB, time=13.89
NO POLE
NO POLE
t[1] = 0.536
x1[1] (analytic) = 2.0010531510444650724770269564933
x1[1] (numeric) = 2.7432776262100741919179847051372e+709
absolute error = 2.7432776262100741919179847051372e+709
relative error = 1.3709169218109970491381895453405e+711 %
h = 0.001
x2[1] (analytic) = 1.0007597683928025256098809007619
x2[1] (numeric) = -2.4506838716008293272085719914552e+707
absolute error = 2.4506838716008293272085719914552e+707
relative error = 2.4488233330328336472663521848804e+709 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=194.5MB, alloc=4.6MB, time=14.17
NO POLE
NO POLE
t[1] = 0.537
x1[1] (analytic) = 2.0010520984198206483355273791457
x1[1] (numeric) = -2.1934767197061369220494647034002e+729
absolute error = 2.1934767197061369220494647034002e+729
relative error = 1.0961617248437804521594014113211e+731 %
h = 0.001
x2[1] (analytic) = 1.0007607626110650563396814253878
x2[1] (numeric) = 1.9595238806150921308788825048906e+727
absolute error = 1.9595238806150921308788825048906e+727
relative error = 1.9580342813426629954494563913993e+729 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=198.3MB, alloc=4.6MB, time=14.45
NO POLE
NO POLE
memory used=202.1MB, alloc=4.6MB, time=14.74
t[1] = 0.538
x1[1] (analytic) = 2.0010510468472747316895473782086
x1[1] (numeric) = 1.7538655489782910041668015380184e+749
absolute error = 1.7538655489782910041668015380184e+749
relative error = 8.7647216783478210347025329880253e+750 %
h = 0.001
x2[1] (analytic) = 1.0007617593463296165824649922391
x2[1] (numeric) = -1.5668009583760180843015149084196e+747
absolute error = 1.5668009583760180843015149084196e+747
relative error = 1.5656083415891209604469366678481e+749 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=205.9MB, alloc=4.6MB, time=15.02
NO POLE
NO POLE
t[1] = 0.539
x1[1] (analytic) = 2.0010499963257757499055392592878
x1[1] (numeric) = -1.4023601601320044802032843129897e+769
absolute error = 1.4023601601320044802032843129897e+769
relative error = 7.0081215497211238837749029726917e+770 %
h = 0.001
x2[1] (analytic) = 1.0007627586031089352174890697879
x2[1] (numeric) = 1.2527865914027184907370846721431e+767
absolute error = 1.2527865914027184907370846721431e+767
relative error = 1.2518317459688358820346608043718e+769 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=209.8MB, alloc=4.6MB, time=15.29
NO POLE
NO POLE
t[1] = 0.54
x1[1] (analytic) = 2.0010489468542731813969777772086
x1[1] (numeric) = 1.1213026106083822743906730073417e+789
absolute error = 1.1213026106083822743906730073417e+789
relative error = 5.6035741273151444677212949182988e+790 %
h = 0.001
x2[1] (analytic) = 1.0007637603859253016627203164664
x2[1] (numeric) = -1.0017062060168731929184419515297e+787
absolute error = 1.0017062060168731929184419515297e+787
relative error = 1.0009417263776462641086691225836e+789 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=213.6MB, alloc=4.6MB, time=15.57
memory used=217.4MB, alloc=4.6MB, time=15.85
NO POLE
NO POLE
t[1] = 0.541
x1[1] (analytic) = 2.0010478984317175545738384619469
x1[1] (numeric) = -8.9657391895589902563869868522159e+808
absolute error = 8.9657391895589902563869868522159e+808
relative error = 4.4805220287758800278900922353962e+810 %
h = 0.001
x2[1] (analytic) = 1.0007647646993105844892592943753
x2[1] (numeric) = 8.0094672952175806138505790239167e+806
absolute error = 8.0094672952175806138505790239167e+806
relative error = 8.0033466182475981062555819726573e+808 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=221.2MB, alloc=4.6MB, time=16.13
NO POLE
NO POLE
t[1] = 0.542
x1[1] (analytic) = 2.001046851057060446793125941149
x1[1] (numeric) = 7.1688479501157942734749179380950e+828
absolute error = 7.1688479501157942734749179380950e+828
relative error = 3.5825487775705119857628847475777e+830 %
h = 0.001
x2[1] (analytic) = 1.0007657715478062500735568098295
x2[1] (numeric) = -6.4042297000683081137004688522782e+826
absolute error = 6.4042297000683081137004688522782e+826
relative error = 6.3993292757838692508073174106671e+828 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=225.0MB, alloc=4.6MB, time=16.41
NO POLE
NO POLE
t[1] = 0.543
x1[1] (analytic) = 2.0010458047292544833104512097672
x1[1] (numeric) = -5.7320852018234238871811653580384e+848
absolute error = 5.7320852018234238871811653580384e+848
relative error = 2.8645447237021076229088185542494e+850 %
h = 0.001
x2[1] (analytic) = 1.0007667809359633812874970143707
x2[1] (numeric) = 5.1207098474234851731265603844898e+846
absolute error = 5.1207098474234851731265603844898e+846
relative error = 5.1167863931638103327681444096118e+848 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=228.8MB, alloc=4.6MB, time=16.69
memory used=232.7MB, alloc=4.6MB, time=16.98
NO POLE
NO POLE
t[1] = 0.544
x1[1] (analytic) = 2.00104475944725333623265679839
x1[1] (numeric) = 4.5832748845555254344608026668733e+868
absolute error = 4.5832748845555254344608026668733e+868
relative error = 2.2904409623608614506763115767069e+870 %
h = 0.001
x2[1] (analytic) = 1.0007677928683426962264225508125
x2[1] (numeric) = -4.0944298642536463082591590129303e+866
absolute error = 4.0944298642536463082591590129303e+866
relative error = 4.0912886020426661897618295306808e+868 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=236.5MB, alloc=4.6MB, time=17.25
NO POLE
NO POLE
t[1] = 0.545
x1[1] (analytic) = 2.0010437152100117234714887928907
x1[1] (numeric) = -3.6647062853697903894445159588451e+888
absolute error = 3.6647062853697903894445159588451e+888
relative error = 1.8313974140166025619113781070865e+890 %
h = 0.001
x2[1] (analytic) = 1.0007688073495145669751771801329
x2[1] (numeric) = 3.2738343731245025214632754098249e+886
absolute error = 3.2738343731245025214632754098249e+886
relative error = 3.2713193587588794145430947519689e+888 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=240.3MB, alloc=4.6MB, time=17.54
memory used=244.1MB, alloc=4.6MB, time=17.82
NO POLE
NO POLE
t[1] = 0.546
x1[1] (analytic) = 2.0010426720164854076983146590661
x1[1] (numeric) = 2.9302349294572722209732522151240e+908
absolute error = 2.9302349294572722209732522151240e+908
relative error = 1.4643540442365597626492478057478e+910 %
h = 0.001
x2[1] (analytic) = 1.000769824384059038412241476574
x2[1] (numeric) = -2.6177005976399194964643858090086e+906
absolute error = 2.6177005976399194964643858090086e+906
relative error = 2.6156869780231715608737066951719e+908 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=247.9MB, alloc=4.6MB, time=18.10
NO POLE
NO POLE
t[1] = 0.547
x1[1] (analytic) = 2.0010416298656311952998858269846
x1[1] (numeric) = -2.3429645033462918715125503514730e+928
absolute error = 2.3429645033462918715125503514730e+928
relative error = 1.1708724438199821970944917039579e+930 %
h = 0.001
x2[1] (analytic) = 1.0007708439765658470520373301571
x2[1] (numeric) = 2.0930675281366164336552120713000e+926
absolute error = 2.0930675281366164336552120713000e+926
relative error = 2.0914553423836835099009588484915e+928 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=251.7MB, alloc=4.6MB, time=18.38
NO POLE
NO POLE
t[1] = 0.548
x1[1] (analytic) = 2.0010405887564069353351439908049
x1[1] (numeric) = 1.8733933613157354426230068803465e+948
absolute error = 1.8733933613157354426230068803465e+948
relative error = 9.3620957607861376690374673615430e+949 %
h = 0.001
x2[1] (analytic) = 1.0007718661316344399254771479759
x2[1] (numeric) = -1.6735801188606937843832807899149e+946
absolute error = 1.6735801188606937843832807899149e+946
relative error = 1.6722893353604355963477508696414e+948 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=255.5MB, alloc=4.6MB, time=18.66
memory used=259.4MB, alloc=4.6MB, time=18.95
NO POLE
NO POLE
t[1] = 0.549
x1[1] (analytic) = 2.0010395486877715184930700808716
x1[1] (numeric) = -1.4979325044017313628227882630618e+968
absolute error = 1.4979325044017313628227882630618e+968
relative error = 7.4857716099815999843190123917602e+969 %
h = 0.001
x2[1] (analytic) = 1.0007728908538739934988337980875
x2[1] (numeric) = 1.3381653370444713904198644219487e+966
absolute error = 1.3381653370444713904198644219487e+966
relative error = 1.3371318800439620743244982742673e+968 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=263.2MB, alloc=4.6MB, time=19.23
NO POLE
NO POLE
t[1] = 0.55
x1[1] (analytic) = 2.0010385096586848760515748659368
x1[1] (numeric) = 1.1977205823807123604094333914057e+988
absolute error = 1.1977205823807123604094333914057e+988
relative error = 5.9854949147630664753270332018294e+989 %
h = 0.001
x2[1] (analytic) = 1.0007739181479034326310074925802
x2[1] (numeric) = -1.0699735549478032978759571662672e+986
absolute error = 1.0699735549478032978759571662672e+986
relative error = 1.0691461233601742569062963999521e+988 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=267.0MB, alloc=4.6MB, time=19.51
NO POLE
NO POLE
memory used=270.8MB, alloc=4.6MB, time=19.78
t[1] = 0.551
x1[1] (analytic) = 2.001037471668107978837430144399
x1[1] (numeric) = -9.5767639011968735713295684146590e+1007
absolute error = 9.5767639011968735713295684146590e+1007
relative error = 4.7858993331161743352290859579026e+1009 %
h = 0.001
x2[1] (analytic) = 1.0007749480183514495692659594676
x2[1] (numeric) = 8.5553210548420680012064262562274e+1005
absolute error = 8.5553210548420680012064262562274e+1005
relative error = 8.5486962596161899857180549724379e+1007 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=274.6MB, alloc=4.6MB, time=20.07
NO POLE
NO POLE
t[1] = 0.552
x1[1] (analytic) = 2.0010364347150028361872394844887
x1[1] (numeric) = 7.6574126026094160380133589826370e+1027
absolute error = 7.6574126026094160380133589826370e+1027
relative error = 3.8267232269061714033098216137136e+1029 %
h = 0.001
x2[1] (analytic) = 1.0007759804698565229835344064281
x2[1] (numeric) = -6.8406848013168518903197732723335e+1025
absolute error = 6.8406848013168518903197732723335e+1025
relative error = 6.8353806794055985346744929252536e+1027 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=278.4MB, alloc=4.6MB, time=20.35
NO POLE
NO POLE
t[1] = 0.553
x1[1] (analytic) = 2.0010353987983324949094474743729
x1[1] (numeric) = -6.1227329368820894985828100755296e+1047
absolute error = 6.1227329368820894985828100755296e+1047
relative error = 3.0597824209201549390130047131553e+1049 %
h = 0.001
x2[1] (analytic) = 1.0007770155070669370393119330918
x2[1] (numeric) = 5.4696916984176483093273342484040e+1045
absolute error = 5.4696916984176483093273342484040e+1045
relative error = 5.4654449629284320367992049243777e+1047 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=282.2MB, alloc=4.6MB, time=20.64
memory used=286.1MB, alloc=4.6MB, time=20.92
NO POLE
NO POLE
t[1] = 0.554
x1[1] (analytic) = 2.001034363917061038247386444187
x1[1] (numeric) = 4.8956299682226920347043009596523e+1067
absolute error = 4.8956299682226920347043009596523e+1067
relative error = 2.4465496727599458279164301836672e+1069 %
h = 0.001
x2[1] (analytic) = 1.0007780531346408005092912025585
x2[1] (numeric) = -4.3734696371304414472782005132757e+1065
absolute error = 4.3734696371304414472782005132757e+1065
relative error = 4.3700694908644762144349070751621e+1067 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=289.9MB, alloc=4.6MB, time=21.20
NO POLE
NO POLE
t[1] = 0.555
x1[1] (analytic) = 2.0010333300701535848433596230406
x1[1] (numeric) = -3.9144599368995264990525684489808e+1087
absolute error = 3.9144599368995264990525684489808e+1087
relative error = 1.9562192583580258032679219028318e+1089 %
h = 0.001
x2[1] (analytic) = 1.000779093357246065923758337132
x2[1] (numeric) = 3.4969496859275047321034094232191e+1085
absolute error = 3.4969496859275047321034094232191e+1085
relative error = 3.4942273566052660889399741908563e+1087 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=293.7MB, alloc=4.6MB, time=21.47
NO POLE
NO POLE
t[1] = 0.556
x1[1] (analytic) = 2.0010322972565762877037596950806
x1[1] (numeric) = 3.1299335728092825713363205673748e+1107
absolute error = 3.1299335728092825713363205673748e+1107
relative error = 1.5641594476513121201667359479745e+1109 %
h = 0.001
x2[1] (analytic) = 1.0007801361795605487598501578497
x2[1] (numeric) = -2.7960996921272890722975206752717e+1105
absolute error = 2.7960996921272890722975206752717e+1105
relative error = 2.7939200540103558312515017688940e+1107 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=297.5MB, alloc=4.6MB, time=21.75
memory used=301.3MB, alloc=4.6MB, time=22.03
NO POLE
NO POLE
t[1] = 0.557
x1[1] (analytic) = 2.0010312654752963331652217197299
x1[1] (numeric) = -2.5026400392688779661743589632288e+1127
absolute error = 2.5026400392688779661743589632288e+1127
relative error = 1.2506751305929428656991016117799e+1129 %
h = 0.001
x2[1] (analytic) = 1.0007811816062719466697460423075
x2[1] (numeric) = 2.2357123180171484169139657946747e+1125
absolute error = 2.2357123180171484169139657946747e+1125
relative error = 2.2339671839440361973671888361689e+1127 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=305.1MB, alloc=4.6MB, time=22.31
NO POLE
NO POLE
t[1] = 0.558
x1[1] (analytic) = 2.0010302347252819398618093822552
x1[1] (numeric) = 2.0010671218591288054286048165708e+1147
absolute error = 2.0010671218591288054286048165708e+1147
relative error = 1.0000184340712132866593490516092e+1149 %
h = 0.001
x2[1] (analytic) = 1.0007822296420778587478718304928
x2[1] (numeric) = -1.7876363932971186778950239844711e+1145
absolute error = 1.7876363932971186778950239844711e+1145
relative error = 1.7862391440907710932640775188572e+1147 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=308.9MB, alloc=4.6MB, time=22.59
memory used=312.8MB, alloc=4.6MB, time=22.87
NO POLE
NO POLE
t[1] = 0.559
x1[1] (analytic) = 2.001029205005502357693233541848
x1[1] (numeric) = -1.6000182061162043971957749907469e+1167
absolute error = 1.6000182061162043971957749907469e+1167
relative error = 7.9959762811747903751120488386343e+1168 %
h = 0.001
x2[1] (analytic) = 1.0007832802916858048371933638772
x2[1] (numeric) = 1.4293627354858182000987038906852e+1165
absolute error = 1.4293627354858182000987038906852e+1165
relative error = 1.4282440200931611223500073044703e+1167 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=316.6MB, alloc=4.6MB, time=23.15
NO POLE
NO POLE
t[1] = 0.56
x1[1] (analytic) = 2.0010281763149278667941020454403
x1[1] (numeric) = 1.2793465206328745082978806906505e+1187
absolute error = 1.2793465206328745082978806906505e+1187
relative error = 6.3934458083888923876298280244265e+1188 %
h = 0.001
x2[1] (analytic) = 1.0007843335598132448746773988584
x2[1] (numeric) = -1.1428933966975498426463347738025e+1185
absolute error = 1.1428933966975498426463347738025e+1185
relative error = 1.1419976895843796251761653381890e+1187 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=320.4MB, alloc=4.6MB, time=23.44
NO POLE
NO POLE
t[1] = 0.561
x1[1] (analytic) = 2.0010271486525297765041997765023
x1[1] (numeric) = -1.0229430600220129734700532656012e+1207
absolute error = 1.0229430600220129734700532656012e+1207
relative error = 5.1120898620033809154387749616560e+1208 %
h = 0.001
x2[1] (analytic) = 1.000785389451187598275997791795
x2[1] (numeric) = 9.1383753317936061066920816788904e+1204
absolute error = 9.1383753317936061066920816788904e+1204
relative error = 9.1312037806676254378489381016825e+1206 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=324.2MB, alloc=4.6MB, time=23.72
memory used=328.0MB, alloc=4.6MB, time=24.00
NO POLE
NO POLE
t[1] = 0.562
x1[1] (analytic) = 2.0010261220172804243397979091028
x1[1] (numeric) = 8.1792734585275166110026544810186e+1226
absolute error = 8.1792734585275166110026544810186e+1226
relative error = 4.0875395720880460313607325713336e+1228 %
h = 0.001
x2[1] (analytic) = 1.0007864479705462633595650093473
x2[1] (numeric) = -7.3068847843587274680374717729034e+1224
absolute error = 7.3068847843587274680374717729034e+1224
relative error = 7.3011428154088807222704608490992e+1226 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=331.8MB, alloc=4.6MB, time=24.28
NO POLE
NO POLE
t[1] = 0.563
x1[1] (analytic) = 2.0010250964081531749659913385423
x1[1] (numeric) = -6.5400037327525379279373780057776e+1246
absolute error = 6.5400037327525379279373780057776e+1246
relative error = 3.2683266914002561874997442126119e+1248 %
h = 0.001
x2[1] (analytic) = 1.0007875091226366368099571746115
x2[1] (numeric) = 5.8424570356768242516981750825319e+1244
absolute error = 5.8424570356768242516981750825319e+1244
relative error = 5.8378596679316555856959076426434e+1246 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=335.6MB, alloc=4.6MB, time=24.55
NO POLE
NO POLE
t[1] = 0.564
x1[1] (analytic) = 2.0010240718241224191700632608944
x1[1] (numeric) = 5.2292723848014180787755364953277e+1266
absolute error = 5.2292723848014180787755364953277e+1266
relative error = 2.6132980899297440459876058618562e+1268 %
h = 0.001
x2[1] (analytic) = 1.0007885729122161331808310166308
x2[1] (numeric) = -4.6715262688688125969417874626172e+1264
absolute error = 4.6715262688688125969417874626172e+1264
relative error = 4.6678453324812034099242228116508e+1266 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=339.5MB, alloc=4.6MB, time=24.83
memory used=343.3MB, alloc=4.6MB, time=25.12
NO POLE
NO POLE
t[1] = 0.565
x1[1] (analytic) = 2.001023048264163572835875874822
x1[1] (numeric) = -4.1812345668092919544336989538798e+1286
absolute error = 4.1812345668092919544336989538798e+1286
relative error = 2.0895484289580803348280779489205e+1288 %
h = 0.001
x2[1] (analytic) = 1.0007896393440522044373912482691
x2[1] (numeric) = 3.7352705458454856861156949342845e+1284
absolute error = 3.7352705458454856861156949342845e+1284
relative error = 3.7323233564784852929978313042997e+1286 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=347.1MB, alloc=4.6MB, time=25.40
NO POLE
NO POLE
t[1] = 0.566
x1[1] (analytic) = 2.0010220257272530759192861800574
x1[1] (numeric) = 3.3432418922168642669504482422821e+1306
absolute error = 3.3432418922168642669504482422821e+1306
relative error = 1.6707671625962206531971623981488e+1308 %
h = 0.001
x2[1] (analytic) = 1.0007907084229223595384970551573
x2[1] (numeric) = -2.9866568756423371712801687322113e+1304
absolute error = 2.9866568756423371712801687322113e+1304
relative error = 2.9842971667360956072746506870361e+1306 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=350.9MB, alloc=4.6MB, time=25.67
memory used=354.7MB, alloc=4.6MB, time=25.96
NO POLE
NO POLE
t[1] = 0.567
x1[1] (analytic) = 2.0010210042123683914245858479624
x1[1] (numeric) = -2.6731976336843479856538391096954e+1326
absolute error = 2.6731976336843479856538391096954e+1326
relative error = 1.3359168284875441905710775872355e+1328 %
h = 0.001
x2[1] (analytic) = 1.0007917801536141840584845364564
x2[1] (numeric) = 2.3880785028390924468592896586411e+1324
absolute error = 2.3880785028390924468592896586411e+1324
relative error = 2.3861891656149893089391152378684e+1326 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=358.5MB, alloc=4.6MB, time=26.24
NO POLE
NO POLE
t[1] = 0.568
x1[1] (analytic) = 2.0010199837184880043819641406087
x1[1] (numeric) = 2.1374419856880827607460767439844e+1346
absolute error = 2.1374419856880827607460767439844e+1346
relative error = 1.0681762316616560004294804209139e+1348 %
h = 0.001
x2[1] (analytic) = 1.0007928545409253598487840965324
x2[1] (numeric) = -1.9094657247815521022855867493232e+1344
absolute error = 1.9094657247815521022855867493232e+1344
relative error = 1.9079529955851302886842301266780e+1346 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=362.4MB, alloc=4.6MB, time=26.52
NO POLE
NO POLE
t[1] = 0.569
x1[1] (analytic) = 2.0010189642445914208259928558409
x1[1] (numeric) = -1.7090611575491476686086938592382e+1366
absolute error = 1.7090611575491476686086938592382e+1366
relative error = 8.5409543242102090006571551615507e+1367 %
h = 0.001
x2[1] (analytic) = 1.0007939315896636847394119453095
x2[1] (numeric) = 1.5267753341361608335248280946856e+1364
absolute error = 1.5267753341361608335248280946856e+1364
relative error = 1.5255641405729018765285623566854e+1366 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=366.2MB, alloc=4.6MB, time=26.80
memory used=370.0MB, alloc=4.6MB, time=27.08
NO POLE
NO POLE
t[1] = 0.57
x1[1] (analytic) = 2.0010179457896591667751322768074
x1[1] (numeric) = 1.3665353538486534080693276313407e+1386
absolute error = 1.3665353538486534080693276313407e+1386
relative error = 6.8292008910963529591385745291561e+1387 %
h = 0.001
x2[1] (analytic) = 1.0007950113046470922804150240494
x2[1] (numeric) = -1.2207828036260053828416970706300e+1384
absolute error = 1.2207828036260053828416970706300e+1384
relative error = 1.2198130384708651265906540181298e+1386 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=373.8MB, alloc=4.6MB, time=27.36
NO POLE
NO POLE
t[1] = 0.571
x1[1] (analytic) = 2.001016928352672787212257105464
x1[1] (numeric) = -1.0926577232591296541569702983278e+1406
absolute error = 1.0926577232591296541569702983278e+1406
relative error = 5.4605121414872520783717342776642e+1407 %
h = 0.001
x2[1] (analytic) = 1.0007960936907036715233488326121
x2[1] (numeric) = 9.7611653811015863573191838137004e+1403
absolute error = 9.7611653811015863573191838137004e+1403
relative error = 9.7534007602934123788050219183314e+1405 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=377.6MB, alloc=4.6MB, time=27.64
NO POLE
NO POLE
memory used=381.4MB, alloc=4.6MB, time=27.92
t[1] = 0.572
x1[1] (analytic) = 2.0010159119326148450662013605777
x1[1] (numeric) = 8.7366996897326648827359473624579e+1425
absolute error = 8.7366996897326648827359473624579e+1425
relative error = 4.3661320420458892217198082146640e+1427 %
h = 0.001
x2[1] (analytic) = 1.0007971787526716868428677938712
x2[1] (numeric) = -7.8048567946903863759337692643772e+1423
absolute error = 7.8048567946903863759337692643772e+1423
relative error = 7.7986398846745858218793666479343e+1425 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=385.2MB, alloc=4.6MB, time=28.20
NO POLE
NO POLE
t[1] = 0.573
x1[1] (analytic) = 2.0010148965284689201943212217741
x1[1] (numeric) = -6.9857119794935812241500792923904e+1445
absolute error = 6.9857119794935812241500792923904e+1445
relative error = 3.4910844450048769637900590490824e+1447 %
h = 0.001
x2[1] (analytic) = 1.0007982664953995977985079509009
x2[1] (numeric) = 6.2406267292184842342904290674211e+1443
absolute error = 6.2406267292184842342904290674211e+1443
relative error = 6.2356490195291227832753271274169e+1445 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=389.1MB, alloc=4.6MB, time=28.48
NO POLE
NO POLE
t[1] = 0.574
x1[1] (analytic) = 2.0010138821392196083660748021921
x1[1] (numeric) = 5.5856528887893330063144014445823e+1465
absolute error = 5.5856528887893330063144014445823e+1465
relative error = 2.7914113633324178055465640699304e+1467 %
h = 0.001
x2[1] (analytic) = 1.0007993569237460790367419528101
x2[1] (numeric) = -4.9898957787323676656350169819941e+1463
absolute error = 4.9898957787323676656350169819941e+1463
relative error = 4.9859102568473801210591252762264e+1465 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=392.9MB, alloc=4.6MB, time=28.76
memory used=396.7MB, alloc=4.6MB, time=29.04
NO POLE
NO POLE
t[1] = 0.575
x1[1] (analytic) = 2.001012868763852520247617833325
x1[1] (numeric) = -4.4661901729739483873426136423753e+1485
absolute error = 4.4661901729739483873426136423753e+1485
relative error = 2.2319647428019720728000341574650e+1487 %
h = 0.001
x2[1] (analytic) = 1.0008004500425800402333864456798
x2[1] (numeric) = 3.9898332271715952316722897429353e+1483
absolute error = 3.9898332271715952316722897429353e+1483
relative error = 3.9866421193174362080229283490783e+1485 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=400.5MB, alloc=4.6MB, time=29.33
NO POLE
NO POLE
t[1] = 0.576
x1[1] (analytic) = 2.0010118564013542803874142466435
x1[1] (numeric) = 3.5710874016542164088659404188806e+1505
absolute error = 3.5710874016542164088659404188806e+1505
relative error = 1.7846408007179459633065614691487e+1507 %
h = 0.001
x2[1] (analytic) = 1.0008015458567806460764421459638
x2[1] (numeric) = -3.1902007349513235419939781661772e+1503
absolute error = 3.1902007349513235419939781661772e+1503
relative error = 3.1876456907550141797653903625070e+1505 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=404.3MB, alloc=4.6MB, time=29.61
NO POLE
NO POLE
t[1] = 0.577
x1[1] (analytic) = 2.0010108450507125262028606376118
x1[1] (numeric) = -2.8553789105137261196629348323445e+1525
absolute error = 2.8553789105137261196629348323445e+1525
relative error = 1.4269682333687506604880856161547e+1527 %
h = 0.001
x2[1] (analytic) = 1.0008026443712373362894470349332
x2[1] (numeric) = 2.5508286060614971301337873970479e+1523
absolute error = 2.5508286060614971301337873970479e+1523
relative error = 2.5487828398615759231380724718527e+1525 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=408.1MB, alloc=4.6MB, time=29.89
memory used=411.9MB, alloc=4.6MB, time=30.18
NO POLE
NO POLE
t[1] = 0.578
x1[1] (analytic) = 2.0010098347109159069679235987209
x1[1] (numeric) = 2.2831109422944378150650799354412e+1545
absolute error = 2.2831109422944378150650799354412e+1545
relative error = 1.1409793708606518676399412210473e+1547 %
h = 0.001
x2[1] (analytic) = 1.0008037455908498456954232742926
x2[1] (numeric) = -2.0395978554625092934249837791431e+1543
absolute error = 2.0395978554625092934249837791431e+1543
relative error = 2.0379598542153547077587865528506e+1545 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=415.8MB, alloc=4.6MB, time=30.46
NO POLE
NO POLE
t[1] = 0.579
x1[1] (analytic) = 2.0010088253809540828017889091757
x1[1] (numeric) = -1.8255355027073343791704487151541e+1565
absolute error = 1.8255355027073343791704487151541e+1565
relative error = 9.1230757183681440530789659896672e+1566 %
h = 0.001
x2[1] (analytic) = 1.0008048495205282243214986049643
x2[1] (numeric) = 1.6308267055348272147502758703507e+1563
absolute error = 1.6308267055348272147502758703507e+1563
relative error = 1.6295151910146456193544229794588e+1565 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=419.6MB, alloc=4.6MB, time=30.74
memory used=423.4MB, alloc=4.6MB, time=31.02
NO POLE
NO POLE
t[1] = 0.58
x1[1] (analytic) = 2.0010078170598177236585215698858
x1[1] (numeric) = 1.4596661992674813784783753193014e+1585
absolute error = 1.4596661992674813784783753193014e+1585
relative error = 7.2946551573808590066069371069532e+1586 %
h = 0.001
x2[1] (analytic) = 1.0008059561651928575442831532282
x2[1] (numeric) = -1.3039804569133923482529251536588e+1583
absolute error = 1.3039804569133923482529251536588e+1583
relative error = 1.3029303521632494763029755607814e+1585 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=427.2MB, alloc=4.6MB, time=31.30
NO POLE
NO POLE
t[1] = 0.581
x1[1] (analytic) = 2.0010068097464985083177356734196
x1[1] (numeric) = -1.1671235153324495948325070610148e+1605
absolute error = 1.1671235153324495948325070610148e+1605
relative error = 5.8326813764332413130359411302632e+1606 %
h = 0.001
x2[1] (analytic) = 1.0008070655297744862760827309214
x2[1] (numeric) = 1.0426399238136263361943930562045e+1603
absolute error = 1.0426399238136263361943930562045e+1603
relative error = 1.0417991236519775573914373353515e+1605 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=431.0MB, alloc=4.6MB, time=31.58
NO POLE
NO POLE
t[1] = 0.582
x1[1] (analytic) = 2.0010058034399891233762730995919
x1[1] (numeric) = 9.3321151145759867182924268814370e+1624
absolute error = 9.3321151145759867182924268814370e+1624
relative error = 4.6637121684169369146159348128658e+1626 %
h = 0.001
x2[1] (analytic) = 1.0008081776192142271920298792437
x2[1] (numeric) = -8.3367661299412196978259759411115e+1622
absolute error = 8.3367661299412196978259759411115e+1622
relative error = 8.3300339829089387452273691852153e+1624 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=434.8MB, alloc=4.6MB, time=31.86
memory used=438.6MB, alloc=4.6MB, time=32.14
NO POLE
NO POLE
t[1] = 0.583
x1[1] (analytic) = 2.0010047981392832622408900283627
x1[1] (numeric) = -7.4617957197864248392898220161899e+1644
absolute error = 7.4617957197864248392898220161899e+1644
relative error = 3.7290244015032262584672573911256e+1646 %
h = 0.001
x2[1] (analytic) = 1.0008092924384635929982140688804
x2[1] (numeric) = 6.6659321130847703412326763727346e+1642
absolute error = 6.6659321130847703412326763727346e+1642
relative error = 6.6605417869804962382368274814589e+1644 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=442.5MB, alloc=4.6MB, time=32.42
NO POLE
NO POLE
t[1] = 0.584
x1[1] (analytic) = 2.0010037938433756241219502627347
x1[1] (numeric) = 5.9663211051541780463122968392778e+1664
absolute error = 5.9663211051541780463122968392778e+1664
relative error = 2.9816640645615783972382928191791e+1666 %
h = 0.001
x2[1] (analytic) = 1.0008104099924845127408926326463
x2[1] (numeric) = -5.3299625110831900301478898333485e+1662
absolute error = 5.3299625110831900301478898333485e+1662
relative error = 5.3256465538994691901438458772537e+1664 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=446.3MB, alloc=4.6MB, time=32.70
NO POLE
NO POLE
t[1] = 0.585
x1[1] (analytic) = 2.001002790551261913028124355342
x1[1] (numeric) = -4.7705658083637603050737214807001e+1684
absolute error = 4.7705658083637603050737214807001e+1684
relative error = 2.3840875339556641249254923292920e+1686 %
h = 0.001
x2[1] (analytic) = 1.0008115302862493521568641706782
x2[1] (numeric) = 4.2617446274000113056132051840064e+1682
absolute error = 4.2617446274000113056132051840064e+1682
relative error = 4.2582888969925025419644532134595e+1684 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=450.1MB, alloc=4.6MB, time=32.98
memory used=453.9MB, alloc=4.6MB, time=33.26
NO POLE
NO POLE
t[1] = 0.586
x1[1] (analytic) = 2.001001788261938836762093533429
x1[1] (numeric) = 3.8144608261645467862568505240195e+1704
absolute error = 3.8144608261645467862568505240195e+1704
relative error = 1.9062755708368308467917547011275e+1706 %
h = 0.001
x2[1] (analytic) = 1.0008126533247409340650863323436
x2[1] (numeric) = -3.4076163258945258816191073422561e+1702
absolute error = 3.4076163258945258816191073422561e+1702
relative error = 3.4048493637388414581601428632088e+1704 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=457.7MB, alloc=4.6MB, time=33.54
NO POLE
NO POLE
t[1] = 0.587
x1[1] (analytic) = 2.0010007869744041059172574179246
x1[1] (numeric) = -3.0499760361411739282508867216956e+1724
absolute error = 3.0499760361411739282508867216956e+1724
relative error = 1.5242253056546088393580716905604e+1726 %
h = 0.001
x2[1] (analytic) = 1.0008137791129525587996200435147
x2[1] (numeric) = 2.7246703028254932308692740182654e+1722
absolute error = 2.7246703028254932308692740182654e+1722
relative error = 2.7224548259521764558575301704696e+1724 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=461.5MB, alloc=4.6MB, time=33.83
memory used=465.4MB, alloc=4.6MB, time=34.14
NO POLE
NO POLE
t[1] = 0.588
x1[1] (analytic) = 2.0009997866876564328754445333169
x1[1] (numeric) = 2.4387073940379080007509688542511e+1744
absolute error = 2.4387073940379080007509688542511e+1744
relative error = 1.2187444547781828380422800914550e+1746 %
h = 0.001
x2[1] (analytic) = 1.0008149076558880246839824126574
x2[1] (numeric) = -2.1785986299823094449476836039163e+1742
absolute error = 2.1785986299823094449476836039163e+1742
relative error = 2.1768247188533895209213431332346e+1744 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=469.2MB, alloc=4.6MB, time=34.44
NO POLE
NO POLE
t[1] = 0.589
x1[1] (analytic) = 2.0009987874006955308056246060418
x1[1] (numeric) = -1.9499476990185382895557618836104e+1764
absolute error = 1.9499476990185382895557618836104e+1764
relative error = 9.7448719674214656332716823836444e+1765 %
h = 0.001
x2[1] (analytic) = 1.0008160389585616485469907143189
x2[1] (numeric) = 1.7419692891425701036723554485384e+1762
absolute error = 1.7419692891425701036723554485384e+1762
relative error = 1.7405489334036298174233152098805e+1764 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=473.0MB, alloc=4.6MB, time=34.72
NO POLE
NO POLE
t[1] = 0.59
x1[1] (analytic) = 2.000997789112522112663621650095
x1[1] (numeric) = 1.5591440113739975640438054172582e+1784
absolute error = 1.5591440113739975640438054172582e+1784
relative error = 7.7918327539257576648150522866531e+1785 %
h = 0.001
x2[1] (analytic) = 1.0008171730259982862801800140618
x2[1] (numeric) = -1.3928481192244719540682721929792e+1782
absolute error = 1.3928481192244719540682721929792e+1782
relative error = 1.3917108506573256581735835050622e+1784 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=476.8MB, alloc=4.6MB, time=35.00
memory used=480.6MB, alloc=4.6MB, time=35.29
NO POLE
NO POLE
t[1] = 0.591
x1[1] (analytic) = 2.0009967918221378901928268395824
x1[1] (numeric) = -1.2466642307519086043273207112436e+1804
absolute error = 1.2466642307519086043273207112436e+1804
relative error = 6.2302160395603499861202683849589e+1805 %
h = 0.001
x2[1] (analytic) = 1.0008183098632333534368771646859
x2[1] (numeric) = 1.1136969493773715717341584192076e+1802
absolute error = 1.1136969493773715717341584192076e+1802
relative error = 1.1127863453353122891275862331478e+1804 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=484.4MB, alloc=4.6MB, time=35.57
NO POLE
NO POLE
t[1] = 0.592
x1[1] (analytic) = 2.0009957955285455729259101689204
x1[1] (numeric) = 9.9681087372207029852685161179458e+1823
absolute error = 9.9681087372207029852685161179458e+1823
relative error = 4.9815740540262924804448878824240e+1825 %
h = 0.001
x2[1] (analytic) = 1.0008194494753128458730140697052
x2[1] (numeric) = -8.9049256550891255576925437781549e+1821
absolute error = 8.9049256550891255576925437781549e+1821
relative error = 8.8976344931721701435530220324136e+1823 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=488.2MB, alloc=4.6MB, time=35.85
NO POLE
NO POLE
memory used=492.1MB, alloc=4.6MB, time=36.13
t[1] = 0.593
x1[1] (analytic) = 2.0009948002307488671875299023983
x1[1] (numeric) = -7.9703250759930890004979741861267e+1843
absolute error = 7.9703250759930890004979741861267e+1843
relative error = 3.9831813031567970226569275186442e+1845 %
h = 0.001
x2[1] (analytic) = 1.0008205918672933604297632765047
x2[1] (numeric) = 7.1202225135838812776483668466643e+1841
absolute error = 7.1202225135838812776483668466643e+1841
relative error = 7.1143845075162155918664365042482e+1843 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=495.9MB, alloc=4.6MB, time=36.41
NO POLE
NO POLE
t[1] = 0.594
x1[1] (analytic) = 2.0009938059277524750980388158125
x1[1] (numeric) = 6.3729322674620533460172545735743e+1863
absolute error = 6.3729322674620533460172545735743e+1863
relative error = 3.1848835556526221950804549739981e+1865 %
h = 0.001
x2[1] (analytic) = 1.0008217370442421156580791283924
x2[1] (numeric) = -5.6932051548317338895201236414002e+1861
absolute error = 5.6932051548317338895201236414002e+1861
relative error = 5.6885306784459471200711807850402e+1863 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=499.7MB, alloc=4.6MB, time=36.69
NO POLE
NO POLE
t[1] = 0.595
x1[1] (analytic) = 2.0009928126185620935781862338771
x1[1] (numeric) = -5.0956849687336698688639845049834e+1883
absolute error = 5.0956849687336698688639845049834e+1883
relative error = 2.5465783468084007466196254010119e+1885 %
h = 0.001
x2[1] (analytic) = 1.0008228850112369725852278718869
x2[1] (numeric) = 4.5521870802725979697641363688518e+1881
absolute error = 4.5521870802725979697641363688518e+1881
relative error = 4.5484442336882486720962058361773e+1883 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=503.5MB, alloc=4.6MB, time=36.97
memory used=507.3MB, alloc=4.6MB, time=37.25
NO POLE
NO POLE
t[1] = 0.596
x1[1] (analytic) = 2.0009918203021844133548148681153
x1[1] (numeric) = 4.0744204097620079861451658502814e+1903
absolute error = 4.0744204097620079861451658502814e+1903
relative error = 2.0362004324169101066102516653753e+1905 %
h = 0.001
x2[1] (analytic) = 1.000824035773366455523390283036
x2[1] (numeric) = -3.6398490218140090104829535233121e+1901
absolute error = 3.6398490218140090104829535233121e+1901
relative error = 3.6368521255601036528622418710283e+1903 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=511.1MB, alloc=4.6MB, time=37.53
NO POLE
NO POLE
t[1] = 0.597
x1[1] (analytic) = 2.000990828977627117967551460926
x1[1] (numeric) = -3.2578351639368914701746345278406e+1923
absolute error = 3.2578351639368914701746345278406e+1923
relative error = 1.6281109921935164478151203039020e+1925 %
h = 0.001
x2[1] (analytic) = 1.0008251893357297729204205443582
x2[1] (numeric) = 2.9103594970897022429173317557909e+1921
absolute error = 2.9103594970897022429173317557909e+1921
relative error = 2.9079598796083194233780792772554e+1923 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=514.9MB, alloc=4.6MB, time=37.81
NO POLE
NO POLE
t[1] = 0.598
x1[1] (analytic) = 2.0009898386438988827764902425173
x1[1] (numeric) = 2.6049079103262345478634773830846e+1943
absolute error = 2.6049079103262345478634773830846e+1943
relative error = 1.3018096644067018791948329463416e+1945 %
h = 0.001
x2[1] (analytic) = 1.0008263457034368382528452721242
x2[1] (numeric) = -2.3270724559006280307502772906496e+1941
absolute error = 2.3270724559006280307502772906496e+1941
relative error = 2.3251510772980612420584632493226e+1943 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=518.8MB, alloc=4.6MB, time=38.09
memory used=522.6MB, alloc=4.6MB, time=38.37
NO POLE
NO POLE
t[1] = 0.599
x1[1] (analytic) = 2.000988849300009373970868208391
x1[1] (numeric) = -2.0828387195257233395276642644817e+1963
absolute error = 2.0828387195257233395276642644817e+1963
relative error = 1.0409047108155284721791920176684e+1965 %
h = 0.001
x2[1] (analytic) = 1.0008275048816082909611867621606
x2[1] (numeric) = 1.8606863586531257486071279045220e+1961
absolute error = 1.8606863586531257486071279045220e+1961
relative error = 1.8591479046863659551391679915447e+1963 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=526.4MB, alloc=4.6MB, time=38.65
NO POLE
NO POLE
t[1] = 0.6
x1[1] (analytic) = 2.000987860944969247578731226051
x1[1] (numeric) = 1.6654013427339331014272811022458e+1983
absolute error = 1.6654013427339331014272811022458e+1983
relative error = 8.3228957818237090402170979307528e+1984 %
h = 0.001
x2[1] (analytic) = 1.0008286668753755174276946911611
x2[1] (numeric) = -1.4877722077363934728674331356853e+1981
absolute error = 1.4877722077363934728674331356853e+1981
relative error = 1.4865403609803403005216436293525e+1983 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=530.2MB, alloc=4.6MB, time=38.93
memory used=534.0MB, alloc=4.6MB, time=39.22
NO POLE
NO POLE
t[1] = 0.601
x1[1] (analytic) = 2.0009868735777901484775899806045
x1[1] (numeric) = -1.3316257309694849120782286055482e+2003
absolute error = 1.3316257309694849120782286055482e+2003
relative error = 6.6548449095446641105481858476753e+2004 %
h = 0.001
x2[1] (analytic) = 1.0008298316898806719965706796246
x2[1] (numeric) = 1.1895965872050888507025956322134e+2001
absolute error = 1.1895965872050888507025956322134e+2001
relative error = 1.1886102407603891845474105136994e+2003 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=537.8MB, alloc=4.6MB, time=39.50
NO POLE
NO POLE
t[1] = 0.602
x1[1] (analytic) = 2.0009858871974847094060647699092
x1[1] (numeric) = 1.0647446005231834991461676318528e+2023
absolute error = 1.0647446005231834991461676318528e+2023
relative error = 5.3211000004324363853724998798366e+2024 %
h = 0.001
x2[1] (analytic) = 1.0008309993302766980367702920204
x2[1] (numeric) = -9.5118058593330839638253383517450e+2020
absolute error = 9.5118058593330839638253383517450e+2020
relative error = 9.5039081180519715018841832804549e+2022 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=541.6MB, alloc=4.6MB, time=39.78
NO POLE
NO POLE
t[1] = 0.603
x1[1] (analytic) = 2.0009849018030665499765181609133
x1[1] (numeric) = -8.5135112515278714283122430063289e+2042
absolute error = 8.5135112515278714283122430063289e+2042
relative error = 4.2546604144071429792326232300038e+2044 %
h = 0.001
x2[1] (analytic) = 1.0008321698017273490474672195941
x2[1] (numeric) = 7.6054732905891575255716798015466e+2040
absolute error = 7.6054732905891575255716798015466e+2040
relative error = 7.5991495078499135808931051636097e+2042 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=545.5MB, alloc=4.6MB, time=40.06
memory used=549.3MB, alloc=4.6MB, time=40.35
NO POLE
NO POLE
t[1] = 0.604
x1[1] (analytic) = 2.0009839173935502756886745198199
x1[1] (numeric) = 6.8072544152163093237573979416346e+2062
absolute error = 6.8072544152163093237573979416346e+2062
relative error = 3.4019535869550267613326209428669e+2064 %
h = 0.001
x2[1] (analytic) = 1.0008333431094072098062645613823
x2[1] (numeric) = -6.0812031731186657823998089173498e+2060
absolute error = 6.0812031731186657823998089173498e+2060
relative error = 6.0761396639978773122955669729284e+2062 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=553.1MB, alloc=4.6MB, time=40.63
NO POLE
NO POLE
t[1] = 0.605
x1[1] (analytic) = 2.0009829339679514769442254296945
x1[1] (numeric) = -5.4429613474893560861996064743625e+2082
absolute error = 5.4429613474893560861996064743625e+2082
relative error = 2.7201438128689870564889889032712e+2084 %
h = 0.001
x2[1] (analytic) = 1.0008345192585017175602382895013
x2[1] (numeric) = 4.8624234968398391414568781430550e+2080
absolute error = 4.8624234968398391414568781430550e+2080
relative error = 4.8583690942657648142605667791850e+2082 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=556.9MB, alloc=4.6MB, time=40.91
NO POLE
NO POLE
t[1] = 0.606
x1[1] (analytic) = 2.0009819515252867280624200101232
x1[1] (numeric) = 4.3520965169217563141342519686396e+2102
absolute error = 4.3520965169217563141342519686396e+2102
relative error = 2.1749803958023147498262201069466e+2104 %
h = 0.001
x2[1] (analytic) = 1.0008356982542071832598981556067
x2[1] (numeric) = -3.8879086242558611265247768139717e+2100
absolute error = 3.8879086242558611265247768139717e+2100
relative error = 3.8846622188214074733793525161031e+2102 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=560.7MB, alloc=4.6MB, time=41.19
memory used=564.5MB, alloc=4.6MB, time=41.47
NO POLE
NO POLE
t[1] = 0.607
x1[1] (analytic) = 2.000980970064573586296639154509
x1[1] (numeric) = -3.4798601135279369122186868127784e+2122
absolute error = 3.4798601135279369122186868127784e+2122
relative error = 1.7390770654933507284947072468909e+2124 %
h = 0.001
x2[1] (analytic) = 1.000836880101730812836151466605
x2[1] (numeric) = 3.1087036084757130268694705414240e+2120
absolute error = 3.1087036084757130268694705414240e+2120
relative error = 3.1061041717005137987407261543615e+2122 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=568.3MB, alloc=4.6MB, time=41.75
NO POLE
NO POLE
t[1] = 0.608
x1[1] (analytic) = 2.0009799895848305908519527015831
x1[1] (numeric) = 2.7824351694956617063102064616114e+2142
absolute error = 2.7824351694956617063102064616114e+2142
relative error = 1.3905362292368400000848679039332e+2144 %
h = 0.001
x2[1] (analytic) = 1.0008380648062907285203553292093
x2[1] (numeric) = -2.4856649317985448211029361660431e+2140
absolute error = 2.4856649317985448211029361660431e+2140
relative error = 2.4835835278503700565602260045701e+2142 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=572.2MB, alloc=4.6MB, time=42.03
memory used=576.0MB, alloc=4.6MB, time=42.32
NO POLE
NO POLE
t[1] = 0.609
x1[1] (analytic) = 2.0009790100850772619036585586858
x1[1] (numeric) = -2.2247864051631218037085173666551e+2162
absolute error = 2.2247864051631218037085173666551e+2162
relative error = 1.1118489469155044957990239132360e+2164 %
h = 0.001
x2[1] (analytic) = 1.0008392523731159902075431348015
x2[1] (numeric) = 1.9874941233791586449672765566453e+2160
absolute error = 1.9874941233791586449672765566453e+2160
relative error = 1.9858275129263361925980736453604e+2162 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=579.8MB, alloc=4.6MB, time=42.60
NO POLE
NO POLE
t[1] = 0.61
x1[1] (analytic) = 2.0009780315643340996168027953581
x1[1] (numeric) = 1.7789002248328444869257355032374e+2182
absolute error = 1.7789002248328444869257355032374e+2182
relative error = 8.8901536986996675258583531320380e+2183 %
h = 0.001
x2[1] (analytic) = 1.0008404428074466168629112282639
x2[1] (numeric) = -1.5891654743700732634362293307436e+2180
absolute error = 1.5891654743700732634362293307436e+2180
relative error = 1.5878309932323703000409688057659e+2182 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=583.6MB, alloc=4.6MB, time=42.88
NO POLE
NO POLE
t[1] = 0.611
x1[1] (analytic) = 2.0009770540216225831666797267625
x1[1] (numeric) = -1.4223774482648925978478613677771e+2202
absolute error = 1.4223774482648925978478613677771e+2202
relative error = 7.1084145887937921815115329328843e+2203 %
h = 0.001
x2[1] (analytic) = 1.0008416361145336079716518769977
x2[1] (numeric) = 1.2706688665001274555816058475606e+2200
absolute error = 1.2706688665001274555816058475606e+2200
relative error = 1.2696003250155707447762401644923e+2202 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=587.4MB, alloc=4.6MB, time=43.16
memory used=591.2MB, alloc=4.6MB, time=43.43
NO POLE
NO POLE
t[1] = 0.612
x1[1] (analytic) = 2.0009760774559651697603110074342
x1[1] (numeric) = 1.1373080834382684587735452999033e+2222
absolute error = 1.1373080834382684587735452999033e+2222
relative error = 5.6837665190092550127061944261873e+2223 %
h = 0.001
x2[1] (analytic) = 1.0008428322996389650322188292359
x2[1] (numeric) = -1.0160045598352350101487928913038e+2220
absolute error = 1.0160045598352350101487928913038e+2220
relative error = 1.0151489595032208079696912724275e+2222 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=595.1MB, alloc=4.6MB, time=43.71
NO POLE
NO POLE
t[1] = 0.613
x1[1] (analytic) = 2.0009751018663852936589027568408
x1[1] (numeric) = -9.0937161456818992055209946752400e+2241
absolute error = 9.0937161456818992055209946752400e+2241
relative error = 4.5446423282327929014046971223258e+2243 %
h = 0.001
x2[1] (analytic) = 1.0008440313680357130931119240064
x2[1] (numeric) = 8.1237944268612966421368994723867e+2239
absolute error = 8.1237944268612966421368994723867e+2239
relative error = 8.1169434719583910505414337551688e+2241 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=598.9MB, alloc=4.6MB, time=43.99
NO POLE
NO POLE
memory used=602.7MB, alloc=4.6MB, time=44.28
t[1] = 0.614
x1[1] (analytic) = 2.0009741272519073652012797392075
x1[1] (numeric) = 7.2711760817027786222542342132739e+2261
absolute error = 7.2711760817027786222542342132739e+2261
relative error = 3.6338181402119614058022372952288e+2263 %
h = 0.001
x2[1] (analytic) = 1.0008452333250079223332673886798
x2[1] (numeric) = -6.4956436711863980052797399608925e+2259
absolute error = 6.4956436711863980052797399608925e+2259
relative error = 6.4901579733827290425191343087365e+2261 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=606.5MB, alloc=4.6MB, time=44.56
NO POLE
NO POLE
t[1] = 0.615
x1[1] (analytic) = 2.0009731536115567698282956210436
x1[1] (numeric) = -5.8139049827535688480109174520747e+2281
absolute error = 5.8139049827535688480109174520747e+2281
relative error = 2.9055387236255772850838596135314e+2283 %
h = 0.001
x2[1] (analytic) = 1.0008464381758507296861406339776
x2[1] (numeric) = 5.1938028568905716087403359879763e+2279
absolute error = 5.1938028568905716087403359879763e+2279
relative error = 5.1894103418670607423215996232713e+2281 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=610.3MB, alloc=4.6MB, time=44.84
NO POLE
NO POLE
t[1] = 0.616
x1[1] (analytic) = 2.0009721809443598671082183307772
x1[1] (numeric) = 4.6486965476664779903549898795963e+2301
absolute error = 4.6486965476664779903549898795963e+2301
relative error = 2.3232189792226512733790213313807e+2303 %
h = 0.001
x2[1] (analytic) = 1.0008476459258703605075685305955
x2[1] (numeric) = -4.1528737538211824862888798599762e+2299
absolute error = 4.1528737538211824862888798599762e+2299
relative error = 4.1493565686307991704533953401910e+2301 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=614.1MB, alloc=4.6MB, time=45.11
memory used=617.9MB, alloc=4.6MB, time=45.39
NO POLE
NO POLE
t[1] = 0.617
x1[1] (analytic) = 2.0009712092493439897630895458875
x1[1] (numeric) = -3.7170163008152862485894850078844e+2321
absolute error = 3.7170163008152862485894850078844e+2321
relative error = 1.8576060883003456223764541001766e+2323 %
h = 0.001
x2[1] (analytic) = 1.0008488565803841502874983262271
x2[1] (numeric) = 3.3205650831155918654956825029198e+2319
absolute error = 3.3205650831155918654956825029198e+2319
relative error = 3.3177487902229495609422571868018e+2321 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=621.8MB, alloc=4.6MB, time=45.67
NO POLE
NO POLE
t[1] = 0.618
x1[1] (analytic) = 2.00097023852553744269605733389
x1[1] (numeric) = 2.9720611011837123558070499259168e+2341
absolute error = 2.9720611011837123558070499259168e+2341
relative error = 1.4853099981005946065422576567266e+2343 %
h = 0.001
x2[1] (analytic) = 1.0008500701447205664056705367518
x2[1] (numeric) = -2.6550656544906926522902354266935e+2339
absolute error = 2.6550656544906926522902354266935e+2339
relative error = 2.6528105794175309421419886664653e+2341 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=625.6MB, alloc=4.6MB, time=45.95
NO POLE
NO POLE
t[1] = 0.619
x1[1] (analytic) = 2.0009692687719695020196809745104
x1[1] (numeric) = -2.3764079773424421488284874555175e+2361
absolute error = 2.3764079773424421488284874555175e+2361
relative error = 1.1876284230996141548256199081723e+2363 %
h = 0.001
x2[1] (analytic) = 1.0008512866242192299313433206843
x2[1] (numeric) = 2.1229439728499051610391761251701e+2359
absolute error = 2.1229439728499051610391761251701e+2359
relative error = 2.1211382762072504942429471101768e+2361 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=629.4MB, alloc=4.6MB, time=46.23
memory used=633.2MB, alloc=4.6MB, time=46.51
NO POLE
NO POLE
t[1] = 0.62
x1[1] (analytic) = 2.0009682999876704140852069913503
x1[1] (numeric) = 1.9001341770960175530279397916455e+2381
absolute error = 1.9001341770960175530279397916455e+2381
relative error = 9.4960733616206004776011076080665e+2382 %
h = 0.001
x2[1] (analytic) = 1.0008525060242309374671460216572
x2[1] (numeric) = -1.6974688005311387277692554384505e+2379
absolute error = 1.6974688005311387277692554384505e+2379
relative error = 1.6960229307654273907478557493073e+2381 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=637.0MB, alloc=4.6MB, time=46.79
NO POLE
NO POLE
t[1] = 0.621
x1[1] (analytic) = 2.0009673321716713945128154223205
x1[1] (numeric) = -1.5193139921226929331259912731176e+2401
absolute error = 1.5193139921226929331259912731176e+2401
relative error = 7.5928975335832449378922495583870e+2402 %
h = 0.001
x2[1] (analytic) = 1.0008537283501176830371497397433
x2[1] (numeric) = 1.3572663083089011440316019139871e+2399
absolute error = 1.3572663083089011440316019139871e+2399
relative error = 1.3561085599854043377881753300073e+2401 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=640.8MB, alloc=4.6MB, time=47.08
memory used=644.6MB, alloc=4.6MB, time=47.37
NO POLE
NO POLE
t[1] = 0.622
x1[1] (analytic) = 2.0009663653230046272228353590896
x1[1] (numeric) = 1.2148168452964732412095562167122e+2421
absolute error = 1.2148168452964732412095562167122e+2421
relative error = 6.0711507517037762035184670693703e+2422 %
h = 0.001
x2[1] (analytic) = 1.000854953607252680019242968807
x2[1] (numeric) = -1.0852463568662096913868337728235e+2419
absolute error = 1.0852463568662096913868337728235e+2419
relative error = 1.0843193141571572777821608601957e+2421 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=648.5MB, alloc=4.6MB, time=47.64
NO POLE
NO POLE
t[1] = 0.623
x1[1] (analytic) = 2.0009653994407032634679287867612
x1[1] (numeric) = -9.7134626237082537057480430697317e+2440
absolute error = 9.7134626237082537057480430697317e+2440
relative error = 4.8543881000757420033252584432039e+2442 %
h = 0.001
x2[1] (analytic) = 1.0008561818010203831219005138068
x2[1] (numeric) = 8.6774397027420609472977832103975e+2438
absolute error = 8.6774397027420609472977832103975e+2438
relative error = 8.6700165923211708025045854593662e+2440 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=652.3MB, alloc=4.6MB, time=47.92
NO POLE
NO POLE
t[1] = 0.624
x1[1] (analytic) = 2.0009644345238014208662417559653
x1[1] (numeric) = 7.7667145057698802073758375983279e+2460
absolute error = 7.7667145057698802073758375983279e+2460
relative error = 3.8814855335588401416963689191741e+2462 %
h = 0.001
x2[1] (analytic) = 1.0008574129368165104054340790651
x2[1] (numeric) = -6.9383287323034099324662739137455e+2458
absolute error = 6.9383287323034099324662739137455e+2458
relative error = 6.9323848158792846912209556524407e+2460 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=656.1MB, alloc=4.6MB, time=48.20
memory used=659.9MB, alloc=4.6MB, time=48.48
NO POLE
NO POLE
t[1] = 0.625
x1[1] (analytic) = 2.0009634705713341824355219205144
x1[1] (numeric) = -6.2101288233616058688931216487355e+2480
absolute error = 6.2101288233616058688931216487355e+2480
relative error = 3.1035693128312985308595749281896e+2482 %
h = 0.001
x2[1] (analytic) = 1.0008586470200480653478130959583
x2[1] (numeric) = 5.5477660746285256041732579526813e+2478
absolute error = 5.5477660746285256041732579526813e+2478
relative error = 5.5430065885391696534574338767198e+2480 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=663.7MB, alloc=4.6MB, time=48.76
NO POLE
NO POLE
t[1] = 0.626
x1[1] (analytic) = 2.0009625075823375956282014747412
x1[1] (numeric) = 4.9655101876213171523183589208973e+2500
absolute error = 4.9655101876213171523183589208973e+2500
relative error = 2.4815608332516402234004890069079e+2502 %
h = 0.001
x2[1] (analytic) = 1.0008598840561333589551445362852
x2[1] (numeric) = -4.4358965402582635160206492756248e+2498
absolute error = 4.4358965402582635160206492756248e+2498
relative error = 4.4320854606352427968218317282652e+2500 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=667.5MB, alloc=4.6MB, time=49.04
NO POLE
NO POLE
t[1] = 0.627
x1[1] (analytic) = 2.0009615455558486713674445256013
x1[1] (numeric) = -3.9703349358257574834062873619669e+2520
absolute error = 3.9703349358257574834062873619669e+2520
relative error = 1.9842135120706855158540620366025e+2522 %
h = 0.001
x2[1] (analytic) = 1.0008611240505020319169006357167
x2[1] (numeric) = 3.5468651437674040105728669174946e+2518
absolute error = 3.5468651437674040105728669174946e+2518
relative error = 3.5438134807486380388779657133406e+2520 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=671.3MB, alloc=4.6MB, time=49.31
memory used=675.2MB, alloc=4.6MB, time=49.60
NO POLE
NO POLE
t[1] = 0.628
x1[1] (analytic) = 2.0009605844909053830841579355885
x1[1] (numeric) = 3.1746102428580279938674431845376e+2540
absolute error = 3.1746102428580279938674431845376e+2540
relative error = 1.5865431170728075856996903964698e+2542 %
h = 0.001
x2[1] (analytic) = 1.000862367008595076805983630248
x2[1] (numeric) = -2.8360112175519155125445191261864e+2538
absolute error = 2.8360112175519155125445191261864e+2538
relative error = 2.8335676423005729628197677571713e+2540 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=679.0MB, alloc=4.6MB, time=49.88
NO POLE
NO POLE
t[1] = 0.629
x1[1] (analytic) = 2.0009596243865466657549646734725
x1[1] (numeric) = -2.5383627217745133298533546947413e+2560
absolute error = 2.5383627217745133298533546947413e+2560
relative error = 1.2685726842453022872641969368119e+2562 %
h = 0.001
x2[1] (analytic) = 1.0008636129358648603237167874342
x2[1] (numeric) = 2.2676248743805464258259527448482e+2558
absolute error = 2.2676248743805464258259527448482e+2558
relative error = 2.2656682140025559838102754541832e+2560 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=682.8MB, alloc=4.6MB, time=50.17
memory used=686.6MB, alloc=4.6MB, time=50.45
NO POLE
NO POLE
t[1] = 0.63
x1[1] (analytic) = 2.0009586652418124149411387108333
x1[1] (numeric) = 2.0296303528252258780772355831568e+2580
absolute error = 2.0296303528252258780772355831568e+2580
relative error = 1.0143289754463511313862060335325e+2582 %
h = 0.001
x2[1] (analytic) = 1.0008648618377751455898511934167
x2[1] (numeric) = -1.8131531141643864759257544561216e+2578
absolute error = 1.8131531141643864759257544561216e+2578
relative error = 1.8115863422711215198521987370968e+2580 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=690.4MB, alloc=4.6MB, time=50.73
NO POLE
NO POLE
t[1] = 0.631
x1[1] (analytic) = 2.0009577070557434858285005033265
x1[1] (numeric) = -1.6228568650857233453007739969295e+2600
absolute error = 1.6228568650857233453007739969295e+2600
relative error = 8.1104006314737822943619665684020e+2601 %
h = 0.001
x2[1] (analytic) = 1.0008661137198011144776779363305
x2[1] (numeric) = 1.4497654583640405216375301740117e+2598
absolute error = 1.4497654583640405216375301740117e+2598
relative error = 1.4485108832148069474767665977284e+2600 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=694.2MB, alloc=4.6MB, time=51.01
NO POLE
NO POLE
t[1] = 0.632
x1[1] (analytic) = 2.0009567498273816922682720965747
x1[1] (numeric) = 1.2976079121450988407034297619582e+2620
absolute error = 1.2976079121450988407034297619582e+2620
relative error = 6.4849373293902565932921611878372e+2621 %
h = 0.001
x2[1] (analytic) = 1.0008673685874293899943355066245
x2[1] (numeric) = -1.1592070563958662723440175101039e+2618
absolute error = 1.1592070563958662723440175101039e+2618
relative error = 1.1582024679572769357207581613347e+2620 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=698.1MB, alloc=4.6MB, time=51.29
memory used=701.9MB, alloc=4.6MB, time=51.57
NO POLE
NO POLE
t[1] = 0.633
x1[1] (analytic) = 2.0009557935557698058188908975412
x1[1] (numeric) = -1.0375445486824377218547918936205e+2640
absolute error = 1.0375445486824377218547918936205e+2640
relative error = 5.1852447316623824886812427356577e+2641 %
h = 0.001
x2[1] (analytic) = 1.0008686264461580587064024151242
x2[1] (numeric) = 9.2688164961131706671077087281004e+2637
absolute error = 9.2688164961131706671077087281004e+2637
relative error = 9.2607723443430251512686395175364e+2639 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=705.7MB, alloc=4.6MB, time=51.85
NO POLE
NO POLE
t[1] = 0.634
x1[1] (analytic) = 2.0009548382399515547887811531979
x1[1] (numeric) = 8.2960244032503173227398017250855e+2659
absolute error = 8.2960244032503173227398017250855e+2659
relative error = 4.1460328062913883240101841727719e+2661 %
h = 0.001
x2[1] (analytic) = 1.0008698873014966932108652103333
x2[1] (numeric) = -7.4111832536396551597204859355722e+2657
absolute error = 7.4111832536396551597204859355722e+2657
relative error = 7.4047419626354988377286956982618e+2659 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=709.5MB, alloc=4.6MB, time=52.14
NO POLE
NO POLE
memory used=713.3MB, alloc=4.6MB, time=52.42
t[1] = 0.635
x1[1] (analytic) = 2.0009538838789716232800821792605
x1[1] (numeric) = -6.6333557423364015242672881114008e+2679
absolute error = 6.6333557423364015242672881114008e+2679
relative error = 3.3150967624887162587404999861118e+2681 %
h = 0.001
x2[1] (analytic) = 1.000871151158966374651552257488
x2[1] (numeric) = 5.9258522641009930045258859371044e+2677
absolute error = 5.9258522641009930045258859371044e+2677
relative error = 5.9206944442739779531322156854491e+2679 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=717.1MB, alloc=4.6MB, time=52.70
NO POLE
NO POLE
t[1] = 0.636
x1[1] (analytic) = 2.000952930471875650233332382718
x1[1] (numeric) = 5.3039150158656603848630430265192e+2699
absolute error = 5.3039150158656603848630430265192e+2699
relative error = 2.6506945441314614898417740774694e+2701 %
h = 0.001
x2[1] (analytic) = 1.0008724180240997152811238232684
x2[1] (numeric) = -4.7382076321895593512304867543927e+2697
absolute error = 4.7382076321895593512304867543927e+2697
relative error = 4.7340775376182555871522908116755e+2699 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=720.9MB, alloc=4.6MB, time=52.99
NO POLE
NO POLE
t[1] = 0.637
x1[1] (analytic) = 2.0009519780177102284731081228412
x1[1] (numeric) = -4.2409175066520316495565002580630e+2719
absolute error = 4.2409175066520316495565002580630e+2719
relative error = 2.1194499184600099919355801250743e+2721 %
h = 0.001
x2[1] (analytic) = 1.0008736879024408810687091918124
x2[1] (numeric) = 3.7885877955051175216224205973711e+2717
absolute error = 3.7885877955051175216224205973711e+2717
relative error = 3.7852806416012068906788021360143e+2719 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=724.8MB, alloc=4.6MB, time=53.26
memory used=728.6MB, alloc=4.6MB, time=53.55
NO POLE
NO POLE
t[1] = 0.638
x1[1] (analytic) = 2.0009510265155229037546164563083
x1[1] (numeric) = 3.3909633250962378577075126987656e+2739
absolute error = 3.3909633250962378577075126987656e+2739
relative error = 1.6946758217272798245727402756160e+2741 %
h = 0.001
x2[1] (analytic) = 1.0008749607995456143532817197936
x2[1] (numeric) = -3.0292884141967243012723856838740e+2737
absolute error = 3.0292884141967243012723856838740e+2737
relative error = 3.0266402226475796587310699000468e+2739 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=732.4MB, alloc=4.6MB, time=53.83
NO POLE
NO POLE
t[1] = 0.639
x1[1] (analytic) = 2.0009500759643621738112408130409
x1[1] (numeric) = -2.7113548551962435975212099289793e+2759
absolute error = 2.7113548551962435975212099289793e+2759
relative error = 1.3550337351068093586223245474206e+2761 %
h = 0.001
x2[1] (analytic) = 1.0008762367209812565428629207967
x2[1] (numeric) = 2.4221659340384973804394272954523e+2757
absolute error = 2.4221659340384973804394272954523e+2757
relative error = 2.4200454013913564494436753316309e+2759 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=736.2MB, alloc=4.6MB, time=54.11
NO POLE
NO POLE
t[1] = 0.64
x1[1] (analytic) = 2.0009491263632774874030386502954
x1[1] (numeric) = 2.1679518313833736455927885584829e+2779
absolute error = 2.1679518313833736455927885584829e+2779
relative error = 1.0834617446389670905121412428953e+2781 %
h = 0.001
x2[1] (analytic) = 1.000877515672326770859646852064
x2[1] (numeric) = -1.9367214374575514655355732387141e+2777
absolute error = 1.9367214374575514655355732387141e+2777
relative error = 1.9350234240766048333979932432908e+2779 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=740.0MB, alloc=4.6MB, time=54.39
memory used=743.8MB, alloc=4.6MB, time=54.67
NO POLE
NO POLE
t[1] = 0.641
x1[1] (analytic) = 2.000948177711319243366190133508
x1[1] (numeric) = -1.7334562955457720990207109560027e+2799
absolute error = 1.7334562955457720990207109560027e+2799
relative error = 8.6631743633085797588595292509901e+2800 %
h = 0.001
x2[1] (analytic) = 1.0008787976591727651311362598939
x2[1] (numeric) = 1.5485685243924451136535213080289e+2797
absolute error = 1.5485685243924451136535213080289e+2797
relative error = 1.5472088408848241229873226734688e+2799 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=747.6MB, alloc=4.6MB, time=54.95
NO POLE
NO POLE
t[1] = 0.642
x1[1] (analytic) = 2.0009472300075387896633968933414
x1[1] (numeric) = 1.3860412787169068281294787507445e+2819
absolute error = 1.3860412787169068281294787507445e+2819
relative error = 6.9269256976441340961531852067796e+2820 %
h = 0.001
x2[1] (analytic) = 1.0008800826871215146273821235389
x2[1] (numeric) = -1.2382082566747831554451423043876e+2817
absolute error = 1.2382082566747831554451423043876e+2817
relative error = 1.2371194892304108597797923281572e+2819 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=751.5MB, alloc=4.6MB, time=55.23
memory used=755.3MB, alloc=4.6MB, time=55.52
NO POLE
NO POLE
t[1] = 0.643
x1[1] (analytic) = 2.000946283250988422435229909332
x1[1] (numeric) = -1.1082543189831872346852280491476e+2839
absolute error = 1.1082543189831872346852280491476e+2839
relative error = 5.5386510285652356329514861298849e+2840 %
h = 0.001
x2[1] (analytic) = 1.0008813707617869849444184213975
x2[1] (numeric) = 9.9004962502328734340480193343670e+2836
absolute error = 9.9004962502328734340480193343670e+2836
relative error = 9.8917779263864665117768369471109e+2838 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=759.1MB, alloc=4.6MB, time=55.80
NO POLE
NO POLE
t[1] = 0.644
x1[1] (analytic) = 2.0009453374407213850524255714857
x1[1] (numeric) = 8.8614073361645422715767220263250e+2858
absolute error = 8.8614073361645422715767220263250e+2858
relative error = 4.4286104024703594194899315084501e+2860 %
h = 0.001
x2[1] (analytic) = 1.0008826618887948549339841275898
x2[1] (numeric) = -7.9162633161652555014882837675273e+2856
absolute error = 7.9162633161652555014882837675273e+2856
relative error = 7.9092820942928956083287284016460e+2858 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=762.9MB, alloc=4.6MB, time=56.08
NO POLE
NO POLE
t[1] = 0.645
x1[1] (analytic) = 2.0009443925757918671691289721178
x1[1] (numeric) = -7.0854260283394415655408503135571e+2878
absolute error = 7.0854260283394415655408503135571e+2878
relative error = 3.5410409477788920915184033346516e+2880 %
h = 0.001
x2[1] (analytic) = 1.0008839560737825396796246316935
x2[1] (numeric) = 6.3297054316231580557439827841173e+2876
absolute error = 6.3297054316231580557439827841173e+2876
relative error = 6.3241151915882531897455108805167e+2878 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=766.7MB, alloc=4.6MB, time=56.36
memory used=770.5MB, alloc=4.6MB, time=56.65
NO POLE
NO POLE
t[1] = 0.646
x1[1] (analytic) = 2.0009434486552550037770834811805
x1[1] (numeric) = 5.6653824949660160939902122975742e+2898
absolute error = 5.6653824949660160939902122975742e+2898
relative error = 2.8313556281530432094303363824676e+2900 %
h = 0.001
x2[1] (analytic) = 1.0008852533223992135192649594507
x2[1] (numeric) = -5.0611215482569139241939470152493e+2896
absolute error = 5.0611215482569139241939470152493e+2896
relative error = 5.0566451363497664693724546075479e+2898 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=774.3MB, alloc=4.6MB, time=56.93
NO POLE
NO POLE
t[1] = 0.647
x1[1] (analytic) = 2.0009425056781668742607656592677
x1[1] (numeric) = -4.5299405689779803391691136763225e+2918
absolute error = 4.5299405689779803391691136763225e+2918
relative error = 2.2639034135779308849030076786538e+2920 %
h = 0.001
x2[1] (analytic) = 1.0008865536403058331143473576768
x2[1] (numeric) = 4.0467841044005568013597103335061e+2916
absolute error = 4.0467841044005568013597103335061e+2916
relative error = 4.0431995910845976954020466721980e+2918 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=778.2MB, alloc=4.6MB, time=57.20
NO POLE
NO POLE
t[1] = 0.648
x1[1] (analytic) = 2.0009415636435845014534645634316
x1[1] (numeric) = 3.6220611012064843885176529042156e+2938
absolute error = 3.6220611012064843885176529042156e+2938
relative error = 1.8101783515411347655629648037013e+2940 %
h = 0.001
x2[1] (analytic) = 1.0008878570331751605656259923846
x2[1] (numeric) = -3.2357376584384119102076982367127e+2936
absolute error = 3.2357376584384119102076982367127e+2936
relative error = 3.2328673344382087126273761539586e+2938 %
memory used=782.0MB, alloc=4.6MB, time=57.48
h = 0.001
TOP MAIN SOLVE Loop
memory used=785.8MB, alloc=4.6MB, time=57.76
NO POLE
NO POLE
t[1] = 0.649
x1[1] (analytic) = 2.0009406225505658506943045018897
x1[1] (numeric) = -2.8961365874680865575050609199141e+2958
absolute error = 2.8961365874680865575050609199141e+2958
relative error = 1.4473875710396789516381945828807e+2960 %
h = 0.001
x2[1] (analytic) = 1.0008891635066917865757116952936
x2[1] (numeric) = 2.5872391321422865281221697107511e+2956
absolute error = 2.5872391321422865281221697107511e+2956
relative error = 2.5849406972073673137191345163781e+2958 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=789.6MB, alloc=4.6MB, time=58.04
NO POLE
NO POLE
t[1] = 0.65
x1[1] (analytic) = 2.000939682398169828886210294647
x1[1] (numeric) = 2.3157000665939726418559754745472e+2978
absolute error = 2.3157000665939726418559754745472e+2978
relative error = 1.1573062831252142647721616158715e+2980 %
h = 0.001
x2[1] (analytic) = 1.0008904730665521536584598804244
x2[1] (numeric) = -2.0687110740982773447652573631806e+2976
absolute error = 2.0687110740982773447652573631806e+2976
relative error = 2.0668705815133906826908400985063e+2978 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=793.4MB, alloc=4.6MB, time=58.32
memory used=797.2MB, alloc=4.6MB, time=58.61
NO POLE
NO POLE
t[1] = 0.651
x1[1] (analytic) = 2.0009387431854562835548140979959
x1[1] (numeric) = -1.8515931954408970157785006751735e+2998
absolute error = 1.8515931954408970157785006751735e+2998
relative error = 9.2536225896310848247157714955719e+2999 %
h = 0.001
x2[1] (analytic) = 1.0008917857184645793952949393756
x2[1] (numeric) = 1.6541051250076297406209929565399e+2996
absolute error = 1.6541051250076297406209929565399e+2996
relative error = 1.6526313319878758579168852834465e+2998 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=801.0MB, alloc=4.6MB, time=58.89
NO POLE
NO POLE
t[1] = 0.652
x1[1] (analytic) = 2.0009378049114860019083028518026
x1[1] (numeric) = 1.4805014737705908420394569834918e+3018
absolute error = 1.4805014737705908420394569834918e+3018
relative error = 7.3990379417919123431498831414915e+3019 %
h = 0.001
x2[1] (analytic) = 1.0008931014681492797385646111628
x2[1] (numeric) = -1.3225934732181577891894285876375e+3016
absolute error = 1.3225934732181577891894285876375e+3016
relative error = 1.3214133170446731819145762241048e+3018 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=804.9MB, alloc=4.6MB, time=59.17
NO POLE
NO POLE
t[1] = 0.653
x1[1] (analytic) = 2.000936867575320709898205409426
x1[1] (numeric) = -1.1837830357304618821795184558318e+3038
absolute error = 1.1837830357304618821795184558318e+3038
relative error = 5.9161438569770421138126022031045e+3039 %
h = 0.001
x2[1] (analytic) = 1.00089442032133839236201801014
x2[1] (numeric) = 1.0575225654966767860682993548575e+3036
absolute error = 1.0575225654966767860682993548575e+3036
relative error = 1.0565775410728714599229445061002e+3038 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=808.7MB, alloc=4.6MB, time=59.45
memory used=812.5MB, alloc=4.6MB, time=59.73
NO POLE
NO POLE
t[1] = 0.654
x1[1] (analytic) = 2.0009359311760230712811184110572
x1[1] (numeric) = 9.4653217204454545634680206581781e+3057
absolute error = 9.4653217204454545634680206581781e+3057
relative error = 4.7304471737295154421488895906284e+3059 %
h = 0.001
x2[1] (analytic) = 1.0008957422837760000585011835573
x2[1] (numeric) = -8.4557651249667398006863942677663e+3055
absolute error = 8.4557651249667398006863942677663e+3055
relative error = 8.4481977170498783527032113430413e+3057 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=816.3MB, alloc=4.6MB, time=60.02
NO POLE
NO POLE
t[1] = 0.655
x1[1] (analytic) = 2.000934995712656686681369962205
x1[1] (numeric) = -7.5683053876720672826713634280782e+3077
absolute error = 7.5683053876720672826713634280782e+3077
relative error = 3.7823844372198236864197108438182e+3079 %
h = 0.001
x2[1] (analytic) = 1.0008970673612181541849642587032
x2[1] (numeric) = 6.7610816242983015537988883786006e+3075
absolute error = 6.7610816242983015537988883786006e+3075
relative error = 6.7550219146143876214624735624037e+3077 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=820.1MB, alloc=4.6MB, time=60.30
NO POLE
NO POLE
memory used=823.9MB, alloc=4.6MB, time=60.59
t[1] = 0.656
x1[1] (analytic) = 2.0009340611842860926546201799904
x1[1] (numeric) = 6.0514843692360389534816939667458e+3097
absolute error = 6.0514843692360389534816939667458e+3097
relative error = 3.0243297301133288292901455124002e+3099 %
h = 0.001
x2[1] (analytic) = 1.0008983955594328981548744283602
x2[1] (numeric) = -5.4060423929530523390900155395392e+3095
absolute error = 5.4060423929530523390900155395392e+3095
relative error = 5.4011899878523123925088374329576e+3097 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=827.8MB, alloc=4.6MB, time=60.87
NO POLE
NO POLE
t[1] = 0.657
x1[1] (analytic) = 2.0009331275899767607523976708514
x1[1] (numeric) = -4.8386608620152651060950134088957e+3117
absolute error = 4.8386608620152651060950134088957e+3117
relative error = 2.4182021854189542906683906492903e+3119 %
h = 0.001
x2[1] (analytic) = 1.0008997268842002909781292124573
x2[1] (numeric) = 4.3225767678021058886847613147163e+3115
absolute error = 4.3225767678021058886847613147163e+3115
relative error = 4.3186911252921233580763329708026e+3117 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=831.6MB, alloc=4.6MB, time=61.15
NO POLE
NO POLE
t[1] = 0.658
x1[1] (analytic) = 2.0009321949287950965875710041946
x1[1] (numeric) = 3.8689084378406820087166387389357e+3137
absolute error = 3.8689084378406820087166387389357e+3137
relative error = 1.9335529947721993962680009874168e+3139 %
h = 0.001
x2[1] (analytic) = 1.0009010613413124308485646233361
x2[1] (numeric) = -3.4562566394038197866150661752290e+3135
absolute error = 3.4562566394038197866150661752290e+3135
relative error = 3.4531451438087929287436041563670e+3137 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=835.4MB, alloc=4.6MB, time=61.42
memory used=839.2MB, alloc=4.6MB, time=61.71
NO POLE
NO POLE
t[1] = 0.659
x1[1] (analytic) = 2.000931263199808438900754247464
x1[1] (numeric) = -3.0935113923567234340326682152561e+3157
absolute error = 3.0935113923567234340326682152561e+3157
relative error = 1.5460358130492223868774870292403e+3159 %
h = 0.001
x2[1] (analytic) = 1.0009023989365734787791530519576
x2[1] (numeric) = 2.7635622451876090434386449929475e+3155
absolute error = 2.7635622451876090434386449929475e+3155
relative error = 2.7610706579620598452758163756459e+3157 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=843.0MB, alloc=4.6MB, time=61.99
NO POLE
NO POLE
t[1] = 0.66
x1[1] (analytic) = 2.0009303324020850586276456290331
x1[1] (numeric) = 2.4735175020016613579773823175036e+3177
absolute error = 2.4735175020016613579773823175036e+3177
relative error = 1.2361837201159537194721370193471e+3179 %
h = 0.001
x2[1] (analytic) = 1.0009037396757996822849858826715
x2[1] (numeric) = -2.2096959455949878663903409371688e+3175
absolute error = 2.2096959455949878663903409371688e+3175
relative error = 2.2077007588269428924520889295915e+3177 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=846.8MB, alloc=4.6MB, time=62.27
NO POLE
NO POLE
t[1] = 0.661
x1[1] (analytic) = 2.0009294025346941579672983962594
x1[1] (numeric) = -1.9777812513719095689412196445763e+3197
absolute error = 1.9777812513719095689412196445763e+3197
relative error = 9.8843130040796967961244368228697e+3198 %
h = 0.001
x2[1] (analytic) = 1.0009050835648193991141360348409
x2[1] (numeric) = 1.7668341577909541568766083693181e+3195
absolute error = 1.7668341577909541568766083693181e+3195
relative error = 1.7652364712727853674792017032997e+3197 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=850.6MB, alloc=4.6MB, time=62.55
memory used=854.5MB, alloc=4.6MB, time=62.83
NO POLE
NO POLE
t[1] = 0.662
x1[1] (analytic) = 2.0009284735967058694513229369711
x1[1] (numeric) = 1.5813992321108748216763154816211e+3217
absolute error = 1.5813992321108748216763154816211e+3217
relative error = 7.9033271452641208534544580538764e+3218 %
h = 0.001
x2[1] (analytic) = 1.0009064306094731210264958206685
x2[1] (numeric) = -1.4127296324908236647847670441027e+3215
absolute error = 1.4127296324908236647847670441027e+3215
relative error = 1.4114502507797683698249309871665e+3217 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=858.3MB, alloc=4.6MB, time=63.11
NO POLE
NO POLE
t[1] = 0.663
x1[1] (analytic) = 2.0009275455871912550140192335882
x1[1] (numeric) = -1.2644591152768492369533584871435e+3237
absolute error = 1.2644591152768492369533584871435e+3237
relative error = 6.3193648269047226324888992278826e+3238 %
h = 0.001
x2[1] (analytic) = 1.0009077808156134976206857000054
x2[1] (numeric) = 1.1295938590031462339091684875299e+3235
absolute error = 1.1295938590031462339091684875299e+3235
relative error = 1.1285693653841613924717769695481e+3237 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=862.1MB, alloc=4.6MB, time=63.39
memory used=865.9MB, alloc=4.6MB, time=63.67
NO POLE
NO POLE
t[1] = 0.664
x1[1] (analytic) = 2.0009266185052223050634387200113
x1[1] (numeric) = 1.0110393515700237165389741528163e+3257
absolute error = 1.0110393515700237165389741528163e+3257
relative error = 5.0528557230415242293716712137891e+3258 %
h = 0.001
x2[1] (analytic) = 1.0009091341891053602091297047469
x2[1] (numeric) = -9.0320345588553931014420132038951e+3254
absolute error = 9.0320345588553931014420132038951e+3254
relative error = 9.0238306858621777240428781300198e+3256 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=869.7MB, alloc=4.6MB, time=63.95
NO POLE
NO POLE
t[1] = 0.665
x1[1] (analytic) = 2.0009256923498719375533746123389
x1[1] (numeric) = -8.0840934916217240184295183090577e+3276
absolute error = 8.0840934916217240184295183090577e+3276
relative error = 4.0401767654489088070761713518088e+3278 %
h = 0.001
x2[1] (analytic) = 1.0009104907358257457413934976137
x2[1] (numeric) = 7.2218565657172998999446326357082e+3274
absolute error = 7.2218565657172998999446326357082e+3274
relative error = 7.2152871136440041494712146219677e+3276 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=873.5MB, alloc=4.6MB, time=64.23
NO POLE
NO POLE
t[1] = 0.666
x1[1] (analytic) = 2.0009247671202139970562797854037
x1[1] (numeric) = 6.4638994990448158238655950727395e+3296
absolute error = 6.4638994990448158238655950727395e+3296
relative error = 3.2304560397579754636580439493114e+3298 %
h = 0.001
x2[1] (analytic) = 1.0009118504616639207758812227102
x2[1] (numeric) = -5.7744699619931006289800638917751e+3294
absolute error = 5.7744699619931006289800638917751e+3294
relative error = 5.7692093058241490907282067063260e+3296 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=877.3MB, alloc=4.6MB, time=64.51
memory used=881.2MB, alloc=4.6MB, time=64.80
NO POLE
NO POLE
t[1] = 0.667
x1[1] (analytic) = 2.0009238428153232538371112680455
x1[1] (numeric) = -5.1684207730964859065212965701545e+3316
absolute error = 5.1684207730964859065212965701545e+3316
relative error = 2.5830172355907646230556006076411e+3318 %
h = 0.001
x2[1] (analytic) = 1.0009132133725214054999874982209
x2[1] (numeric) = 4.6171649960827917707140687594901e+3314
absolute error = 4.6171649960827917707140687594901e+3314
relative error = 4.6129523862768392330871341653421e+3316 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=885.0MB, alloc=4.6MB, time=65.08
NO POLE
NO POLE
t[1] = 0.668
x1[1] (analytic) = 2.0009229194342754029281004309665
x1[1] (numeric) = 4.1325786843874430321974131907904e+3336
absolute error = 4.1325786843874430321974131907904e+3336
relative error = 2.0653362727015264350560106145737e+3338 %
h = 0.001
x2[1] (analytic) = 1.0009145794743119977988010949601
x2[1] (numeric) = -3.6918042246935629092950670612215e+3334
absolute error = 3.6918042246935629092950670612215e+3334
relative error = 3.6884308615351839116508271815723e+3336 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=888.8MB, alloc=4.6MB, time=65.36
NO POLE
NO POLE
memory used=892.6MB, alloc=4.6MB, time=65.64
t[1] = 0.669
x1[1] (analytic) = 2.0009219969761470632044479419367
x1[1] (numeric) = -3.3043375012250821415733066517537e+3356
absolute error = 3.3043375012250821415733066517537e+3356
relative error = 1.6514074542729278912534151755963e+3358 %
h = 0.001
x2[1] (analytic) = 1.000915948772961797372457038241
x2[1] (numeric) = 2.9519019669057644267813975585660e+3354
absolute error = 2.9519019669057644267813975585660e+3354
relative error = 2.9492006501890056720319984404136e+3356 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=896.4MB, alloc=4.6MB, time=65.92
NO POLE
NO POLE
t[1] = 0.67
x1[1] (analytic) = 2.0009210754400157764609425640462
x1[1] (numeric) = 2.6420903643655246181281061572837e+3376
absolute error = 2.6420903643655246181281061572837e+3376
relative error = 1.3204370711046218927041853106386e+3378 %
h = 0.001
x2[1] (analytic) = 1.000917321274409229902234064653
x2[1] (numeric) = -2.3602890868205236051231926675938e+3374
absolute error = 2.3602890868205236051231926675938e+3374
relative error = 2.3581259277392723682116873699941e+3376 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=900.2MB, alloc=4.6MB, time=66.20
NO POLE
NO POLE
t[1] = 0.671
x1[1] (analytic) = 2.0009201548249600064895028736225
x1[1] (numeric) = -2.1125691582306831218871387188376e+3396
absolute error = 2.1125691582306831218871387188376e+3396
relative error = 1.0557988299215718291492751299057e+3398 %
h = 0.001
x2[1] (analytic) = 1.0009186969846050712654945598636
x2[1] (numeric) = 1.8872457946845857790964534756928e+3394
absolute error = 1.8872457946845857790964534756928e+3394
relative error = 1.8855135790450851436875445353914e+3396 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=904.0MB, alloc=4.6MB, time=66.48
memory used=907.9MB, alloc=4.6MB, time=66.77
NO POLE
NO POLE
t[1] = 0.672
x1[1] (analytic) = 2.0009192351300591381576409753546
x1[1] (numeric) = 1.6891732805585686027144117839096e+3416
absolute error = 1.6891732805585686027144117839096e+3416
relative error = 8.4419863175975358957148438490267e+3417 %
h = 0.001
x2[1] (analytic) = 1.0009200759095124717995642984636
x2[1] (numeric) = -1.5090086673884982193257035108628e+3414
absolute error = 1.5090086673884982193257035108628e+3414
relative error = 1.5076215411278444234583358141749e+3416 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=911.7MB, alloc=4.6MB, time=67.05
NO POLE
NO POLE
t[1] = 0.673
x1[1] (analytic) = 2.0009183163543934764878472930869
x1[1] (numeric) = -1.3506333559004975300090075990244e+3436
absolute error = 1.3506333559004975300090075990244e+3436
relative error = 6.7500674308449857963844685663825e+3437 %
h = 0.001
x2[1] (analytic) = 1.0009214580551069806146495021779
x2[1] (numeric) = 1.2065768882183058505432464546453e+3434
absolute error = 1.2065768882183058505432464546453e+3434
relative error = 1.2054661017686726958365029920508e+3436 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=915.5MB, alloc=4.6MB, time=67.33
NO POLE
NO POLE
t[1] = 0.674
x1[1] (analytic) = 2.0009173984970442457378955156682
x1[1] (numeric) = 1.0799427643490891030240805442321e+3456
absolute error = 1.0799427643490891030240805442321e+3456
relative error = 5.3972381126790646674443164680032e+3457 %
h = 0.001
x2[1] (analytic) = 1.0009228434273765699558889284481
x2[1] (numeric) = -9.6475773707916249408329899582034e+3453
absolute error = 9.6475773707916249408329899582034e+3453
relative error = 9.6386823761122593622692006290490e+3455 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=919.3MB, alloc=4.6MB, time=67.60
memory used=923.1MB, alloc=4.6MB, time=67.89
NO POLE
NO POLE
t[1] = 0.675
x1[1] (analytic) = 2.0009164815570935884820667781614
x1[1] (numeric) = -8.6350331063189950565632926280975e+3475
absolute error = 8.6350331063189950565632926280975e+3475
relative error = 4.3155389972095671645245021539062e+3477 %
h = 0.001
x2[1] (analytic) = 1.0009242320323216596146388974756
x2[1] (numeric) = 7.7140338120392088519332506372206e+3473
absolute error = 7.7140338120392088519332506372206e+3473
relative error = 7.7069108381723230206914137820484e+3475 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=926.9MB, alloc=4.6MB, time=68.17
NO POLE
NO POLE
t[1] = 0.676
x1[1] (analytic) = 2.000915565533624564693292159636
x1[1] (numeric) = 6.9044211608905683713338730765720e+3495
absolute error = 6.9044211608905683713338730765720e+3495
relative error = 3.4506309410658349981351720871629e+3497 %
h = 0.001
x2[1] (analytic) = 1.0009256238759551413890893622884
x2[1] (numeric) = -6.1680062637737022439105624718079e+3493
absolute error = 6.1680062637737022439105624718079e+3493
relative error = 6.1623022896435551340696700562904e+3495 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=930.8MB, alloc=4.6MB, time=68.45
NO POLE
NO POLE
memory used=934.6MB, alloc=4.6MB, time=68.73
t[1] = 0.677
x1[1] (analytic) = 2.0009146504257211508262125796873
x1[1] (numeric) = -5.5206541746861951666270048235315e+3515
absolute error = 5.5206541746861951666270048235315e+3515
relative error = 2.7590652972187507913395366355772e+3517 %
h = 0.001
x2[1] (analytic) = 1.0009270189643024035943093232542
x2[1] (numeric) = 4.9318297270847189748284126903999e+3513
absolute error = 4.9318297270847189748284126903999e+3513
relative error = 4.9272620617114247240561886351709e+3515 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=938.4MB, alloc=4.6MB, time=69.01
NO POLE
NO POLE
t[1] = 0.678
x1[1] (analytic) = 2.0009137362324682389011551767429
x1[1] (numeric) = 4.4142183401438030846039646704171e+3535
absolute error = 4.4142183401438030846039646704171e+3535
relative error = 2.2061012727392034890267178511945e+3537 %
h = 0.001
x2[1] (analytic) = 1.0009284173034013556218200857267
x2[1] (numeric) = -3.9434046297604274393250068327179e+3533
absolute error = 3.9434046297604274393250068327179e+3533
relative error = 3.9397469005669192514154980857246e+3535 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=942.2MB, alloc=4.6MB, time=69.29
NO POLE
NO POLE
t[1] = 0.679
x1[1] (analytic) = 2.0009128229529516355890252521297
x1[1] (numeric) = -3.5295316348210664931543559921716e+3555
absolute error = 3.5295316348210664931543559921716e+3555
relative error = 1.7639607254913663773216376607534e+3557 %
h = 0.001
x2[1] (analytic) = 1.0009298188993024525487950571612
x2[1] (numeric) = 3.1530772420255636166622956926722e+3553
absolute error = 3.1530772420255636166622956926722e+3553
relative error = 3.1501481747171085248327469072661e+3555 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=946.0MB, alloc=4.6MB, time=69.57
memory used=949.8MB, alloc=4.6MB, time=69.86
NO POLE
NO POLE
t[1] = 0.68
x1[1] (analytic) = 2.0009119105862580612971128647975
x1[1] (numeric) = 2.8221516475319696503617852103640e+3575
absolute error = 2.8221516475319696503617852103640e+3575
relative error = 1.4104327294973680739281835699976e+3577 %
h = 0.001
x2[1] (analytic) = 1.0009312237580687197969849780872
x2[1] (numeric) = -2.5211453116297456692857152718291e+3573
absolute error = 2.5211453116297456692857152718291e+3573
relative error = 2.5187997454649512625066028626803e+3575 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=953.6MB, alloc=4.6MB, time=70.14
NO POLE
NO POLE
t[1] = 0.681
x1[1] (analytic) = 2.0009109991314751492558131625016
x1[1] (numeric) = -2.2565430050526184934931507068458e+3595
absolute error = 2.2565430050526184934931507068458e+3595
relative error = 1.1277578093339004965840398464243e+3597 %
h = 0.001
x2[1] (analytic) = 1.0009326318857757778414676797685
x2[1] (numeric) = 2.0158636133726262324230517825103e+3593
absolute error = 2.0158636133726262324230517825103e+3593
relative error = 2.0139853064583392836092178940346e+3595 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=957.5MB, alloc=4.6MB, time=70.42
NO POLE
NO POLE
t[1] = 0.682
x1[1] (analytic) = 2.0009100885876914446062595361678
x1[1] (numeric) = 1.8042922456363923014914837077188e+3615
absolute error = 1.8042922456363923014914837077188e+3615
relative error = 9.0173579309099364718514353561722e+3616 %
h = 0.001
x2[1] (analytic) = 1.000934043288511866969321660221
x2[1] (numeric) = -1.6118492214527836189324788269505e+3613
absolute error = 1.6118492214527836189324788269505e+3613
relative error = 1.6103450894298136592764524809608e+3615 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=961.3MB, alloc=4.6MB, time=70.71
memory used=965.1MB, alloc=4.6MB, time=70.99
NO POLE
NO POLE
t[1] = 0.683
x1[1] (analytic) = 2.0009091789539964034888686850712
x1[1] (numeric) = -1.4426804631572726182363320564496e+3635
absolute error = 1.4426804631572726182363320564496e+3635
relative error = 7.2101246689839978231366865220797e+3636 %
h = 0.001
x2[1] (analytic) = 1.0009354579723778720883229695017
x2[1] (numeric) = 1.2888063931821669413239979466431e+3633
absolute error = 1.2888063931821669413239979466431e+3633
relative error = 1.2876018957235634723482760728875e+3635 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=968.9MB, alloc=4.6MB, time=71.27
NO POLE
NO POLE
t[1] = 0.684
x1[1] (analytic) = 2.000908270229480392132796681374
x1[1] (numeric) = 1.1535420183782796098370846060809e+3655
absolute error = 1.1535420183782796098370846060809e+3655
relative error = 5.7650919611921142863959704693488e+3656 %
h = 0.001
x2[1] (analytic) = 1.0009368759434873475857650948153
x2[1] (numeric) = -1.0305070083479164293378914630321e+3653
absolute error = 1.0305070083479164293378914630321e+3653
relative error = 1.0295424547892254938073568565940e+3655 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=972.7MB, alloc=4.6MB, time=71.55
memory used=976.5MB, alloc=4.6MB, time=71.83
NO POLE
NO POLE
t[1] = 0.685
x1[1] (analytic) = 2.0009073624132346859463051234791
x1[1] (numeric) = -9.2235198448041537082063492415216e+3674
absolute error = 9.2235198448041537082063492415216e+3674
relative error = 4.6096686023884391860125602910681e+3676 %
h = 0.001
x2[1] (analytic) = 1.0009382972079665422375017360243
x2[1] (numeric) = 8.2397534639174592673249385686558e+3672
absolute error = 8.2397534639174592673249385686558e+3672
relative error = 8.2320293737401802929223382482026e+3674 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=980.3MB, alloc=4.6MB, time=72.12
NO POLE
NO POLE
t[1] = 0.686
x1[1] (analytic) = 2.0009064555043514686080364685643
x1[1] (numeric) = 7.3749648449821835155692441881000e+3694
absolute error = 7.3749648449821835155692441881000e+3694
relative error = 3.6858119102440692888986934405453e+3696 %
h = 0.001
x2[1] (analytic) = 1.0009397217719544241673125625832
x2[1] (numeric) = -6.5883624852765458543523673581357e+3692
absolute error = 6.5883624852765458543523673581357e+3692
relative error = 6.5821770701768414927123420577112e+3694 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=984.2MB, alloc=4.6MB, time=72.39
NO POLE
NO POLE
t[1] = 0.687
x1[1] (analytic) = 2.0009055495019238311591976355737
x1[1] (numeric) = -5.8968926591904531965292627589987e+3714
absolute error = 5.8968926591904531965292627589987e+3714
relative error = 2.9471119517152318491917447892065e+3716 %
h = 0.001
x2[1] (analytic) = 1.0009411496416027058566922437566
x2[1] (numeric) = 5.2679391959334674883169929463513e+3712
absolute error = 5.2679391959334674883169929463513e+3712
relative error = 5.2629859386035906384973748715140e+3714 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=988.0MB, alloc=4.6MB, time=72.67
memory used=991.8MB, alloc=4.6MB, time=72.96
NO POLE
NO POLE
t[1] = 0.688
x1[1] (analytic) = 2.0009046444050457710966509708487
x1[1] (numeric) = 4.7150520395596895954128821004131e+3734
absolute error = 4.7150520395596895954128821004131e+3734
relative error = 2.3564601405389188455148456343808e+3736 %
h = 0.001
x2[1] (analytic) = 1.0009425808230758692051632452178
x2[1] (numeric) = -4.2121518714353639310800503493948e+3732
absolute error = 4.2121518714353639310800503493948e+3732
relative error = 4.2081853166559345929684216793306e+3734 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=995.6MB, alloc=4.6MB, time=73.24
NO POLE
NO POLE
t[1] = 0.689
x1[1] (analytic) = 2.00090374021281219146691166949
x1[1] (numeric) = -3.7700729893916772083220929763817e+3754
absolute error = 3.7700729893916772083220929763817e+3754
relative error = 1.8841850877797347965686806522545e+3756 %
h = 0.001
x2[1] (analytic) = 1.000944015322551190641213086769
x2[1] (numeric) = 3.3679628272346744187952401064919e+3752
absolute error = 3.3679628272346744187952401064919e+3752
relative error = 3.3647864172996314420660803025402e+3754 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=999.4MB, alloc=4.6MB, time=73.52
NO POLE
NO POLE
memory used=1003.2MB, alloc=4.6MB, time=73.80
t[1] = 0.69
x1[1] (analytic) = 2.0009028369243188999610507464485
x1[1] (numeric) = 3.0144842996617289190647149535957e+3774
absolute error = 3.0144842996617289190647149535957e+3774
relative error = 1.5065620599026354386817693157963e+3776 %
h = 0.001
x2[1] (analytic) = 1.0009454531462187662839569579643
x2[1] (numeric) = -2.6929640601418290949070173835230e+3772
absolute error = 2.6929640601418290949070173835230e+3772
relative error = 2.6904203937159392282614974868075e+3774 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1007.0MB, alloc=4.6MB, time=74.08
NO POLE
NO POLE
t[1] = 0.691
x1[1] (analytic) = 2.0009019345386626080105026522465
x1[1] (numeric) = -2.4103288234675059258258587424960e+3794
absolute error = 2.4103288234675059258258587424960e+3794
relative error = 1.2046211670154853008086712843223e+3796 %
h = 0.001
x2[1] (analytic) = 1.0009468943002815371556267908721
x2[1] (numeric) = 2.1532468739181404723546142438149e+3792
absolute error = 2.1532468739181404723546142438149e+3792
relative error = 2.1512099055198945001978193311915e+3794 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1010.9MB, alloc=4.6MB, time=74.36
NO POLE
NO POLE
t[1] = 0.692
x1[1] (analytic) = 2.0009010330549409298837766291383
x1[1] (numeric) = 1.9272566912656292651102816971124e+3814
absolute error = 1.9272566912656292651102816971124e+3814
relative error = 9.6319441063165789696072500653774e+3815 %
h = 0.001
x2[1] (analytic) = 1.0009483387909553144449880920591
x2[1] (numeric) = -1.7216984692302419351240400625217e+3812
absolute error = 1.7216984692302419351240400625217e+3812
relative error = 1.7200672627219503834884931421957e+3814 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1014.7MB, alloc=4.6MB, time=74.64
memory used=1018.5MB, alloc=4.6MB, time=74.92
NO POLE
NO POLE
t[1] = 0.693
x1[1] (analytic) = 2.0009001324722523817840709044204
x1[1] (numeric) = -1.5410006791872953049224818529743e+3834
absolute error = 1.5410006791872953049224818529743e+3834
relative error = 7.7015371940791514555821564207862e+3835 %
h = 0.001
x2[1] (analytic) = 1.0009497866244688048217860391447
x2[1] (numeric) = 1.3766399268263604731494015533866e+3832
absolute error = 1.3766399268263604731494015533866e+3832
relative error = 1.3753336533182569764099724703876e+3834 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1022.3MB, alloc=4.6MB, time=75.20
NO POLE
NO POLE
t[1] = 0.694
x1[1] (analytic) = 2.0008992327896963809477888185067
x1[1] (numeric) = 1.2321571402594281767553580595639e+3854
absolute error = 1.2321571402594281767553580595639e+3854
relative error = 6.1580169559140087988464821605328e+3855 %
h = 0.001
x2[1] (analytic) = 1.0009512378070636358023225509344
x2[1] (numeric) = -1.1007371627505648107070892931905e+3852
absolute error = 1.1007371627505648107070892931905e+3852
relative error = 1.0996910950049049365558588222017e+3854 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1026.1MB, alloc=4.6MB, time=75.48
NO POLE
NO POLE
t[1] = 0.695
x1[1] (analytic) = 2.0008983340063732447439559862824
x1[1] (numeric) = -9.8521125837074775074144186001056e+3873
absolute error = 9.8521125837074775074144186001056e+3873
relative error = 4.9238446633021668757579026162003e+3875 %
h = 0.001
x2[1] (analytic) = 1.0009526923449943811662662442189
x2[1] (numeric) = 8.8013014721531375877516556721249e+3871
absolute error = 8.8013014721531375877516556721249e+3871
relative error = 8.7929245202725605280039899885650e+3873 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1029.9MB, alloc=4.6MB, time=75.76
memory used=1033.8MB, alloc=4.6MB, time=76.04
NO POLE
NO POLE
t[1] = 0.696
x1[1] (analytic) = 2.0008974361213841897745375911567
x1[1] (numeric) = 7.8775765842342620918050033501247e+3893
absolute error = 7.8775765842342620918050033501247e+3893
relative error = 3.9370216793842550084252075820421e+3895 %
h = 0.001
x2[1] (analytic) = 1.0009541502445285864247973948022
x2[1] (numeric) = -7.0373664327056662862642841349640e+3891
absolute error = 7.0373664327056662862642841349640e+3891
relative error = 7.0306581285331295069390205992268e+3893 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1037.6MB, alloc=4.6MB, time=76.32
NO POLE
NO POLE
t[1] = 0.697
x1[1] (analytic) = 2.0008965391338313309756549121294
x1[1] (numeric) = -6.2987721986753208562079553977511e+3913
absolute error = 6.2987721986753208562079553977511e+3913
relative error = 3.1479749579665913839162551254104e+3915 %
h = 0.001
x2[1] (analytic) = 1.0009556115119467943401902252155
x2[1] (numeric) = 5.6269548844412969561108995945423e+3911
absolute error = 5.6269548844412969561108995945423e+3911
relative error = 5.6215828351686472983150824558288e+3913 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1041.4MB, alloc=4.6MB, time=76.60
memory used=1045.2MB, alloc=4.6MB, time=76.89
NO POLE
NO POLE
t[1] = 0.698
x1[1] (analytic) = 2.0008956430428176807197001850876
x1[1] (numeric) = 5.0363878772321308749359343842542e+3933
absolute error = 5.0363878772321308749359343842542e+3933
relative error = 2.5170667419581941259835071042357e+3935 %
h = 0.001
x2[1] (analytic) = 1.0009570761535425704969350468707
x2[1] (numeric) = -4.4992145249660385421039780139290e+3931
absolute error = 4.4992145249660385421039780139290e+3931
relative error = 4.4949125513508814186260142185784e+3933 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1049.0MB, alloc=4.6MB, time=77.17
NO POLE
NO POLE
t[1] = 0.699
x1[1] (analytic) = 2.0008947478474471479183489004502
x1[1] (numeric) = -4.0270074944550720881225491226735e+3953
absolute error = 4.0270074944550720881225491226735e+3953
relative error = 2.0126033609650418608359918630882e+3955 %
h = 0.001
x2[1] (analytic) = 1.0009585441756225289245029901196
x2[1] (numeric) = 3.5974930948242898873246587512511e+3951
absolute error = 3.5974930948242898873246587512511e+3951
relative error = 3.5940480410076744210165162858994e+3953 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1052.8MB, alloc=4.6MB, time=77.45
NO POLE
NO POLE
t[1] = 0.7
x1[1] (analytic) = 2.0008938535468245371264686401681
x1[1] (numeric) = 3.2199246276697908772918378436245e+3973
absolute error = 3.2199246276697908772918378436245e+3973
relative error = 1.6092431000085726506580889682705e+3975 %
h = 0.001
x2[1] (analytic) = 1.000960015584506357771856261807
x2[1] (numeric) = -2.8764924400678887539331192382911e+3971
absolute error = 2.8764924400678887539331192382911e+3971
relative error = 2.8737336110155940522277805534569e+3973 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1056.6MB, alloc=4.6MB, time=77.72
memory used=1060.5MB, alloc=4.6MB, time=78.01
NO POLE
NO POLE
t[1] = 0.701
x1[1] (analytic) = 2.0008929601400555476469235579926
x1[1] (numeric) = -2.5745953098300380136311687172678e+3993
absolute error = 2.5745953098300380136311687172678e+3993
relative error = 1.2867231586690300999278833939749e+3995 %
h = 0.001
x2[1] (analytic) = 1.0009614903865268450338070764361
x2[1] (numeric) = 2.2999929505554335457031558788590e+3991
absolute error = 2.2999929505554335457031558788590e+3991
relative error = 2.2977836536621188887924979223188e+3993 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1064.3MB, alloc=4.6MB, time=78.29
NO POLE
NO POLE
t[1] = 0.702
x1[1] (analytic) = 2.0008920676262467726362736078145
x1[1] (numeric) = 2.0586012953339845574174273638594e+4013
absolute error = 2.0586012953339845574174273638594e+4013
relative error = 1.0288417494583808214307137708761e+4015 %
h = 0.001
x2[1] (analytic) = 1.0009629685880299043293286140165
x2[1] (numeric) = -1.8390340606908875616962025858876e+4011
absolute error = 1.8390340606908875616962025858876e+4011
relative error = 1.8372648323694237788129344140446e+4013 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1068.1MB, alloc=4.6MB, time=78.56
NO POLE
NO POLE
t[1] = 0.703
x1[1] (analytic) = 2.0008911760045056982113676257735
x1[1] (numeric) = -1.6460215230604611788855415680868e+4033
absolute error = 1.6460215230604611788855415680868e+4033
relative error = 8.2264420114407790880269979604783e+4034 %
h = 0.001
x2[1] (analytic) = 1.0009644501953746007319215650229
x2[1] (numeric) = 1.4704594096970917375707765802419e+4031
absolute error = 1.4704594096970917375707765802419e+4031
relative error = 1.4690425912829153201601610928686e+4033 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1071.9MB, alloc=4.6MB, time=78.84
memory used=1075.7MB, alloc=4.6MB, time=79.12
NO POLE
NO POLE
t[1] = 0.704
x1[1] (analytic) = 2.0008902852739407025568293727305
x1[1] (numeric) = 1.3161299667494444319088695182294e+4053
absolute error = 1.3161299667494444319088695182294e+4053
relative error = 6.5777218093157659493665617999539e+4054 %
h = 0.001
x2[1] (analytic) = 1.0009659352149331766521400306684
x2[1] (numeric) = -1.1757535772634934060052094129375e+4051
absolute error = 1.1757535772634934060052094129375e+4051
relative error = 1.1746189714348558915932004289435e+4053 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1079.5MB, alloc=4.6MB, time=79.41
NO POLE
NO POLE
t[1] = 0.705
x1[1] (analytic) = 2.0008893954336610550334356445901
x1[1] (numeric) = -1.0523544589837462986444028793599e+4073
absolute error = 1.0523544589837462986444028793599e+4073
relative error = 5.2594334368775299213026168870229e+4074 %
h = 0.001
x2[1] (analytic) = 1.0009674236530910777723807548876
x2[1] (numeric) = 9.4011195775384866824352469829144e+4070
absolute error = 9.4011195775384866824352469829144e+4070
relative error = 9.3920335021778559920462099206362e+4072 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1083.3MB, alloc=4.6MB, time=79.69
memory used=1087.2MB, alloc=4.6MB, time=79.98
NO POLE
NO POLE
t[1] = 0.706
x1[1] (analytic) = 2.0008885064827769152873855588495
x1[1] (numeric) = 8.4144418508920851630349301075099e+4092
absolute error = 8.4144418508920851630349301075099e+4092
relative error = 4.2053526838850450004101229198416e+4094 %
h = 0.001
x2[1] (analytic) = 1.0009689155162469790340398730335
x2[1] (numeric) = -7.5169704792121327962244738377084e+4090
absolute error = 7.5169704792121327962244738377084e+4090
relative error = 7.5096942199601431595911841012506e+4092 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1091.0MB, alloc=4.6MB, time=80.26
NO POLE
NO POLE
t[1] = 0.707
x1[1] (analytic) = 2.0008876184203993323604601266444
x1[1] (numeric) = -6.7280402584522878456012104267292e+4112
absolute error = 6.7280402584522878456012104267292e+4112
relative error = 3.3625278084152167510189331014687e+4114 %
h = 0.001
x2[1] (analytic) = 1.0009704108108128106771415713127
x2[1] (numeric) = 6.0104378759685401481544982205352e+4110
absolute error = 6.0104378759685401481544982205352e+4110
relative error = 6.0046109366009377616131413321950e+4112 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1094.8MB, alloc=4.6MB, time=80.54
NO POLE
NO POLE
t[1] = 0.708
x1[1] (analytic) = 2.0008867312456402438010712204505
x1[1] (numeric) = 5.3796230958035138462019646788393e+4132
absolute error = 5.3796230958035138462019646788393e+4132
relative error = 2.6886195064397579310809007341239e+4134 %
h = 0.001
x2[1] (analytic) = 1.0009719095432137843325432604322
x2[1] (numeric) = -4.8058408052526475749595615494213e+4130
absolute error = 4.8058408052526475749595615494213e+4130
relative error = 4.8011744979394655586613130807795e+4132 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1098.6MB, alloc=4.6MB, time=80.82
memory used=1102.4MB, alloc=4.6MB, time=81.11
NO POLE
NO POLE
t[1] = 0.709
x1[1] (analytic) = 2.0008858449576124747761990484906
x1[1] (numeric) = -4.3014523607443443589467696712104e+4152
absolute error = 4.3014523607443443589467696712104e+4152
relative error = 2.1497739971444837516336184940805e+4154 %
h = 0.001
x2[1] (analytic) = 1.0009734117198884191668220767854
x2[1] (numeric) = 3.8426660955562475863067513665863e+4150
absolute error = 3.8426660955562475863067513665863e+4150
relative error = 3.8389292368452800857673411168245e+4152 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1106.2MB, alloc=4.6MB, time=81.38
NO POLE
NO POLE
t[1] = 0.71
x1[1] (analytic) = 2.0008849595554297371842172477831
x1[1] (numeric) = 3.4393659336815519135498306511718e+4172
absolute error = 3.4393659336815519135498306511718e+4172
relative error = 1.7189223784488507960481479314573e+4174 %
h = 0.001
x2[1] (analytic) = 1.0009749173472885680799477347923
x2[1] (numeric) = -3.0725284753083346541857915396442e+4170
absolute error = 3.0725284753083346541857915396442e+4170
relative error = 3.0695359314806086353429997110727e+4172 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1110.0MB, alloc=4.6MB, time=81.67
NO POLE
NO POLE
memory used=1113.9MB, alloc=4.6MB, time=81.95
t[1] = 0.711
x1[1] (analytic) = 2.0008840750382066287686047086586
x1[1] (numeric) = -2.7500567328664275011615615110740e+4192
absolute error = 2.7500567328664275011615615110740e+4192
relative error = 1.3744208208633553720932055191387e+4194 %
h = 0.001
x2[1] (analytic) = 1.0009764264318794439558469647067
x2[1] (numeric) = 2.4567399292115710040421712899355e+4190
absolute error = 2.4567399292115710040421712899355e+4190
relative error = 2.4543434434005247216777849636465e+4192 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1117.7MB, alloc=4.6MB, time=82.23
NO POLE
NO POLE
t[1] = 0.712
x1[1] (analytic) = 2.0008831914050586322325432444553
x1[1] (numeric) = 2.1988971745988701145927471514216e+4212
absolute error = 2.1988971745988701145927471514216e+4212
relative error = 1.0989632898334071454244383505553e+4214 %
h = 0.001
x2[1] (analytic) = 1.0009779389801396459659649813274
x2[1] (numeric) = -1.9643661981608787972383607884293e+4210
absolute error = 1.9643661981608787972383607884293e+4210
relative error = 1.9624470446994073965491628729345e+4212 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1121.5MB, alloc=4.6MB, time=82.51
NO POLE
NO POLE
t[1] = 0.713
x1[1] (analytic) = 2.0008823086551021143544002209907
x1[1] (numeric) = -1.7581996497283683500546265268622e+4232
absolute error = 1.7581996497283683500546265268622e+4232
relative error = 8.7871217718454740061206596805323e+4233 %
h = 0.001
x2[1] (analytic) = 1.000979454998561185925929640596
x2[1] (numeric) = 1.5706727906341266321436354547750e+4230
absolute error = 1.5706727906341266321436354547750e+4230
relative error = 1.5691358926406579712968192638429e+4232 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1125.3MB, alloc=4.6MB, time=82.80
memory used=1129.1MB, alloc=4.6MB, time=83.08
NO POLE
NO POLE
t[1] = 0.714
x1[1] (analytic) = 2.0008814267874543251040952612934
x1[1] (numeric) = 1.4058256311457018587838613835220e+4252
absolute error = 1.4058256311457018587838613835220e+4252
relative error = 7.0260316894582135751488104643566e+4253 %
h = 0.001
x2[1] (analytic) = 1.0009809744936495147054241530315
x2[1] (numeric) = -1.2558824406305275554967554085633e+4250
absolute error = 1.2558824406305275554967554085633e+4250
relative error = 1.2546516593542859614154434525186e+4252 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1132.9MB, alloc=4.6MB, time=83.36
NO POLE
NO POLE
t[1] = 0.715
x1[1] (analytic) = 2.0008805458012333967603501419595
x1[1] (numeric) = -1.1240735405057923465143134638045e+4272
absolute error = 1.1240735405057923465143134638045e+4272
relative error = 5.6178942959119425771562056167541e+4273 %
h = 0.001
x2[1] (analytic) = 1.0009824974719235486913744353461
x2[1] (numeric) = 1.0041815928111368623484006984344e+4270
absolute error = 1.0041815928111368623484006984344e+4270
relative error = 1.0031959553211898640025783198894e+4272 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1136.7MB, alloc=4.6MB, time=83.64
NO POLE
NO POLE
t[1] = 0.716
x1[1] (analytic) = 2.000879665695558343028820998386
x1[1] (numeric) = 8.9878950594710837612150902937538e+4291
absolute error = 8.9878950594710837612150902937538e+4291
relative error = 4.4919718129808947256435484616492e+4293 %
h = 0.001
x2[1] (analytic) = 1.0009840239399156963045573943993
x2[1] (numeric) = -8.0292600542646722947843892388004e+4289
absolute error = 8.0292600542646722947843892388004e+4289
relative error = 8.0213668372659567400720362835112e+4291 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1140.6MB, alloc=4.6MB, time=83.92
memory used=1144.4MB, alloc=4.6MB, time=84.20
NO POLE
NO POLE
t[1] = 0.717
x1[1] (analytic) = 2.0008787864695490581611119570114
x1[1] (numeric) = -7.1865633954621535410553000491323e+4311
absolute error = 7.1865633954621535410553000491323e+4311
relative error = 3.5917035274997775565020339107873e+4313 %
h = 0.001
x2[1] (analytic) = 1.0009855539041718845697366508957
x2[1] (numeric) = 6.4200556433755947975191961419239e+4309
absolute error = 6.4200556433755947975191961419239e+4309
relative error = 6.4137345622374595163122174116563e+4311 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1148.2MB, alloc=4.6MB, time=84.48
NO POLE
NO POLE
t[1] = 0.718
x1[1] (analytic) = 2.0008779081223263160746693135771
x1[1] (numeric) = 5.7462501614961893524583083364461e+4331
absolute error = 5.7462501614961893524583083364461e+4331
relative error = 2.8718644641784333960918551279362e+4333 %
h = 0.001
x2[1] (analytic) = 1.0009870873712515857394324238966
x2[1] (numeric) = -5.1333639943753854680387083637117e+4329
absolute error = 5.1333639943753854680387083637117e+4329
relative error = 5.1283019123217672946251388676299e+4331 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1152.0MB, alloc=4.6MB, time=84.76
memory used=1155.8MB, alloc=4.6MB, time=85.04
NO POLE
NO POLE
t[1] = 0.719
x1[1] (analytic) = 2.0008770306530117694735553773055
x1[1] (numeric) = -4.5946009380985320203757896278807e+4351
absolute error = 4.5946009380985320203757896278807e+4351
relative error = 2.2962935091513471633657709533843e+4353 %
h = 0.001
x2[1] (analytic) = 1.0009886243477278439714325113141
x2[1] (numeric) = 4.1045478984188869109351295681949e+4349
absolute error = 4.1045478984188869109351295681949e+4349
relative error = 4.1004940501631824295879301732806e+4351 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1159.6MB, alloc=4.6MB, time=85.33
NO POLE
NO POLE
t[1] = 0.72
x1[1] (analytic) = 2.0008761540607279489701011017664
x1[1] (numeric) = 3.6737623993173430314375119697591e+4371
absolute error = 3.6737623993173430314375119697591e+4371
relative error = 1.8360768565618288885794985513882e+4373 %
h = 0.001
x2[1] (analytic) = 1.0009901648401873020601515160803
x2[1] (numeric) = -3.2819245759456102950028566429054e+4369
absolute error = 3.2819245759456102950028566429054e+4369
relative error = 3.2786781441250071571801001909496e+4371 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1163.5MB, alloc=4.6MB, time=85.61
NO POLE
NO POLE
t[1] = 0.721
x1[1] (analytic) = 2.0008752783445982622074366240855
x1[1] (numeric) = -2.9374760394802508406846230203781e+4391
absolute error = 2.9374760394802508406846230203781e+4391
relative error = 1.4680955236303077929713429370175e+4393 %
h = 0.001
x2[1] (analytic) = 1.0009917088552302282219456826375
x2[1] (numeric) = 2.6241693820517681167431989035968e+4389
absolute error = 2.6241693820517681167431989035968e+4389
relative error = 2.6215695483161011296180654030551e+4391 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1167.3MB, alloc=4.6MB, time=85.89
memory used=1171.1MB, alloc=4.6MB, time=86.17
NO POLE
NO POLE
t[1] = 0.722
x1[1] (analytic) = 2.0008744035037469929828988350251
x1[1] (numeric) = 2.3487543680353344931759652192447e+4411
absolute error = 2.3487543680353344931759652192447e+4411
relative error = 1.1738639686341192345222659030819e+4413 %
h = 0.001
x2[1] (analytic) = 1.000993256399470542934490923781
x2[1] (numeric) = -2.0982398548003929461909518487522e+4409
absolute error = 2.0982398548003929461909518487522e+4409
relative error = 2.0961578326188439762258662977057e+4411 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1174.9MB, alloc=4.6MB, time=86.45
NO POLE
NO POLE
t[1] = 0.723
x1[1] (analytic) = 2.000873529537299300372315103345
x1[1] (numeric) = -1.8780228356658065896564252073520e+4431
absolute error = 1.8780228356658065896564252073520e+4431
relative error = 9.3860146977910100414731788876286e+4432 %
h = 0.001
x2[1] (analytic) = 1.0009948074795358458303318336966
x2[1] (numeric) = 1.6777158206268263994603580412525e+4429
absolute error = 1.6777158206268263994603580412525e+4429
relative error = 1.6760484750677643388774341894070e+4431 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1178.7MB, alloc=4.6MB, time=86.73
NO POLE
NO POLE
t[1] = 0.724
x1[1] (analytic) = 2.000872656444381217855162278726
x1[1] (numeric) = 1.5016341509701782923600842929437e+4451
absolute error = 1.5016341509701782923600842929437e+4451
relative error = 7.5048961568530466386372362294431e+4452 %
h = 0.001
x2[1] (analytic) = 1.0009963621020674426447096992844
x2[1] (numeric) = -1.3414721717071344266743814638194e+4449
absolute error = 1.3414721717071344266743814638194e+4449
relative error = 1.3401369100783505939144471484331e+4451 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1182.5MB, alloc=4.6MB, time=87.01
memory used=1186.3MB, alloc=4.6MB, time=87.29
NO POLE
NO POLE
t[1] = 0.725
x1[1] (analytic) = 2.0008717842241196524406000984165
x1[1] (numeric) = -1.2006803541132167969058956706008e+4471
absolute error = 1.2006803541132167969058956706008e+4471
relative error = 6.0007860752497241869764883309462e+4472 %
h = 0.001
x2[1] (analytic) = 1.0009979202737203722177777385379
x2[1] (numeric) = 1.0726176419986970713835088694953e+4469
absolute error = 1.0726176419986970713835088694953e+4469
relative error = 1.0715483222036989505238703819068e+4471 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1190.2MB, alloc=4.6MB, time=87.57
NO POLE
NO POLE
t[1] = 0.726
x1[1] (analytic) = 2.0008709128756423837943781236344
x1[1] (numeric) = 9.6004297173317937173968455815542e+4490
absolute error = 9.6004297173317937173968455815542e+4490
relative error = 4.7981254840344001566515896530953e+4492 %
h = 0.001
x2[1] (analytic) = 1.0009994820011634335513120118572
x2[1] (numeric) = -8.5764627115799770945426478535874e+4488
absolute error = 8.5764627115799770945426478535874e+4488
relative error = 8.5678992504913293382607017189678e+4490 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1194.0MB, alloc=4.6MB, time=87.85
memory used=1197.8MB, alloc=4.6MB, time=88.14
NO POLE
NO POLE
t[1] = 0.727
x1[1] (analytic) = 2.0008700423980780633666153326315
x1[1] (numeric) = -7.6763353744968932495060767857204e+4510
absolute error = 7.6763353744968932495060767857204e+4510
relative error = 3.8364987289712578271331413285059e+4512 %
h = 0.001
x2[1] (analytic) = 1.0010010472910792129200266697248
x2[1] (numeric) = 6.8575892995811011342549157054530e+4508
absolute error = 6.8575892995811011342549157054530e+4508
relative error = 6.8507313934777489121995843661047e+4510 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1201.6MB, alloc=4.6MB, time=88.42
NO POLE
NO POLE
t[1] = 0.728
x1[1] (analytic) = 2.0008691727905562135204514982004
x1[1] (numeric) = 6.1378632537012565754298595401757e+4530
absolute error = 6.1378632537012565754298595401757e+4530
relative error = 3.0675984902805766894751244110549e+4532 %
h = 0.001
x2[1] (analytic) = 1.0010026161501641110376024181493
x2[1] (numeric) = -5.4832082390137126613700427025387e+4528
absolute error = 5.4832082390137126613700427025387e+4528
relative error = 5.4777161922933039356193233874903e+4530 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1205.4MB, alloc=4.6MB, time=88.70
NO POLE
NO POLE
t[1] = 0.729
x1[1] (analytic) = 2.0008683040522072266615694782741
x1[1] (numeric) = -4.9077279044240933751941541333217e+4550
absolute error = 4.9077279044240933751941541333217e+4550
relative error = 2.4527990645285565673476859673044e+4552 %
h = 0.001
x2[1] (analytic) = 1.0010041885851283702775373017035
x2[1] (numeric) = 4.3842772261419080074901406071606e+4548
absolute error = 4.3842772261419080074901406071606e+4548
relative error = 4.3798790016442134458335102128102e+4550 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1209.2MB, alloc=4.6MB, time=88.98
memory used=1213.0MB, alloc=4.6MB, time=89.27
NO POLE
NO POLE
t[1] = 0.73
x1[1] (analytic) = 2.0008674361821623643685875491419
x1[1] (numeric) = 3.9241332346950999700238605860532e+4570
absolute error = 3.9241332346950999700238605860532e+4570
relative error = 1.9612160024867535632047558989810e+4572 %
h = 0.001
x2[1] (analytic) = 1.0010057646026961019489291228349
x2[1] (numeric) = -3.5055912447206461423672402917062e+4568
absolute error = 3.5055912447206461423672402917062e+4568
relative error = 3.5020689876966211102918829197239e+4570 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1216.9MB, alloc=4.6MB, time=89.55
NO POLE
NO POLE
t[1] = 0.731
x1[1] (analytic) = 2.0008665691795537565243209116727
x1[1] (numeric) = -3.1376681722222806135692837068742e+4590
absolute error = 3.1376681722222806135692837068742e+4590
relative error = 1.5681546288760610299064797987602e+4592 %
h = 0.001
x2[1] (analytic) = 1.0010073442096053136272990354173
x2[1] (numeric) = 2.8030093311130138103120856992071e+4588
absolute error = 2.8030093311130138103120856992071e+4588
relative error = 2.8001885773638034421235628519859e+4590 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1220.7MB, alloc=4.6MB, time=89.83
NO POLE
NO POLE
memory used=1224.5MB, alloc=4.6MB, time=90.12
t[1] = 0.732
x1[1] (analytic) = 2.0008657030435144004479115018074
x1[1] (numeric) = 2.5088244894268091432370697899924e+4610
absolute error = 2.5088244894268091432370697899924e+4610
relative error = 1.2538695053899116004139476458494e+4612 %
h = 0.001
x2[1] (analytic) = 1.0010089274126079365405660702459
x2[1] (numeric) = -2.2412371442731405306235537525093e+4608
absolute error = 2.2412371442731405306235537525093e+4608
relative error = 2.2389781778133137115535891257020e+4610 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1228.3MB, alloc=4.6MB, time=90.40
NO POLE
NO POLE
t[1] = 0.733
x1[1] (analytic) = 2.000864837773178160027825237451
x1[1] (numeric) = -2.0060120998358369369875444720119e+4630
absolute error = 2.0060120998358369369875444720119e+4630
relative error = 1.0025725186256895381394876738440e+4632 %
h = 0.001
x2[1] (analytic) = 1.0010105142184698530102825703439
x2[1] (numeric) = 1.7920539475603676813827739221180e+4628
absolute error = 1.7920539475603676813827739221180e+4628
relative error = 1.7902448796549335201809374664884e+4630 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1232.1MB, alloc=4.6MB, time=90.68
NO POLE
NO POLE
t[1] = 0.734
x1[1] (analytic) = 2.0008639733676797648557158347604
x1[1] (numeric) = 1.6039721238559680890119628059335e+4650
absolute error = 1.6039721238559680890119628059335e+4650
relative error = 8.0163976422460247326511760104992e+4651 %
h = 0.001
x2[1] (analytic) = 1.0010121046339709239482407345618
x2[1] (numeric) = -1.4328949344662990990357072057482e+4648
absolute error = 1.4328949344662990990357072057482e+4648
relative error = 1.4314461611732957163667929015717e+4650 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1235.9MB, alloc=4.6MB, time=90.96
memory used=1239.7MB, alloc=4.6MB, time=91.24
NO POLE
NO POLE
t[1] = 0.735
x1[1] (analytic) = 2.0008631098261548093611543276921
x1[1] (numeric) = -1.2825080039734383844985249132082e+4670
absolute error = 1.2825080039734383844985249132082e+4670
relative error = 6.4097738504703063879128379853493e+4671 %
h = 0.001
x2[1] (analytic) = 1.0010136986659050164085606889993
x2[1] (numeric) = 1.1457176811079317520176154904492e+4668
absolute error = 1.1457176811079317520176154904492e+4668
relative error = 1.1445574447531338457156053848927e+4670 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1243.6MB, alloc=4.6MB, time=91.51
NO POLE
NO POLE
t[1] = 0.736
x1[1] (analytic) = 2.0008622471477397519472234255395
x1[1] (numeric) = 1.0254709267027346319871262690777e+4690
absolute error = 1.0254709267027346319871262690777e+4690
relative error = 5.1251450626576586407153512264342e+4691 %
h = 0.001
x2[1] (analytic) = 1.0010152963210800311953707272764
x2[1] (numeric) = -9.1609578150421582600249483463274e+4687
absolute error = 9.1609578150421582600249483463274e+4687
relative error = 9.1516661620560701234503080495186e+4689 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1247.4MB, alloc=4.6MB, time=91.79
NO POLE
NO POLE
t[1] = 0.737
x1[1] (analytic) = 2.0008613853315719141269758440541
x1[1] (numeric) = -8.1994858375507222417204690082599e+4709
absolute error = 8.1994858375507222417204690082599e+4709
relative error = 4.0979779497278607577701152089548e+4711 %
h = 0.001
x2[1] (analytic) = 1.0010168976063179305261905826109
x2[1] (numeric) = 7.3249413422534112732549979043086e+4707
absolute error = 7.3249413422534112732549979043086e+4707
relative error = 7.3175001938220826047772441356187e+4709 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1251.2MB, alloc=4.6MB, time=92.07
memory used=1255.0MB, alloc=4.6MB, time=92.36
NO POLE
NO POLE
t[1] = 0.738
x1[1] (analytic) = 2.0008605243767894796607557466077
x1[1] (numeric) = 6.5561651968397615636583241651258e+4729
absolute error = 6.5561651968397615636583241651258e+4729
relative error = 3.2766727700231971469605127416980e+4731 %
h = 0.001
x2[1] (analytic) = 1.0010185025284547657511288170474
x2[1] (numeric) = -5.8568947429659449748858266159750e+4727
absolute error = 5.8568947429659449748858266159750e+4727
relative error = 5.8509355503141241631312266760067e+4729 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1258.8MB, alloc=4.6MB, time=92.64
NO POLE
NO POLE
t[1] = 0.739
x1[1] (analytic) = 2.0008596642825314936943824327193
x1[1] (numeric) = -5.2421948082896549813918537139684e+4749
absolute error = 5.2421948082896549813918537139684e+4749
relative error = 2.6199712562896817879557105526844e+4751 %
h = 0.001
x2[1] (analytic) = 1.0010201110943407051280056360003
x2[1] (numeric) = 4.6830704066265244666292730114927e+4747
absolute error = 4.6830704066265244666292730114927e+4747
relative error = 4.6782980229107210537840242466405e+4749 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1262.6MB, alloc=4.6MB, time=92.92
memory used=1266.5MB, alloc=4.6MB, time=93.20
NO POLE
NO POLE
t[1] = 0.74
x1[1] (analytic) = 2.0008588050479378618981954121275
x1[1] (numeric) = 4.1915671101920012682636019076353e+4769
absolute error = 4.1915671101920012682636019076353e+4769
relative error = 2.0948840066161375180402593291718e+4771 %
h = 0.001
x2[1] (analytic) = 1.00102172331084006165351265955
x2[1] (numeric) = -3.7445010361096462494221506952314e+4767
absolute error = 3.7445010361096462494221506952314e+4767
relative error = 3.7406790970777897177167297820736e+4769 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1270.3MB, alloc=4.6MB, time=93.48
NO POLE
NO POLE
t[1] = 0.741
x1[1] (analytic) = 2.0008579466721493496069600034559
x1[1] (numeric) = -3.3515036128494339590147929374770e+4789
absolute error = 3.3515036128494339590147929374770e+4789
relative error = 1.6750332618183587139641738350852e+4791 %
h = 0.001
x2[1] (analytic) = 1.0010233391848313209505214056437
x2[1] (numeric) = 2.9940374139124946974589482625574e+4787
absolute error = 2.9940374139124946974589482625574e+4787
relative error = 2.9909766303257675952585330250805e+4789 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1274.1MB, alloc=4.6MB, time=93.76
NO POLE
NO POLE
t[1] = 0.742
x1[1] (analytic) = 2.0008570891543075809606325973753
x1[1] (numeric) = 2.6798035607327501016560392550087e+4809
absolute error = 2.6798035607327501016560392550087e+4809
relative error = 1.3393278186926431035276686733382e+4811 %
h = 0.001
x2[1] (analytic) = 1.0010249587232071692116524645227
x2[1] (numeric) = -2.3939798519113904671892795086933e+4807
absolute error = 2.3939798519113904671892795086933e+4807
relative error = 2.3915286337764016208147703188250e+4809 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1277.9MB, alloc=4.6MB, time=94.04
memory used=1281.7MB, alloc=4.6MB, time=94.32
NO POLE
NO POLE
t[1] = 0.743
x1[1] (analytic) = 2.000856232493555038045984725029
x1[1] (numeric) = -2.1427239692009091465419357540488e+4829
absolute error = 2.1427239692009091465419357540488e+4829
relative error = 1.0709035134076336386363877544426e+4831 %
h = 0.001
x2[1] (analytic) = 1.0010265819328745211992175683031
x2[1] (numeric) = 1.9141843400909432694613807317546e+4827
absolute error = 1.9141843400909432694613807317546e+4827
relative error = 1.9122212882647526327219962435893e+4829 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1285.5MB, alloc=4.6MB, time=94.60
NO POLE
NO POLE
t[1] = 0.744
x1[1] (analytic) = 2.0008553766890350600390850733442
x1[1] (numeric) = 1.7132845390102732861092045082055e+4849
absolute error = 1.7132845390102732861092045082055e+4849
relative error = 8.5627605021876856852680624840865e+4850 %
h = 0.001
x2[1] (analytic) = 1.0010282088207545483016469847083
x2[1] (numeric) = -1.5305482562536708978125191953705e+4847
absolute error = 1.5305482562536708978125191953705e+4847
relative error = 1.5289761494900419118597189124529e+4849 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1289.3MB, alloc=4.6MB, time=94.89
NO POLE
NO POLE
t[1] = 0.745
x1[1] (analytic) = 2.0008545217398918423486385897126
x1[1] (numeric) = -1.3699122956590293013860401271042e+4869
absolute error = 1.3699122956590293013860401271042e+4869
relative error = 6.8466361785652894840378486147138e+4870 %
h = 0.001
x2[1] (analytic) = 1.0010298393937827066465148894562
x2[1] (numeric) = 1.2237995660385855538099282400245e+4867
absolute error = 1.2237995660385855538099282400245e+4867
relative error = 1.2225405456242051429686918793409e+4869 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1293.2MB, alloc=4.6MB, time=95.16
memory used=1297.0MB, alloc=4.6MB, time=95.45
NO POLE
NO POLE
t[1] = 0.746
x1[1] (analytic) = 2.000853667645270435760181819378
x1[1] (numeric) = 1.0953578667568532737136620946089e+4889
absolute error = 1.0953578667568532737136620946089e+4889
relative error = 5.4744526522318787287318765528997e+4890 %
h = 0.001
x2[1] (analytic) = 1.0010314736589087652702755977723
x2[1] (numeric) = -9.7852868847279655655248238904616e+4886
absolute error = 9.7852868847279655655248238904616e+4886
relative error = 9.7752040192716277911888593670369e+4888 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1300.8MB, alloc=4.6MB, time=95.73
NO POLE
NO POLE
t[1] = 0.747
x1[1] (analytic) = 2.0008528144043167455811336197272
x1[1] (numeric) = -8.7582895639967037805388054013584e+4908
absolute error = 8.7582895639967037805388054013584e+4908
relative error = 4.3772782790143287732431610097253e+4910 %
h = 0.001
x2[1] (analytic) = 1.0010331116230968343448237619125
x2[1] (numeric) = 7.8241439263110626068275914261673e+4906
absolute error = 7.8241439263110626068275914261673e+4906
relative error = 7.8160690545239064743915404711453e+4908 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1304.6MB, alloc=4.6MB, time=96.01
memory used=1308.4MB, alloc=4.6MB, time=96.29
NO POLE
NO POLE
t[1] = 0.748
x1[1] (analytic) = 2.0008519620161775307867003965345
x1[1] (numeric) = 7.0029748646376477554441379637070e+4928
absolute error = 7.0029748646376477554441379637070e+4928
relative error = 3.4999965002813268872449910689135e+4930 %
h = 0.001
x2[1] (analytic) = 1.0010347532933253934609918684512
x2[1] (numeric) = -6.2560483816956738383140755961429e+4926
absolute error = 6.2560483816956738383140755961429e+4926
relative error = 6.2495816065463941536176385441236e+4928 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1312.2MB, alloc=4.6MB, time=96.57
NO POLE
NO POLE
t[1] = 0.749
x1[1] (analytic) = 2.0008511104800004031666350080642
x1[1] (numeric) = -5.5994559892545176346184930368957e+4948
absolute error = 5.5994559892545176346184930368957e+4948
relative error = 2.7985370625159703743943530197357e+4950 %
h = 0.001
x2[1] (analytic) = 1.0010363986765873199690985964066
x2[1] (numeric) = 5.0022266618208748267718326950623e+4946
absolute error = 5.0022266618208748267718326950623e+4946
relative error = 4.9970477281685572602052336350083e+4948 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1316.0MB, alloc=4.6MB, time=96.85
NO POLE
NO POLE
t[1] = 0.75
x1[1] (analytic) = 2.0008502597949338264728484837917
x1[1] (numeric) = 4.4772268902354002552983185360075e+4968
absolute error = 4.4772268902354002552983185360075e+4968
relative error = 2.2376621480381390807541220847979e+4970 %
h = 0.001
x2[1] (analytic) = 1.0010380477798899173766618250573
x2[1] (numeric) = -3.9996927852161907980853590868707e+4966
absolute error = 3.9996927852161907980853590868707e+4966
relative error = 3.9955452183728091284565058560363e+4968 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1319.9MB, alloc=4.6MB, time=97.13
memory used=1323.7MB, alloc=4.6MB, time=97.41
NO POLE
NO POLE
t[1] = 0.751
x1[1] (analytic) = 2.0008494099601271155678737053527
x1[1] (numeric) = -3.5799121673810519932886677867982e+4988
absolute error = 3.5799121673810519932886677867982e+4988
relative error = 1.7891962031527362205251498652601e+4990 %
h = 0.001
x2[1] (analytic) = 1.0010397006102549438033903085354
x2[1] (numeric) = 3.1980842647956177667399220061055e+4986
absolute error = 3.1980842647956177667399220061055e+4986
relative error = 3.1947626680999745107545712493933e+4988 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1327.5MB, alloc=4.6MB, time=97.69
NO POLE
NO POLE
t[1] = 0.752
x1[1] (analytic) = 2.0008485609747304355741801981858
x1[1] (numeric) = 2.8624350385533138090221526825693e+5008
absolute error = 2.8624350385533138090221526825693e+5008
relative error = 1.4306105391398808189008187022530e+5010 %
h = 0.001
x2[1] (analytic) = 1.0010413571747186404935682629654
x2[1] (numeric) = -2.5571321383825979471485551067200e+5006
absolute error = 2.5571321383825979471485551067200e+5006
relative error = 2.5544720206163111286196489747041e+5008 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1331.3MB, alloc=4.6MB, time=97.97
NO POLE
NO POLE
memory used=1335.1MB, alloc=4.6MB, time=98.25
t[1] = 0.753
x1[1] (analytic) = 2.0008477128378948010243391831827
x1[1] (numeric) = -2.2887528986309839981183270821264e+5028
absolute error = 2.2887528986309839981183270821264e+5028
relative error = 1.1438916035167613848845673738586e+5030 %
h = 0.001
x2[1] (analytic) = 1.0010430174803317603859473410724
x2[1] (numeric) = 2.0446380494502216463875252896297e+5026
absolute error = 2.0446380494502216463875252896297e+5026
relative error = 2.0425076782381074615673594234862e+5028 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1338.9MB, alloc=4.6MB, time=98.53
NO POLE
NO POLE
t[1] = 0.754
x1[1] (analytic) = 2.0008468655487720750120380385101
x1[1] (numeric) = 1.8300467121305343649830711719866e+5048
absolute error = 1.8300467121305343649830711719866e+5048
relative error = 9.1463606917694205019532402682035e+5049 %
h = 0.001
x2[1] (analytic) = 1.0010446815341595967412606987796
x2[1] (numeric) = -1.6348567563285281347960495193287e+5046
absolute error = 1.6348567563285281347960495193287e+5046
relative error = 1.6331506340186677948203429826767e+5048 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1342.7MB, alloc=4.6MB, time=98.81
NO POLE
NO POLE
t[1] = 0.755
x1[1] (analytic) = 2.0008460191065149683439433226194
x1[1] (numeric) = -1.4632732832727479907612219564007e+5068
absolute error = 1.4632732832727479907612219564007e+5068
relative error = 7.3132728320901873875840280361990e+5069 %
h = 0.001
x2[1] (analytic) = 1.0010463493432820118274740883854
x2[1] (numeric) = 1.3072028149098116553888058445455e+5066
absolute error = 1.3072028149098116553888058445455e+5066
relative error = 1.3058364537939506439504171836022e+5068 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1346.6MB, alloc=4.6MB, time=99.09
memory used=1350.4MB, alloc=4.6MB, time=99.38
NO POLE
NO POLE
t[1] = 0.756
x1[1] (analytic) = 2.0008451735102770386924115103059
x1[1] (numeric) = 1.1700076764964464883797256321325e+5088
absolute error = 1.1700076764964464883797256321325e+5088
relative error = 5.8475672780007679133023947466743e+5089 %
h = 0.001
x2[1] (analytic) = 1.0010480209147934656628891434283
x2[1] (numeric) = -1.0452164648024687818316554484557e+5086
absolute error = 1.0452164648024687818316554484557e+5086
relative error = 1.0441222028962333028425947810052e+5088 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1354.2MB, alloc=4.6MB, time=99.66
NO POLE
NO POLE
t[1] = 0.757
x1[1] (analytic) = 2.000844328759212689749046594528
x1[1] (numeric) = -9.3551763618542936583517394028655e+5107
absolute error = 9.3551763618542936583517394028655e+5107
relative error = 4.6756143031155934821203319653756e+5109 %
h = 0.001
x2[1] (analytic) = 1.00104969625580304481721425134
x2[1] (numeric) = 8.3573677002030031406850513021564e+5105
absolute error = 8.3573677002030031406850513021564e+5105
relative error = 8.3486042016313691242896686139200e+5107 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1358.0MB, alloc=4.6MB, time=99.94
NO POLE
NO POLE
t[1] = 0.758
x1[1] (analytic) = 2.0008434848524771703791037075452
x1[1] (numeric) = 7.4802350890099607838573384510125e+5127
absolute error = 7.4802350890099607838573384510125e+5127
relative error = 3.7385408432191690934297751387837e+5129 %
h = 0.001
x2[1] (analytic) = 1.0010513753734344912707186414253
x2[1] (numeric) = -6.6824047676665971122519756057972e+5125
absolute error = 6.6824047676665971122519756057972e+5125
relative error = 6.6753864307651318859071946171693e+5127 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1361.8MB, alloc=4.6MB, time=100.22
memory used=1365.6MB, alloc=4.6MB, time=100.51
NO POLE
NO POLE
t[1] = 0.759
x1[1] (analytic) = 2.0008426417892265737767379157772
x1[1] (numeric) = -5.9810649016738798512060621089906e+5147
absolute error = 5.9810649016738798512060621089906e+5147
relative error = 2.9892730076591096387414399226197e+5149 %
h = 0.001
x2[1] (analytic) = 1.0010530582748262313315855476253
x2[1] (numeric) = 5.3431337570379480607066507560086e+5145
absolute error = 5.3431337570379480607066507560086e+5145
relative error = 5.3375130447591714623505112697277e+5147 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1369.4MB, alloc=4.6MB, time=100.79
NO POLE
NO POLE
t[1] = 0.76
x1[1] (analytic) = 2.0008417995686178366210973436332
x1[1] (numeric) = 4.7823546897066702673440773477282e+5167
absolute error = 4.7823546897066702673440773477282e+5167
relative error = 2.3901713222593348175685461546475e+5169 %
h = 0.001
x2[1] (analytic) = 1.0010547449671314046115805378902
x2[1] (numeric) = -4.2722761248668568193260590028546e+5165
absolute error = 4.2722761248668568193260590028546e+5165
relative error = 4.2677747109696109372218678806606e+5167 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1373.3MB, alloc=4.6MB, time=101.06
memory used=1377.1MB, alloc=4.6MB, time=101.35
NO POLE
NO POLE
t[1] = 0.761
x1[1] (analytic) = 2.0008409581898087382332597824052
x1[1] (numeric) = -3.8238870091108115273719647422246e+5187
absolute error = 3.8238870091108115273719647422246e+5187
relative error = 1.9111399101757394514683271488343e+5189 %
h = 0.001
x2[1] (analytic) = 1.001056435457517893060151334826
x2[1] (numeric) = 3.4160371267265160430751420154812e+5185
absolute error = 3.4160371267265160430751420154812e+5185
relative error = 3.4124321124465548166400756757498e+5187 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1380.9MB, alloc=4.6MB, time=101.63
NO POLE
NO POLE
t[1] = 0.762
x1[1] (analytic) = 2.0008401176519578997340119411602
x1[1] (numeric) = 3.0575130468508363785888993352264e+5207
absolute error = 3.0575130468508363785888993352264e+5207
relative error = 1.5281146253899156385551737201744e+5209 %
h = 0.001
x2[1] (analytic) = 1.0010581297531683500570756855867
x2[1] (numeric) = -2.7314034276138036766391434048706e+5205
absolute error = 2.7314034276138036766391434048706e+5205
relative error = 2.7285163033312439685061674805262e+5207 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1384.7MB, alloc=4.6MB, time=101.91
NO POLE
NO POLE
t[1] = 0.763
x1[1] (analytic) = 2.0008392779542247832024704974122
x1[1] (numeric) = -2.4447338557309814274499996262727e+5227
absolute error = 2.4447338557309814274499996262727e+5227
relative error = 1.2218541902229250758952883142756e+5229 %
h = 0.001
x2[1] (analytic) = 1.0010598278612802295637740727514
x2[1] (numeric) = 2.1839823185790917744526033171007e+5225
absolute error = 2.1839823185790917744526033171007e+5225
relative error = 2.1816701237977682121047038186627e+5227 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1388.5MB, alloc=4.6MB, time=102.19
memory used=1392.3MB, alloc=4.6MB, time=102.47
NO POLE
NO POLE
t[1] = 0.764
x1[1] (analytic) = 2.0008384390957696908355441061944
x1[1] (numeric) = 1.9547663521871640732088163250245e+5247
absolute error = 1.9547663521871640732088163250245e+5247
relative error = 9.7697360965864551378569466642059e+5248 %
h = 0.001
x2[1] (analytic) = 1.0010615297890658153334042921666
x2[1] (numeric) = -1.7462739922066576946222179139928e+5245
absolute error = 1.7462739922066576946222179139928e+5245
relative error = 1.7444222360383941401636484320908e+5247 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1396.2MB, alloc=4.6MB, time=102.75
NO POLE
NO POLE
t[1] = 0.765
x1[1] (analytic) = 2.0008376010757537641082355269924
x1[1] (numeric) = -1.5629969220107970599962668979437e+5267
absolute error = 1.5629969220107970599962668979437e+5267
relative error = 7.8117130604225404755886518488916e+5268 %
h = 0.001
x2[1] (analytic) = 1.0010632355437522501798551584403
x2[1] (numeric) = 1.3962900843635849785158098564076e+5265
absolute error = 1.3962900843635849785158098564076e+5265
relative error = 1.3948070759038069082881970176739e+5267 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1400.0MB, alloc=4.6MB, time=103.03
NO POLE
NO POLE
t[1] = 0.766
x1[1] (analytic) = 2.0008367638933389829347830288427
x1[1] (numeric) = 1.2497449505828808494134048358173e+5287
absolute error = 1.2497449505828808494134048358173e+5287
relative error = 6.2461114926290034416023946779153e+5288 %
h = 0.001
x2[1] (analytic) = 1.0010649451325815653057568339487
x2[1] (numeric) = -1.1164490843893553575727539778621e+5285
absolute error = 1.1164490843893553575727539778621e+5285
relative error = 1.1152613921981777680468493349575e+5287 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1403.8MB, alloc=4.6MB, time=103.31
memory used=1407.6MB, alloc=4.6MB, time=103.59
NO POLE
NO POLE
t[1] = 0.767
x1[1] (analytic) = 2.0008359275476881648306402347354
x1[1] (numeric) = -9.9927416331573433083058688599873e+5306
absolute error = 9.9927416331573433083058688599873e+5306
relative error = 4.9942833870465748616129163331394e+5308 %
h = 0.001
x2[1] (analytic) = 1.0010666585628107096896255128694
x2[1] (numeric) = 8.9269312443907616428105507944764e+5304
absolute error = 8.9269312443907616428105507944764e+5304
relative error = 8.9174194026267754291923874301893e+5306 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1411.4MB, alloc=4.6MB, time=103.88
NO POLE
NO POLE
t[1] = 0.768
x1[1] (analytic) = 2.0008350920379649640752935673032
x1[1] (numeric) = 7.9900211079439677545322058306819e+5326
absolute error = 7.9900211079439677545322058306819e+5326
relative error = 3.9933431494375052800820684882744e+5328 %
h = 0.001
x2[1] (analytic) = 1.0010683758417115795322604278644
x2[1] (numeric) = -7.1378177971874726501496495400769e+5324
absolute error = 7.1378177971874726501496495400769e+5324
relative error = 7.1302000636928528405042407498104e+5326 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1415.2MB, alloc=4.6MB, time=104.16
memory used=1419.0MB, alloc=4.6MB, time=104.44
NO POLE
NO POLE
t[1] = 0.769
x1[1] (analytic) = 2.0008342573633338708759164586116
x1[1] (numeric) = -6.3886808694781485332791459214672e+5346
absolute error = 6.3886808694781485332791459214672e+5346
relative error = 3.1930085392965262394328763400817e+5348 %
h = 0.001
x2[1] (analytic) = 1.0010700969765710477625113836365
x2[1] (numeric) = 5.7072740352805657464988488142678e+5344
absolute error = 5.7072740352805657464988488142678e+5344
relative error = 5.7011732270473945259929096290671e+5346 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1422.9MB, alloc=4.6MB, time=104.72
NO POLE
NO POLE
t[1] = 0.77
x1[1] (analytic) = 2.0008334235229602105318594877074
x1[1] (numeric) = 5.1082772749443780545288695709359e+5366
absolute error = 5.1082772749443780545288695709359e+5366
relative error = 2.5530747411995933808266644197552e+5368 %
h = 0.001
x2[1] (analytic) = 1.0010718219746909936025352586378
x2[1] (numeric) = -4.5634363105517349935735531442912e+5364
absolute error = 4.5634363105517349935735531442912e+5364
relative error = 4.5585503561073237097861681446697e+5366 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1426.7MB, alloc=4.6MB, time=104.99
NO POLE
NO POLE
t[1] = 0.771
x1[1] (analytic) = 2.0008325905160101425999756104122
x1[1] (numeric) = -4.0844889971542212217105602657943e+5386
absolute error = 4.0844889971542212217105602657943e+5386
relative error = 2.0413946756539190837667985605460e+5388 %
h = 0.001
x2[1] (analytic) = 1.0010735508433883321926601537526
x2[1] (numeric) = 3.6488437092259388150283808280254e+5384
absolute error = 3.6488437092259388150283808280254e+5384
relative error = 3.6449306908087290876373331054989e+5386 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1430.5MB, alloc=4.6MB, time=105.27
memory used=1434.3MB, alloc=4.6MB, time=105.56
NO POLE
NO POLE
t[1] = 0.772
x1[1] (analytic) = 2.0008317583416506600607796466893
x1[1] (numeric) = 3.2658858299847379954400565842203e+5406
absolute error = 3.2658858299847379954400565842203e+5406
relative error = 1.6322640903559038228622788450999e+5408 %
h = 0.001
x2[1] (analytic) = 1.0010752835899950442759761047885
x2[1] (numeric) = -2.9175514915311685976594757674220e+5404
absolute error = 2.9175514915311685976594757674220e+5404
relative error = 2.9144176660404836084093324876313e+5406 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1438.1MB, alloc=4.6MB, time=105.84
NO POLE
NO POLE
t[1] = 0.773
x1[1] (analytic) = 2.000830926999049588485441191741
x1[1] (numeric) = -2.6113450818269828582705283492339e+5426
absolute error = 2.6113450818269828582705283492339e+5426
relative error = 1.3051303069088472107279728133501e+5428 %
h = 0.001
x2[1] (analytic) = 1.0010770202218582059427715140979
x2[1] (numeric) = 2.3328230486313414401578703637425e+5424
absolute error = 2.3328230486313414401578703637425e+5424
relative error = 2.3303132541333755941287892802859e+5426 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1441.9MB, alloc=4.6MB, time=106.12
NO POLE
NO POLE
memory used=1445.7MB, alloc=4.6MB, time=106.40
t[1] = 0.774
x1[1] (analytic) = 2.0008300964873755852036101178301
x1[1] (numeric) = 2.0879857690597342920724561937882e+5446
absolute error = 2.0879857690597342920724561937882e+5446
relative error = 1.0435597568855885226875382748200e+5448 %
h = 0.001
x2[1] (analytic) = 1.0010787607463400184349346956192
x2[1] (numeric) = -1.8652844318334759131149600265210e+5444
absolute error = 1.8652844318334759131149600265210e+5444
relative error = 1.8632744045461914102309128620224e+5446 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1449.6MB, alloc=4.6MB, time=106.68
NO POLE
NO POLE
t[1] = 0.775
x1[1] (analytic) = 2.0008292668057981384720738346518
x1[1] (numeric) = -1.6695168333500340860412510715756e+5466
absolute error = 1.6695168333500340860412510715756e+5466
relative error = 8.3441244140501596103660292292865e+5467 %
h = 0.001
x2[1] (analytic) = 1.0010805051708178380104401670711
x2[1] (numeric) = 1.4914487464797714270800448724401e+5464
absolute error = 1.4914487464797714270800448724401e+5464
relative error = 1.4898389677714085098696702967328e+5466 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1453.4MB, alloc=4.6MB, time=106.96
NO POLE
NO POLE
t[1] = 0.776
x1[1] (analytic) = 2.0008284379534875666442454769111
x1[1] (numeric) = 1.3349164051507408526902724471047e+5486
absolute error = 1.3349164051507408526902724471047e+5486
relative error = 6.6718184319498017036283668947654e+5487 %
h = 0.001
x2[1] (analytic) = 1.001082253502684205868039562957
x2[1] (numeric) = -1.1925362831606303345972014168219e+5484
absolute error = 1.1925362831606303345972014168219e+5484
relative error = 1.1912470518661859210256166737312e+5486 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1457.2MB, alloc=4.6MB, time=107.24
memory used=1461.0MB, alloc=4.6MB, time=107.53
NO POLE
NO POLE
t[1] = 0.777
x1[1] (analytic) = 2.0008276099296150173404821885963
x1[1] (numeric) = -1.0673757659363228466774541684612e+5506
absolute error = 1.0673757659363228466774541684612e+5506
relative error = 5.3346713162053522516414507405609e+5507 %
h = 0.001
x2[1] (analytic) = 1.0010840057493468781322772824375
x2[1] (numeric) = 9.5353111530732689984424367020432e+5503
absolute error = 9.5353111530732689984424367020432e+5503
relative error = 9.5249860134722165149301591845161e+5505 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1464.8MB, alloc=4.6MB, time=107.81
NO POLE
NO POLE
t[1] = 0.778
x1[1] (analytic) = 2.0008267827333524666192326742651
x1[1] (numeric) = 8.5345495891145432972358828314362e+5525
absolute error = 8.5345495891145432972358828314362e+5525
relative error = 4.2655114689415527526135286589826e+5527 %
h = 0.001
x2[1] (analytic) = 1.0010857619182288558989512270172
x2[1] (numeric) = -7.6242677115826242805677737278018e+5523
absolute error = 7.6242677115826242805677737278018e+5523
relative error = 7.6159985503873275499695643990399e+5525 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1468.6MB, alloc=4.6MB, time=108.09
NO POLE
NO POLE
t[1] = 0.779
x1[1] (analytic) = 2.0008259563638727181490131884908
x1[1] (numeric) = -6.8240763012976816405378625442519e+5545
absolute error = 6.8240763012976816405378625442519e+5545
relative error = 3.4106296350229107906687408077106e+5547 %
h = 0.001
x2[1] (analytic) = 1.0010875220167684153411392243529
x2[1] (numeric) = 6.0962308628120634724401324821293e+5543
absolute error = 6.0962308628120634724401324821293e+5543
relative error = 6.0896082797343571240124861400021e+5545 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1472.4MB, alloc=4.6MB, time=108.37
memory used=1476.3MB, alloc=4.6MB, time=108.65
NO POLE
NO POLE
t[1] = 0.78
x1[1] (analytic) = 2.0008251308203494023812111354461
x1[1] (numeric) = 5.4564118328315980279382560589666e+5565
absolute error = 5.4564118328315980279382560589666e+5565
relative error = 2.7270808171998713897116419540181e+5567 %
h = 0.001
x2[1] (analytic) = 1.0010892860524191378759119763419
x2[1] (numeric) = -4.8744393741898013366185862478017e+5563
absolute error = 4.8744393741898013366185862478017e+5563
relative error = 4.8691354928101442610828967439438e+5565 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1480.1MB, alloc=4.6MB, time=108.93
NO POLE
NO POLE
t[1] = 0.781
x1[1] (analytic) = 2.0008243061019569757237154514262
x1[1] (numeric) = -4.3628512893097468509221809367957e+5585
absolute error = 4.3628512893097468509221809367957e+5585
relative error = 2.1805269338263561254763862593282e+5587 %
h = 0.001
x2[1] (analytic) = 1.0010910540326499403918536119819
x2[1] (numeric) = 3.8975163092317338596505703038793e+5583
absolute error = 3.8975163092317338596505703038793e+5583
relative error = 3.8932685428878269386630678917799e+5585 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1483.9MB, alloc=4.6MB, time=109.22
memory used=1487.7MB, alloc=4.6MB, time=109.50
NO POLE
NO POLE
t[1] = 0.782
x1[1] (analytic) = 2.0008234822078707197153729439423
x1[1] (numeric) = 3.4884594410744479202600807518359e+5605
absolute error = 3.4884594410744479202600807518359e+5605
relative error = 1.7435118450454205825830123810435e+5607 %
h = 0.001
x2[1] (analytic) = 1.0010928259649451055375111683079
x2[1] (numeric) = -3.1163857450278060009572587786794e+5603
absolute error = 3.1163857450278060009572587786794e+5603
relative error = 3.1129837955076219069541273283288e+5605 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1491.5MB, alloc=4.6MB, time=109.79
NO POLE
NO POLE
t[1] = 0.783
x1[1] (analytic) = 2.0008226591372667402012697618419
x1[1] (numeric) = -2.7893110411165951777104899009597e+5625
absolute error = 2.7893110411165951777104899009597e+5625
relative error = 1.3940820933721912998289005400827e+5627 %
h = 0.001
x2[1] (analytic) = 1.0010946018568043120708945660189
x2[1] (numeric) = 2.4918074335721983815130254513746e+5623
absolute error = 2.4918074335721983815130254513746e+5623
relative error = 2.4890828788312898291502626481122e+5625 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1495.3MB, alloc=4.6MB, time=110.06
NO POLE
NO POLE
t[1] = 0.784
x1[1] (analytic) = 2.0008218368893219665088371717373
x1[1] (numeric) = 2.2302842316259293700673543076918e+5645
absolute error = 2.2302842316259293700673543076918e+5645
relative error = 1.1146840715679875954254800457441e+5647 %
h = 0.001
x2[1] (analytic) = 1.0010963817157426652701488901915
x2[1] (numeric) = -1.9924055601628562252404116636590e+5643
absolute error = 1.9924055601628562252404116636590e+5643
relative error = 1.9902235154902316461177056336364e+5645 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1499.2MB, alloc=4.6MB, time=110.34
memory used=1503.0MB, alloc=4.6MB, time=110.62
NO POLE
NO POLE
t[1] = 0.785
x1[1] (analytic) = 2.0008210154632141506247808168473
x1[1] (numeric) = -1.7832961905345781165277853367487e+5665
absolute error = 1.7832961905345781165277853367487e+5665
relative error = 8.9128221702615592599673037726745e+5666 %
h = 0.001
x2[1] (analytic) = 1.0010981655492907274055210307597
x2[1] (numeric) = 1.5930925731596450797501771539303e+5663
absolute error = 1.5930925731596450797501771539303e+5663
relative error = 1.5913450128894542725158032589397e+5665 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1506.8MB, alloc=4.6MB, time=110.90
NO POLE
NO POLE
t[1] = 0.786
x1[1] (analytic) = 2.0008201948581218663728326351826
x1[1] (numeric) = 1.4258923854098802596183900767823e+5685
absolute error = 1.4258923854098802596183900767823e+5685
relative error = 7.1265393515832154516048809051697e+5686 %
h = 0.001
x2[1] (analytic) = 1.0010999533649945482727429822022
x2[1] (numeric) = -1.2738089058780640025259546345598e+5683
absolute error = 1.2738089058780640025259546345598e+5683
relative error = 1.2724093149704118899207448092623e+5685 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1510.6MB, alloc=4.6MB, time=111.18
NO POLE
NO POLE
t[1] = 0.787
x1[1] (analytic) = 2.0008193750732245085923246148252
x1[1] (numeric) = -1.1401185655874675937378994453897e+5705
absolute error = 1.1401185655874675937378994453897e+5705
relative error = 5.6982583225222035706647343477953e+5706 %
h = 0.001
x2[1] (analytic) = 1.0011017451704156957879543471364
x2[1] (numeric) = 1.0185152802992005184471244799242e+5703
absolute error = 1.0185152802992005184471244799242e+5703
relative error = 1.0173943709645821752397875111010e+5705 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1514.4MB, alloc=4.6MB, time=111.46
memory used=1518.2MB, alloc=4.6MB, time=111.75
NO POLE
NO POLE
t[1] = 0.788
x1[1] (analytic) = 2.0008185561077022923175835648766
x1[1] (numeric) = 9.1161882684685919255893153659337e+5724
absolute error = 9.1161882684685919255893153659337e+5724
relative error = 4.5562293695450291386465016195697e+5726 %
h = 0.001
x2[1] (analytic) = 1.0011035409731312866442868342615
x2[1] (numeric) = -8.1438697077398365068845670894411e+5722
absolute error = 8.1438697077398365068845670894411e+5722
relative error = 8.1348925205314108485390529114473e+5724 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1522.0MB, alloc=4.6MB, time=112.02
NO POLE
NO POLE
t[1] = 0.789
x1[1] (analytic) = 2.0008177379607362519581460814697
x1[1] (numeric) = -7.2891443973059962459570001625835e+5744
absolute error = 7.2891443973059962459570001625835e+5744
relative error = 3.6430826551623850734898593915986e+5746 %
h = 0.001
x2[1] (analytic) = 1.0011053407807340170302337873344
x2[1] (numeric) = 6.5116955139995055690340292103138e+5742
absolute error = 6.5116955139995055690340292103138e+5742
relative error = 6.5045058184598402128105215802339e+5744 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1525.9MB, alloc=4.6MB, time=112.31
memory used=1529.7MB, alloc=4.6MB, time=112.59
NO POLE
NO POLE
t[1] = 0.79
x1[1] (analytic) = 2.0008169206315082404797928890576
x1[1] (numeric) = 5.8282721330526950884214591053700e+5764
absolute error = 5.8282721330526950884214591053700e+5764
relative error = 2.9129462435839184784200828134145e+5766 %
h = 0.001
x2[1] (analytic) = 1.0011071446008321934099280285891
x2[1] (numeric) = -5.2066376291289092000259987201242e+5762
absolute error = 5.2066376291289092000259987201242e+5762
relative error = 5.2008795034670668180719161652080e+5764 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1533.5MB, alloc=4.6MB, time=112.87
NO POLE
NO POLE
t[1] = 0.791
x1[1] (analytic) = 2.0008161041192009285864017380157
x1[1] (numeric) = -4.6601842692913541726229680845795e+5784
absolute error = 4.6601842692913541726229680845795e+5784
relative error = 2.3291417235682736769717131565736e+5786 %
h = 0.001
x2[1] (analytic) = 1.0011089524410497633654515472347
x2[1] (numeric) = 4.1631362128003774175911330666854e+5782
absolute error = 4.1631362128003774175911330666854e+5782
relative error = 4.1585246067865160033236150105469e+5784 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1537.3MB, alloc=4.6MB, time=113.15
NO POLE
NO POLE
t[1] = 0.792
x1[1] (analytic) = 2.0008152884229978039026180404089
x1[1] (numeric) = 3.7262016817282063067867669306329e+5804
absolute error = 3.7262016817282063067867669306329e+5804
relative error = 1.8623416680632839462188572448663e+5806 %
h = 0.001
x2[1] (analytic) = 1.0011107643090263465013008113861
x2[1] (numeric) = -3.3287707654871942671685981025541e+5802
absolute error = 3.3287707654871942671685981025541e+5802
relative error = 3.3250773881996315744929683384328e+5804 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1541.1MB, alloc=4.6MB, time=113.43
memory used=1544.9MB, alloc=4.6MB, time=113.71
NO POLE
NO POLE
t[1] = 0.793
x1[1] (analytic) = 2.0008144735420831701573424265938
x1[1] (numeric) = -2.9794055708070651498666812258792e+5824
absolute error = 2.9794055708070651498666812258792e+5824
relative error = 1.4890963706057973265264848743200e+5826 %
h = 0.001
x2[1] (analytic) = 1.0011125802124172654111317299951
x2[1] (numeric) = 2.6616267743275788180870817468775e+5822
absolute error = 2.6616267743275788180870817468775e+5822
relative error = 2.6586687920381858188700549939315e+5824 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1548.7MB, alloc=4.6MB, time=113.99
NO POLE
NO POLE
t[1] = 0.794
x1[1] (analytic) = 2.0008136594756421463680344061453
x1[1] (numeric) = 2.3822804865567828161626034056887e+5844
absolute error = 2.3822804865567828161626034056887e+5844
relative error = 1.1906558490714785311871918460276e+5846 %
h = 0.001
x2[1] (analytic) = 1.0011144001588935767069085400585
x2[1] (numeric) = -2.1281901293015562011217364951389e+5842
absolute error = 2.1281901293015562011217364951389e+5842
relative error = 2.1258211139144306393882738603897e+5844 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1552.6MB, alloc=4.6MB, time=114.27
NO POLE
NO POLE
memory used=1556.4MB, alloc=4.6MB, time=114.55
t[1] = 0.795
x1[1] (analytic) = 2.0008128462228606660258313174086
x1[1] (numeric) = -1.9048297325603443033434597165821e+5864
absolute error = 1.9048297325603443033434597165821e+5864
relative error = 9.5202794012257892237290319776433e+5865 %
h = 0.001
x2[1] (analytic) = 1.0011162241561421021105811435889
x2[1] (numeric) = 1.7016635353019429660076289989493e+5862
absolute error = 1.7016635353019429660076289989493e+5862
relative error = 1.6997662151927505832438557062183e+5864 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1560.2MB, alloc=4.6MB, time=114.83
NO POLE
NO POLE
t[1] = 0.796
x1[1] (analytic) = 2.0008120337829254762814817507983
x1[1] (numeric) = 1.5230684759921651171068198394070e+5884
absolute error = 1.5230684759921651171068198394070e+5884
relative error = 7.6122516771978177128064026819529e+5885 %
h = 0.001
x2[1] (analytic) = 1.0011180522118654596084156685398
x2[1] (numeric) = -1.3606203447276694856693415345221e+5882
absolute error = 1.3606203447276694856693415345221e+5882
relative error = 1.3591007990731176728591749166858e+5884 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1564.0MB, alloc=4.6MB, time=115.11
NO POLE
NO POLE
t[1] = 0.797
x1[1] (analytic) = 2.0008112221550241371320926317755
x1[1] (numeric) = -1.2178188648090141141836307001372e+5904
absolute error = 1.2178188648090141141836307001372e+5904
relative error = 6.0866255213089599876050735111203e+5905 %
h = 0.001
x2[1] (analytic) = 1.0011198843337820946681032780826
x2[1] (numeric) = 1.0879281856141730657590345721228e+5902
absolute error = 1.0879281856141730657590345721228e+5902
relative error = 1.0867111947718025015961276915658e+5904 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1567.8MB, alloc=4.6MB, time=115.39
memory used=1571.6MB, alloc=4.6MB, time=115.67
NO POLE
NO POLE
t[1] = 0.798
x1[1] (analytic) = 2.0008104113383450206086891502517
x1[1] (numeric) = 9.7374662456893040337326351918215e+5923
absolute error = 9.7374662456893040337326351918215e+5923
relative error = 4.8667610836630436018773276777949e+5925 %
h = 0.001
x2[1] (analytic) = 1.0011217205296263115187725033377
x2[1] (numeric) = -8.6988831354762943415349844389328e+5921
absolute error = 8.6988831354762943415349844389328e+5921
relative error = 8.6891363528445862753774104870841e+5923 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1575.4MB, alloc=4.6MB, time=115.95
NO POLE
NO POLE
t[1] = 0.799
x1[1] (analytic) = 2.0008096013320773099645867239781
x1[1] (numeric) = -7.7859073812925811203053264567384e+5943
absolute error = 7.7859073812925811203053264567384e+5943
relative error = 3.8913784580546615589238133972406e+5945 %
h = 0.001
x2[1] (analytic) = 1.0011235608071483044940306258725
x2[1] (numeric) = 6.9554745253663259698014943520408e+5941
absolute error = 6.9554745253663259698014943520408e+5941
relative error = 6.9476683974538839167962774381587e+5943 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1579.3MB, alloc=4.6MB, time=116.23
NO POLE
NO POLE
t[1] = 0.8
x1[1] (analytic) = 2.000808792135410998864574184293
x1[1] (numeric) = 6.2254751103144956846930441146613e+5963
absolute error = 6.2254751103144956846930441146613e+5963
relative error = 3.1114792851695781466467087943828e+5965 %
h = 0.001
x2[1] (analytic) = 1.0011254051741141894381598879868
x2[1] (numeric) = -5.5614755503174164888390895892854e+5961
absolute error = 5.5614755503174164888390895892854e+5961
relative error = 5.5552236728526265117532173958095e+5963 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1583.1MB, alloc=4.6MB, time=116.51
memory used=1586.9MB, alloc=4.6MB, time=116.79
NO POLE
NO POLE
t[1] = 0.801
x1[1] (analytic) = 2.0008079837475368905749073734102
x1[1] (numeric) = -4.9777808097572176255333872625686e+5983
absolute error = 4.9777808097572176255333872625686e+5983
relative error = 2.4878853194266926161810487273257e+5985 %
h = 0.001
x2[1] (analytic) = 1.0011272536383060351755945610209
x2[1] (numeric) = 4.4468583967891695885433397615569e+5981
absolute error = 4.4468583967891695885433397615569e+5981
relative error = 4.4418513037462072706251186456859e+5983 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1590.7MB, alloc=4.6MB, time=117.07
NO POLE
NO POLE
t[1] = 0.802
x1[1] (analytic) = 2.0008071761676465971541123432417
x1[1] (numeric) = 3.9801463102685960898139789068050e+6003
absolute error = 3.9801463102685960898139789068050e+6003
relative error = 1.9892703093419441492612347328484e+6005 %
h = 0.001
x2[1] (analytic) = 1.0011291062075218950438051546411
x2[1] (numeric) = -3.5556300521658731433633974871779e+6001
absolute error = 3.5556300521658731433633974871779e+6001
relative error = 3.5516198960944346493214413157040e+6003 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1594.5MB, alloc=4.6MB, time=117.35
memory used=1598.3MB, alloc=4.6MB, time=117.64
NO POLE
NO POLE
t[1] = 0.803
x1[1] (analytic) = 2.0008063693949325386445973465579
x1[1] (numeric) = -3.1824552459386743493074651262382e+6023
absolute error = 3.1824552459386743493074651262382e+6023
relative error = 1.5905863229039431625627915020018e+6025 %
h = 0.001
x2[1] (analytic) = 1.0011309628895758384897163032782
x2[1] (numeric) = 2.8430194847206160629395153831473e+6021
absolute error = 2.8430194847206160629395153831473e+6021
relative error = 2.8398077675220194488366104359527e+6023 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1602.1MB, alloc=4.6MB, time=117.92
NO POLE
NO POLE
t[1] = 0.804
x1[1] (analytic) = 2.0008055634285879422650728120981
x1[1] (numeric) = 2.5446354487705023856121314724236e+6043
absolute error = 2.5446354487705023856121314724236e+6043
relative error = 1.2718054644000516999079525244084e+6045 %
h = 0.001
x2[1] (analytic) = 1.0011328236922979827297851196289
x2[1] (numeric) = -2.2732285620033930639635492298909e+6041
absolute error = 2.2732285620033930639635492298909e+6041
relative error = 2.2706563087397867505042682168624e+6043 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1606.0MB, alloc=4.6MB, time=118.21
NO POLE
NO POLE
t[1] = 0.805
x1[1] (analytic) = 2.0008047582678068416037784960493
x1[1] (numeric) = -2.0346459154147778566058060749258e+6063
absolute error = 2.0346459154147778566058060749258e+6063
relative error = 1.0169137728242254564462445859475e+6065 %
h = 0.001
x2[1] (analytic) = 1.001134688623534524473867059364
x2[1] (numeric) = 1.8176337245946915942225612751116e+6061
absolute error = 1.8176337245946915942225612751116e+6061
relative error = 1.8155736138698440186810585845026e+6063 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1609.8MB, alloc=4.6MB, time=118.48
memory used=1613.6MB, alloc=4.6MB, time=118.77
NO POLE
NO POLE
t[1] = 0.806
x1[1] (analytic) = 2.000803953911784075812517003122
x1[1] (numeric) = 1.6268672210450690433962524692885e+6083
absolute error = 1.6268672210450690433962524692885e+6083
relative error = 8.1310676034219692856671034934525e+6084 %
h = 0.001
x2[1] (analytic) = 1.0011365576911477717129965959371
x2[1] (numeric) = -1.4533480759507718465166626697160e+6081
absolute error = 1.4533480759507718465166626697160e+6081
relative error = 1.4516981372676354218320973641921e+6083 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1617.4MB, alloc=4.6MB, time=119.06
NO POLE
NO POLE
t[1] = 0.807
x1[1] (analytic) = 2.0008031503597152888014928712567
x1[1] (numeric) = -1.3008145224970785544694479100840e+6103
absolute error = 1.3008145224970785544694479100840e+6103
relative error = 6.5014617867990213532121834483237e+6104 %
h = 0.001
x2[1] (analytic) = 1.0011384309030161755712102596424
x2[1] (numeric) = 1.1620716546403252401381152708404e+6101
absolute error = 1.1620716546403252401381152708404e+6101
relative error = 1.1607502207183765935661551341629e+6103 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1621.2MB, alloc=4.6MB, time=119.33
NO POLE
NO POLE
t[1] = 0.808
x1[1] (analytic) = 2.0008023476107969284349564147984
x1[1] (numeric) = 1.0401084981307308506311554074840e+6123
absolute error = 1.0401084981307308506311554074840e+6123
relative error = 5.1984570058744073107198758768113e+6124 %
h = 0.001
x2[1] (analytic) = 1.0011403082670343622215398508344
memory used=1625.0MB, alloc=4.6MB, time=119.61
x2[1] (numeric) = -9.2917213217148454569907701643031e+6120
absolute error = 9.2917213217148454569907701643031e+6120
relative error = 9.2811379633677307699139678299651e+6122 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1628.9MB, alloc=4.6MB, time=119.89
NO POLE
NO POLE
t[1] = 0.809
x1[1] (analytic) = 2.0008015456642262457276515217838
x1[1] (numeric) = -8.3165252937602729521070156770050e+6142
absolute error = 8.3165252937602729521070156770050e+6142
relative error = 4.1565967958103272393376407047334e+6144 %
h = 0.001
x2[1] (analytic) = 1.0011421897911131648663038935078
x2[1] (numeric) = 7.4294975508315192546617216576229e+6140
absolute error = 7.4294975508315192546617216576229e+6140
relative error = 7.4210213360218820815082878039473e+6142 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1632.7MB, alloc=4.6MB, time=120.17
NO POLE
NO POLE
t[1] = 0.81
x1[1] (analytic) = 2.0008007445192012940420666017904
x1[1] (numeric) = 6.6497478951528691704796420106289e+6162
absolute error = 6.6497478951528691704796420106289e+6162
relative error = 3.3235432930383202576064789633304e+6164 %
h = 0.001
x2[1] (analytic) = 1.0011440754831796557818256522167
x2[1] (numeric) = -5.9404960552157961576388732185998e+6160
absolute error = 5.9404960552157961576388732185998e+6160
relative error = 5.9337074460024641671772834086036e+6162 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1636.5MB, alloc=4.6MB, time=120.45
memory used=1640.3MB, alloc=4.6MB, time=120.73
NO POLE
NO POLE
t[1] = 0.811
x1[1] (analytic) = 2.0007999441749209282864878815951
x1[1] (numeric) = -5.3170218940194625801944696286536e+6182
absolute error = 5.3170218940194625801944696286536e+6182
relative error = 2.6574480419690671991642812575412e+6184 %
h = 0.001
x2[1] (analytic) = 1.0011459653511771784277062926278
x2[1] (numeric) = 4.7499165509630982247460497311944e+6180
absolute error = 4.7499165509630982247460497311944e+6180
relative error = 4.7444795417988277924579764830394e+6182 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1644.1MB, alloc=4.6MB, time=121.01
NO POLE
NO POLE
t[1] = 0.812
x1[1] (analytic) = 2.0007991446305848041138542466989
x1[1] (numeric) = 4.2513975367531441658049780656442e+6202
absolute error = 4.2513975367531441658049780656442e+6202
relative error = 2.1248497372474116824549402666944e+6204 %
h = 0.001
x2[1] (analytic) = 1.0011478594030653796207820238126
x2[1] (numeric) = -3.7979500417820901774844032721352e+6200
absolute error = 3.7979500417820901774844032721352e+6200
relative error = 3.7935955274844403938051936433547e+6202 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1647.9MB, alloc=4.6MB, time=121.28
NO POLE
NO POLE
t[1] = 0.813
x1[1] (analytic) = 2.0007983458853933771214128275702
x1[1] (numeric) = -3.3993429735244460162925592357626e+6222
absolute error = 3.3993429735244460162925592357626e+6222
relative error = 1.6989932946091919150762249010711e+6224 %
h = 0.001
x2[1] (analytic) = 1.0011497576468202417738943187252
x2[1] (numeric) = 3.0367743022659774065778169821643e+6220
absolute error = 3.0367743022659774065778169821643e+6220
relative error = 3.0332867576214036204811152112369e+6222 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1651.7MB, alloc=4.6MB, time=121.56
memory used=1655.6MB, alloc=4.6MB, time=121.85
NO POLE
NO POLE
t[1] = 0.814
x1[1] (analytic) = 2.0007975479385479020511745302633
x1[1] (numeric) = 2.7180550752435998888960698682244e+6242
absolute error = 2.7180550752435998888960698682244e+6242
relative error = 1.3584858088436050461829216911149e+6244 %
h = 0.001
x2[1] (analytic) = 1.0011516600904341151996025681617
x2[1] (numeric) = -2.4281515189641170053667156870838e+6240
absolute error = 2.4281515189641170053667156870838e+6240
relative error = 2.4253583305697978572993134932583e+6242 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1659.4MB, alloc=4.6MB, time=122.13
NO POLE
NO POLE
t[1] = 0.815
x1[1] (analytic) = 2.000796750789250431991168711867
x1[1] (numeric) = -2.1733092099258759014042516439837e+6262
absolute error = 2.1733092099258759014042516439837e+6262
relative error = 1.0862218808924868618821959707279e+6264 %
h = 0.001
x2[1] (analytic) = 1.0011535667419157504789687828648
x2[1] (numeric) = 1.9415074062792011733697044747918e+6260
absolute error = 1.9415074062792011733697044747918e+6260
relative error = 1.9392703285246311275694506485017e+6262 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1663.2MB, alloc=4.6MB, time=122.41
NO POLE
NO POLE
memory used=1667.0MB, alloc=4.6MB, time=122.70
t[1] = 0.816
x1[1] (analytic) = 2.0007959544367038175774962020388
x1[1] (numeric) = 1.7377399615514860993459139917020e+6282
absolute error = 1.7377399615514860993459139917020e+6282
relative error = 8.6852432787966254039213053252307e+6283 %
h = 0.001
x2[1] (analytic) = 1.001155477609290330895544218333
x2[1] (numeric) = -1.5523953011981274633388823192140e+6280
absolute error = 1.5523953011981274633388823192140e+6280
relative error = 1.5506036134419106560179503855765e+6282 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1670.8MB, alloc=4.6MB, time=122.97
NO POLE
NO POLE
t[1] = 0.817
x1[1] (analytic) = 2.0007951588801117061971798726762
x1[1] (numeric) = -1.3894664229927748444853627440213e+6302
absolute error = 1.3894664229927748444853627440213e+6302
relative error = 6.9445710962759887529188768096220e+6303 %
h = 0.001
x2[1] (analytic) = 1.0011573927005995049346880572926
x2[1] (numeric) = 1.2412680803523349437644037111118e+6300
absolute error = 1.2412680803523349437644037111118e+6300
relative error = 1.2398331065648351953670076199705e+6302 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1674.6MB, alloc=4.6MB, time=123.25
NO POLE
NO POLE
t[1] = 0.818
x1[1] (analytic) = 2.000794364118678541191811958577
x1[1] (numeric) = 1.1109930043276708123452674513954e+6322
absolute error = 1.1109930043276708123452674513954e+6322
relative error = 5.5527595651592482787854828282946e+6323 %
h = 0.001
x2[1] (analytic) = 1.0011593120239014188483485457303
x2[1] (numeric) = -9.9249620641883782840670333598165e+6319
absolute error = 9.9249620641883782840670333598165e+6319
relative error = 9.9134692600765943862506017777980e+6321 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1678.4MB, alloc=4.6MB, time=123.53
memory used=1682.3MB, alloc=4.6MB, time=123.81
NO POLE
NO POLE
t[1] = 0.819
x1[1] (analytic) = 2.0007935701516095610619973327352
x1[1] (numeric) = -8.8833053842816200435603546846248e+6341
absolute error = 8.8833053842816200435603546846248e+6341
relative error = 4.4398910096499810904651262386893e+6343 %
h = 0.001
x2[1] (analytic) = 1.0011612355872707492854372398268
x2[1] (numeric) = 7.9358257522917811227813588073354e+6339
absolute error = 7.9358257522917811227813588073354e+6339
relative error = 7.9266210778094184031351169333569e+6341 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1686.1MB, alloc=4.6MB, time=124.10
NO POLE
NO POLE
t[1] = 0.82
x1[1] (analytic) = 2.0007927769781107986725919407158
x1[1] (numeric) = 7.1029353238962947851572064012034e+6361
absolute error = 7.1029353238962947851572064012034e+6361
relative error = 3.5500604588468097879710482651516e+6363 %
h = 0.001
x2[1] (analytic) = 1.0011631633987987359879272831134
x2[1] (numeric) = -6.3453472127590883032082094715399e+6359
absolute error = 6.3453472127590883032082094715399e+6359
relative error = 6.3379751120862123048221723880103e+6361 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1689.9MB, alloc=4.6MB, time=124.38
NO POLE
NO POLE
t[1] = 0.821
x1[1] (analytic) = 2.0007919845973890804587355993465
x1[1] (numeric) = -5.6793826208794370687080041094768e+6381
absolute error = 5.6793826208794370687080041094768e+6381
relative error = 2.8385672596655645055983588789951e+6383 %
h = 0.001
x2[1] (analytic) = 1.0011650954665932145528068956668
x2[1] (numeric) = 5.0736284423636550680574918484156e+6379
absolute error = 5.0736284423636550680574918484156e+6379
relative error = 5.0677240600353625077380372480434e+6381 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1693.7MB, alloc=4.6MB, time=124.66
memory used=1697.5MB, alloc=4.6MB, time=124.94
NO POLE
NO POLE
t[1] = 0.822
x1[1] (analytic) = 2.0007911930086520256326783657601
x1[1] (numeric) = 4.5411348243353824701345641809767e+6401
absolute error = 4.5411348243353824701345641809767e+6401
relative error = 2.2696695388321540013430472447653e+6403 %
h = 0.001
x2[1] (analytic) = 1.0011670317987786492600195201863
x2[1] (numeric) = -4.0567843977711067408007601934888e+6399
absolute error = 4.0567843977711067408007601934888e+6399
relative error = 4.0520555201286999888290881785674e+6401 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1701.3MB, alloc=4.6MB, time=125.22
NO POLE
NO POLE
t[1] = 0.823
x1[1] (analytic) = 2.0007904022111080453913996836126
x1[1] (numeric) = -3.6310118316343156685277768131399e+6421
absolute error = 3.6310118316343156685277768131399e+6421
relative error = 1.8147887093128904220454929472387e+6423 %
h = 0.001
x2[1] (analytic) = 1.0011689724034961659665223333419
x2[1] (numeric) = 3.2437337177832465707976359721970e+6419
absolute error = 3.2437337177832465707976359721970e+6419
relative error = 3.2399463099580963210195874194170e+6421 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1705.1MB, alloc=4.6MB, time=125.50
memory used=1709.0MB, alloc=4.6MB, time=125.79
NO POLE
NO POLE
t[1] = 0.824
x1[1] (analytic) = 2.0007896122039663421250195140969
x1[1] (numeric) = 2.9032934346753220801932190811636e+6441
absolute error = 2.9032934346753220801932190811636e+6441
relative error = 1.4510738245373056545282495498138e+6443 %
h = 0.001
x2[1] (analytic) = 1.0011709172889035850665950948637
x2[1] (numeric) = -2.5936326410801749831709166818364e+6439
absolute error = 2.5936326410801749831709166818364e+6439
relative error = 2.5905992636137887018166468240856e+6441 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1712.8MB, alloc=4.6MB, time=126.07
NO POLE
NO POLE
t[1] = 0.825
x1[1] (analytic) = 2.0007888229864369086260006601633
x1[1] (numeric) = -2.3214225562120769576466093832465e+6461
absolute error = 2.3214225562120769576466093832465e+6461
relative error = 1.1602536607271988864284402347810e+6463 %
h = 0.001
x2[1] (analytic) = 1.0011728664631754545185315714457
x2[1] (numeric) = 2.0738232118121207877808902519599e+6459
absolute error = 2.0738232118121207877808902519599e+6459
relative error = 2.0713937435582698354126648819486e+6461 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1716.6MB, alloc=4.6MB, time=126.35
NO POLE
NO POLE
t[1] = 0.826
x1[1] (analytic) = 2.0007880345577305272991414931476
x1[1] (numeric) = 1.8561687978648533079893048488510e+6481
absolute error = 1.8561687978648533079893048488510e+6481
relative error = 9.2771886167099906700270641117480e+6482 %
h = 0.001
x2[1] (analytic) = 1.0011748199345030829378460376734
x2[1] (numeric) = -1.6581927007440815244792708211571e+6479
absolute error = 1.6581927007440815244792708211571e+6479
relative error = 1.6562469088590947492099969340200e+6481 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1720.4MB, alloc=4.6MB, time=126.62
memory used=1724.2MB, alloc=4.6MB, time=126.91
NO POLE
NO POLE
t[1] = 0.827
x1[1] (analytic) = 2.0007872469170587693723582918024
x1[1] (numeric) = -1.4841600452909093346579760473709e+6501
absolute error = 1.4841600452909093346579760473709e+6501
relative error = 7.4178803747264895843811861037010e+6502 %
h = 0.001
x2[1] (analytic) = 1.0011767777110945727571276218477
x2[1] (numeric) = 1.3258618271507961983130386115086e+6499
absolute error = 1.3258618271507961983130386115086e+6499
relative error = 1.3243034164076412913259597647001e+6501 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1728.0MB, alloc=4.6MB, time=127.19
NO POLE
NO POLE
t[1] = 0.828
x1[1] (analytic) = 2.0007864600636339941082564045099
x1[1] (numeric) = 1.1867083654092830826072940383434e+6521
absolute error = 1.1867083654092830826072940383434e+6521
relative error = 5.9312094973470603533891983227491e+6522 %
h = 0.001
x2[1] (analytic) = 1.0011787398011748534526755307781
x2[1] (numeric) = -1.0601358840301372996506225462501e+6519
absolute error = 1.0601358840301372996506225462501e+6519
relative error = 1.0588877309167300215816660988259e+6521 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1731.9MB, alloc=4.6MB, time=127.46
NO POLE
NO POLE
memory used=1735.7MB, alloc=4.6MB, time=127.75
t[1] = 0.829
x1[1] (analytic) = 2.0007856739966693480164894462513
x1[1] (numeric) = -9.4887121439543741866312934541240e+6540
absolute error = 9.4887121439543741866312934541240e+6540
relative error = 4.7424930452446701097776965694866e+6542 %
h = 0.001
x2[1] (analytic) = 1.0011807062129857148380484543421
x2[1] (numeric) = 8.4766607620307926693444554867946e+6538
absolute error = 8.4766607620307926693444554867946e+6538
relative error = 8.4666641191021055889623163698670e+6540 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1739.5MB, alloc=4.6MB, time=128.03
NO POLE
NO POLE
t[1] = 0.83
x1[1] (analytic) = 2.0007848887153787640669057426889
x1[1] (numeric) = 7.5870079604414751267943896034124e+6560
absolute error = 7.5870079604414751267943896034124e+6560
relative error = 3.7920158250059451331579073013980e+6562 %
h = 0.001
x2[1] (analytic) = 1.001182676954785840424661717876
x2[1] (numeric) = -6.7777894095423163662987368430751e+6558
absolute error = 6.7777894095423163662987368430751e+6558
relative error = 6.7697829432664129211516388484046e+6560 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1743.3MB, alloc=4.6MB, time=128.31
NO POLE
NO POLE
t[1] = 0.831
x1[1] (analytic) = 2.0007841042189769609034812345092
x1[1] (numeric) = -6.0664386186989274525394916324660e+6580
absolute error = 6.0664386186989274525394916324660e+6580
relative error = 3.0320305953585198052940499121632e+6582 %
h = 0.001
x2[1] (analytic) = 1.0011846520348508408495660182553
x2[1] (numeric) = 5.4194016452651221110693949812973e+6578
absolute error = 5.4194016452651221110693949812973e+6578
relative error = 5.4129891366697408063611507339743e+6580 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1747.1MB, alloc=4.6MB, time=128.59
memory used=1750.9MB, alloc=4.6MB, time=128.88
NO POLE
NO POLE
t[1] = 0.832
x1[1] (analytic) = 2.000783320506679442059038055958
x1[1] (numeric) = 4.8506180178437988219221040787912e+6600
absolute error = 4.8506180178437988219221040787912e+6600
relative error = 2.4243594836723377478898946473601e+6602 %
h = 0.001
x2[1] (analytic) = 1.0011866314614732873705418478589
x2[1] (numeric) = -4.3332585918578390845680919565505e+6598
absolute error = 4.3332585918578390845680919565505e+6598
relative error = 4.3281227052866290936483633155683e+6600 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1754.7MB, alloc=4.6MB, time=129.16
NO POLE
NO POLE
t[1] = 0.833
x1[1] (analytic) = 2.0007825375777024951707480022887
x1[1] (numeric) = -3.8784691701169925609171697161953e+6620
absolute error = 3.8784691701169925609171697161953e+6620
relative error = 1.9384761198548636021247445795823e+6622 %
h = 0.001
x2[1] (analytic) = 1.0011886152429627454286439794798
x2[1] (numeric) = 3.4647976387421250050428474474356e+6618
absolute error = 3.4647976387421250050428474474356e+6618
relative error = 3.4606842167310379040659567400116e+6620 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1758.6MB, alloc=4.6MB, time=129.44
NO POLE
NO POLE
t[1] = 0.834
x1[1] (analytic) = 2.0007817554312631911964201016243
x1[1] (numeric) = 3.1011559863529944937747360796768e+6640
absolute error = 3.1011559863529944937747360796768e+6640
relative error = 1.5499721436057120387214750336769e+6642 %
h = 0.001
x2[1] (analytic) = 1.0011906033876458082783306546539
x2[1] (numeric) = -2.7703914785953412037679315944739e+6638
absolute error = 2.7703914785953412037679315944739e+6638
relative error = 2.7670969635765625186733604786912e+6640 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1762.4MB, alloc=4.6MB, time=129.72
memory used=1766.2MB, alloc=4.6MB, time=130.01
NO POLE
NO POLE
t[1] = 0.835
x1[1] (analytic) = 2.0007809740665793836315715075221
x1[1] (numeric) = -2.4796299854055346039515205194437e+6660
absolute error = 2.4796299854055346039515205194437e+6660
relative error = 1.2393310499977898662920808738240e+6662 %
h = 0.001
x2[1] (analytic) = 1.0011925959038661306853123878248
x2[1] (numeric) = 2.2151564809597569532265288597917e+6658
absolute error = 2.2151564809597569532265288597917e+6658
relative error = 2.2125178412450573638013559157975e+6660 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1770.0MB, alloc=4.6MB, time=130.30
NO POLE
NO POLE
t[1] = 0.836
x1[1] (analytic) = 2.0007801934828697077272809293125
x1[1] (numeric) = 1.9826686859931400509228909870368e+6680
absolute error = 1.9826686859931400509228909870368e+6680
relative error = 9.9094777749763608701898461666083e+6681 %
h = 0.001
x2[1] (analytic) = 1.0011945927999844626922555692482
x2[1] (numeric) = -1.7712003061841448340078023559204e+6678
absolute error = 1.7712003061841448340078023559204e+6678
relative error = 1.7690869676300676090271879923047e+6680 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1773.8MB, alloc=4.6MB, time=130.59
memory used=1777.6MB, alloc=4.6MB, time=130.88
NO POLE
NO POLE
t[1] = 0.837
x1[1] (analytic) = 2.0007794136793535797088238180636
x1[1] (numeric) = -1.5853071391919257181917221292948e+6700
absolute error = 1.5853071391919257181917221292948e+6700
relative error = 7.9234478741292578988522608595936e+6701 %
h = 0.001
x2[1] (analytic) = 1.0011965940843786834524763205715
x2[1] (numeric) = 1.4162207282383864445953078221353e+6698
absolute error = 1.4162207282383864445953078221353e+6698
relative error = 1.4145281122670603339824152970388e+6700 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1781.4MB, alloc=4.6MB, time=131.16
NO POLE
NO POLE
t[1] = 0.838
x1[1] (analytic) = 2.0007786346552511959950885268082
x1[1] (numeric) = 1.2675838093009470689918821690527e+6720
absolute error = 1.2675838093009470689918821690527e+6720
relative error = 6.3354525450505974528535925151043e+6721 %
h = 0.001
x2[1] (analytic) = 1.0011985997654438351317603285888
x2[1] (numeric) = -1.1323852779887351336246383628586e+6718
absolute error = 1.1323852779887351336246383628586e+6718
relative error = 1.1310296261441287523627820745001e+6720 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1785.3MB, alloc=4.6MB, time=131.44
NO POLE
NO POLE
t[1] = 0.839
x1[1] (analytic) = 2.0007778564097835324187726644484
x1[1] (numeric) = -1.0135378021579550677448728860164e+6740
absolute error = 1.0135378021579550677448728860164e+6740
relative error = 5.0657188098665674802937172381514e+6741 %
h = 0.001
x2[1] (analytic) = 1.0012006098515921568784446547896
x2[1] (numeric) = 9.0543542559262796949986983385483e+6737
absolute error = 9.0543542559262796949986983385483e+6737
relative error = 9.0434965448816551475151646318743e+6739 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1789.1MB, alloc=4.6MB, time=131.72
memory used=1792.9MB, alloc=4.6MB, time=132.00
NO POLE
NO POLE
t[1] = 0.84
x1[1] (analytic) = 2.0007770789421723434473588635347
x1[1] (numeric) = 8.1040706647215342984366324411248e+6759
absolute error = 8.1040706647215342984366324411248e+6759
relative error = 4.0504615681654172922880502609155e+6761 %
h = 0.001
x2[1] (analytic) = 1.0012026243512531188618977909758
x2[1] (numeric) = -7.2397030043891012940861106122889e+6757
absolute error = 7.2397030043891012940861106122889e+6757
relative error = 7.2310068195038885517580482700553e+6759 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1796.7MB, alloc=4.6MB, time=132.28
NO POLE
NO POLE
t[1] = 0.841
x1[1] (analytic) = 2.0007763022516401614048691828943
x1[1] (numeric) = -6.4798728965971851491908280125857e+6779
absolute error = 6.4798728965971851491908280125857e+6779
relative error = 3.2386793512622298914556933146235e+6781 %
h = 0.001
x2[1] (analytic) = 1.0012046432728734563795345044232
x2[1] (numeric) = 5.7887396616335051519648822610951e+6777
absolute error = 5.7887396616335051519648822610951e+6777
relative error = 5.7817746856531630262156175985635e+6779 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1800.5MB, alloc=4.6MB, time=132.56
NO POLE
NO POLE
t[1] = 0.842
x1[1] (analytic) = 2.0007755263374102956943973668652
x1[1] (numeric) = 5.1811928218789265745755876897160e+6799
absolute error = 5.1811928218789265745755876897160e+6799
relative error = 2.5895922624381259467577154612205e+6801 %
h = 0.001
x2[1] (analytic) = 1.0012066666249172040325022898174
x2[1] (numeric) = -4.6285747978685733494255092627141e+6797
absolute error = 4.6285747978685733494255092627141e+6797
relative error = 4.6229963824267859757407862362368e+6799 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1804.3MB, alloc=4.6MB, time=132.84
memory used=1808.1MB, alloc=4.6MB, time=133.12
NO POLE
NO POLE
t[1] = 0.843
x1[1] (analytic) = 2.0007747511987068320214181836646
x1[1] (numeric) = -4.1427909907904003589000707160918e+6819
absolute error = 4.1427909907904003589000707160918e+6819
relative error = 2.0705933980366185180691291524000e+6821 %
h = 0.001
x2[1] (analytic) = 1.0012086944158657299701765194893
x2[1] (numeric) = 3.7009273022685253776717371972366e+6817
absolute error = 3.7009273022685253776717371972366e+6817
relative error = 3.6964594124182611081294578345108e+6819 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1812.0MB, alloc=4.6MB, time=133.40
NO POLE
NO POLE
t[1] = 0.844
x1[1] (analytic) = 2.0007739768347546316178730662048
x1[1] (numeric) = 3.3125030824755441163615759298399e+6839
absolute error = 3.3125030824755441163615759298399e+6839
relative error = 1.6556108390193872155469247303590e+6841 %
h = 0.001
x2[1] (analytic) = 1.0012107266542177702036016583191
x2[1] (numeric) = -2.9591966198718222177088388329198e+6837
absolute error = 2.9591966198718222177088388329198e+6837
relative error = 2.9556181741686657542170337852551e+6839 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1815.8MB, alloc=4.6MB, time=133.68
memory used=1819.6MB, alloc=4.6MB, time=133.96
NO POLE
NO POLE
t[1] = 0.845
x1[1] (analytic) = 2.0007732032447793304670312794398
x1[1] (numeric) = -2.6486194200486353008553244674511e+6859
absolute error = 2.6486194200486353008553244674511e+6859
relative error = 1.3237979275977922673449027230527e+6861 %
h = 0.001
x2[1] (analytic) = 1.0012127633484894629880161850813
x2[1] (numeric) = 2.3661217635086240717577757644683e+6857
absolute error = 2.3661217635086240717577757644683e+6857
relative error = 2.3632556936202923375884575900847e+6859 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1823.4MB, alloc=4.6MB, time=134.24
NO POLE
NO POLE
t[1] = 0.846
x1[1] (analytic) = 2.0007724304280073385291258391038
x1[1] (numeric) = 2.1177896767468326190134048415929e+6879
absolute error = 2.1177896767468326190134048415929e+6879
relative error = 1.0584860349629032164935846280731e+6881 %
h = 0.001
x2[1] (analytic) = 1.0012148045072143832745991379414
x2[1] (numeric) = -1.8919095007589127024972904886345e+6877
absolute error = 1.8919095007589127024972904886345e+6877
relative error = 1.8896139891679760943231123439582e+6879 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1827.2MB, alloc=4.6MB, time=134.52
NO POLE
NO POLE
t[1] = 0.847
x1[1] (analytic) = 2.0007716583836658389677634074786
x1[1] (numeric) = -1.6933475156853970855401504094357e+6899
absolute error = 1.6933475156853970855401504094357e+6899
relative error = 8.4634721238173525359068441747595e+6900 %
h = 0.001
x2[1] (analytic) = 1.0012168501389435772315764783227
x2[1] (numeric) = 1.5127376850438205883481930902904e+6897
absolute error = 1.5127376850438205883481930902904e+6897
relative error = 1.5108991472066124895912090266188e+6899 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1831.0MB, alloc=4.6MB, time=134.80
memory used=1834.8MB, alloc=4.6MB, time=135.08
NO POLE
NO POLE
t[1] = 0.848
x1[1] (analytic) = 2.0007708871109827873771073925989
x1[1] (numeric) = 1.3539710011631563075851917523769e+6919
absolute error = 1.3539710011631563075851917523769e+6919
relative error = 6.7672466142199095201736106671819e+6920 %
h = 0.001
x2[1] (analytic) = 1.0012189002522455968348257444061
x2[1] (numeric) = -1.2095585453922547517394250407101e+6917
absolute error = 1.2095585453922547517394250407101e+6917
relative error = 1.2080860090510880041902231877884e+6919 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1838.7MB, alloc=4.6MB, time=135.36
NO POLE
NO POLE
t[1] = 0.849
x1[1] (analytic) = 2.0007701166091869110098334780787
x1[1] (numeric) = -1.0826114870158480501002425836239e+6939
absolute error = 1.0826114870158480501002425836239e+6939
relative error = 5.4109738946451687349016199322187e+6940 %
h = 0.001
x2[1] (analytic) = 1.0012209548557065345281177431384
x2[1] (numeric) = 9.6714181790813684610728696701262e+6936
absolute error = 9.6714181790813684610728696701262e+6936
relative error = 9.6596242139929932989327270257592e+6938 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1842.5MB, alloc=4.6MB, time=135.65
NO POLE
NO POLE
memory used=1846.3MB, alloc=4.6MB, time=135.94
t[1] = 0.85
x1[1] (analytic) = 2.0007693468775077080058568115141
x1[1] (numeric) = 8.6563717451244848785980021875263e+6958
absolute error = 8.6563717451244848785980021875263e+6958
relative error = 4.3265215746302866677398049085068e+6960 %
h = 0.001
x2[1] (analytic) = 1.001223013957930057953134307785
x2[1] (numeric) = -7.7330965045873107673678019912514e+6956
absolute error = 7.7330965045873107673678019912514e+6956
relative error = 7.7236503723757235677404248171650e+6958 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1850.1MB, alloc=4.6MB, time=136.22
NO POLE
NO POLE
t[1] = 0.851
x1[1] (analytic) = 2.00076857791517544662183008019
x1[1] (numeric) = -6.9214831625643558017487990359023e+6978
absolute error = 6.9214831625643558017487990359023e+6978
relative error = 3.4594121673865066536437610241995e+6980 %
h = 0.001
x2[1] (analytic) = 1.0012250775675374447494014267787
x2[1] (numeric) = 6.1832484587012874617854150140453e+6976
absolute error = 6.1832484587012874617854150140453e+6976
relative error = 6.1756827682776429738727087040681e+6978 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1853.9MB, alloc=4.6MB, time=136.50
NO POLE
NO POLE
t[1] = 0.852
x1[1] (analytic) = 2.0007678097214211644614117035885
x1[1] (numeric) = 5.5342966522486079247975555773426e+6998
absolute error = 5.5342966522486079247975555773426e+6998
relative error = 2.7660864121055511466275697834353e+7000 %
h = 0.001
x2[1] (analytic) = 1.0012271456931676174242773288971
x2[1] (numeric) = -4.9440171190611812530168878267807e+6996
absolute error = 4.9440171190611812530168878267807e+6996
relative error = 4.9379575257504120106034432050779e+6998 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1857.7MB, alloc=4.6MB, time=136.78
memory used=1861.6MB, alloc=4.6MB, time=137.06
NO POLE
NO POLE
t[1] = 0.853
x1[1] (analytic) = 2.0007670422954766677063033729673
x1[1] (numeric) = -4.4251266261467794972667075428556e+7018
absolute error = 4.4251266261467794972667075428556e+7018
relative error = 2.2117150735699040455367870296344e+7020 %
h = 0.001
x2[1] (analytic) = 1.001229218343477178293135389631
x2[1] (numeric) = 3.9531494548262139943147984085468e+7016
absolute error = 3.9531494548262139943147984085468e+7016
relative error = 3.9482961367893923948438853908824e+7018 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1865.4MB, alloc=4.6MB, time=137.35
NO POLE
NO POLE
t[1] = 0.854
x1[1] (analytic) = 2.0007662756365745303480561690449
x1[1] (numeric) = 3.5382537091641146971516920870249e+7038
absolute error = 3.5382537091641146971516920870249e+7038
relative error = 1.7684492947775046427571111112409e+7040 %
h = 0.001
x2[1] (analytic) = 1.001231295527140444489882004006
x2[1] (numeric) = -3.1608690333904580053342107293811e+7036
absolute error = 3.1608690333904580053342107293811e+7036
relative error = 3.1569818557522067732076831446485e+7038 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1869.2MB, alloc=4.6MB, time=137.63
NO POLE
NO POLE
t[1] = 0.855
x1[1] (analytic) = 2.0007655097439480934206444895996
x1[1] (numeric) = -2.8291256653405329942666104483263e+7058
absolute error = 2.8291256653405329942666104483263e+7058
relative error = 1.4140216090103412084498179396673e+7060 %
h = 0.001
x2[1] (analytic) = 1.0012333772528494830479498520702
x2[1] (numeric) = 2.5273754914702436455637256958746e+7056
absolute error = 2.5273754914702436455637256958746e+7056
relative error = 2.5242621239862894347321309063618e+7058 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1873.0MB, alloc=4.6MB, time=137.91
memory used=1876.8MB, alloc=4.6MB, time=138.19
NO POLE
NO POLE
t[1] = 0.856
x1[1] (analytic) = 2.0007647446168314642338070195559
x1[1] (numeric) = 2.2621193074872479326113322924925e+7078
absolute error = 2.2621193074872479326113322924925e+7078
relative error = 1.1306273331602855448932825688492e+7080 %
h = 0.001
x2[1] (analytic) = 1.0012354635293141460519072647833
x2[1] (numeric) = -2.0208451560021975898524080073425e+7076
absolute error = 2.0208451560021975898524080073425e+7076
relative error = 2.0183515562650976131230080151374e+7078 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1880.6MB, alloc=4.6MB, time=138.47
NO POLE
NO POLE
t[1] = 0.857
x1[1] (analytic) = 2.0007639802544595156071539768985
x1[1] (numeric) = -1.8087509593500671807306189010072e+7098
absolute error = 1.8087509593500671807306189010072e+7098
relative error = 9.0403014908336569858709794971668e+7099 %
h = 0.001
x2[1] (analytic) = 1.0012375543652621058598246801185
x2[1] (numeric) = 1.6158323756482575650139117681659e+7096
absolute error = 1.6158323756482575650139117681659e+7096
relative error = 1.6138351668926560593671645288117e+7098 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1884.4MB, alloc=4.6MB, time=138.76
memory used=1888.3MB, alloc=4.6MB, time=139.05
NO POLE
NO POLE
t[1] = 0.858
x1[1] (analytic) = 2.0007632166560678851050398685222
x1[1] (numeric) = 1.4462455725130806346055921546645e+7118
absolute error = 1.4462455725130806346055921546645e+7118
relative error = 7.2284694184363891774767125739739e+7119 %
h = 0.001
x2[1] (analytic) = 1.001239649769438890396539461839
x2[1] (numeric) = -1.2919912534804089068605914223628e+7116
absolute error = 1.2919912534804089068605914223628e+7116
relative error = 1.2903916198064299896095492297222e+7118 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1892.1MB, alloc=4.6MB, time=139.33
NO POLE
NO POLE
t[1] = 0.859
x1[1] (analytic) = 2.0007624538208929742722009908891
x1[1] (numeric) = -1.1563926173480874835268466668325e+7138
absolute error = 1.1563926173480874835268466668325e+7138
relative error = 5.7797596868119109567190944234446e+7139 %
h = 0.001
x2[1] (analytic) = 1.0012417497506079185179606366181
x2[1] (numeric) = 1.0330535668343651243651820247900e+7136
absolute error = 1.0330535668343651243651820247900e+7136
relative error = 1.0317723637589832643102215193303e+7138 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1895.9MB, alloc=4.6MB, time=139.61
NO POLE
NO POLE
t[1] = 0.86
x1[1] (analytic) = 2.0007616917481719478701569111322
x1[1] (numeric) = 9.2463127346587988764899992691464e+7157
absolute error = 9.2463127346587988764899992691464e+7157
relative error = 4.6213963276055148060036458661155e+7159 %
h = 0.001
x2[1] (analytic) = 1.00124385431755053544655538895
x2[1] (numeric) = -8.2601152993439096811680137624751e+7155
absolute error = 8.2601152993439096811680137624751e+7155
relative error = 8.2498536832208752081942744156445e+7157 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1899.7MB, alloc=4.6MB, time=139.89
memory used=1903.5MB, alloc=4.6MB, time=140.17
NO POLE
NO POLE
t[1] = 0.861
x1[1] (analytic) = 2.000760930437142733114375165005
x1[1] (numeric) = -7.3931896403121629292426231752553e+7177
absolute error = 7.3931896403121629292426231752553e+7177
relative error = 3.6951889292924357241011029853939e+7179 %
h = 0.001
x2[1] (analytic) = 1.0012459634790660482781594376444
x2[1] (numeric) = 6.6046434520848926710963556363741e+7175
absolute error = 6.6046434520848926710963556363741e+7175
relative error = 6.5964245480056628504161456581752e+7177 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1907.3MB, alloc=4.6MB, time=140.45
NO POLE
NO POLE
t[1] = 0.862
x1[1] (analytic) = 2.0007601698870440189121984088431
x1[1] (numeric) = 5.9114648861848265756058549031276e+7197
absolute error = 5.9114648861848265756058549031276e+7197
relative error = 2.9546094405300798164590664751837e+7199 %
h = 0.001
x2[1] (analytic) = 1.0012480772439717615602537026122
x2[1] (numeric) = -5.2809571717034788639193542894775e+7195
absolute error = 5.2809571717034788639193542894775e+7195
relative error = 5.2743743451071621521979217241324e+7197 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1911.1MB, alloc=4.6MB, time=140.73
NO POLE
NO POLE
t[1] = 0.863
x1[1] (analytic) = 2.0007594100971152551015332634642
x1[1] (numeric) = -4.7267037369165445802420279700634e+7217
absolute error = 4.7267037369165445802420279700634e+7217
relative error = 2.3624548324314087202141919168917e+7219 %
h = 0.001
x2[1] (analytic) = 1.0012501956211030129418499561319
x2[1] (numeric) = 4.2225608167482259233118116465447e+7215
absolute error = 4.2225608167482259233118116465447e+7215
relative error = 4.2172883812810197787312420614690e+7217 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1915.0MB, alloc=4.6MB, time=141.01
memory used=1918.8MB, alloc=4.6MB, time=141.30
NO POLE
NO POLE
t[1] = 0.864
x1[1] (analytic) = 2.0007586510665966516903000886957
x1[1] (numeric) = 3.7793894824265552550561932243570e+7237
absolute error = 3.7793894824265552550561932243570e+7237
relative error = 1.8889782035488275550052254517345e+7239 %
h = 0.001
x2[1] (analytic) = 1.0012523186193132088951284388431
x2[1] (numeric) = -3.3762856375118099215880868149564e+7235
absolute error = 3.3762856375118099215880868149564e+7235
relative error = 3.3720627405563189169450212301001e+7237 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1922.6MB, alloc=4.6MB, time=141.58
NO POLE
NO POLE
t[1] = 0.865
x1[1] (analytic) = 2.0007578927947291780966429279791
x1[1] (numeric) = -3.0219336042403331932176386580838e+7257
absolute error = 3.0219336042403331932176386580838e+7257
relative error = 1.5103944435871697456055172383549e+7259 %
h = 0.001
x2[1] (analytic) = 1.0012544462474738605089707073401
x2[1] (numeric) = 2.6996188333995575895372769177931e+7255
absolute error = 2.6996188333995575895372769177931e+7255
relative error = 2.6962365495776380520241026081607e+7257 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1926.4MB, alloc=4.6MB, time=141.86
memory used=1930.2MB, alloc=4.6MB, time=142.14
NO POLE
NO POLE
t[1] = 0.866
x1[1] (analytic) = 2.0007571352807545623898988632613
x1[1] (numeric) = 2.4162851568750520193569302697669e+7277
absolute error = 2.4162851568750520193569302697669e+7277
relative error = 1.2076853878299371086796404134477e+7279 %
h = 0.001
x2[1] (analytic) = 1.0012565785144746193545312674411
x2[1] (numeric) = -2.1585679140040164206985084377229e+7275
absolute error = 2.1585679140040164206985084377229e+7275
relative error = 2.1558589080199598245364677858972e+7277 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1934.0MB, alloc=4.6MB, time=142.42
NO POLE
NO POLE
t[1] = 0.867
x1[1] (analytic) = 2.0007563785239152905323260211429
x1[1] (numeric) = -1.9320192710859991436752803508527e+7297
absolute error = 1.9320192710859991436752803508527e+7297
relative error = 9.6564443918523060520696000123338e+7298 %
h = 0.001
x2[1] (analytic) = 1.0012587154292233134229918349809
x2[1] (numeric) = 1.7259530796427931044668903261262e+7295
absolute error = 1.7259530796427931044668903261262e+7295
relative error = 1.7237833269724949292855318818543e+7297 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1937.8MB, alloc=4.6MB, time=142.70
NO POLE
NO POLE
t[1] = 0.868
x1[1] (analytic) = 2.0007556225234546056215894720095
x1[1] (numeric) = 1.5448087545573977058161256782150e+7317
absolute error = 1.5448087545573977058161256782150e+7317
relative error = 7.7211266441875917196216652083335e+7318 %
h = 0.001
x2[1] (analytic) = 1.00126085700064598313564235433
x2[1] (numeric) = -1.3800418387590740813894908149320e+7315
absolute error = 1.3800418387590740813894908149320e+7315
relative error = 1.3783039945185670233918305753279e+7317 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1941.7MB, alloc=4.6MB, time=142.99
memory used=1945.5MB, alloc=4.6MB, time=143.27
NO POLE
NO POLE
t[1] = 0.869
x1[1] (analytic) = 2.0007548672786165071340042646342
x1[1] (numeric) = -1.2352020105967938411634604707899e+7337
absolute error = 1.2352020105967938411634604707899e+7337
relative error = 6.1736798985119496311327935252879e+7338 %
h = 0.001
x2[1] (analytic) = 1.0012630032376869174264331937684
x2[1] (numeric) = 1.1034572719205604198407295509344e+7335
absolute error = 1.1034572719205604198407295509344e+7335
relative error = 1.1020653598029866501186448767180e+7337 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1949.3MB, alloc=4.6MB, time=143.55
NO POLE
NO POLE
t[1] = 0.87
x1[1] (analytic) = 2.0007541127886457501685348394924
x1[1] (numeric) = 9.8764588333751146981560107921265e+7356
absolute error = 9.8764588333751146981560107921265e+7356
relative error = 4.9363681275203441656701107493645e+7358 %
h = 0.001
x2[1] (analytic) = 1.0012651541493086898971432263494
x2[1] (numeric) = -8.8230509884340962043625941427169e+7354
absolute error = 8.8230509884340962043625941427169e+7354
relative error = 8.8119025733301436510766710703676e+7356 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1953.1MB, alloc=4.6MB, time=143.83
NO POLE
NO POLE
memory used=1956.9MB, alloc=4.6MB, time=144.11
t[1] = 0.871
x1[1] (analytic) = 2.0007533590527878446915500647891
x1[1] (numeric) = -7.8970434188513231839230702172388e+7376
absolute error = 7.8970434188513231839230702172388e+7376
relative error = 3.9470349421729836098221047482167e+7378 %
h = 0.001
x2[1] (analytic) = 1.0012673097444921950453087949757
x2[1] (numeric) = 7.0547569648090688687641841963897e+7374
absolute error = 7.0547569648090688687641841963897e+7374
relative error = 7.0458277186831684770112389875748e+7376 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1960.7MB, alloc=4.6MB, time=144.39
NO POLE
NO POLE
t[1] = 0.872
x1[1] (analytic) = 2.0007526060702890547823331399536
x1[1] (numeric) = 6.3143375385195000688045505349737e+7396
absolute error = 6.3143375385195000688045505349737e+7396
relative error = 3.1559811639688895828824574561720e+7398 %
h = 0.001
x2[1] (analytic) = 1.0012694700322366845650588510736
x2[1] (numeric) = -5.6408600491784203018486630914460e+7394
absolute error = 5.6408600491784203018486630914460e+7394
relative error = 5.6337082254158895175884605723085e+7396 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1964.6MB, alloc=4.6MB, time=144.68
NO POLE
NO POLE
t[1] = 0.873
x1[1] (analytic) = 2.0007518538403963978793456121116
x1[1] (numeric) = -5.0488336502214618920508157716077e+7416
absolute error = 5.0488336502214618920508157716077e+7416
relative error = 2.5234681854875424767650867243946e+7418 %
h = 0.001
x2[1] (analytic) = 1.0012716350215598037210018474988
x2[1] (numeric) = 4.5103328510308693900962056644954e+7414
absolute error = 4.5103328510308693900962056644954e+7414
relative error = 4.5046046380148889349690706875265e+7416 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1968.4MB, alloc=4.6MB, time=144.95
memory used=1972.2MB, alloc=4.6MB, time=145.24
NO POLE
NO POLE
t[1] = 0.874
x1[1] (analytic) = 2.0007511023623576440272447517979
x1[1] (numeric) = 4.0369589164511608297157167113917e+7436
absolute error = 4.0369589164511608297157167113917e+7436
relative error = 2.0177217004576833905626030785329e+7438 %
h = 0.001
x2[1] (analytic) = 1.0012738047214976277953102581398
x2[1] (numeric) = -3.6063831135202834538161475758701e+7434
absolute error = 3.6063831135202834538161475758701e+7434
relative error = 3.6017951298779777242674025193436e+7436 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1976.0MB, alloc=4.6MB, time=145.51
NO POLE
NO POLE
t[1] = 0.875
x1[1] (analytic) = 2.0007503516354213151246535349282
x1[1] (numeric) = -3.2278816103199751403193272225129e+7456
absolute error = 3.2278816103199751403193272225129e+7456
relative error = 1.6133355206867722608872458539509e+7458 %
h = 0.001
x2[1] (analytic) = 1.0012759791411046986081488890957
x2[1] (numeric) = 2.8836007432381931531814804742886e+7454
absolute error = 2.8836007432381931531814804742886e+7454
relative error = 2.8799260177116683435771398379296e+7456 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1979.8MB, alloc=4.6MB, time=145.79
NO POLE
NO POLE
t[1] = 0.876
x1[1] (analytic) = 2.0007496016588366841726824787984
x1[1] (numeric) = 2.5809575737276214781934677076743e+7476
absolute error = 2.5809575737276214781934677076743e+7476
relative error = 1.2899952955570901823562452350911e+7478 %
h = 0.001
x2[1] (analytic) = 1.001278158289454061111593439306
x2[1] (numeric) = -2.3056766252122406048132501914455e+7474
absolute error = 2.3056766252122406048132501914455e+7474
relative error = 2.3027333674702060962582425613002e+7476 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1983.6MB, alloc=4.6MB, time=146.07
memory used=1987.4MB, alloc=4.6MB, time=146.35
NO POLE
NO POLE
t[1] = 0.877
x1[1] (analytic) = 2.000748852431853774524202580635
x1[1] (numeric) = -2.0636884500611042103825877197750e+7496
absolute error = 2.0636884500611042103825877197750e+7496
relative error = 1.0314580201071959286252457224871e+7498 %
h = 0.001
x2[1] (analytic) = 1.0012803421756373000571860620944
x2[1] (numeric) = 1.8435786273519417044503266826846e+7494
absolute error = 1.8435786273519417044503266826846e+7494
relative error = 1.8412212341511789892665780722652e+7496 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1991.3MB, alloc=4.6MB, time=146.63
NO POLE
NO POLE
t[1] = 0.878
x1[1] (analytic) = 2.0007481039537233591338686079677
x1[1] (numeric) = 1.6500891228385032889956971651656e+7516
absolute error = 1.6500891228385032889956971651656e+7516
relative error = 8.2473606726290282856605326200314e+7517 %
h = 0.001
x2[1] (analytic) = 1.0012825308087645767372749732617
x2[1] (numeric) = -1.4740931655652306023887308917429e+7514
absolute error = 1.4740931655652306023887308917429e+7514
relative error = 1.4722050172737592203100022380861e+7516 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1995.1MB, alloc=4.6MB, time=146.91
memory used=1998.9MB, alloc=4.6MB, time=147.20
NO POLE
NO POLE
t[1] = 0.879
x1[1] (analytic) = 2.0007473562236969598088919908488
x1[1] (numeric) = -1.3193823482557754199701212848490e+7536
absolute error = 1.3193823482557754199701212848490e+7536
relative error = 6.5944475405732318424994364800143e+7537 %
h = 0.001
x2[1] (analytic) = 1.0012847241979646658002854461236
x2[1] (numeric) = 1.1786590647816742563888038297027e+7534
absolute error = 1.1786590647816742563888038297027e+7534
relative error = 1.1771467558598654824450466257779e+7536 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2002.7MB, alloc=4.6MB, time=147.48
NO POLE
NO POLE
t[1] = 0.88
x1[1] (analytic) = 2.0007466092410268464605625666915
x1[1] (numeric) = 1.0549550062450148131503343873499e+7556
absolute error = 1.0549550062450148131503343873499e+7556
relative error = 5.2728066681327861084916987385649e+7557 %
h = 0.001
x2[1] (analytic) = 1.0012869223523849921400698292401
x2[1] (numeric) = -9.4243513466078503424214811150787e+7553
absolute error = 9.4243513466078503424214811150787e+7553
relative error = 9.4122385264621669983757642306295e+7555 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2006.5MB, alloc=4.6MB, time=147.77
NO POLE
NO POLE
t[1] = 0.881
x1[1] (analytic) = 2.0007458630049660363565184292485
x1[1] (numeric) = -8.4352353711015895481360415338462e+7575
absolute error = 8.4352353711015895481360415338462e+7575
relative error = 4.2160453894091858049497331978417e+7577 %
h = 0.001
x2[1] (analytic) = 1.0012891252811916678594845185259
x2[1] (numeric) = 7.5355461946717594172649654073589e+7573
absolute error = 7.5355461946717594172649654073589e+7573
relative error = 7.5258444383439744914796689888182e+7575 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2010.3MB, alloc=4.6MB, time=148.05
memory used=2014.1MB, alloc=4.6MB, time=148.34
NO POLE
NO POLE
t[1] = 0.882
x1[1] (analytic) = 2.0007451175147682933737631340021
x1[1] (numeric) = 6.7446663928487903094969102330255e+7595
absolute error = 6.7446663928487903094969102330255e+7595
relative error = 3.3710772720648687282663985461255e+7597 %
h = 0.001
x2[1] (analytic) = 1.0012913329935695293083421119616
x2[1] (numeric) = -6.0252906925494370109729839719604e+7593
absolute error = 6.0252906925494370109729839719604e+7593
relative error = 6.0175200703431360844724185996122e+7595 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2018.0MB, alloc=4.6MB, time=148.62
NO POLE
NO POLE
t[1] = 0.883
x1[1] (analytic) = 2.0007443727696881272524295129808
x1[1] (numeric) = -5.3929170615286733302397586317403e+7615
absolute error = 5.3929170615286733302397586317403e+7615
relative error = 2.6954553189936517155780532888844e+7617 %
h = 0.001
x2[1] (analytic) = 1.0012935454987221741958872722594
x2[1] (numeric) = 4.8177168571261402066222764446673e+7613
absolute error = 4.8177168571261402066222764446673e+7613
relative error = 4.8114929720500115382979555908074e+7615 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2021.8MB, alloc=4.6MB, time=148.90
NO POLE
NO POLE
t[1] = 0.884
x1[1] (analytic) = 2.0007436287689807928502893527685
x1[1] (numeric) = 4.3120819827891951820681195907004e+7635
absolute error = 4.3120819827891951820681195907004e+7635
relative error = 2.1552396422935689055483709163653e+7637 %
h = 0.001
x2[1] (analytic) = 1.0012957628058719987779451205506
x2[1] (numeric) = -3.8521619785312847251631182771071e+7633
absolute error = 3.8521619785312847251631182771071e+7633
relative error = 3.8471769497322136344266092825328e+7635 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2025.6MB, alloc=4.6MB, time=149.18
memory used=2029.4MB, alloc=4.6MB, time=149.47
NO POLE
NO POLE
t[1] = 0.885
x1[1] (analytic) = 2.0007428855119022893980081902137
x1[1] (numeric) = -3.4478651932066868106553283904004e+7655
absolute error = 3.4478651932066868106553283904004e+7655
relative error = 1.7232924920907712930098280188298e+7657 %
h = 0.001
x2[1] (analytic) = 1.0012979849242602351188912824855
x2[1] (numeric) = 3.0801212169396560685191229832136e+7653
absolute error = 3.0801212169396560685191229832136e+7653
relative error = 3.0761284485883004288271793367282e+7655 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2033.2MB, alloc=4.6MB, time=149.75
NO POLE
NO POLE
t[1] = 0.886
x1[1] (analytic) = 2.0007421429977093597551444810955
x1[1] (numeric) = 2.7568525918509517304681237283153e+7675
absolute error = 2.7568525918509517304681237283153e+7675
relative error = 1.3779149909444917600260549462692e+7677 %
h = 0.001
x2[1] (analytic) = 1.0013002118631469884285930070474
x2[1] (numeric) = -2.4628109523730349227024453269274e+7673
absolute error = 2.4628109523730349227024453269274e+7673
relative error = 2.4596129344569042796555987926250e+7675 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2037.0MB, alloc=4.6MB, time=150.03
memory used=2040.8MB, alloc=4.6MB, time=150.31
NO POLE
NO POLE
t[1] = 0.887
x1[1] (analytic) = 2.0007414012256594896668923977435
x1[1] (numeric) = -2.2043310243596592085741065044034e+7695
absolute error = 2.2043310243596592085741065044034e+7695
relative error = 1.1017570901513209931690112753497e+7697 %
h = 0.001
x2[1] (analytic) = 1.001302443631811274474471077897
x2[1] (numeric) = 1.9692204818987829452653994065181e+7693
absolute error = 1.9692204818987829452653994065181e+7693
relative error = 1.9666590193830432947143876125597e+7695 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2044.7MB, alloc=4.6MB, time=150.59
NO POLE
NO POLE
t[1] = 0.888
x1[1] (analytic) = 2.0007406601950109070215675123559
x1[1] (numeric) = 1.7625444607802261054065167640643e+7715
absolute error = 1.7625444607802261054065167640643e+7715
relative error = 8.8094598957589637276742746536568e+7716 %
h = 0.001
x2[1] (analytic) = 1.0013046802395510570688325371707
x2[1] (numeric) = -1.5745541908497697912274058075876e+7713
absolute error = 1.5745541908497697912274058075876e+7713
relative error = 1.5725025778098581707114264118245e+7715 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2048.5MB, alloc=4.6MB, time=150.88
NO POLE
NO POLE
t[1] = 0.889
x1[1] (analytic) = 2.0007399199050225811088346235008
x1[1] (numeric) = -1.4092996659290271810737943464775e+7735
absolute error = 1.4092996659290271810737943464775e+7735
relative error = 7.0438923715578597177866469599386e+7736 %
h = 0.001
x2[1] (analytic) = 1.0013069216956832856316245423744
x2[1] (numeric) = 1.2589859402295228209846981548212e+7733
absolute error = 1.2589859402295228209846981548212e+7733
relative error = 1.2573426917867179368049161810086e+7735 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2052.3MB, alloc=4.6MB, time=151.16
memory used=2056.1MB, alloc=4.7MB, time=151.44
NO POLE
NO POLE
t[1] = 0.89
x1[1] (analytic) = 2.0007391803549542218786769840286
x1[1] (numeric) = 1.1268513178433347439623570743344e+7755
absolute error = 1.1268513178433347439623570743344e+7755
relative error = 5.6321749926615537901441234659285e+7756 %
h = 0.001
x2[1] (analytic) = 1.0013091680095439328287599783212
x2[1] (numeric) = -1.0066630967081442395986454023051e+7753
absolute error = 1.0066630967081442395986454023051e+7753
relative error = 1.0053469286706353976395557269709e+7755 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2059.9MB, alloc=4.7MB, time=151.72
NO POLE
NO POLE
t[1] = 0.891
x1[1] (analytic) = 2.000738441544066279201106189364
x1[1] (numeric) = -9.0101056803146044555891335045579e+7774
absolute error = 9.0101056803146044555891335045579e+7774
relative error = 4.5033900949896637502637912195079e+7776 %
h = 0.001
x2[1] (analytic) = 1.0013114191904880322861657479845
x2[1] (numeric) = 8.0491017245934081549568124591331e+7772
absolute error = 8.0491017245934081549568124591331e+7772
relative error = 8.0385598030038631924040191061379e+7774 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2063.7MB, alloc=4.7MB, time=152.00
NO POLE
NO POLE
memory used=2067.6MB, alloc=4.7MB, time=152.28
t[1] = 0.892
x1[1] (analytic) = 2.0007377034716199421266119858887
x1[1] (numeric) = 7.2043226186938862559831956111056e+7794
absolute error = 7.2043226186938862559831956111056e+7794
relative error = 3.6008331357944432863382859488722e+7796 %
h = 0.001
x2[1] (analytic) = 1.0013136752478897163797049686521
x2[1] (numeric) = -6.4359206952866161007793564794635e+7792
absolute error = 6.4359206952866161007793564794635e+7792
relative error = 6.4274770777432063243723682895561e+7794 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2071.4MB, alloc=4.7MB, time=152.56
NO POLE
NO POLE
t[1] = 0.893
x1[1] (analytic) = 2.0007369661368771381473512598636
x1[1] (numeric) = -5.7604501251989834092038134631668e+7814
absolute error = 5.7604501251989834092038134631668e+7814
relative error = 2.8791641393628809783041419089433e+7816 %
h = 0.001
x2[1] (analytic) = 1.0013159361911422541011246028976
x2[1] (numeric) = 5.1460494118815353571885196146807e+7812
absolute error = 5.1460494118815353571885196146807e+7812
relative error = 5.1392864388599928991777067664697e+7814 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2075.2MB, alloc=4.7MB, time=152.84
NO POLE
NO POLE
t[1] = 0.894
x1[1] (analytic) = 2.0007362295391005324590754680795
x1[1] (numeric) = 4.6059549802505769429173049157079e+7834
absolute error = 4.6059549802505769429173049157079e+7834
relative error = 2.3021300420553825096227686716570e+7836 %
h = 0.001
x2[1] (analytic) = 1.0013182020296580890001803576155
x2[1] (numeric) = -4.1146909359713543302242549171682e+7832
absolute error = 4.1146909359713543302242549171682e+7832
relative error = 4.1092740825353348702616388382264e+7834 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2079.0MB, alloc=4.7MB, time=153.12
memory used=2082.8MB, alloc=4.7MB, time=153.41
NO POLE
NO POLE
t[1] = 0.895
x1[1] (analytic) = 2.0007354936775535272237957721639
x1[1] (numeric) = -3.6828408924662408043904231953468e+7854
absolute error = 3.6828408924662408043904231953468e+7854
relative error = 1.8407435186231479228488743160773e+7856 %
h = 0.001
x2[1] (analytic) = 1.0013204727728688772030909887061
x2[1] (numeric) = 3.2900347710370124861182067524790e+7852
absolute error = 3.2900347710370124861182067524790e+7852
relative error = 3.2856960987986274102754340445216e+7854 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2086.6MB, alloc=4.7MB, time=153.69
NO POLE
NO POLE
t[1] = 0.896
x1[1] (analytic) = 2.0007347585515002608331851392094
x1[1] (numeric) = 2.9447350435204762594458988948563e+7874
absolute error = 2.9447350435204762594458988948563e+7874
relative error = 1.4718268030952873532462391973585e+7876 %
h = 0.001
x2[1] (analytic) = 1.0013227484302255255074744539455
x2[1] (numeric) = -2.6306541519326213675339660049646e+7872
absolute error = 2.6306541519326213675339660049646e+7872
relative error = 2.6271790549617493340027637986819e+7874 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2090.4MB, alloc=4.7MB, time=153.97
NO POLE
NO POLE
t[1] = 0.897
x1[1] (analytic) = 2.0007340241602056071727166721245
x1[1] (numeric) = -2.3545585404670123723224400866495e+7894
absolute error = 2.3545585404670123723224400866495e+7894
relative error = 1.1768473530385040463425947581716e+7896 %
h = 0.001
x2[1] (analytic) = 1.0013250290111982295539186621371
x2[1] (numeric) = 2.1034249631650736004482775686093e+7892
absolute error = 2.1034249631650736004482775686093e+7892
relative error = 2.1006415521663247410313350510140e+7894 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2094.3MB, alloc=4.7MB, time=154.25
memory used=2098.1MB, alloc=4.7MB, time=154.54
NO POLE
NO POLE
t[1] = 0.898
x1[1] (analytic) = 2.0007332905029351748865374338462
x1[1] (numeric) = 1.8826637502361755786582357446945e+7914
absolute error = 1.8826637502361755786582357446945e+7914
relative error = 9.4098686675169991511588966011401e+7915 %
h = 0.001
x2[1] (analytic) = 1.0013273145252765120743398728068
x2[1] (numeric) = -1.6818617424170293507508697813689e+7912
absolute error = 1.6818617424170293507508697813689e+7912
relative error = 1.6796323420123521493905505595286e+7914 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2101.9MB, alloc=4.7MB, time=154.82
NO POLE
NO POLE
t[1] = 0.899
x1[1] (analytic) = 2.0007325575789553066430770302881
x1[1] (numeric) = -1.5053449449383094069543984371020e+7934
absolute error = 1.5053449449383094069543984371020e+7934
relative error = 7.5239688544874578027977965366388e+7935 %
h = 0.001
x2[1] (analytic) = 1.0013296049819692612172821074908
x2[1] (numeric) = 1.3447871781219595250579975987679e+7932
absolute error = 1.3447871781219595250579975987679e+7932
relative error = 1.3430015166146763778035612881057e+7934 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2105.7MB, alloc=4.7MB, time=155.10
memory used=2109.5MB, alloc=4.7MB, time=155.39
NO POLE
NO POLE
t[1] = 0.9
x1[1] (analytic) = 2.0007318253875330784013902176314
x1[1] (numeric) = 1.2036474399462196314044429418376e+7954
absolute error = 1.2036474399462196314044429418376e+7954
relative error = 6.0160358558452897199531286807740e+7955 %
h = 0.001
x2[1] (analytic) = 1.0013319003908047689503112410625
x2[1] (numeric) = -1.0752682630394267387184887146974e+7952
absolute error = 1.0752682630394267387184887146974e+7952
relative error = 1.0738380177639059739295284834337e+7954 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2113.3MB, alloc=4.7MB, time=155.67
NO POLE
NO POLE
t[1] = 0.901
x1[1] (analytic) = 2.0007310939279362986782328003031
x1[1] (numeric) = -9.6241540157326556865514339873079e+7973
absolute error = 9.6241540157326556865514339873079e+7973
relative error = 4.8103186105025391534007054211108e+7975 %
h = 0.001
x2[1] (analytic) = 1.0013342007613307695396577495512
x2[1] (numeric) = 8.5976566129556687296429615118595e+7971
absolute error = 8.5976566129556687296429615118595e+7971
relative error = 8.5862008971817099557465534335574e+7973 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2117.1MB, alloc=4.7MB, time=155.95
NO POLE
NO POLE
t[1] = 0.902
x1[1] (analytic) = 2.0007303631994335078158700867156
x1[1] (numeric) = 7.6953049077794379643399306421399e+7993
absolute error = 7.6953049077794379643399306421399e+7993
relative error = 3.8462478749378420158017768907431e+7995 %
h = 0.001
x2[1] (analytic) = 1.0013365061031144781072623995407
x2[1] (numeric) = -6.8745355717422431272414315738353e+7991
absolute error = 6.8745355717422431272414315738353e+7991
relative error = 6.8653599762339286132783644205081e+7993 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2121.0MB, alloc=4.7MB, time=156.23
memory used=2124.8MB, alloc=4.7MB, time=156.51
NO POLE
NO POLE
t[1] = 0.903
x1[1] (analytic) = 2.0007296332012939772506171705773
x1[1] (numeric) = -6.1530309601125238341822579332429e+8013
absolute error = 6.1530309601125238341822579332429e+8013
relative error = 3.0753935254446574390467408647492e+8015 %
h = 0.001
x2[1] (analytic) = 1.0013388164257426292653794734752
x2[1] (numeric) = 5.4967581812857321515913125418076e+8011
absolute error = 5.4967581812857321515913125418076e+8011
relative error = 5.4894088705222596563583815739543e+8013 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2128.6MB, alloc=4.7MB, time=156.79
NO POLE
NO POLE
t[1] = 0.904
x1[1] (analytic) = 2.0007289039327877087821103063132
x1[1] (numeric) = 4.9198557366881635026401414976386e+8033
absolute error = 4.9198557366881635026401414976386e+8033
relative error = 2.4590316694167380586405487115020e+8035 %
h = 0.001
x2[1] (analytic) = 1.0013411317388215158288924350689
x2[1] (numeric) = -4.3951115225481736799175543164080e+8031
absolute error = 4.3951115225481736799175543164080e+8031
relative error = 4.3892249936004274819223677595600e+8033 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2132.4MB, alloc=4.7MB, time=157.08
NO POLE
NO POLE
t[1] = 0.905
x1[1] (analytic) = 2.0007281753931854338433086478683
x1[1] (numeric) = -3.9338304368585173386215635906279e+8053
absolute error = 3.9338304368585173386215635906279e+8053
relative error = 1.9661993494370800243220016933064e+8055 %
h = 0.001
x2[1] (analytic) = 1.0013434520519770276054972494966
x2[1] (numeric) = 3.5142541582786776036532316915395e+8051
absolute error = 3.5142541582786776036532316915395e+8051
relative error = 3.5095392605575875724852231399638e+8053 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2136.2MB, alloc=4.7MB, time=157.36
memory used=2140.0MB, alloc=4.7MB, time=157.64
NO POLE
NO POLE
t[1] = 0.906
x1[1] (analytic) = 2.0007274475817586127712256208943
x1[1] (numeric) = 3.1454218851489325108898794819502e+8073
absolute error = 3.1454218851489325108898794819502e+8073
relative error = 1.5721391181746141349443075949480e+8075 %
h = 0.001
x2[1] (analytic) = 1.0013457773748546902639088841506
x2[1] (numeric) = -2.8099360449945469749378780004299e+8071
absolute error = 2.8099360449945469749378780004299e+8071
relative error = 2.8061595789230006361225165679051e+8073 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2143.8MB, alloc=4.7MB, time=157.92
NO POLE
NO POLE
t[1] = 0.907
x1[1] (analytic) = 2.0007267204977794340783891990514
x1[1] (numeric) = -2.5150242224153335320087641996678e+8093
absolute error = 2.5150242224153335320087641996678e+8093
relative error = 1.2570553472638168358358149205957e+8095 %
h = 0.001
x2[1] (analytic) = 1.0013481077171197042802468274756
x2[1] (numeric) = 2.2467756233166191717983786226029e+8091
absolute error = 2.2467756233166191717983786226029e+8091
relative error = 2.2437508055403766371235553987439e+8093 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2147.7MB, alloc=4.7MB, time=158.19
memory used=2151.5MB, alloc=4.7MB, time=158.49
NO POLE
NO POLE
t[1] = 0.908
x1[1] (analytic) = 2.0007259941405208137250303558853
x1[1] (numeric) = 2.0109692976960877105889007391264e+8113
absolute error = 2.0109692976960877105889007391264e+8113
relative error = 1.0051197933078123737028592950209e+8115 %
h = 0.001
x2[1] (analytic) = 1.0013504430884569839627557757455
x2[1] (numeric) = -1.7964824183532543235137160764106e+8111
absolute error = 1.7964824183532543235137160764106e+8111
relative error = 1.7940596429082093275238679353374e+8113 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2155.3MB, alloc=4.7MB, time=158.77
NO POLE
NO POLE
t[1] = 0.909
x1[1] (analytic) = 2.0007252685092563943919989644679
x1[1] (numeric) = -1.6079358124004845378795184977031e+8133
absolute error = 1.6079358124004845378795184977031e+8133
relative error = 8.0367646558418292478845829007281e+8134 %
h = 0.001
x2[1] (analytic) = 1.0013527834985711965550179506235
x2[1] (numeric) = 1.4364358621125888696144895647647e+8131
absolute error = 1.4364358621125888696144895647647e+8131
relative error = 1.4344953005412387525876522886541e+8133 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2159.1MB, alloc=4.7MB, time=159.05
NO POLE
NO POLE
t[1] = 0.91
x1[1] (analytic) = 2.000724543603260544754406417717
x1[1] (numeric) = 1.2856772998782696169376176428185e+8153
absolute error = 1.2856772998782696169376176428185e+8153
relative error = 6.4260585195940731788294763750203e+8154 %
h = 0.001
x2[1] (analytic) = 1.0013551289571868014178138239487
x2[1] (numeric) = -1.1485489448065427954804723316738e+8151
absolute error = 1.1485489448065427954804723316738e+8151
relative error = 1.1469946191843486367006074022439e+8153 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2162.9MB, alloc=4.7MB, time=159.33
memory used=2166.7MB, alloc=4.7MB, time=159.63
NO POLE
NO POLE
t[1] = 0.911
x1[1] (analytic) = 2.0007238194218083587559942430391
x1[1] (numeric) = -1.0280050401729455952412865096777e+8173
absolute error = 1.0280050401729455952412865096777e+8173
relative error = 5.1381656488201856775453295528478e+8174 %
h = 0.001
x2[1] (analytic) = 1.0013574794740480892897883404229
x2[1] (numeric) = 9.1835961034564160603078937506428e+8170
absolute error = 9.1835961034564160603078937506428e+8170
relative error = 9.1711464603829574075279336590505e+8172 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2170.5MB, alloc=4.7MB, time=159.90
NO POLE
NO POLE
t[1] = 0.912
x1[1] (analytic) = 2.0007230959641756548842279856615
x1[1] (numeric) = 8.2197481648080649507884699245209e+8192
absolute error = 8.2197481648080649507884699245209e+8192
relative error = 4.1083887027589175616463440250503e+8194 %
h = 0.001
x2[1] (analytic) = 1.0013598350589192216270800437313
x2[1] (numeric) = -7.3430425209807243262548334787006e+8190
absolute error = 7.3430425209807243262548334787006e+8190
relative error = 7.3330707542795198144494974932771e+8192 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2174.4MB, alloc=4.7MB, time=160.18
NO POLE
NO POLE
memory used=2178.2MB, alloc=4.7MB, time=160.46
t[1] = 0.913
x1[1] (analytic) = 2.0007223732296389754461156357498
x1[1] (numeric) = -6.5723665986597627140460224176582e+8212
absolute error = 6.5723665986597627140460224176582e+8212
relative error = 3.2849968024551097544938910388045e+8214 %
h = 0.001
x2[1] (analytic) = 1.0013621957215842700220708271181
x2[1] (numeric) = 5.8713681282909491372919019030179e+8210
absolute error = 5.8713681282909491372919019030179e+8210
relative error = 5.8633810557028524512564807886045e+8212 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2182.0MB, alloc=4.7MB, time=160.75
NO POLE
NO POLE
t[1] = 0.914
x1[1] (analytic) = 2.0007216512174755858447498751274
x1[1] (numeric) = 5.2551491652891954223141100462360e+8232
absolute error = 5.2551491652891954223141100462360e+8232
relative error = 2.6266268284203059359044576569296e+8234 %
h = 0.001
x2[1] (analytic) = 1.0013645614718472557014143455623
x2[1] (numeric) = -4.6946430719165456641672712978182e+8230
absolute error = 4.6946430719165456641672712978182e+8230
relative error = 4.6882456725012957688878138110108e+8232 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2185.8MB, alloc=4.7MB, time=161.03
NO POLE
NO POLE
t[1] = 0.915
x1[1] (analytic) = 2.0007209299269634738565734201404
x1[1] (numeric) = -4.2019251870507807945086124056075e+8252
absolute error = 4.2019251870507807945086124056075e+8252
relative error = 2.1002055430110247867289050321308e+8254 %
h = 0.001
x2[1] (analytic) = 1.0013669323195321891035014434441
x2[1] (numeric) = 3.7537543364887559234147995737211e+8250
absolute error = 3.7537543364887559234147995737211e+8250
relative error = 3.7486302126970455076023904401229e+8252 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2189.6MB, alloc=4.7MB, time=161.31
memory used=2193.4MB, alloc=4.7MB, time=161.59
NO POLE
NO POLE
t[1] = 0.916
x1[1] (analytic) = 2.0007202093573813489093667379328
x1[1] (numeric) = 3.3597857496020485479758413253577e+8272
absolute error = 3.3597857496020485479758413253577e+8272
relative error = 1.6792881552794383164220607676864e+8274 %
h = 0.001
x2[1] (analytic) = 1.0013693082744831095355212689898
x2[1] (numeric) = -3.0014361907508659038712723534636e+8270
absolute error = 3.0014361907508659038712723534636e+8270
relative error = 2.9973319193523244256826913709346e+8272 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2197.3MB, alloc=4.7MB, time=161.87
NO POLE
NO POLE
t[1] = 0.917
x1[1] (analytic) = 2.0007194895080086413609574141192
x1[1] (numeric) = -2.6864258121529902497104211835184e+8292
absolute error = 2.6864258121529902497104211835184e+8292
relative error = 1.3427298660511383036480243318451e+8294 %
h = 0.001
x2[1] (analytic) = 1.001371689346564124910277064794
x2[1] (numeric) = 2.3998957842232393270498460152950e+8290
absolute error = 2.3998957842232393270498460152950e+8290
relative error = 2.3966083820377119133595871089333e+8292 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2201.1MB, alloc=4.7MB, time=162.15
NO POLE
NO POLE
t[1] = 0.918
x1[1] (analytic) = 2.0007187703781255017786504505652
x1[1] (numeric) = 2.1480190053954066975279001715481e+8312
absolute error = 2.1480190053954066975279001715481e+8312
relative error = 1.0736236582562986666178509969139e+8314 %
h = 0.001
x2[1] (analytic) = 1.0013740755456594515629159423831
x2[1] (numeric) = -1.9189146159031384699028952322406e+8310
absolute error = 1.9189146159031384699028952322406e+8310
relative error = 1.9162815003549011965174733863028e+8312 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2204.9MB, alloc=4.7MB, time=162.43
memory used=2208.7MB, alloc=4.7MB, time=162.72
NO POLE
NO POLE
t[1] = 0.919
x1[1] (analytic) = 2.0007180519670128002193787727045
x1[1] (numeric) = -1.7175183571669421797528409789722e+8332
absolute error = 1.7175183571669421797528409789722e+8332
relative error = 8.5845097237882075823873742622727e+8333 %
h = 0.001
x2[1] (analytic) = 1.001376466881673454147732268077
x2[1] (numeric) = 1.5343305019048971068275204611718e+8330
absolute error = 1.5343305019048971068275204611718e+8330
relative error = 1.5322214498238249276392546015258e+8332 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2212.5MB, alloc=4.7MB, time=163.00
NO POLE
NO POLE
t[1] = 0.92
x1[1] (analytic) = 2.0007173342739521255105732265448
x1[1] (numeric) = 1.3732975824682803045251613349203e+8352
absolute error = 1.3732975824682803045251613349203e+8352
relative error = 6.8640260117836258671429224968021e+8353 %
h = 0.001
x2[1] (analytic) = 1.0013788633645306856152046073395
x2[1] (numeric) = -1.2268237833853496966544043162733e+8350
absolute error = 1.2268237833853496966544043162733e+8350
relative error = 1.2251344903200244410663295121891e+8352 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2216.3MB, alloc=4.7MB, time=163.28
memory used=2220.1MB, alloc=4.7MB, time=163.56
NO POLE
NO POLE
t[1] = 0.921
x1[1] (analytic) = 2.0007166172982257845317513462307
x1[1] (numeric) = -1.0980646827694487531893076949400e+8372
absolute error = 1.0980646827694487531893076949400e+8372
relative error = 5.4883568881048174915757079029417e+8373 %
h = 0.001
x2[1] (analytic) = 1.0013812650041759272694264953865
x2[1] (numeric) = 9.8094679967017582832380549339415e+8369
absolute error = 9.8094679967017582832380549339415e+8369
relative error = 9.7959372114484797774873264542481e+8371 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2224.0MB, alloc=4.7MB, time=163.84
NO POLE
NO POLE
t[1] = 0.922
x1[1] (analytic) = 2.0007159010391168014968241737537
x1[1] (numeric) = 8.7799327905204391853268593536599e+8391
absolute error = 8.7799327905204391853268593536599e+8391
relative error = 4.3883955667870603818684333542236e+8393 %
h = 0.001
x2[1] (analytic) = 1.0013836718105742289060916230294
x2[1] (numeric) = -7.8434787197218188754003708913911e+8389
absolute error = 7.8434787197218188754003708913911e+8389
relative error = 7.8326409152849887095821611900398e+8391 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2227.8MB, alloc=4.7MB, time=164.13
NO POLE
NO POLE
t[1] = 0.923
x1[1] (analytic) = 2.0007151854959089172371204131149
x1[1] (numeric) = -7.0202804093136806814553272988706e+8411
absolute error = 7.0202804093136806814553272988706e+8411
relative error = 3.5088854526655642371779490476096e+8413 %
h = 0.001
x2[1] (analytic) = 1.0013860837937109490311943486005
x2[1] (numeric) = 6.2715081437050381044570296813117e+8409
absolute error = 6.2715081437050381044570296813117e+8409
relative error = 6.2628273402259410795384374174266e+8411 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2231.6MB, alloc=4.7MB, time=164.41
memory used=2235.4MB, alloc=4.7MB, time=164.69
NO POLE
NO POLE
t[1] = 0.924
x1[1] (analytic) = 2.0007144706678865884851272019661
x1[1] (numeric) = 5.6132931995339433830378282427164e+8431
absolute error = 5.6132931995339433830378282427164e+8431
relative error = 2.8056443244797900455322652879111e+8433 %
h = 0.001
x2[1] (analytic) = 1.0013885009635917951606067692987
x2[1] (numeric) = -5.0145880166235188829351889054109e+8429
absolute error = 5.0145880166235188829351889054109e+8429
relative error = 5.0076349107246617769238285122888e+8431 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2239.2MB, alloc=4.7MB, time=164.97
NO POLE
NO POLE
t[1] = 0.925
x1[1] (analytic) = 2.0007137565543349871589467844677
x1[1] (numeric) = -4.4882908811066160620144008384505e+8451
absolute error = 4.4882908811066160620144008384505e+8451
relative error = 2.2433448395118904401687372195293e+8453 %
h = 0.001
x2[1] (analytic) = 1.001390923330242864200693908452
x2[1] (numeric) = 4.0095767079094570715288705628525e+8449
absolute error = 4.0095767079094570715288705628525e+8449
relative error = 4.0040074405459357115443826798080e+8451 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2243.0MB, alloc=4.7MB, time=165.25
NO POLE
NO POLE
t[1] = 0.926
x1[1] (analytic) = 2.000713043154539999647468369822
x1[1] (numeric) = 3.5887587406083417692429546318255e+8471
absolute error = 3.5887587406083417692429546318255e+8471
relative error = 1.7937398633388812327520343777027e+8473 %
h = 0.001
x2[1] (analytic) = 1.0013933509037106829101288989797
x2[1] (numeric) = -3.2059872761860495031168164058521e+8469
absolute error = 3.2059872761860495031168164058521e+8469
relative error = 3.2015264264465066299052408738951e+8471 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2246.8MB, alloc=4.7MB, time=165.54
memory used=2250.7MB, alloc=4.7MB, time=165.82
NO POLE
NO POLE
t[1] = 0.927
x1[1] (analytic) = 2.0007123304677882260962544616536
x1[1] (numeric) = -2.8695086034881337664587887768038e+8491
absolute error = 2.8695086034881337664587887768038e+8491
relative error = 1.4342434740816594837139829963977e+8493 %
h = 0.001
x2[1] (analytic) = 1.0013957836940622484430703677842
x2[1] (numeric) = 2.5634512478066169069538768657596e+8489
absolute error = 2.5634512478066169069538768657596e+8489
relative error = 2.5598782115401639151019721998226e+8491 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2254.5MB, alloc=4.7MB, time=166.10
NO POLE
NO POLE
t[1] = 0.928
x1[1] (analytic) = 2.0007116184933669796941409441208
x1[1] (numeric) = 2.2944087972034127283567480653132e+8511
absolute error = 2.2944087972034127283567480653132e+8511
relative error = 1.1467963578535191336897190443822e+8513 %
h = 0.001
x2[1] (analytic) = 1.0013982217113850689738645508947
x2[1] (numeric) = -2.0496906986164711483384793493906e+8509
absolute error = 2.0496906986164711483384793493906e+8509
relative error = 2.0468287781793330315849279062200e+8511 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2258.3MB, alloc=4.7MB, time=166.38
memory used=2262.1MB, alloc=4.7MB, time=166.66
NO POLE
NO POLE
t[1] = 0.929
x1[1] (analytic) = 2.0007109072305642859605502113621
x1[1] (numeric) = -1.8345690695212374681401740363134e+8531
absolute error = 1.8345690695212374681401740363134e+8531
relative error = 9.1695859851171369838437829224569e+8532 %
h = 0.001
x2[1] (analytic) = 1.001400664965787204403434994923
x2[1] (numeric) = 1.6388967660647363662499589868683e+8529
absolute error = 1.6388967660647363662499589868683e+8529
relative error = 1.6366044315745777731632048341654e+8531 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2265.9MB, alloc=4.7MB, time=166.94
NO POLE
NO POLE
t[1] = 0.93
x1[1] (analytic) = 2.0007101966786688820335166275864
x1[1] (numeric) = 1.4668892809974852461892796851486e+8551
absolute error = 1.4668892809974852461892796851486e+8551
relative error = 7.3318428797565636294898007975042e+8552 %
h = 0.001
x2[1] (analytic) = 1.0014031134673973071475230267897
x2[1] (numeric) = -1.3104331359021501391782656137670e+8549
absolute error = 1.3104331359021501391782656137670e+8549
relative error = 1.3085970257918655113886089319007e+8551 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2269.7MB, alloc=4.7MB, time=167.22
NO POLE
NO POLE
t[1] = 0.931
x1[1] (analytic) = 2.0007094868369702159584236058361
x1[1] (numeric) = -1.1728989649143377895494361515780e+8571
absolute error = 1.1728989649143377895494361515780e+8571
relative error = 5.8624151713732170525992003551527e+8572 %
h = 0.001
x2[1] (analytic) = 1.0014055672263646630069425007233
x2[1] (numeric) = 1.0477993728633133272677651672376e+8569
absolute error = 1.0477993728633133272677651672376e+8569
relative error = 1.0463286875520849651073899227620e+8571 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2273.5MB, alloc=4.7MB, time=167.50
memory used=2277.4MB, alloc=4.7MB, time=167.78
NO POLE
NO POLE
t[1] = 0.932
x1[1] (analytic) = 2.0007087777047584459774515941576
x1[1] (numeric) = 9.3782945974058378797361283500930e+8590
absolute error = 9.3782945974058378797361283500930e+8590
relative error = 4.6874861058813121087309143678530e+8592 %
h = 0.001
x2[1] (analytic) = 1.001408026252859232120012659239
x2[1] (numeric) = -8.3780201804568189727769346602090e+8588
absolute error = 8.3780201804568189727769346602090e+8588
relative error = 8.3662402944844561053898388746176e+8590 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2281.2MB, alloc=4.7MB, time=168.06
NO POLE
NO POLE
t[1] = 0.933
x1[1] (analytic) = 2.0007080692813244398197362586281
x1[1] (numeric) = -7.4987200250581767823201336452780e+8610
absolute error = 7.4987200250581767823201336452780e+8610
relative error = 3.7480330789847799009146192116114e+8612 %
h = 0.001
x2[1] (analytic) = 1.0014104905570716899973332731577
x2[1] (numeric) = 6.6989181289859616899045550733726e+8608
absolute error = 6.6989181289859616899045550733726e+8608
relative error = 6.6894826768385862124434097128456e+8610 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2285.0MB, alloc=4.7MB, time=168.34
NO POLE
NO POLE
memory used=2288.8MB, alloc=4.7MB, time=168.63
t[1] = 0.934
x1[1] (analytic) = 2.0007073615659597739922361533973
x1[1] (numeric) = 5.9958451326281323847710968066308e+8630
absolute error = 5.9958451326281323847710968066308e+8630
relative error = 2.9968626335913344430275065792958e+8632 %
h = 0.001
x2[1] (analytic) = 1.0014129601492134686390665547424
x2[1] (numeric) = -5.3563375513867407565651608651588e+8628
absolute error = 5.3563375513867407565651608651588e+8628
relative error = 5.3487799384867465155998184586759e+8630 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2292.6MB, alloc=4.7MB, time=168.91
NO POLE
NO POLE
t[1] = 0.935
x1[1] (analytic) = 2.0007066545579567330713091686105
x1[1] (numeric) = -4.7941727033850096151025797749253e+8650
absolute error = 4.7941727033850096151025797749253e+8650
relative error = 2.3962396948413465631994200548958e+8652 %
h = 0.001
x2[1] (analytic) = 1.0014154350395167977348906677
x2[1] (numeric) = 4.2828336474592298188339373235807e+8648
absolute error = 4.2828336474592298188339373235807e+8648
relative error = 4.2767801429885341870797733708742e+8650 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2296.4MB, alloc=4.7MB, time=169.19
NO POLE
NO POLE
t[1] = 0.936
x1[1] (analytic) = 2.00070594825660830899499704779
x1[1] (numeric) = 3.8333364857620022656300888834816e+8670
absolute error = 3.8333364857620022656300888834816e+8670
relative error = 1.9159919472935674063318449438190e+8672 %
h = 0.001
x2[1] (analytic) = 1.001417915238234745946789988131
x2[1] (numeric) = -3.4244787367928420072265389753616e+8668
absolute error = 3.4244787367928420072265389753616e+8668
relative error = 3.4196299913190262079669576454151e+8670 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2300.2MB, alloc=4.7MB, time=169.47
memory used=2304.1MB, alloc=4.7MB, time=169.76
NO POLE
NO POLE
t[1] = 0.937
x1[1] (analytic) = 2.0007052426612082003560172669597
x1[1] (numeric) = -3.0650686827987841231380601895639e+8690
absolute error = 3.0650686827987841231380601895639e+8690
relative error = 1.5319941275916430287821494122705e+8692 %
h = 0.001
x2[1] (analytic) = 1.0014204007556412622748476014995
x2[1] (numeric) = 2.7381531911012506557552236066256e+8688
absolute error = 2.7381531911012506557552236066256e+8688
relative error = 2.7342694327328700815416044589140e+8690 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2307.9MB, alloc=4.7MB, time=170.04
NO POLE
NO POLE
t[1] = 0.938
x1[1] (analytic) = 2.0007045377710508116954615685041
x1[1] (numeric) = 2.4507752098382193707187372345215e+8710
absolute error = 2.4507752098382193707187372345215e+8710
relative error = 1.2249560910021148127482138663436e+8712 %
h = 0.001
x2[1] (analytic) = 1.0014228916020312175062058523533
x2[1] (numeric) = -2.1893793111881452213057635421658e+8708
absolute error = 2.1893793111881452213057635421658e+8708
relative error = 2.1862684881166185980558574091484e+8710 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2311.7MB, alloc=4.7MB, time=170.32
NO POLE
NO POLE
t[1] = 0.939
x1[1] (analytic) = 2.0007038335854312527972004434604
x1[1] (numeric) = -1.9595969130691973468523752980757e+8730
absolute error = 1.9595969130691973468523752980757e+8730
relative error = 9.7945377030513966084139350192281e+8731 %
h = 0.001
x2[1] (analytic) = 1.0014253877877204457473610958425
x2[1] (numeric) = 1.7505893329258322395663467692532e+8728
absolute error = 1.7505893329258322395663467692532e+8728
relative error = 1.7480976159323390573622689747270e+8730 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2315.5MB, alloc=4.7MB, time=170.60
memory used=2319.3MB, alloc=4.7MB, time=170.88
NO POLE
NO POLE
t[1] = 0.94
x1[1] (analytic) = 2.0007031301036453379829928566483
x1[1] (numeric) = 1.5668593538465793751132036504678e+8750
absolute error = 1.5668593538465793751132036504678e+8750
relative error = 7.8315434722462251463677047692009e+8751 %
h = 0.001
x2[1] (analytic) = 1.0014278893230457860399591330697
x2[1] (numeric) = -1.3997405551853028412691546291250e+8748
absolute error = 1.3997405551853028412691546291250e+8748
relative error = 1.3977447304084091631995275121699e+8750 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2323.1MB, alloc=4.7MB, time=171.17
NO POLE
NO POLE
t[1] = 0.941
x1[1] (analytic) = 2.0007024273249895854083005097463
x1[1] (numeric) = -1.2528332833977206282541543849252e+8770
absolute error = 1.2528332833977206282541543849252e+8770
relative error = 6.2619671285789529267084074603630e+8771 %
h = 0.001
x2[1] (analytic) = 1.0014303962183651240602581459522
x2[1] (numeric) = 1.1192080203961056474281770317414e+8768
absolute error = 1.1192080203961056474281770317414e+8768
relative error = 1.1176093961422544368112663617385e+8770 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2327.0MB, alloc=4.7MB, time=171.46
memory used=2330.8MB, alloc=4.7MB, time=171.74
NO POLE
NO POLE
t[1] = 0.942
x1[1] (analytic) = 2.0007017252487612163588059381308
x1[1] (numeric) = 1.0017435401178971995238384539214e+8790
absolute error = 1.0017435401178971995238384539214e+8790
relative error = 5.0069609451321057366841053312999e+8791 %
h = 0.001
x2[1] (analytic) = 1.0014329084840574339024262815997
x2[1] (numeric) = -8.9489912132548183907112285401759e+8787
absolute error = 8.9489912132548183907112285401759e+8787
relative error = 8.9361864758384701457636667015719e+8789 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2334.6MB, alloc=4.7MB, time=172.02
NO POLE
NO POLE
t[1] = 0.943
x1[1] (analytic) = 2.0007010238742581545476337379927
x1[1] (numeric) = -8.0097658121473470379578289389137e+8809
absolute error = 8.0097658121473470379578289389137e+8809
relative error = 4.0034796386702663855662627481336e+8811 %
h = 0.001
x2[1] (analytic) = 1.0014354261305228199458413711908
x2[1] (numeric) = 7.1554565617362873174844302526464e+8807
absolute error = 7.1554565617362873174844302526464e+8807
relative error = 7.1452001547263773792361140134776e+8809 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2338.4MB, alloc=4.7MB, time=172.30
NO POLE
NO POLE
t[1] = 0.944
x1[1] (analytic) = 2.0007003232007790254132742209564
x1[1] (numeric) = 6.4044683889744635641273508643564e+8829
absolute error = 6.4044683889744635641273508643564e+8829
relative error = 3.2011132875354402379523697014644e+8831 %
h = 0.001
x2[1] (analytic) = 1.0014379491681825588065606039963
x2[1] (numeric) = -5.7213776823312853890081739273361e+8827
absolute error = 5.7213776823312853890081739273361e+8827
relative error = 5.7131624451455964448437744217350e+8829 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2342.2MB, alloc=4.7MB, time=172.58
memory used=2346.0MB, alloc=4.7MB, time=172.86
NO POLE
NO POLE
t[1] = 0.945
x1[1] (analytic) = 2.0006996232276231554182087941221
x1[1] (numeric) = -5.1209006988903224601187344909781e+8849
absolute error = 5.1209006988903224601187344909781e+8849
relative error = 2.5595549873843848259793905176296e+8851 %
h = 0.001
x2[1] (analytic) = 1.0014404776074791413731283135198
x2[1] (numeric) = 4.5747133395965293979130189040145e+8847
absolute error = 4.5747133395965293979130189040145e+8847
relative error = 4.5681330462354417668577017945445e+8849 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2349.8MB, alloc=4.7MB, time=173.14
NO POLE
NO POLE
t[1] = 0.946
x1[1] (analytic) = 2.0006989239540905713482363641574
x1[1] (numeric) = 4.0945824657422560138564193974102e+8869
absolute error = 4.0945824657422560138564193974102e+8869
relative error = 2.0465760323646843477757952645850e+8871 %
h = 0.001
x2[1] (analytic) = 1.0014430114588763149268903697304
x2[1] (numeric) = -3.6578606240437729468282420663684e+8867
absolute error = 3.6578606240437729468282420663684e+8867
relative error = 3.6525898949707543127332932091517e+8869 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2353.7MB, alloc=4.7MB, time=173.43
NO POLE
NO POLE
t[1] = 0.947
x1[1] (analytic) = 2.0006982253794819996125000647655
x1[1] (numeric) = -3.2739563906007724415562169589179e+8889
absolute error = 3.2739563906007724415562169589179e+8889
relative error = 1.6364069048843113144217520872537e+8891 %
h = 0.001
x2[1] (analytic) = 1.0014455507328591253469840090406
x2[1] (numeric) = 2.9247612586169071829046453281221e+8887
absolute error = 2.9247612586169071829046453281221e+8887
relative error = 2.9205394706447726298315206240761e+8889 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2357.5MB, alloc=4.7MB, time=173.70
memory used=2361.3MB, alloc=4.7MB, time=173.99
NO POLE
NO POLE
t[1] = 0.948
x1[1] (analytic) = 2.0006975275030988655442136075553
x1[1] (numeric) = 2.6177981606758434697870386053352e+8909
absolute error = 2.6177981606758434697870386053352e+8909
relative error = 1.3084427429382069757440488730555e+8911 %
h = 0.001
x2[1] (analytic) = 1.0014480954399339594001722720276
x2[1] (numeric) = -2.3385878520569864499468595139119e+8907
absolute error = 2.3385878520569864499468595139119e+8907
relative error = 2.3352062505342824763506909141779e+8909 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2365.1MB, alloc=4.7MB, time=174.27
NO POLE
NO POLE
t[1] = 0.949
x1[1] (analytic) = 2.0006968303242432927020865570406
x1[1] (numeric) = -2.0931455378305527852418500952150e+8929
absolute error = 2.0931455378305527852418500952150e+8929
relative error = 1.0462082540968122472015904850562e+8931 %
h = 0.001
x2[1] (analytic) = 1.0014506455906285871156925579331
x2[1] (numeric) = 1.8698938676364806337084002243945e+8927
absolute error = 1.8698938676364806337084002243945e+8927
relative error = 1.8671852435959713735069204695565e+8929 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2368.9MB, alloc=4.7MB, time=174.55
memory used=2372.7MB, alloc=4.7MB, time=174.84
NO POLE
NO POLE
t[1] = 0.95
x1[1] (analytic) = 2.0006961338422181021724478311933
x1[1] (numeric) = 1.6736424940450083174767004940349e+8949
absolute error = 1.6736424940450083174767004940349e+8949
relative error = 8.3653007857363991930614723499716e+8950 %
h = 0.001
x2[1] (analytic) = 1.0014532011954922042452891446777
x2[1] (numeric) = -1.4951343705771177316042978681742e+8947
absolute error = 1.4951343705771177316042978681742e+8947
relative error = 1.4929647923560381664664583336357e+8949 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2376.5MB, alloc=4.7MB, time=175.12
NO POLE
NO POLE
t[1] = 0.951
x1[1] (analytic) = 2.0006954380563268118720667296741
x1[1] (numeric) = -1.3382152111488544480288719477097e+8969
absolute error = 1.3382152111488544480288719477097e+8969
relative error = 6.6887502500077118201022737518396e+8970 %
h = 0.001
x2[1] (analytic) = 1.0014557622650954748085998635152
x2[1] (numeric) = 1.1954832436060030566274830264842e+8967
absolute error = 1.1954832436060030566274830264842e+8967
relative error = 1.1937454340489845261758744958472e+8969 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2380.4MB, alloc=4.7MB, time=175.40
NO POLE
NO POLE
t[1] = 0.952
x1[1] (analytic) = 2.0006947429658736358516707925618
x1[1] (numeric) = 1.0700134334077284666874018176567e+8989
absolute error = 1.0700134334077284666874018176567e+8989
relative error = 5.3482093516251117608644990508675e+8990 %
h = 0.001
x2[1] (analytic) = 1.0014583288100305737240674585201
x2[1] (numeric) = -9.5588745324011944792237283886297e+8986
absolute error = 9.5588745324011944792237283886297e+8986
relative error = 9.5449548497533581108805713677673e+8988 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2384.2MB, alloc=4.7MB, time=175.68
memory used=2388.0MB, alloc=4.7MB, time=175.96
NO POLE
NO POLE
t[1] = 0.953
x1[1] (analytic) = 2.0006940485701634836001597930982
x1[1] (numeric) = -8.5556399160197623563477624300980e+9008
absolute error = 8.5556399160197623563477624300980e+9008
relative error = 4.2763359655786569047506769963177e+9010 %
h = 0.001
x2[1] (analytic) = 1.0014609008409112295255465028528
x2[1] (numeric) = 7.6431085767942196749881228390860e+9006
absolute error = 7.6431085767942196749881228390860e+9006
relative error = 7.6319590414128196255940270930618e+9008 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2391.8MB, alloc=4.7MB, time=176.24
NO POLE
NO POLE
t[1] = 0.954
x1[1] (analytic) = 2.0006933548685019593495151686641
x1[1] (numeric) = 6.8409397571271600556498074729918e+9028
absolute error = 6.8409397571271600556498074729918e+9028
relative error = 3.4192844897896855695228436604822e+9030 %
h = 0.001
x2[1] (analytic) = 1.0014634783683727671647770861773
x2[1] (numeric) = -6.1112956884884388922707075192661e+9026
absolute error = 6.1112956884884388922707075192661e+9026
relative error = 6.1023650093014113965969670049948e+9028 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2395.6MB, alloc=4.7MB, time=176.53
NO POLE
NO POLE
memory used=2399.4MB, alloc=4.7MB, time=176.81
t[1] = 0.955
x1[1] (analytic) = 2.0006926618601953613804041948942
x1[1] (numeric) = -5.4698955566160025830890149319632e+9048
absolute error = 5.4698955566160025830890149319632e+9048
relative error = 2.7340009092302196848811115138598e+9050 %
h = 0.001
x2[1] (analytic) = 1.0014660614030721508998968307328
x2[1] (numeric) = 4.8864849448210219762681293479393e+9046
absolute error = 4.8864849448210219762681293479393e+9046
relative error = 4.8793315451698560510707095850858e+9048 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2403.2MB, alloc=4.7MB, time=177.09
NO POLE
NO POLE
t[1] = 0.956
x1[1] (analytic) = 2.000691969544550681328478208536
x1[1] (numeric) = 4.3736326385736563284448268248302e+9068
absolute error = 4.3736326385736563284448268248302e+9068
relative error = 2.1860599758239124911412080932304e+9070 %
h = 0.001
x2[1] (analytic) = 1.001468649955688027270163137359
x2[1] (numeric) = -3.9071477364349881013000737541229e+9066
absolute error = 3.9071477364349881013000737541229e+9066
relative error = 3.9014179191808626518089338262082e+9068 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2407.1MB, alloc=4.7MB, time=177.38
NO POLE
NO POLE
t[1] = 0.957
x1[1] (analytic) = 2.0006912779208756034913641853505
x1[1] (numeric) = -3.4970800190252394650117588748391e+9088
absolute error = 3.4970800190252394650117588748391e+9088
relative error = 1.7479358547808613152044245660054e+9090 %
h = 0.001
x2[1] (analytic) = 1.0014712440369207681570579072741
x2[1] (numeric) = 3.1240868654488802768013016745704e+9086
absolute error = 3.1240868654488802768013016745704e+9086
relative error = 3.1194973236133238782736446704784e+9088 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2410.9MB, alloc=4.7MB, time=177.66
memory used=2414.7MB, alloc=4.7MB, time=177.95
NO POLE
NO POLE
t[1] = 0.958
x1[1] (analytic) = 2.000690586988478504136348980046
x1[1] (numeric) = 2.7962039041884224098170723933311e+9108
absolute error = 2.7962039041884224098170723933311e+9108
relative error = 1.3976193632206683019343749707068e+9110 %
h = 0.001
x2[1] (analytic) = 1.0014738436574925139319473305855
x2[1] (numeric) = -2.4979651145148367321296204295217e+9106
absolute error = 2.4979651145148367321296204295217e+9106
relative error = 2.4942889226062996015090092490441e+9108 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2418.5MB, alloc=4.7MB, time=178.24
NO POLE
NO POLE
t[1] = 0.959
x1[1] (analytic) = 2.0006898967466684508087555359296
x1[1] (numeric) = -2.2357956441551318949000515168105e+9128
absolute error = 2.2357956441551318949000515168105e+9128
relative error = 1.1175123380143869576053373739017e+9130 %
h = 0.001
x2[1] (analytic) = 1.0014764488281472166904696783888
x2[1] (numeric) = 1.9973291339440908069270470650256e+9126
absolute error = 1.9973291339440908069270470650256e+9126
relative error = 1.9943845272459635632667061479989e+9128 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2422.3MB, alloc=4.7MB, time=178.52
NO POLE
NO POLE
t[1] = 0.96
x1[1] (analytic) = 2.000689207194755201641010372653
x1[1] (numeric) = 1.7877030194169337139993753072561e+9148
absolute error = 1.7877030194169337139993753072561e+9148
relative error = 8.9354359137246620418570492908489e+9149 %
h = 0.001
x2[1] (analytic) = 1.0014790595596506835738243818754
x2[1] (numeric) = -1.5970293764797719470213525896143e+9146
absolute error = 1.5970293764797719470213525896143e+9146
relative error = 1.5946707634426067057538996931852e+9148 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2426.1MB, alloc=4.7MB, time=178.80
memory used=2430.0MB, alloc=4.7MB, time=179.08
NO POLE
NO POLE
t[1] = 0.961
x1[1] (analytic) = 2.0006885183320492046624016611179
x1[1] (numeric) = -1.4294160085637386927675775871898e+9168
absolute error = 1.4294160085637386927675775871898e+9168
relative error = 7.1446204417438563979303006798217e+9169 %
h = 0.001
x2[1] (analytic) = 1.0014816758627906201771360291279
x2[1] (numeric) = 1.2769567048285807368260596266202e+9166
absolute error = 1.2769567048285807368260596266202e+9166
relative error = 1.2750674681376116894239917106888e+9168 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2433.8MB, alloc=4.7MB, time=179.36
NO POLE
NO POLE
t[1] = 0.962
x1[1] (analytic) = 2.0006878301578615971095271953025
x1[1] (numeric) = 1.1429359929171556315804523227558e+9188
absolute error = 1.1429359929171556315804523227558e+9188
relative error = 5.7127152756608400814617391361010e+9189 %
h = 0.001
x2[1] (analytic) = 1.0014842977483766740450672582412
x2[1] (numeric) = -1.0210322051814308398956706715635e+9186
absolute error = 1.0210322051814308398956706715635e+9186
relative error = 1.0195189355210096217859021613201e+9188 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2437.6MB, alloc=4.7MB, time=179.65
memory used=2441.4MB, alloc=4.7MB, time=179.93
NO POLE
NO POLE
t[1] = 0.963
x1[1] (analytic) = 2.0006871426715042047374315714535
x1[1] (numeric) = -9.1387159237014760730074635858944e+9207
absolute error = 9.1387159237014760730074635858944e+9207
relative error = 4.5677886006197898688447542177217e+9209 %
h = 0.001
x2[1] (analytic) = 1.0014869252272404782548548740524
x2[1] (numeric) = 8.1639945980596270874807413188765e+9205
absolute error = 8.1639945980596270874807413188765e+9205
relative error = 8.1518733718936884610636360792391e+9207 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2445.2MB, alloc=4.7MB, time=180.21
NO POLE
NO POLE
t[1] = 0.964
x1[1] (analytic) = 2.0006864558722895411314318857828
x1[1] (numeric) = 7.3071571156800983873989275078970e+9227
absolute error = 7.3071571156800983873989275078970e+9227
relative error = 3.6523249778757629007813776461118e+9229 %
h = 0.001
x2[1] (analytic) = 1.0014895583102356950869438651145
x2[1] (numeric) = -6.5277870236525353498095243038198e+9225
absolute error = 6.5277870236525353498095243038198e+9225
relative error = 6.5180779664508443145013330663731e+9227 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2449.0MB, alloc=4.7MB, time=180.49
NO POLE
NO POLE
t[1] = 0.965
x1[1] (analytic) = 2.0006857697595308070196312624942
x1[1] (numeric) = -5.8426747870293547585921237487434e+9247
absolute error = 5.8426747870293547585921237487434e+9247
relative error = 2.9203360544377769092815860569531e+9249 %
h = 0.001
x2[1] (analytic) = 1.0014921970082380597833943475958
x2[1] (numeric) = 5.2195041182773700651865552102365e+9245
absolute error = 5.2195041182773700651865552102365e+9245
relative error = 5.2117271945499097532989674904301e+9247 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2452.8MB, alloc=4.7MB, time=180.77
memory used=2456.7MB, alloc=4.7MB, time=181.05
NO POLE
NO POLE
t[1] = 0.966
x1[1] (analytic) = 2.0006850843325418895861195246536
x1[1] (numeric) = 4.6717003790346582811388992947693e+9267
absolute error = 4.6717003790346582811388992947693e+9267
relative error = 2.3350503363167754940994076389127e+9269 %
h = 0.001
x2[1] (analytic) = 1.0014948413321454243942368135349
x2[1] (numeric) = -4.1734240320651343052115600678513e+9265
absolute error = 4.1734240320651343052115600678513e+9265
relative error = 4.1671947371329690561162860166765e+9267 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2460.5MB, alloc=4.7MB, time=181.33
NO POLE
NO POLE
t[1] = 0.967
x1[1] (analytic) = 2.000684399590637361784860321102
x1[1] (numeric) = -3.7354097612831788440735336883825e+9287
absolute error = 3.7354097612831788440735336883825e+9287
relative error = 1.8670659710484501682042599265246e+9289 %
h = 0.001
x2[1] (analytic) = 1.0014974912928778017119514123283
x2[1] (numeric) = 3.3369967254987459661355571879548e+9285
absolute error = 3.3369967254987459661355571879548e+9285
relative error = 3.3320070739177468983173477359589e+9287 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2464.3MB, alloc=4.7MB, time=181.61
NO POLE
NO POLE
t[1] = 0.968
memory used=2468.1MB, alloc=4.7MB, time=181.89
x1[1] (analytic) = 2.0006837155331324816542640233009
x1[1] (numeric) = 2.9867681898668568072526666782201e+9307
absolute error = 2.9867681898668568072526666782201e+9307
relative error = 1.4928737444493855557163228050026e+9309 %
h = 0.001
x2[1] (analytic) = 1.0015001469013774092942473464862
x2[1] (numeric) = -2.6682041078100451489724253877018e+9305
absolute error = 2.6682041078100451489724253877018e+9305
relative error = 2.6642074053263181253064340510812e+9307 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2471.9MB, alloc=4.7MB, time=182.17
NO POLE
NO POLE
t[1] = 0.969
x1[1] (analytic) = 2.0006830321593431916324457066804
x1[1] (numeric) = -2.3881675077424690276424255373313e+9327
absolute error = 2.3881675077424690276424255373313e+9327
relative error = 1.1936760942911145102382850355089e+9329 %
h = 0.001
x2[1] (analytic) = 1.0015028081686087135753188155439
x2[1] (numeric) = 2.1334492499001028624026806784597e+9325
absolute error = 2.1334492499001028624026806784597e+9325
relative error = 2.1302478959608913099205061839847e+9327 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2475.7MB, alloc=4.7MB, time=182.45
NO POLE
NO POLE
t[1] = 0.97
x1[1] (analytic) = 2.0006823494685861178731675317499
x1[1] (numeric) = 1.9095368915426669591988390147580e+9347
absolute error = 1.9095368915426669591988390147580e+9347
relative error = 9.5444281399786983688515335900812e+9348 %
h = 0.001
x2[1] (analytic) = 1.0015054751055584740657542955835
x2[1] (numeric) = -1.7058686359774353424619604315166e+9345
absolute error = 1.7058686359774353424619604315166e+9345
relative error = 1.7033043536757870784664342237615e+9347 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2479.5MB, alloc=4.7MB, time=182.73
memory used=2483.4MB, alloc=4.7MB, time=183.02
NO POLE
NO POLE
t[1] = 0.971
x1[1] (analytic) = 2.000681667460178569562464840912
x1[1] (numeric) = -1.5268322378312994066428037006650e+9367
absolute error = 1.5268322378312994066428037006650e+9367
relative error = 7.6315600960625554919387300261318e+9368 %
h = 0.001
x2[1] (analytic) = 1.001508147723235787641276296091
x2[1] (numeric) = 1.3639826695421856307421788721532e+9365
absolute error = 1.3639826695421856307421788721532e+9365
relative error = 1.3619286799043783207689594093706e+9367 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2487.2MB, alloc=4.7MB, time=183.30
NO POLE
NO POLE
t[1] = 0.972
x1[1] (analytic) = 2.0006809861334385382359552876071
x1[1] (numeric) = 1.2208283028235197642046231045661e+9387
absolute error = 1.2208283028235197642046231045661e+9387
relative error = 6.1020638036997604413970283024482e+9388 %
h = 0.001
x2[1] (analytic) = 1.0015108260326721329204890908537
x2[1] (numeric) = -1.0906166416181395574610333520085e+9385
absolute error = 1.0906166416181395574610333520085e+9385
relative error = 1.0889713952853072197221174394508e+9387 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2491.0MB, alloc=4.7MB, time=183.59
NO POLE
NO POLE
t[1] = 0.973
x1[1] (analytic) = 2.0006803054876846970968303150973
x1[1] (numeric) = -9.7615291847121271749462370309538e+9406
absolute error = 9.7615291847121271749462370309538e+9406
relative error = 4.8791049514193435090618585871266e+9408 %
h = 0.001
x2[1] (analytic) = 1.0015135100449214147318122752937
x2[1] (numeric) = 8.7203795585882404485919243423818e+9404
absolute error = 8.7203795585882404485919243423818e+9404
relative error = 8.7072011222265994752552883693453e+9406 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2494.8MB, alloc=4.7MB, time=183.86
memory used=2498.6MB, alloc=4.7MB, time=184.15
NO POLE
NO POLE
t[1] = 0.974
x1[1] (analytic) = 2.00067962552223640033452830288
x1[1] (numeric) = 7.8051476856824762931705470783971e+9426
absolute error = 7.8051476856824762931705470783971e+9426
relative error = 3.9012481489359409570927676738724e+9428 %
h = 0.001
x2[1] (analytic) = 1.0015161997710600086697783590357
x2[1] (numeric) = -6.9726626886067153860640037846757e+9424
absolute error = 6.9726626886067153860640037846757e+9424
relative error = 6.9621067439554348134011598103100e+9426 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2502.4MB, alloc=4.7MB, time=184.43
NO POLE
NO POLE
t[1] = 0.975
x1[1] (analytic) = 2.0006789462364136824440886994064
x1[1] (numeric) = -6.2408593205585021818743874704015e+9446
absolute error = 6.2408593205585021818743874704015e+9446
relative error = 3.1193707177748449518481493748537e+9448 %
h = 0.001
x2[1] (analytic) = 1.0015188952221868057408729596211
x2[1] (numeric) = 5.5752189044577662114073405474741e+9444
absolute error = 5.5752189044577662114073405474741e+9444
relative error = 5.5667635738623830902523427024176e+9446 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2506.2MB, alloc=4.7MB, time=184.71
NO POLE
NO POLE
memory used=2510.1MB, alloc=4.7MB, time=184.99
t[1] = 0.976
x1[1] (analytic) = 2.0006782676295372575461864604568
x1[1] (numeric) = 4.9900817546921685179790222668349e+9466
absolute error = 4.9900817546921685179790222668349e+9466
relative error = 2.4941950114770651580574057406970e+9468 %
h = 0.001
x2[1] (analytic) = 1.0015215964094232570990965211144
x2[1] (numeric) = -4.4578473419362130365589338906438e+9464
absolute error = 4.4578473419362130365589338906438e+9464
relative error = 4.4510746028025136814807749817374e+9466 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2513.9MB, alloc=4.7MB, time=185.27
NO POLE
NO POLE
t[1] = 0.977
x1[1] (analytic) = 2.0006775897009285187078461132086
x1[1] (numeric) = -3.9899819302902116831073375003297e+9486
absolute error = 3.9899819302902116831073375003297e+9486
relative error = 1.9943153013907925636623390972740e+9488 %
h = 0.001
x2[1] (analytic) = 1.0015243033439134188714268398884
x2[1] (numeric) = 3.5644166201471342946683949563835e+9484
absolute error = 3.5644166201471342946683949563835e+9484
relative error = 3.5589916372934479982878539799260e+9486 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2517.7MB, alloc=4.7MB, time=185.55
NO POLE
NO POLE
t[1] = 0.978
x1[1] (analytic) = 2.0006769124499095372638347667101
x1[1] (numeric) = 3.1903196353592576489768982017390e+9506
absolute error = 3.1903196353592576489768982017390e+9506
relative error = 1.5946201085774427399476157825664e+9508 %
h = 0.001
x2[1] (analytic) = 1.0015270160368239970733620391432
x2[1] (numeric) = -2.8500450705121781559911946022417e+9504
absolute error = 2.8500450705121781559911946022417e+9504
relative error = 2.8456996415235873384768111119722e+9506 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2521.5MB, alloc=4.7MB, time=185.83
memory used=2525.3MB, alloc=4.7MB, time=186.12
NO POLE
NO POLE
t[1] = 0.979
x1[1] (analytic) = 2.0006762358758030621387333901535
x1[1] (numeric) = -2.5509236767441999003069785989258e+9526
absolute error = 2.5509236767441999003069785989258e+9526
relative error = 1.2750307276117187870448503641858e+9528 %
h = 0.001
x2[1] (analytic) = 1.0015297344993443926147239936939
x2[1] (numeric) = 2.2788460972936070935411577433135e+9524
absolute error = 2.2788460972936070935411577433135e+9524
relative error = 2.2753653923543084180858003928249e+9526 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2529.1MB, alloc=4.7MB, time=186.40
NO POLE
NO POLE
t[1] = 0.98
x1[1] (analytic) = 2.0006755599779325191696856810185
x1[1] (numeric) = 2.0396738723144832562353423670977e+9546
absolute error = 2.0396738723144832562353423670977e+9546
relative error = 1.0194925719675312518057069204395e+9548 %
h = 0.001
x2[1] (analytic) = 1.0015324587426867463959025672641
x2[1] (numeric) = -1.8221254073771722270646840195498e+9544
absolute error = 1.8221254073771722270646840195498e+9544
relative error = 1.8193373479524060432571237602752e+9546 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2532.9MB, alloc=4.7MB, time=186.68
NO POLE
NO POLE
t[1] = 0.981
x1[1] (analytic) = 2.0006748847556220104298238458346
x1[1] (numeric) = -1.6308874872776290153905832482457e+9566
absolute error = 1.6308874872776290153905832482457e+9566
relative error = 8.1516867118409310986834520550097e+9567 %
h = 0.001
x2[1] (analytic) = 1.0015351887780859844947213859507
x2[1] (numeric) = 1.4569395467962828640467414002640e+9564
absolute error = 1.4569395467962828640467414002640e+9564
relative error = 1.4547062980121635846181327956034e+9566 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2536.8MB, alloc=4.7MB, time=186.96
memory used=2540.6MB, alloc=4.7MB, time=187.25
NO POLE
NO POLE
t[1] = 0.982
x1[1] (analytic) = 2.0006742102081963135523706169887
x1[1] (numeric) = 1.3040290569298635598179280906282e+9586
absolute error = 1.3040290569298635598179280906282e+9586
relative error = 6.5179480510930476991632984407294e+9587 %
h = 0.001
x2[1] (analytic) = 1.0015379246167998634441062336668
x2[1] (numeric) = -1.1649433317953695788844966184754e+9584
absolute error = 1.1649433317953695788844966184754e+9584
relative error = 1.1631544878753248784602158645544e+9586 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2544.4MB, alloc=4.7MB, time=187.52
NO POLE
NO POLE
t[1] = 0.983
x1[1] (analytic) = 2.000673536334980881055416829679
x1[1] (numeric) = -1.0426787835351829228054325741593e+9606
absolute error = 1.0426787835351829228054325741593e+9606
relative error = 5.2116388036263952810504698731435e+9607 %
h = 0.001
x2[1] (analytic) = 1.0015406662701090156007375182498
x2[1] (numeric) = 9.3146827490451296263085663892444e+9603
absolute error = 9.3146827490451296263085663892444e+9603
relative error = 9.3003540073259692888509975445241e+9605 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2548.2MB, alloc=4.7MB, time=187.80
memory used=2552.0MB, alloc=4.7MB, time=188.10
NO POLE
NO POLE
t[1] = 0.984
x1[1] (analytic) = 2.0006728631353018396673738837939
x1[1] (numeric) = 8.3370768454654314938264126891764e+9625
absolute error = 8.3370768454654314938264126891764e+9625
relative error = 4.1671364664786830088407346862930e+9627 %
h = 0.001
x2[1] (analytic) = 1.0015434137493169946048686205123
x2[1] (numeric) = -7.4478571057737523205049984324904e+9623
absolute error = 7.4478571057737523205049984324904e+9623
relative error = 7.4363796951071821752639447984928e+9625 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2555.8MB, alloc=4.7MB, time=188.38
NO POLE
NO POLE
t[1] = 0.985
x1[1] (analytic) = 2.0006721906084859896531004161669
x1[1] (numeric) = -6.6661805557732894184698873058778e+9645
absolute error = 6.6661805557732894184698873058778e+9645
relative error = 3.3319704182751858519165280653920e+9647 %
h = 0.001
x2[1] (analytic) = 1.0015461670657503209314923028486
x2[1] (numeric) = 5.9551760336347467793039491603638e+9643
absolute error = 5.9551760336347467793039491603638e+9643
relative error = 5.9459825512404926594929831044842e+9645 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2559.7MB, alloc=4.7MB, time=188.66
NO POLE
NO POLE
t[1] = 0.986
x1[1] (analytic) = 2.0006715187538608041407025093357
x1[1] (numeric) = 5.3301611615034906066583486277911e+9665
absolute error = 5.3301611615034906066583486277911e+9665
relative error = 2.6641860553017905084347258194660e+9667 %
h = 0.001
x2[1] (analytic) = 1.0015489262307585275330377190544
x2[1] (numeric) = -4.7616544044709264811774761688652e+9663
absolute error = 4.7616544044709264811774761688652e+9663
relative error = 4.7542903594245713747309688812106e+9665 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2563.5MB, alloc=4.7MB, time=188.93
memory used=2567.3MB, alloc=4.7MB, time=189.22
NO POLE
NO POLE
t[1] = 0.987
x1[1] (analytic) = 2.0006708475707544284490067636039
x1[1] (numeric) = -4.2619034647951498851150723466456e+9685
absolute error = 4.2619034647951498851150723466456e+9685
relative error = 2.1302372001721418443150879360021e+9687 %
h = 0.001
x2[1] (analytic) = 1.0015516912557142055737809328136
x2[1] (numeric) = 3.8073354237655798317481303757611e+9683
absolute error = 3.8073354237655798317481303757611e+9683
relative error = 3.8014367675741844947760525269040e+9685 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2571.1MB, alloc=4.7MB, time=189.50
NO POLE
NO POLE
t[1] = 0.988
x1[1] (analytic) = 2.00067017705849567941570555988
x1[1] (numeric) = 3.4077433294923850502073889017273e+9705
absolute error = 3.4077433294923850502073889017273e+9705
relative error = 1.7033009081500140271925318651264e+9707 %
h = 0.001
x2[1] (analytic) = 1.0015544621520130502561522188153
x2[1] (numeric) = -3.0442786892407565628604694297025e+9703
absolute error = 3.0442786892407565628604694297025e+9703
relative error = 3.0395538178718679759504020010292e+9705 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2574.9MB, alloc=4.7MB, time=189.78
NO POLE
NO POLE
memory used=2578.7MB, alloc=4.7MB, time=190.06
t[1] = 0.989
x1[1] (analytic) = 2.000669507216414044726173841438
x1[1] (numeric) = -2.7247718526768685992716721305756e+9725
absolute error = 2.7247718526768685992716721305756e+9725
relative error = 1.3619300153516698827836122051076e+9727 %
h = 0.001
x2[1] (analytic) = 1.0015572389310739067391237877214
x2[1] (numeric) = 2.4341518952904405737508742451727e+9723
absolute error = 2.4341518952904405737508742451727e+9723
relative error = 2.4303672328186889499366025250384e+9725 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2582.5MB, alloc=4.7MB, time=190.34
NO POLE
NO POLE
t[1] = 0.99
x1[1] (analytic) = 2.0006688380438396822429567434158
x1[1] (numeric) = 2.1786798274640201171743513110649e+9745
absolute error = 2.1786798274640201171743513110649e+9745
relative error = 1.0889757395303018993606447360969e+9747 %
h = 0.001
x2[1] (analytic) = 1.0015600216043388161488619441866
x2[1] (numeric) = -1.9463052020456653468770333882273e+9743
absolute error = 1.9463052020456653468770333882273e+9743
relative error = 1.9432736531635877345696056175837e+9745 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2586.4MB, alloc=4.7MB, time=190.62
NO POLE
NO POLE
t[1] = 0.991
x1[1] (analytic) = 2.0006681695401034193359273995408
x1[1] (numeric) = -1.7420342132261296600642826062763e+9765
absolute error = 1.7420342132261296600642826062763e+9765
relative error = 8.7072621024733635206063130770236e+9766 %
h = 0.001
x2[1] (analytic) = 1.0015628101832730616818280558585
x2[1] (numeric) = 1.5562315346216409508631676762029e+9763
absolute error = 1.5562315346216409508631676762029e+9763
relative error = 1.5538032351030193250832746427314e+9765 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2590.2MB, alloc=4.7MB, time=190.90
memory used=2594.0MB, alloc=4.7MB, time=191.19
NO POLE
NO POLE
t[1] = 0.992
x1[1] (analytic) = 2.0006675017045367522131142562379
x1[1] (numeric) = 1.3929000313840271960659416634537e+9785
absolute error = 1.3929000313840271960659416634537e+9785
relative error = 6.9621765245714173890124498820531e+9786 %
h = 0.001
x2[1] (analytic) = 1.0015656046793652148005130807438
x2[1] (numeric) = -1.2443354653757970312647137674945e+9783
absolute error = 1.2443354653757970312647137674945e+9783
relative error = 1.2423903731939263246841016729777e+9785 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2597.8MB, alloc=4.7MB, time=191.47
NO POLE
NO POLE
t[1] = 0.993
x1[1] (analytic) = 2.0006668345364718452521972249501
x1[1] (numeric) = -1.1137384574304997584903264667886e+9805
absolute error = 1.1137384574304997584903264667886e+9805
relative error = 5.5668362078313668352994885551815e+9806 %
h = 0.001
x2[1] (analytic) = 1.0015684051041271815219907705268
x2[1] (numeric) = 9.9494883373408139239476663871551e+9802
absolute error = 9.9494883373408139239476663871551e+9802
relative error = 9.9339079454152950123188656100522e+9804 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2601.6MB, alloc=4.7MB, time=191.75
NO POLE
NO POLE
t[1] = 0.994
x1[1] (analytic) = 2.0006661680352415303326720041648
x1[1] (numeric) = 8.9052575462085190673210286451080e+9824
absolute error = 8.9052575462085190673210286451080e+9824
relative error = 4.4511461674557860892689813404249e+9826 %
h = 0.001
x2[1] (analytic) = 1.0015712114690942487994750383671
x2[1] (numeric) = -7.9554365305327514382172297417731e+9822
absolute error = 7.9554365305327514382172297417731e+9822
relative error = 7.9429564662344874861244689043015e+9824 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2605.4MB, alloc=4.7MB, time=192.03
memory used=2609.2MB, alloc=4.7MB, time=192.32
NO POLE
NO POLE
t[1] = 0.995
x1[1] (analytic) = 2.0006655022001793061686819033125
x1[1] (numeric) = -7.1204878879072495698836021743337e+9844
absolute error = 7.1204878879072495698836021743337e+9844
relative error = 3.5590596629354982879812915604193e+9846 %
h = 0.001
x2[1] (analytic) = 1.0015740237858251309970673513854
x2[1] (numeric) = 6.3610276474026339283742119031832e+9842
absolute error = 6.3610276474026339283742119031832e+9842
relative error = 6.3510309735856979006231660751504e+9844 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2613.1MB, alloc=4.7MB, time=192.60
NO POLE
NO POLE
t[1] = 0.996
x1[1] (analytic) = 2.0006648370306193376425165013682
x1[1] (numeric) = 5.6934173434905683570191242679743e+9864
absolute error = 5.6934173434905683570191242679743e+9864
relative error = 2.8457626875377692202819127801112e+9866 %
h = 0.001
x2[1] (analytic) = 1.0015768420659020164578803804734
x2[1] (numeric) = -5.0861662431377634695472462949987e+9862
absolute error = 5.0861662431377634695472462949987e+9862
relative error = 5.0781587887423445094748091319828e+9864 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2616.9MB, alloc=4.7MB, time=192.88
memory used=2620.7MB, alloc=4.7MB, time=193.16
NO POLE
NO POLE
t[1] = 0.997
x1[1] (analytic) = 2.0006641725258964551387764736548
x1[1] (numeric) = -4.5523567426060388909575302611709e+9884
absolute error = 4.5523567426060388909575302611709e+9884
relative error = 2.2754227346704353042476374181647e+9886 %
h = 0.001
x2[1] (analytic) = 1.0015796663209306141657245132347
x2[1] (numeric) = 4.0668094035713087381853038218461e+9882
absolute error = 4.0668094035713087381853038218461e+9882
relative error = 4.0603953338128208065569027227927e+9884 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2624.5MB, alloc=4.7MB, time=193.44
NO POLE
NO POLE
t[1] = 0.998
x1[1] (analytic) = 2.0006635086853461538792039210128
x1[1] (numeric) = 3.6399846808428502941455377674230e+9904
absolute error = 3.6399846808428502941455377674230e+9904
relative error = 1.8193887503025017496918461732063e+9906 %
h = 0.001
x2[1] (analytic) = 1.0015824965625402005005442097848
x2[1] (numeric) = -3.2517495367537972958035412669592e+9902
absolute error = 3.2517495367537972958035412669592e+9902
relative error = 3.2466117847645049614112734681647e+9904 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2628.3MB, alloc=4.7MB, time=193.72
NO POLE
NO POLE
t[1] = 0.999
x1[1] (analytic) = 2.0006628455083045932581775361673
x1[1] (numeric) = -2.9104679676720225582579198836942e+9924
absolute error = 2.9104679676720225582579198836942e+9924
relative error = 1.4547518459726108988140022984718e+9926 %
h = 0.001
x2[1] (analytic) = 1.0015853328023836660877915557993
x2[1] (numeric) = 2.6000419494685398279342282511071e+9922
absolute error = 2.6000419494685398279342282511071e+9922
relative error = 2.5959265419689780084504635981960e+9924 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2632.1MB, alloc=4.7MB, time=194.00
memory used=2635.9MB, alloc=4.7MB, time=194.29
NO POLE
NO POLE
t[1] = 1
x1[1] (analytic) = 2.0006621829941085961788719427863
x1[1] (numeric) = 2.3271591870775309257405888630868e+9944
absolute error = 2.3271591870775309257405888630868e+9944
relative error = 1.1631944697404138288169625293701e+9946 %
h = 0.001
x2[1] (analytic) = 1.0015881750521375627419247426231
x2[1] (numeric) = -2.0789479824897127774096273905847e+9942
absolute error = 2.0789479824897127774096273905847e+9942
relative error = 2.0756514845849626448532199004297e+9944 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2639.8MB, alloc=4.7MB, time=194.57
NO POLE
NO POLE
t[1] = 1.001
x1[1] (analytic) = 2.0006615211420956483900805433908
x1[1] (numeric) = -1.8607557073823945544443510376610e+9964
absolute error = 1.8607557073823945544443510376610e+9964
relative error = 9.3007022313307920267635779660203e+9965 %
h = 0.001
x2[1] (analytic) = 1.0015910233235021505042195804158
x2[1] (numeric) = 1.6622903775769803387367951373937e+9962
absolute error = 1.6622903775769803387367951373937e+9962
relative error = 1.6596498359790910862762234161947e+9964 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2643.6MB, alloc=4.7MB, time=194.85
NO POLE
NO POLE
t[1] = 1.002
x1[1] (analytic) = 2.0006608599516038978237012129387
x1[1] (numeric) = 1.4878276577651251549356688809154e+9984
absolute error = 1.4878276577651251549356688809154e+9984
relative error = 7.4366809865072073845800282608399e+9985 %
h = 0.001
x2[1] (analytic) = 1.00159387762820144477508252723
x2[1] (numeric) = -1.3291382577431530324710469048175e+9982
absolute error = 1.3291382577431530324710469048175e+9982
relative error = 1.3270231452398497194301429736309e+9984 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2647.4MB, alloc=4.7MB, time=195.13
memory used=2651.2MB, alloc=4.7MB, time=195.41
NO POLE
NO POLE
t[1] = 1.003
x1[1] (analytic) = 2.0006601994219721539328841755681
x1[1] (numeric) = -1.1896409240764167499790156560678e+10004
absolute error = 1.1896409240764167499790156560678e+10004
relative error = 5.9462417676931149132491999798487e+10005 %
h = 0.001
x2[1] (analytic) = 1.0015967379779832635410540945977
x2[1] (numeric) = 1.0627556605191820713266005219934e+10002
absolute error = 1.0627556605191820713266005219934e+10002
relative error = 1.0610614234473906414154033789453e+10004 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2655.0MB, alloc=4.7MB, time=195.69
NO POLE
NO POLE
t[1] = 1.004
x1[1] (analytic) = 2.0006595395525398870308414026484
x1[1] (numeric) = 9.5121603691871110612735711884762e+10023
absolute error = 9.5121603691871110612735711884762e+10023
relative error = 4.7545122901393635759398542002691e+10025 %
h = 0.001
x2[1] (analytic) = 1.0015996043846192746966918686243
x2[1] (numeric) = -8.4976080357760754151669427242802e+10021
absolute error = 8.4976080357760754151669427242802e+10021
relative error = 8.4840369330986190001115513317002e+10023 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2658.8MB, alloc=4.7MB, time=195.97
memory used=2662.7MB, alloc=4.7MB, time=196.26
NO POLE
NO POLE
t[1] = 1.005
x1[1] (analytic) = 2.0006588803426472276303168709484
x1[1] (numeric) = -7.6057567504563927463143183070898e+10043
absolute error = 7.6057567504563927463143183070898e+10043
relative error = 3.8016259669183464940621582433334e+10045 %
h = 0.001
x2[1] (analytic) = 1.0016024768599050434615227647822
x2[1] (numeric) = 6.7945384825718175861872243534429e+10041
absolute error = 6.7945384825718175861872243534429e+10041
relative error = 6.7836678118780004109991231445066e+10043 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2666.5MB, alloc=4.7MB, time=196.54
NO POLE
NO POLE
t[1] = 1.006
x1[1] (analytic) = 2.0006582217916349657837170203908
x1[1] (numeric) = 6.0814298226614648588555235693070e+10063
absolute error = 6.0814298226614648588555235693070e+10063
relative error = 3.0397145081659205439024994005528e+10065 %
h = 0.001
x2[1] (analytic) = 1.0016053554156600798922545145423
x2[1] (numeric) = -5.4327939105669845976526216099517e+10061
absolute error = 5.4327939105669845976526216099517e+10061
relative error = 5.4240863242114040442489689785789e+10063 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2670.3MB, alloc=4.7MB, time=196.82
NO POLE
NO POLE
t[1] = 1.007
x1[1] (analytic) = 2.0006575638988445504239007515246
x1[1] (numeric) = -4.8626047218427013720748796053244e+10083
absolute error = 4.8626047218427013720748796053244e+10083
relative error = 2.4305032553229884080068633057520e+10085 %
h = 0.001
x2[1] (analytic) = 1.0016082400637278864904367626857
x2[1] (numeric) = 4.3439668125217268320550241461745e+10081
absolute error = 4.3439668125217268320550241461745e+10081
relative error = 4.3369918884107218459788636339992e+10083 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2674.1MB, alloc=4.7MB, time=197.10
memory used=2677.9MB, alloc=4.7MB, time=197.38
NO POLE
NO POLE
t[1] = 1.008
x1[1] (analytic) = 2.0006569066636180887056283035048
x1[1] (numeric) = 3.8880535285925600546518847525008e+10103
absolute error = 3.8880535285925600546518847525008e+10103
relative error = 1.9433884518842594216401153499240e+10105 %
h = 0.001
x2[1] (analytic) = 1.0016111308159760059057625356098
x2[1] (numeric) = -3.4733597443457651707379689399411e+10101
absolute error = 3.4733597443457651707379689399411e+10101
relative error = 3.4677727088717013821160627347491e+10103 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2681.7MB, alloc=4.7MB, time=197.66
NO POLE
NO POLE
t[1] = 1.009
x1[1] (analytic) = 2.0006562500852983453476683540281
x1[1] (numeric) = -3.1088194714441916020823671236750e+10123
absolute error = 3.1088194714441916020823671236750e+10123
relative error = 1.5538998622635180406405744482557e+10125 %
h = 0.001
x2[1] (analytic) = 1.0016140276842960687352012231734
x2[1] (numeric) = 2.7772375882029919654918779411320e+10121
absolute error = 2.7772375882029919654918779411320e+10121
relative error = 2.7727622731321849214180818779417e+10123 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2685.5MB, alloc=4.7MB, time=197.96
NO POLE
NO POLE
memory used=2689.4MB, alloc=4.7MB, time=198.24
t[1] = 1.01
x1[1] (analytic) = 2.0006555941632287419755626833321
x1[1] (numeric) = 2.4857575737978837312532467452737e+10143
absolute error = 2.4857575737978837312532467452737e+10143
relative error = 1.2424715083645109733976670705980e+10145 %
h = 0.001
x2[1] (analytic) = 1.0016169306806038414181545996241
x2[1] (numeric) = -2.2206305102382607938047246119575e+10141
absolute error = 2.2206305102382607938047246119575e+10141
relative error = 2.2170457010239742783582963474485e+10143 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2693.2MB, alloc=4.7MB, time=198.52
NO POLE
NO POLE
t[1] = 1.011
x1[1] (analytic) = 2.0006549388967533564650477450223
x1[1] (numeric) = -1.9875681982984724692812391898821e+10163
absolute error = 1.9875681982984724692812391898821e+10163
relative error = 9.9345877175326522059240524453763e+10164 %
h = 0.001
x2[1] (analytic) = 1.0016198398168392742278277929117
x2[1] (numeric) = 1.7755772440743051622267810191968e+10161
absolute error = 1.7755772440743051622267810191968e+10161
relative error = 1.7727057447254591452693220909292e+10163 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2697.0MB, alloc=4.7MB, time=198.80
NO POLE
NO POLE
t[1] = 1.012
x1[1] (analytic) = 2.000654284285216922286132487148
x1[1] (numeric) = 1.5892247033775483317424128915245e+10183
absolute error = 1.5892247033775483317424128915245e+10183
relative error = 7.9435248551467653799479591206548e+10184 %
h = 0.001
x2[1] (analytic) = 1.0016227551049665493590074962274
x2[1] (numeric) = -1.4197204510786627554144155502399e+10181
absolute error = 1.4197204510786627554144155502399e+10181
relative error = 1.4174203250103688338298127248036e+10183 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2700.8MB, alloc=4.7MB, time=199.07
memory used=2704.6MB, alloc=4.7MB, time=199.36
NO POLE
NO POLE
t[1] = 1.013
x1[1] (analytic) = 2.000653630327964827847831767606
x1[1] (numeric) = -1.2707162249766398558974093507195e+10203
absolute error = 1.2707162249766398558974093507195e+10203
relative error = 6.3515053566185408106430259253718e+10204 %
h = 0.001
x2[1] (analytic) = 1.0016256765569741291124401009045
x2[1] (numeric) = 1.1351835950464859894356652789074e+10201
absolute error = 1.1351835950464859894356652789074e+10201
relative error = 1.1333411489096494467604093102941e+10203 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2708.4MB, alloc=4.7MB, time=199.64
NO POLE
NO POLE
t[1] = 1.014
x1[1] (analytic) = 2.0006529770243431158435547086047
x1[1] (numeric) = 1.0160424268431959262763765851738e+10223
absolute error = 1.0160424268431959262763765851738e+10223
relative error = 5.0785540446619551019401035111591e+10224 %
h = 0.001
x2[1] (analytic) = 1.0016286041848748041760028158929
x2[1] (numeric) = -9.0767291087734301999355151533002e+10220
absolute error = 9.0767291087734301999355151533002e+10220
relative error = 9.0619707452944306420292096583861e+10222 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2712.2MB, alloc=4.7MB, time=199.92
NO POLE
NO POLE
t[1] = 1.015
x1[1] (analytic) = 2.0006523243736984825971473355761
x1[1] (numeric) = -8.1240972048215497831242496702816e+10242
absolute error = 8.1240972048215497831242496702816e+10242
relative error = 4.0607241477425556579951081439147e+10244 %
h = 0.001
x2[1] (analytic) = 1.0016315380007057420028612258606
x2[1] (numeric) = 7.2575935446531135180533614835753e+10240
absolute error = 7.2575935446531135180533614835753e+10240
relative error = 7.2457717926289975431625797309490e+10242 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2716.1MB, alloc=4.7MB, time=200.21
memory used=2719.9MB, alloc=4.7MB, time=200.49
NO POLE
NO POLE
t[1] = 1.016
x1[1] (analytic) = 2.0006516723753782774095888465807
x1[1] (numeric) = 6.4958857671378649738248783309493e+10262
absolute error = 6.4958857671378649738248783309493e+10262
relative error = 3.2468849309611627893081456087323e+10264 %
h = 0.001
x2[1] (analytic) = 1.0016344780165285352868071275968
x2[1] (numeric) = -5.8030446241342531511401026346771e+10260
absolute error = 5.8030446241342531511401026346771e+10260
relative error = 5.7935751529097162725547326749508e+10262 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2723.7MB, alloc=4.7MB, time=200.77
NO POLE
NO POLE
t[1] = 1.017
x1[1] (analytic) = 2.0006510210287305019063408588982
x1[1] (numeric) = -5.1939964325711386316846647534197e+10282
absolute error = 5.1939964325711386316846647534197e+10282
relative error = 2.5961531411412254735824584201867e+10284 %
h = 0.001
x2[1] (analytic) = 1.0016374242444292505349708727845
x2[1] (numeric) = 4.6400127952195775858506548203582e+10280
absolute error = 4.6400127952195775858506548203582e+10280
relative error = 4.6324275460451214057406180957306e+10282 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2727.5MB, alloc=4.7MB, time=201.06
memory used=2731.3MB, alloc=4.7MB, time=201.34
NO POLE
NO POLE
t[1] = 1.018
x1[1] (analytic) = 2.0006503703331038093853489801569
x1[1] (numeric) = 4.1530285335433543322884442756675e+10302
absolute error = 4.1530285335433543322884442756675e+10302
relative error = 2.0758392346444243406491956088984e+10304 %
h = 0.001
x2[1] (analytic) = 1.0016403766965184767381028343808
x2[1] (numeric) = -3.7100729245233714852191483304350e+10300
absolute error = 3.7100729245233714852191483304350e+10300
relative error = 3.7039969742029140755252388493913e+10302 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2735.1MB, alloc=4.7MB, time=201.61
NO POLE
NO POLE
t[1] = 1.019
x1[1] (analytic) = 2.0006497202878475041656960519996
x1[1] (numeric) = -3.3206888422692490788213129055191e+10322
absolute error = 3.3206888422692490788213129055191e+10322
relative error = 1.6598052165730832131021657792094e+10324 %
h = 0.001
x2[1] (analytic) = 1.0016433353849313741386190037981
x2[1] (numeric) = 2.9665092991688665330435488400902e+10320
absolute error = 2.9665092991688665330435488400902e+10320
relative error = 2.9616423275345185441668103101854e+10322 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2738.9MB, alloc=4.7MB, time=201.89
NO POLE
NO POLE
t[1] = 1.02
x1[1] (analytic) = 2.0006490708923115409369064149424
x1[1] (numeric) = 2.6551646101413362463249578657011e+10342
absolute error = 2.6551646101413362463249578657011e+10342
relative error = 1.3271515973349106944828494899410e+10344 %
h = 0.001
x2[1] (analytic) = 1.0016463003218277230966061168027
x2[1] (numeric) = -2.3719688537351075583016676748736e+10340
absolute error = 2.3719688537351075583016676748736e+10340
relative error = 2.3680702988400165666196595805020e+10342 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2742.8MB, alloc=4.7MB, time=202.17
memory used=2746.6MB, alloc=4.7MB, time=202.46
NO POLE
NO POLE
t[1] = 1.021
x1[1] (analytic) = 2.000648422145846524108900543728
x1[1] (numeric) = -2.1230230960541686566716149695958e+10362
absolute error = 2.1230230960541686566716149695958e+10362
relative error = 1.0611675057714868527047637135777e+10364 %
h = 0.001
x2[1] (analytic) = 1.0016492715193919730539820975697
x2[1] (numeric) = 1.8965847316459635291629923247292e+10360
absolute error = 1.8965847316459635291629923247292e+10360
relative error = 1.8934618988631147494839435200871e+10362 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2750.4MB, alloc=4.7MB, time=202.74
NO POLE
NO POLE
t[1] = 1.022
x1[1] (analytic) = 2.0006477740478037071625994031305
x1[1] (numeric) = 1.6975320660587989021728484586348e+10382
absolute error = 1.6975320660587989021728484586348e+10382
relative error = 8.4849121773408070003943187621327e+10383 %
h = 0.001
x2[1] (analytic) = 1.0016522489898332915970080026189
x2[1] (numeric) = -1.5164759177374487154333730255162e+10380
absolute error = 1.5164759177374487154333730255162e+10380
relative error = 1.5139744549735852010717825519128e+10382 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2754.2MB, alloc=4.7MB, time=203.01
NO POLE
NO POLE
t[1] = 1.023
x1[1] (analytic) = 2.0006471265975349920011778748138
x1[1] (numeric) = -1.3573168943162219686604265982660e+10402
absolute error = 1.3573168943162219686604265982660e+10402
relative error = 6.7843892922016022155601790913346e+10403 %
h = 0.001
x2[1] (analytic) = 1.0016552327453856136173480394472
x2[1] (numeric) = 1.2125475707493586351239872997836e+10400
absolute error = 1.2125475707493586351239872997836e+10400
relative error = 1.2105438389474080767537720904075e+10402 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2758.0MB, alloc=4.7MB, time=203.29
memory used=2761.8MB, alloc=4.7MB, time=203.58
NO POLE
NO POLE
t[1] = 1.024
x1[1] (analytic) = 2.0006464797943929283019666064981
x1[1] (numeric) = 1.0852868045512492864350847929705e+10422
absolute error = 1.0852868045512492864350847929705e+10422
relative error = 5.4246805495730787715408107128732e+10423 %
h = 0.001
x2[1] (analytic) = 1.0016582227983076905718746285333
x2[1] (numeric) = -9.6953179020724989954297989343125e+10419
absolute error = 9.6953179020724989954297989343125e+10419
relative error = 9.6792675199999159944112251086236e+10421 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2765.6MB, alloc=4.7MB, time=203.86
NO POLE
NO POLE
t[1] = 1.025
x1[1] (analytic) = 2.000645833637730712869001635337
x1[1] (numeric) = -8.6777631153440254408150820745854e+10441
absolute error = 8.6777631153440254408150820745854e+10441
relative error = 4.3374809121339772118797567015321e+10443 %
h = 0.001
x2[1] (analytic) = 1.0016612191608831398414158720518
x2[1] (numeric) = 7.7522063042982846327963054155023e+10439
absolute error = 7.7522063042982846327963054155023e+10439
relative error = 7.7393495485354852068977546719155e+10441 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2769.5MB, alloc=4.7MB, time=204.14
memory used=2773.3MB, alloc=4.7MB, time=204.42
NO POLE
NO POLE
t[1] = 1.026
x1[1] (analytic) = 2.0006451881269021889862211380527
x1[1] (numeric) = 6.9385873273528102951359791220515e+10461
absolute error = 6.9385873273528102951359791220515e+10461
relative error = 3.4681748510584433099137322902320e+10463 %
h = 0.001
x2[1] (analytic) = 1.0016642218454204941886431880771
x2[1] (numeric) = -6.1985283196908504384251510300297e+10459
absolute error = 6.1985283196908504384251510300297e+10459
relative error = 6.1882297325854011907948001596948e+10461 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2777.1MB, alloc=4.7MB, time=204.70
NO POLE
NO POLE
t[1] = 1.027
x1[1] (analytic) = 2.0006445432612618457713086610278
x1[1] (numeric) = -5.5479728426986879338911550758687e+10481
absolute error = 5.5479728426986879338911550758687e+10481
relative error = 2.7730927322326365939424427920060e+10483 %
h = 0.001
x2[1] (analytic) = 1.001667230864253251315297265295
x2[1] (numeric) = 4.9562346281607818713834542243130e+10479
absolute error = 4.9562346281607818713834542243130e+10479
relative error = 4.9479851945285956689949433649383e+10481 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2780.9MB, alloc=4.7MB, time=204.99
NO POLE
NO POLE
t[1] = 1.028
x1[1] (analytic) = 2.0006438990401648175301821841967
x1[1] (numeric) = 4.4360618683839866921638279760524e+10501
absolute error = 4.4360618683839866921638279760524e+10501
relative error = 2.2173170700254281267471570475382e+10503 %
h = 0.001
x2[1] (analytic) = 1.0016702462297399235189508902709
x2[1] (numeric) = -3.9629183610159222786129786400806e+10499
absolute error = 3.9629183610159222786129786400806e+10499
relative error = 3.9563103485725379544863608067306e+10501 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2784.7MB, alloc=4.7MB, time=205.26
memory used=2788.5MB, alloc=4.7MB, time=205.55
NO POLE
NO POLE
t[1] = 1.029
x1[1] (analytic) = 2.0006432554629668831121283732244
x1[1] (numeric) = -3.5469973372397021241454795648549e+10521
absolute error = 3.5469973372397021241454795648549e+10521
relative error = 1.7729284456657891102503223335992e+10523 %
h = 0.001
x2[1] (analytic) = 1.0016732679542640874495075971478
x2[1] (numeric) = 3.1686800796000688021736131364085e+10519
absolute error = 3.1686800796000688021736131364085e+10519
relative error = 3.1633868856972922513304398189373e+10521 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2792.4MB, alloc=4.7MB, time=205.83
NO POLE
NO POLE
t[1] = 1.03
x1[1] (analytic) = 2.0006426125290244652655813751082
x1[1] (numeric) = 2.8361169171359505501583479904188e+10541
absolute error = 2.8361169171359505501583479904188e+10541
relative error = 1.4176029738518854935583349110405e+10543 %
h = 0.001
x2[1] (analytic) = 1.0016762960502344339656354882677
x2[1] (numeric) = -2.5336210671471759192727646146949e+10539
absolute error = 2.5336210671471759192727646146949e+10539
relative error = 2.5293810756405419547380122368341e+10541 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2796.2MB, alloc=4.7MB, time=206.11
NO POLE
NO POLE
memory used=2800.0MB, alloc=4.7MB, time=206.39
t[1] = 1.031
x1[1] (analytic) = 2.0006419702376946299945455129803
x1[1] (numeric) = -2.2677093899157763708436967818398e+10561
absolute error = 2.2677093899157763708436967818398e+10561
relative error = 1.1334908612590745959280871843391e+10563 %
h = 0.001
x2[1] (analytic) = 1.0016793305300848180913359736284
x2[1] (numeric) = 2.0258390088728019300997771560427e+10559
absolute error = 2.0258390088728019300997771560427e+10559
relative error = 2.0224426591699119727403545079778e+10561 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2803.8MB, alloc=4.7MB, time=206.68
NO POLE
NO POLE
t[1] = 1.032
x1[1] (analytic) = 2.0006413285883350859156612365344
x1[1] (numeric) = 1.8132206913053980842181096543697e+10581
absolute error = 1.8132206913053980842181096543697e+10581
relative error = 9.0631972127898499212267591106848e+10582 %
h = 0.001
x2[1] (analytic) = 1.0016823714062743090728475773076
x2[1] (numeric) = -1.6198253728967502183119442184599e+10579
absolute error = 1.6198253728967502183119442184599e+10579
relative error = 1.6171048020168881280772276073286e+10581 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2807.6MB, alloc=4.7MB, time=206.97
NO POLE
NO POLE
t[1] = 1.033
x1[1] (analytic) = 2.0006406875803041836159136851419
x1[1] (numeric) = -1.4498194918618451330359812860915e+10601
absolute error = 1.4498194918618451330359812860915e+10601
relative error = 7.2467759996191244610299380650647e+10602 %
h = 0.001
x2[1] (analytic) = 1.0016854186912872405360853600019
x2[1] (numeric) = 1.2951839841113656824076192279715e+10599
absolute error = 1.2951839841113656824076192279715e+10599
relative error = 1.2930047297718853393186820616306e+10601 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2811.4MB, alloc=4.7MB, time=207.25
memory used=2815.2MB, alloc=4.7MB, time=207.53
NO POLE
NO POLE
t[1] = 1.034
x1[1] (analytic) = 2.0006400472129609150109832213661
x1[1] (numeric) = 1.1592502606338866321782730541848e+10621
absolute error = 1.1592502606338866321782730541848e+10621
relative error = 5.7943969593571202983028057154895e+10622 %
h = 0.001
x2[1] (analytic) = 1.0016884723976332607448169086518
x2[1] (numeric) = -1.0356064183009414367655308122199e+10619
absolute error = 1.0356064183009414367655308122199e+10619
relative error = 1.0338607729228653901011003486402e+10621 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2819.1MB, alloc=4.7MB, time=207.82
NO POLE
NO POLE
t[1] = 1.035
x1[1] (analytic) = 2.0006394074856649127042372932255
x1[1] (numeric) = -9.2691619496297410128218305908770e+10640
absolute error = 9.2691619496297410128218305908770e+10640
relative error = 4.6330997554821267321590753624927e+10642 %
h = 0.001
x2[1] (analytic) = 1.0016915325378473829597762467485
x2[1] (numeric) = 8.2805274523367471764626517645239e+10638
absolute error = 8.2805274523367471764626517645239e+10638
relative error = 8.2665443236377563246417570039319e+10640 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2822.9MB, alloc=4.7MB, time=208.10
NO POLE
NO POLE
t[1] = 1.036
x1[1] (analytic) = 2.0006387683977764493463629841968
x1[1] (numeric) = 7.4114594722181533627813011659309e+10660
absolute error = 7.4114594722181533627813011659309e+10660
relative error = 3.7045465624729771230357992667856e+10662 %
h = 0.001
x2[1] (analytic) = 1.0016945991244900358989174223494
x2[1] (numeric) = -6.6209646519376123286056512442308e+10658
absolute error = 6.6209646519376123286056512442308e+10658
relative error = 6.6097637520702680776130055328769e+10660 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2826.7MB, alloc=4.7MB, time=208.39
memory used=2830.5MB, alloc=4.7MB, time=208.67
NO POLE
NO POLE
t[1] = 1.037
x1[1] (analytic) = 2.0006381299486564369956396105919
x1[1] (numeric) = -5.9260731236362064243161871786267e+10680
absolute error = 5.9260731236362064243161871786267e+10680
relative error = 2.9620914621817643523216237942735e+10682 %
h = 0.001
x2[1] (analytic) = 1.0016976721701471142990099350679
x2[1] (numeric) = 5.2940073171107706815859334173807e+10678
absolute error = 5.2940073171107706815859334173807e+10678
relative error = 5.2850350601708668213104982544904e+10680 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2834.3MB, alloc=4.7MB, time=208.95
NO POLE
NO POLE
t[1] = 1.038
x1[1] (analytic) = 2.0006374921376664264788507265796
x1[1] (numeric) = 4.7383842276038138820768133421782e+10700
absolute error = 4.7383842276038138820768133421782e+10700
relative error = 2.3684371837603049371669473114655e+10702 %
h = 0.001
x2[1] (analytic) = 1.0017007516874300295787785683501
x2[1] (numeric) = -4.2329954843393516455754388946558e+10698
absolute error = 4.2329954843393516455754388946558e+10698
relative error = 4.2258084335152944585640707958197e+10700 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2838.1MB, alloc=4.7MB, time=209.23
memory used=2841.9MB, alloc=4.7MB, time=209.52
NO POLE
NO POLE
t[1] = 1.039
x1[1] (analytic) = 2.000636854964168606752834897765
x1[1] (numeric) = -3.7887289981038896050980581144545e+10720
absolute error = 3.7887289981038896050980581144545e+10720
relative error = 1.8937614733543163270208512674753e+10722 %
h = 0.001
x2[1] (analytic) = 1.0017038376889757606037905992103
x2[1] (numeric) = 3.3846290148719158938102151262242e+10718
absolute error = 3.3846290148719158938102151262242e+10718
relative error = 3.3788719654709229305039201058708e+10720 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2845.8MB, alloc=4.7MB, time=209.79
NO POLE
NO POLE
t[1] = 1.04
x1[1] (analytic) = 2.0006362184275258042666746048776
x1[1] (numeric) = 3.0294013173204217980954586082633e+10740
absolute error = 3.0294013173204217980954586082633e+10740
relative error = 1.5142189716536732788486212360504e+10742 %
h = 0.001
x2[1] (analytic) = 1.0017069301874469045532937642652
x2[1] (numeric) = -2.7062900517364340940115760835182e+10738
absolute error = 2.7062900517364340940115760835182e+10738
relative error = 2.7016784751903561521121563557268e+10740 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2849.6MB, alloc=4.7MB, time=210.07
NO POLE
NO POLE
t[1] = 1.041
x1[1] (analytic) = 2.0006355825271014823245226397552
x1[1] (numeric) = -2.4222562093978144388657572761396e+10760
absolute error = 2.4222562093978144388657572761396e+10760
relative error = 1.2107433410427216070015861922596e+10762 %
h = 0.001
x2[1] (analytic) = 1.001710029195531727889208768393
x2[1] (numeric) = 2.1639021032870134489482599642266e+10758
absolute error = 2.1639021032870134489482599642266e+10758
relative error = 2.1602080843942755709461001540285e+10760 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2853.4MB, alloc=4.7MB, time=210.35
memory used=2857.2MB, alloc=4.7MB, time=210.63
NO POLE
NO POLE
t[1] = 1.042
x1[1] (analytic) = 2.0006349472622597404490653564526
x1[1] (numeric) = 1.9367936200529742411892972719431e+10780
absolute error = 1.9367936200529742411892972719431e+10780
relative error = 9.6808946714809303428786121750781e+10781 %
h = 0.001
x2[1] (analytic) = 1.0017131347259442174274805306432
x2[1] (numeric) = -1.7302182039229500700591713250744e+10778
absolute error = 1.7302182039229500700591713250744e+10778
relative error = 1.7272591762474148203230078700757e+10780 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2861.0MB, alloc=4.7MB, time=210.92
NO POLE
NO POLE
t[1] = 1.043
x1[1] (analytic) = 2.0006343126323653137456221409363
x1[1] (numeric) = -1.5486262403308959237814169128024e+10800
absolute error = 1.5486262403308959237814169128024e+10800
relative error = 7.7406761973069789606311980827256e+10801 %
h = 0.001
x2[1] (analytic) = 1.0017162467914241315119927711368
x2[1] (numeric) = 1.3834521573960917112966457439765e+10798
absolute error = 1.3834521573960917112966457439765e+10798
relative error = 1.3810818800507605861775375181825e+10800 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2864.8MB, alloc=4.7MB, time=211.20
NO POLE
NO POLE
t[1] = 1.044
x1[1] (analytic) = 2.0006336786367835722668804634644
x1[1] (numeric) = 1.2382544053278171337335523511891e+10820
absolute error = 1.2382544053278171337335523511891e+10820
relative error = 6.1893110095575026918040138168905e+10821 %
h = 0.001
x2[1] (analytic) = 1.0017193654047370512912509526347
x2[1] (numeric) = -1.1061841029440075880259981855590e+10818
absolute error = 1.1061841029440075880259981855590e+10818
relative error = 1.1042854327739409911289778997987e+10820 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2868.6MB, alloc=4.7MB, time=211.47
memory used=2872.5MB, alloc=4.7MB, time=211.76
NO POLE
NO POLE
t[1] = 1.045
x1[1] (analytic) = 2.0006330452748805203782658783892
x1[1] (numeric) = -9.9008652467759454318740549312727e+10839
absolute error = 9.9008652467759454318740549312727e+10839
relative error = 4.9488661952075266840616447330966e+10841 %
h = 0.001
x2[1] (analytic) = 1.0017224905786744320980390012082
x2[1] (numeric) = 8.8448542514773890465002229190888e+10837
absolute error = 8.8448542514773890465002229190888e+10837
relative error = 8.8296452706855958518602291594464e+10839 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2876.3MB, alloc=4.7MB, time=212.04
NO POLE
NO POLE
t[1] = 1.046
x1[1] (analytic) = 2.000632412546022796123946336749
x1[1] (numeric) = 7.9165583593352020525341136454892e+10859
absolute error = 7.9165583593352020525341136454892e+10859
relative error = 3.9570279426096664632912069949388e+10861 %
h = 0.001
x2[1] (analytic) = 1.0017256223260536549322556420197
x2[1] (numeric) = -7.0721904718818341308658949816947e+10857
absolute error = 7.0721904718818341308658949816947e+10857
relative error = 7.0600075652052083183925604573258e+10859 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2880.1MB, alloc=4.7MB, time=212.32
memory used=2883.9MB, alloc=4.7MB, time=212.61
NO POLE
NO POLE
t[1] = 1.047
x1[1] (analytic) = 2.0006317804495776705934701776564
x1[1] (numeric) = -6.3299413429718319220409310936517e+10879
absolute error = 6.3299413429718319220409310936517e+10879
relative error = 3.1639712039110870858813245093654e+10881 %
h = 0.001
x2[1] (analytic) = 1.0017287606597180780471365986285
x2[1] (numeric) = 5.6547995759479994554735201610964e+10877
absolute error = 5.6547995759479994554735201610964e+10877
relative error = 5.6450406517467503740285929757607e+10879 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2887.7MB, alloc=4.7MB, time=212.89
NO POLE
NO POLE
t[1] = 1.048
x1[1] (analytic) = 2.0006311489849130472890371651189
x1[1] (numeric) = 5.0613101788374598308308587100427e+10899
absolute error = 5.0613101788374598308308587100427e+10899
relative error = 2.5298567311648048621377598767553e+10901 %
h = 0.001
x2[1] (analytic) = 1.0017319055925370886390693174571
x2[1] (numeric) = -4.5214786523747290437020982963090e+10897
absolute error = 4.5214786523747290437020982963090e+10897
relative error = 4.5136614169239395930146506528912e+10899 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2891.5MB, alloc=4.7MB, time=213.17
NO POLE
NO POLE
t[1] = 1.049
x1[1] (analytic) = 2.0006305181513974614934019375641
x1[1] (numeric) = -4.0469349301074043134634225914576e+10919
absolute error = 4.0469349301074043134634225914576e+10919
relative error = 2.0228297496165421507071823386121e+10921 %
h = 0.001
x2[1] (analytic) = 1.0017350571374061546412072931139
x2[1] (numeric) = 3.6152951009679415666670296000077e+10917
absolute error = 3.6152951009679415666670296000077e+10917
relative error = 3.6090332221167719296895863824623e+10919 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2895.4MB, alloc=4.7MB, time=213.45
memory used=2899.2MB, alloc=4.7MB, time=213.73
NO POLE
NO POLE
t[1] = 1.05
x1[1] (analytic) = 2.0006298879484000796384092379724
x1[1] (numeric) = 3.2358582560307016472877816023833e+10939
absolute error = 3.2358582560307016472877816023833e+10939
relative error = 1.6174197314171887332216912580904e+10941 %
h = 0.001
x2[1] (analytic) = 1.0017382153072468766210914851442
x2[1] (numeric) = -2.8907266122373720295172732856683e+10937
absolute error = 2.8907266122373720295172732856683e+10937
relative error = 2.8857106258552255120774843560283e+10939 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2903.0MB, alloc=4.7MB, time=214.02
NO POLE
NO POLE
t[1] = 1.051
x1[1] (analytic) = 2.0006292583752906986741602931521
x1[1] (numeric) = -2.5873355598638604486265364162919e+10959
absolute error = 2.5873355598638604486265364162919e+10959
relative error = 1.2932608823111151704130666149081e+10961 %
h = 0.001
x2[1] (analytic) = 1.0017413801150070397824867324982
x2[1] (numeric) = 2.3113743451980112286135274566830e+10957
absolute error = 2.3113743451980112286135274566830e+10957
relative error = 2.3073563607132301990406018606944e+10959 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2906.8MB, alloc=4.7MB, time=214.30
NO POLE
NO POLE
memory used=2910.6MB, alloc=4.7MB, time=214.58
t[1] = 1.052
x1[1] (analytic) = 2.0006286294314397454388097113235
x1[1] (numeric) = 2.0687881760147534071539929758520e+10979
absolute error = 2.0687881760147534071539929758520e+10979
relative error = 1.0340690648832132217951138101054e+10981 %
h = 0.001
x2[1] (analytic) = 1.0017445515736606660716414885484
x2[1] (numeric) = -1.8481344244119200551969346356011e+10977
absolute error = 1.8481344244119200551969346356011e+10977
relative error = 1.8449158735214965859559226285816e+10979 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2914.4MB, alloc=4.7MB, time=214.86
NO POLE
NO POLE
t[1] = 1.053
x1[1] (analytic) = 2.0006280011162182760289922678097
x1[1] (numeric) = -1.6541667743489939306940024528199e+10999
absolute error = 1.6541667743489939306940024528199e+10999
relative error = 8.2682376405112701322037439557340e+11000 %
h = 0.001
x2[1] (analytic) = 1.0017477296962080663881796168653
x2[1] (numeric) = 1.4777359010635599759261992520838e+10997
absolute error = 1.4777359010635599759261992520838e+10997
relative error = 1.4751577241025552344538147952103e+10999 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2918.2MB, alloc=4.7MB, time=215.14
NO POLE
NO POLE
t[1] = 1.054
x1[1] (analytic) = 2.0006273734289979751708789492587
x1[1] (numeric) = 1.3226427669512366344001361702612e+11019
absolute error = 1.3226427669512366344001361702612e+11019
relative error = 6.6111400079679908823340412684179e+11020 %
h = 0.001
x2[1] (analytic) = 1.0017509144956758929008334061753
x2[1] (numeric) = -1.1815717322548061711880018325594e+11017
absolute error = 1.1815717322548061711880018325594e+11017
relative error = 1.1795065171961033270337211826253e+11019 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2922.1MB, alloc=4.7MB, time=215.42
memory used=2925.9MB, alloc=4.7MB, time=215.70
NO POLE
NO POLE
t[1] = 1.055
x1[1] (analytic) = 2.0006267463691511555918616274553
x1[1] (numeric) = -1.0575619799018769017261237785420e+11039
absolute error = 1.0575619799018769017261237785420e+11039
relative error = 5.2861533607965567983501235228346e+11040 %
h = 0.001
x2[1] (analytic) = 1.0017541059851171914682273819759
x2[1] (numeric) = 9.4476405253388655518610531189564e+11036
absolute error = 9.4476405253388655518610531189564e+11036
relative error = 9.4310973809766713034332510293366e+11038 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2929.7MB, alloc=4.7MB, time=215.98
NO POLE
NO POLE
t[1] = 1.056
x1[1] (analytic) = 2.0006261199360507573928657344053
x1[1] (numeric) = 8.4560802756441685302273406241997e+11058
absolute error = 8.4560802756441685302273406241997e+11058
relative error = 4.2267169219576438780581799964688e+11060 %
h = 0.001
x2[1] (analytic) = 1.001757304177611454164922912169
x2[1] (numeric) = -7.5541678138908581890482382747668e+11056
absolute error = 7.5541678138908581890482382747668e+11056
relative error = 7.5409161304717625591471853865658e+11058 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2933.5MB, alloc=4.7MB, time=216.26
NO POLE
NO POLE
t[1] = 1.057
x1[1] (analytic) = 2.0006254941290703474212903110062
x1[1] (numeric) = -6.7613336132576160931805304104333e+11078
absolute error = 6.7613336132576160931805304104333e+11078
relative error = 3.3796098435709570521560165535468e+11080 %
h = 0.001
x2[1] (analytic) = 1.0017605090862646719129340248063
x2[1] (numeric) = 6.0401802129720402845128345822794e+11076
absolute error = 6.0401802129720402845128345822794e+11076
relative error = 6.0295651088117527585862484693010e+11078 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2937.3MB, alloc=4.7MB, time=216.55
memory used=2941.1MB, alloc=4.7MB, time=216.83
NO POLE
NO POLE
t[1] = 1.058
x1[1] (analytic) = 2.0006248689475841186445748022435
x1[1] (numeric) = 5.4062438789093399773432614840510e+11098
absolute error = 5.4062438789093399773432614840510e+11098
relative error = 2.7022776547575657684601393931065e+11100 %
h = 0.001
x2[1] (analytic) = 1.0017637207242093872189252776101
x2[1] (numeric) = -4.8296222567483031093571432075722e+11096
absolute error = 4.8296222567483031093571432075722e+11096
relative error = 4.8211191489913443508981291504728e+11098 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2944.9MB, alloc=4.7MB, time=217.11
NO POLE
NO POLE
t[1] = 1.059
x1[1] (analytic) = 2.0006242443909668895243919724792
x1[1] (numeric) = -4.3227378724421328762128293339298e+11118
absolute error = 4.3227378724421328762128293339298e+11118
relative error = 2.1606945354988774466018528795977e+11120 %
h = 0.001
x2[1] (analytic) = 1.0017669391046047470173029413471
x2[1] (numeric) = 3.8616813274519006060901006652390e+11116
absolute error = 3.8616813274519006060901006652390e+11116
relative error = 3.8548700068935524176191761595286e+11118 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2948.8MB, alloc=4.7MB, time=217.39
memory used=2952.6MB, alloc=4.7MB, time=217.69
NO POLE
NO POLE
t[1] = 1.06
x1[1] (analytic) = 2.0006236204585941033914663150266
x1[1] (numeric) = 3.4563854558509629944232713473829e+11138
absolute error = 3.4563854558509629944232713473829e+11138
relative error = 1.7276540277269499820296909398545e+11140 %
h = 0.001
x2[1] (analytic) = 1.0017701642406365556194111823943
x2[1] (numeric) = -3.0877327215298705541694576898705e+11136
absolute error = 3.0877327215298705541694576898705e+11136
relative error = 3.0822765857380457311275000682305e+11138 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2956.4MB, alloc=4.7MB, time=217.97
NO POLE
NO POLE
t[1] = 1.061
x1[1] (analytic) = 2.0006229971498418278210173308279
x1[1] (numeric) = -2.7636652445615055317868253063115e+11158
absolute error = 2.7636652445615055317868253063115e+11158
relative error = 1.3814023174274816573985939597315e+11160 %
h = 0.001
x2[1] (analytic) = 1.0017733961455173277690453539452
x2[1] (numeric) = 2.4688969780676480704656678284424e+11156
absolute error = 2.4688969780676480704656678284424e+11156
relative error = 2.4645263964556479148475680771135e+11158 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2960.2MB, alloc=4.7MB, time=218.24
NO POLE
NO POLE
t[1] = 1.062
x1[1] (analytic) = 2.00062237446408675400882705168
x1[1] (numeric) = 2.2097783020895065710729888161412e+11178
absolute error = 2.2097783020895065710729888161412e+11178
relative error = 1.1045454306095357441634446359473e+11180 %
h = 0.001
x2[1] (analytic) = 1.0017766348324863418044949302553
x2[1] (numeric) = -1.9740867613993051541859063489752e+11176
absolute error = 1.9740867613993051541859063489752e+11176
relative error = 1.9705857501152491762553886721319e+11178 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2964.0MB, alloc=4.7MB, time=218.53
memory used=2967.8MB, alloc=4.7MB, time=218.82
NO POLE
NO POLE
t[1] = 1.063
x1[1] (analytic) = 2.0006217524007061961479311840732
x1[1] (numeric) = -1.7669000086008457369996401856426e+11198
absolute error = 1.7669000086008457369996401856426e+11198
relative error = 8.8317544607350238560850892859154e+11199 %
h = 0.001
x2[1] (analytic) = 1.0017798803148096929273290441388
x2[1] (numeric) = 1.5784451826670016634331658463428e+11196
absolute error = 1.5784451826670016634331658463428e+11196
relative error = 1.5756407307471324826596325001493e+11198 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2971.6MB, alloc=4.7MB, time=219.09
NO POLE
NO POLE
t[1] = 1.064
x1[1] (analytic) = 2.0006211309590780908059332503374
x1[1] (numeric) = 1.4127822856445150493305800891929e+11218
absolute error = 1.4127822856445150493305800891929e+11218
relative error = 7.0617183022916543854230934753170e+11219 %
h = 0.001
x2[1] (analytic) = 1.0017831326057803465781380145825
x2[1] (numeric) = -1.2620971091050756343936773624799e+11216
absolute error = 1.2620971091050756343936773624799e+11216
relative error = 1.2598506283712140644251517993570e+11218 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2975.5MB, alloc=4.7MB, time=219.38
NO POLE
NO POLE
t[1] = 1.065
x1[1] (analytic) = 2.0006205101385809963029411044061
x1[1] (numeric) = -1.1296359595422013054760591181287e+11238
absolute error = 1.1296359595422013054760591181287e+11238
relative error = 5.6464279648115401165432518114257e+11239 %
h = 0.001
x2[1] (analytic) = 1.0017863917187181919194446788586
x2[1] (numeric) = 1.0091507328242989767329388873957e+11236
absolute error = 1.0091507328242989767329388873957e+11236
relative error = 1.0073512089667599978371860851050e+11238 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2979.3MB, alloc=4.7MB, time=219.66
memory used=2983.1MB, alloc=4.7MB, time=219.94
NO POLE
NO POLE
t[1] = 1.066
x1[1] (analytic) = 2.0006198899385940920901252001383
x1[1] (numeric) = 9.0323711873884371965904524142698e+11257
absolute error = 9.0323711873884371965904524142698e+11257
relative error = 4.5147862584059742332197336494364e+11259 %
h = 0.001
x2[1] (analytic) = 1.0017896576669700954259997718836
x2[1] (numeric) = -8.0689924270719029622151320061957e+11255
absolute error = 8.0689924270719029622151320061957e+11255
relative error = 8.0545774907114464694650054299845e+11257 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2986.9MB, alloc=4.7MB, time=220.22
NO POLE
NO POLE
t[1] = 1.067
x1[1] (analytic) = 2.0006192703584971781288979907532
x1[1] (numeric) = -7.2221257279936099195769764050328e+11277
absolute error = 7.2221257279936099195769764050328e+11277
relative error = 3.6099450979993083785222043950018e+11279 %
h = 0.001
x2[1] (analytic) = 1.0017929304639099545826760247977
x2[1] (numeric) = 6.4518249524453986305568931349257e+11275
absolute error = 6.4518249524453986305568931349257e+11275
relative error = 6.4402779818556810582546392371648e+11277 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2990.7MB, alloc=4.7MB, time=220.50
memory used=2994.5MB, alloc=4.7MB, time=220.78
NO POLE
NO POLE
t[1] = 1.068
x1[1] (analytic) = 2.0006186513976706742707138385598
x1[1] (numeric) = 5.7746851794327313370247724894098e+11297
absolute error = 5.7746851794327313370247724894098e+11297
relative error = 2.8864497366344281491999521840400e+11299 %
h = 0.001
x2[1] (analytic) = 1.0017962101229387516901760848239
x2[1] (numeric) = -5.1587661772168050308554893122627e+11295
absolute error = 5.1587661772168050308554893122627e+11295
relative error = 5.1495165634373181475088830411220e+11297 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2998.4MB, alloc=4.7MB, time=221.06
NO POLE
NO POLE
t[1] = 1.069
x1[1] (analytic) = 2.0006180330554956196374888147792
x1[1] (numeric) = -4.6173370801762843075890310937280e+11317
absolute error = 4.6173370801762843075890310937280e+11317
relative error = 2.3079553437416221148759565748419e+11319 %
h = 0.001
x2[1] (analytic) = 1.001799496657484607778769789409
x2[1] (numeric) = 4.1248590386986806895519549514382e+11315
absolute error = 4.1248590386986806895519549514382e+11315
relative error = 4.1174497017230690315357777433859e+11317 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3002.2MB, alloc=4.7MB, time=221.34
NO POLE
NO POLE
t[1] = 1.07
x1[1] (analytic) = 2.0006174153313536720026397698809
x1[1] (numeric) = 3.6919418201193051774674233681163e+11337
absolute error = 3.6919418201193051774674233681163e+11337
relative error = 1.8454012205566173714017354405781e+11339 %
h = 0.001
x2[1] (analytic) = 1.0018027900810028366302767594595
x2[1] (numeric) = -3.2981650078030170414823655908334e+11335
absolute error = 3.2981650078030170414823655908334e+11335
relative error = 3.2922298085597636318723685387491e+11337 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3006.0MB, alloc=4.7MB, time=221.62
memory used=3009.8MB, alloc=4.7MB, time=221.91
NO POLE
NO POLE
t[1] = 1.071
x1[1] (analytic) = 2.000616798224627107172742055471
x1[1] (numeric) = -2.9520119857971154575469011624413e+11357
absolute error = 2.9520119857971154575469011624413e+11357
relative error = 1.4755509343002460982480464560513e+11359 %
h = 0.001
x2[1] (analytic) = 1.0018060904069759989085107091531
x2[1] (numeric) = 2.6371549467852981756738389595383e+11355
absolute error = 2.6371549467852981756738389595383e+11355
relative error = 2.6324005933263734847903368615248e+11357 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3013.6MB, alloc=4.7MB, time=222.19
NO POLE
NO POLE
t[1] = 1.072
x1[1] (analytic) = 2.0006161817346988183698052793905
x1[1] (numeric) = 2.3603770559981965778360818716791e+11377
absolute error = 2.3603770559981965778360818716791e+11377
relative error = 1.1798250346808429212504465111145e+11379 %
h = 0.001
x2[1] (analytic) = 1.0018093976489139563984023033489
x2[1] (numeric) = -2.1086228848164202059207291531897e+11375
absolute error = 2.1086228848164202059207291531897e+11375
relative error = 2.1048144385199620373856993099372e+11377 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3017.4MB, alloc=4.7MB, time=222.47
NO POLE
NO POLE
memory used=3021.2MB, alloc=4.7MB, time=222.76
t[1] = 1.073
x1[1] (analytic) = 2.0006155658609523156141664762995
x1[1] (numeric) = -1.8873161332975769609806880396488e+11397
absolute error = 1.8873161332975769609806880396488e+11397
relative error = 9.4336771416920488819203401758225e+11398 %
h = 0.001
x2[1] (analytic) = 1.0018127118203539263540178280202
x2[1] (numeric) = 1.6860179094867243066126919865844e+11395
absolute error = 1.6860179094867243066126919865844e+11395
relative error = 1.6829671749953425942110383881795e+11397 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3025.1MB, alloc=4.7MB, time=223.04
NO POLE
NO POLE
t[1] = 1.074
x1[1] (analytic) = 2.0006149506027717251080000766397
x1[1] (numeric) = 1.5090649089109086682835478083715e+11417
absolute error = 1.5090649089109086682835478083715e+11417
relative error = 7.5430052567398721036907538622924e+11418 %
h = 0.001
x2[1] (analytic) = 1.0018160329348605359556913744122
x2[1] (numeric) = -1.3481103764827393030674338715435e+11415
absolute error = 1.3481103764827393030674338715435e+11415
relative error = 1.3456666016148648564091730206312e+11417 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3028.9MB, alloc=4.7MB, time=223.32
NO POLE
NO POLE
t[1] = 1.075
x1[1] (analytic) = 2.0006143359595417886194440574866
x1[1] (numeric) = -1.2066218579541100180307356496890e+11437
absolute error = 1.2066218579541100180307356496890e+11437
relative error = 6.0312566808404166299002209594023e+11438 %
h = 0.001
x2[1] (analytic) = 1.0018193610060258768764886737703
x2[1] (numeric) = 1.0779254342165950227876331251597e+11435
absolute error = 1.0779254342165950227876331251597e+11435
relative error = 1.0759678602479228517711988698022e+11437 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3032.7MB, alloc=4.7MB, time=223.60
memory used=3036.5MB, alloc=4.7MB, time=223.88
NO POLE
NO POLE
t[1] = 1.076
x1[1] (analytic) = 2.0006137219306478628673416594154
x1[1] (numeric) = 9.6479369409191079959418042367707e+11456
absolute error = 9.6479369409191079959418042367707e+11456
relative error = 4.8224886369411585437539221602423e+11458 %
h = 0.001
x2[1] (analytic) = 1.0018226960474695599582211565038
x2[1] (numeric) = -8.6189028880745489239422038352357e+11454
absolute error = 8.6189028880745489239422038352357e+11454
relative error = 8.6032218296501417746536551909374e+11456 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3040.3MB, alloc=4.7MB, time=224.17
NO POLE
NO POLE
t[1] = 1.077
x1[1] (analytic) = 2.0006131085154759189065980541243
x1[1] (numeric) = -7.7143213180124287317961370302922e+11476
absolute error = 7.7143213180124287317961370302922e+11476
relative error = 3.8559785923509827486443939320437e+11478 %
h = 0.001
x2[1] (analytic) = 1.0018260380728387699972292475448
x2[1] (numeric) = 6.8915237210306982181987813097401e+11474
absolute error = 6.8915237210306982181987813097401e+11474
relative error = 6.8789624736521801729821470264928e+11476 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3044.1MB, alloc=4.7MB, time=224.45
NO POLE
NO POLE
t[1] = 1.078
x1[1] (analytic) = 2.0006124957134125415141513481704
x1[1] (numeric) = 6.1682361485119470961578273180412e+11496
absolute error = 6.1682361485119470961578273180412e+11496
relative error = 3.0831738588698418568916815919748e+11498 %
h = 0.001
x2[1] (analytic) = 1.0018293870958083206401543484281
x2[1] (numeric) = -5.5103416077749419934531738990194e+11494
absolute error = 5.5103416077749419934531738990194e+11494
relative error = 5.5002794674937694302443869324772e+11496 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3047.9MB, alloc=4.7MB, time=224.74
memory used=3051.8MB, alloc=4.7MB, time=225.02
NO POLE
NO POLE
t[1] = 1.079
x1[1] (analytic) = 2.00061188352384492857555730879
x1[1] (numeric) = -4.9320135388931696038462776832553e+11516
absolute error = 4.9320135388931696038462776832553e+11516
relative error = 2.4652525457391575235899155572577e+11518 %
h = 0.001
x2[1] (analytic) = 1.0018327431300807093899193962709
x2[1] (numeric) = 4.4059725923477637784736698275234e+11514
absolute error = 4.4059725923477637784736698275234e+11514
relative error = 4.3979123487039794429234078473392e+11516 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3055.6MB, alloc=4.7MB, time=225.30
NO POLE
NO POLE
t[1] = 1.08
x1[1] (analytic) = 2.0006112719461608904721871983874
x1[1] (numeric) = 3.9435516024615464850663972022436e+11536
absolute error = 3.9435516024615464850663972022436e+11536
relative error = 1.9711733397489688353627583134627e+11538 %
h = 0.001
x2[1] (analytic) = 1.0018361061893861727221383303517
x2[1] (numeric) = -3.5229384793728634706391874296570e+11534
absolute error = 3.5229384793728634706391874296570e+11534
relative error = 3.5164818452918589784909186597889e+11536 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3059.4MB, alloc=4.7MB, time=225.58
memory used=3063.2MB, alloc=4.7MB, time=225.87
NO POLE
NO POLE
t[1] = 1.081
x1[1] (analytic) = 2.0006106609797488494690381048906
x1[1] (numeric) = -3.1531947588219887509538198450738e+11556
absolute error = 3.1531947588219887509538198450738e+11556
relative error = 1.5761161430969236028788485616020e+11558 %
h = 0.001
x2[1] (analytic) = 1.0018394762874827413121752384054
x2[1] (numeric) = 2.8168798759668668379730373481175e+11554
absolute error = 2.8168798759668668379730373481175e+11554
relative error = 2.8117078061301602873731207525597e+11556 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3067.0MB, alloc=4.7MB, time=226.15
NO POLE
NO POLE
t[1] = 1.082
x1[1] (analytic) = 2.0006100506239978391031551557832
x1[1] (numeric) = 2.5212392760009307671058065418014e+11576
absolute error = 2.5212392760009307671058065418014e+11576
relative error = 1.2602352343549142443359622892937e+11578 %
h = 0.001
x2[1] (analytic) = 1.0018428534381562953730743970359
x2[1] (numeric) = -2.2523277888859495876924732047841e+11574
absolute error = 2.2523277888859495876924732047841e+11574
relative error = 2.2481847139562249311280346481544e+11576 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3070.8MB, alloc=4.7MB, time=226.43
NO POLE
NO POLE
t[1] = 1.083
x1[1] (analytic) = 2.0006094408782975035726650042359
x1[1] (numeric) = -2.0159387456372964633864603845260e+11596
absolute error = 2.0159387456372964633864603845260e+11596
relative error = 1.0076623175147414907074600338881e+11598 %
h = 0.001
x2[1] (analytic) = 1.0018462376552206201045828638317
x2[1] (numeric) = 1.8009218326523842615991882761279e+11594
absolute error = 1.8009218326523842615991882761279e+11594
relative error = 1.7976030302488002352178243085185e+11596 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3074.6MB, alloc=4.7MB, time=226.71
memory used=3078.5MB, alloc=4.7MB, time=226.99
NO POLE
NO POLE
t[1] = 1.084
x1[1] (analytic) = 2.0006088317420380971264199763704
x1[1] (numeric) = 1.6119092958950779007460070422618e+11616
absolute error = 1.6119092958950779007460070422618e+11616
relative error = 8.0570937722568257904113422428144e+11617 %
h = 0.001
x2[1] (analytic) = 1.0018496289525174612534877228308
x2[1] (numeric) = -1.4399855399947086867440115602608e+11614
absolute error = 1.4399855399947086867440115602608e+11614
relative error = 1.4373270183273747786986005812245e+11616 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3082.3MB, alloc=4.7MB, time=227.27
NO POLE
NO POLE
t[1] = 1.085
x1[1] (analytic) = 2.0006082232146104834542522692988
x1[1] (numeric) = -1.2888544276535463051287955637477e+11636
absolute error = 1.2888544276535463051287955637477e+11636
relative error = 6.4423129561198825249512505692842e+11637 %
h = 0.001
x2[1] (analytic) = 1.0018530273439165807854905299369
x2[1] (numeric) = 1.1513872050403939349170653331322e+11634
absolute error = 1.1513872050403939349170653331322e+11634
relative error = 1.1492575992837172821454856721958e+11636 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3086.1MB, alloc=4.7MB, time=227.56
NO POLE
NO POLE
memory used=3089.9MB, alloc=4.7MB, time=227.84
t[1] = 1.086
x1[1] (analytic) = 2.0006076152954061350778375901955
x1[1] (numeric) = 1.0305454158695275711507620272082e+11656
absolute error = 1.0305454158695275711507620272082e+11656
relative error = 5.1511621169019647160516474668726e+11657 %
h = 0.001
x2[1] (analytic) = 1.0018564328433158126688419507311
x2[1] (numeric) = -9.2062903349404569802598855312164e+11653
absolute error = 9.2062903349404569802598855312164e+11653
relative error = 9.1892311444390996831823440476538e+11655 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3093.7MB, alloc=4.7MB, time=228.13
NO POLE
NO POLE
t[1] = 1.087
x1[1] (analytic) = 2.0006070079838171327421676272613
x1[1] (numeric) = -8.2400605637301458835797027392870e+11675
absolute error = 8.2400605637301458835797027392870e+11675
relative error = 4.1187802156278358678394643534202e+11677 %
h = 0.001
x2[1] (analytic) = 1.0018598454646411187699600298615
x2[1] (numeric) = 7.3611884308063504932592007732250e+11673
absolute error = 7.3611884308063504932592007732250e+11673
relative error = 7.3475231731564100224973081635924e+11675 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3097.5MB, alloc=4.7MB, time=228.41
NO POLE
NO POLE
t[1] = 1.088
x1[1] (analytic) = 2.0006064012792361648076307440557
x1[1] (numeric) = 6.5886080369054871914236524207216e+11695
absolute error = 6.5886080369054871914236524207216e+11695
relative error = 3.2933054861228933946306841174922e+11697 %
h = 0.001
x2[1] (analytic) = 1.0018632652218466448612559788203
x2[1] (numeric) = -5.8858772798183453825127664253401e+11693
absolute error = 5.8858772798183453825127664253401e+11693
relative error = 5.8749307257163598190420608853354e+11695 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3101.3MB, alloc=4.7MB, time=228.69
memory used=3105.2MB, alloc=4.7MB, time=228.97
NO POLE
NO POLE
t[1] = 1.089
x1[1] (analytic) = 2.000605795181056526642700289276
x1[1] (numeric) = -5.2681355347131894853073070555571e+11715
absolute error = 5.2681355347131894853073070555571e+11715
relative error = 2.6332701561710805386920766469350e+11717 %
h = 0.001
x2[1] (analytic) = 1.0018666921289147767413918174488
x2[1] (numeric) = 4.7062443352352715670351777907203e+11713
absolute error = 4.7062443352352715670351777907203e+11713
relative error = 4.6974755945172170166526046785021e+11715 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3109.0MB, alloc=4.7MB, time=229.25
NO POLE
NO POLE
t[1] = 1.09
x1[1] (analytic) = 2.0006051896886721200172299146716
x1[1] (numeric) = 4.2123088604832025519913518852026e+11735
absolute error = 4.2123088604832025519913518852026e+11735
relative error = 2.1055173115584633632115439511137e+11737 %
h = 0.001
x2[1] (analytic) = 1.0018701261998561964681946539286
x2[1] (numeric) = -3.7630305033504971498192765135351e+11733
absolute error = 3.7630305033504971498192765135351e+11733
relative error = 3.7560062975665929949856905027969e+11735 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3112.8MB, alloc=4.7MB, time=229.53
NO POLE
NO POLE
t[1] = 1.091
x1[1] (analytic) = 2.0006045848014774524963552943896
x1[1] (numeric) = -3.3680883529264209669051994739762e+11755
absolute error = 3.3680883529264209669051994739762e+11755
relative error = 1.6835352565487800653258351604531e+11757 %
h = 0.001
x2[1] (analytic) = 1.0018735674487099387044528383454
x2[1] (numeric) = 3.0088532512280619450023793865614e+11753
absolute error = 3.0088532512280619450023793865614e+11753
relative error = 3.0032265038094216578552227597064e+11755 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3116.6MB, alloc=4.7MB, time=229.81
memory used=3120.4MB, alloc=4.7MB, time=230.10
NO POLE
NO POLE
t[1] = 1.092
x1[1] (analytic) = 2.0006039805188676368350016396528
x1[1] (numeric) = 2.6930644282853740301934060209573e+11775
absolute error = 2.6930644282853740301934060209573e+11775
relative error = 1.3461256972941306308685498563409e+11777 %
h = 0.001
x2[1] (analytic) = 1.0018770158895434471768196761349
x2[1] (numeric) = -2.4058263358123099372307237569202e+11773
absolute error = 2.4058263358123099372307237569202e+11773
relative error = 2.4013190218524299978683954532579e+11775 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3124.2MB, alloc=4.7MB, time=230.38
NO POLE
NO POLE
t[1] = 1.093
x1[1] (analytic) = 2.0006033768402383903729964032778
x1[1] (numeric) = -2.1533271265269768921545324793762e+11795
absolute error = 2.1533271265269768921545324793762e+11795
relative error = 1.0763388442980392501974948091871e+11797 %
h = 0.001
x2[1] (analytic) = 1.0018804715364526312480508398454
x2[1] (numeric) = 1.9236565810332278789546478359711e+11793
absolute error = 1.9236565810332278789546478359711e+11793
relative error = 1.9200459892018537567941543177343e+11795 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3128.1MB, alloc=4.7MB, time=230.66
memory used=3131.9MB, alloc=4.7MB, time=230.94
NO POLE
NO POLE
t[1] = 1.094
x1[1] (analytic) = 2.0006027737649860344307865691452
x1[1] (numeric) = 1.7217626378100081631587670740929e+11815
absolute error = 1.7217626378100081631587670740929e+11815
relative error = 8.6062193874188156945860624889445e+11816 %
h = 0.001
x2[1] (analytic) = 1.001883934403561922602802070687
x2[1] (numeric) = -1.5381220941298806404963684925698e+11813
absolute error = 1.5381220941298806404963684925698e+11813
relative error = 1.5352298218511210720272641474411e+11815 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3135.7MB, alloc=4.7MB, time=231.22
NO POLE
NO POLE
t[1] = 1.095
x1[1] (analytic) = 2.0006021712925074937057599223403
x1[1] (numeric) = -1.3766912348983211960041693028617e+11835
absolute error = 1.3766912348983211960041693028617e+11835
relative error = 6.8813842884559958265681776107373e+11836 %
h = 0.001
x2[1] (analytic) = 1.0018874045050243320472142152763
x2[1] (numeric) = 1.2298554740887110102386873354436e+11833
absolute error = 1.2298554740887110102386873354436e+11833
relative error = 1.2275386121819874107922358993749e+11835 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3139.5MB, alloc=4.7MB, time=231.50
NO POLE
NO POLE
t[1] = 1.096
x1[1] (analytic) = 2.0006015694222002956691696962845
x1[1] (numeric) = 1.1007781877858377934960436384287e+11855
absolute error = 1.1007781877858377934960436384287e+11855
relative error = 5.5022359504784194687527573030602e+11856 %
h = 0.001
x2[1] (analytic) = 1.0018908818550215064225130978292
x2[1] (numeric) = -9.8337088643253523053857755610445e+11852
absolute error = 9.8337088643253523053857755610445e+11852
relative error = 9.8151495760876062201399152665966e+11854 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3143.3MB, alloc=4.7MB, time=231.79
memory used=3147.1MB, alloc=4.7MB, time=232.07
NO POLE
NO POLE
t[1] = 1.097
x1[1] (analytic) = 2.0006009681534625699636619937826
x1[1] (numeric) = -8.8016295011463996784140943743692e+11874
absolute error = 8.8016295011463996784140943743692e+11874
relative error = 4.3994927730492041883913581905776e+11876 %
h = 0.001
x2[1] (analytic) = 1.0018943664677637856328521838189
x2[1] (numeric) = 7.8628612927030632957504833133887e+11872
absolute error = 7.8628612927030632957504833133887e+11872
relative error = 7.8479943154327067701452431769344e+11874 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3150.9MB, alloc=4.7MB, time=232.35
NO POLE
NO POLE
t[1] = 1.098
x1[1] (analytic) = 2.0006003674856930478014053795129
x1[1] (numeric) = 7.0376287189406555908240498513729e+11894
absolute error = 7.0376287189406555908240498513729e+11894
relative error = 3.5177583855917111301304986117681e+11896 %
h = 0.001
x2[1] (analytic) = 1.0018978583574902597876264477776
x2[1] (numeric) = -6.2870061094217275050684610239527e+11892
absolute error = 6.2870061094217275050684610239527e+11892
relative error = 6.2750968643935772311271684232884e+11894 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3154.8MB, alloc=4.7MB, time=232.63
NO POLE
NO POLE
t[1] = 1.099
x1[1] (analytic) = 2.00059976741829106136282204209
x1[1] (numeric) = -5.6271646039187758848552253375393e+11914
absolute error = 5.6271646039187758848552253375393e+11914
relative error = 2.8127388074129633664833164942818e+11916 %
h = 0.001
x2[1] (analytic) = 1.0019013575384688264584863155133
x2[1] (numeric) = 5.0269799184410999289754028647244e+11912
absolute error = 5.0269799184410999289754028647244e+11912
relative error = 5.0174399711281805519064787749874e+11914 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3158.6MB, alloc=4.7MB, time=232.91
memory used=3162.4MB, alloc=4.7MB, time=233.19
NO POLE
NO POLE
t[1] = 1.1
x1[1] (analytic) = 2.0005991679506565431959199244316
x1[1] (numeric) = 4.4993822129853348212166744334203e+11934
absolute error = 4.4993822129853348212166744334203e+11934
relative error = 2.2490173369382852362725344869941e+11936 %
h = 0.001
x2[1] (analytic) = 1.0019048640249962480512810095053
x2[1] (numeric) = -4.0194850554605943185789198110594e+11932
absolute error = 4.0194850554605943185789198110594e+11932
relative error = 4.0118430399798052031502856584024e+11934 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3166.2MB, alloc=4.7MB, time=233.48
NO POLE
NO POLE
t[1] = 1.101
x1[1] (analytic) = 2.0005985690821900256162252217605
x1[1] (numeric) = -3.5976271752261368474787259212757e+11954
absolute error = 3.5976271752261368474787259212757e+11954
relative error = 1.7982753915877346341234449668529e+11956 %
h = 0.001
x2[1] (analytic) = 1.0019083778313982092931610856632
x2[1] (numeric) = 3.2139098172648402437829333163289e+11952
absolute error = 3.2139098172648402437829333163289e+11952
relative error = 3.2077881454801838869532461573767e+11954 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3170.0MB, alloc=4.7MB, time=233.76
memory used=3173.8MB, alloc=4.7MB, time=234.04
NO POLE
NO POLE
t[1] = 1.102
x1[1] (analytic) = 2.0005979708122926401073146471753
x1[1] (numeric) = 2.8765996484077265495247842522283e+11974
absolute error = 2.8765996484077265495247842522283e+11974
relative error = 1.4378699220812242423631609576186e+11976 %
h = 0.001
x2[1] (analytic) = 1.0019118989720293748350704099714
x2[1] (numeric) = -2.5697859728272307231861074012401e+11972
absolute error = 2.5697859728272307231861074012401e+11972
relative error = 2.5648821772292097322996202200715e+11974 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3177.6MB, alloc=4.7MB, time=234.32
NO POLE
NO POLE
t[1] = 1.103
x1[1] (analytic) = 2.0005973731403661167219468653215
x1[1] (numeric) = -2.3000786724653655813872286704910e+11994
absolute error = 2.3000786724653655813872286704910e+11994
relative error = 1.1496959374963586074997143717957e+11996 %
h = 0.001
x2[1] (analytic) = 1.0019154274612734469698582847953
x2[1] (numeric) = 2.0547558337401271782058590598847e+11992
absolute error = 2.0547558337401271782058590598847e+11992
relative error = 2.0508276221942382086660140426766e+11994 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3181.5MB, alloc=4.7MB, time=234.60
NO POLE
NO POLE
t[1] = 1.104
x1[1] (analytic) = 2.0005967760658127834837924952942
x1[1] (numeric) = 1.8391026024279717643801389939407e+12014
absolute error = 1.8391026024279717643801389939407e+12014
relative error = 9.1927699995827224417173353477589e+12015 %
h = 0.001
x2[1] (analytic) = 1.0019189633135432234662428968112
x2[1] (numeric) = -1.6429467593536965290944459447082e+12012
absolute error = 1.6429467593536965290944459447082e+12012
relative error = 1.6398000432291931155916052715831e+12014 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3185.3MB, alloc=4.7MB, time=234.89
memory used=3189.1MB, alloc=4.7MB, time=235.17
NO POLE
NO POLE
t[1] = 1.105
x1[1] (analytic) = 2.0005961795880355657897620845026
x1[1] (numeric) = -1.4705142144690134636997723491887e+12034
absolute error = 1.4705142144690134636997723491887e+12034
relative error = 7.3503799990851875837087232075565e+12035 %
h = 0.001
x2[1] (analytic) = 1.0019225065432806555188577216251
x2[1] (numeric) = 1.3136714395683281546174368015091e+12032
absolute error = 1.3136714395683281546174368015091e+12032
relative error = 1.3111507436843676601716697421458e+12034 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3192.9MB, alloc=4.7MB, time=235.45
NO POLE
NO POLE
t[1] = 1.106
x1[1] (analytic) = 2.0005955837064379858129314558247
x1[1] (numeric) = 1.1757973981987828425763057070610e+12054
absolute error = 1.1757973981987828425763057070610e+12054
relative error = 5.8772367977561035633909984902783e+12055 %
h = 0.001
x2[1] (analytic) = 1.0019260571649569058146129841797
x2[1] (numeric) = -1.0503886637302802738980594146320e+12052
absolute error = 1.0503886637302802738980594146320e+12052
relative error = 1.0483694442506594019281856385305e+12054 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3196.7MB, alloc=4.7MB, time=235.73
NO POLE
NO POLE
memory used=3200.5MB, alloc=4.7MB, time=236.01
t[1] = 1.107
x1[1] (analytic) = 2.0005949884204241619060638309764
x1[1] (numeric) = -9.4014699620583572482122679156065e+12073
absolute error = 9.4014699620583572482122679156065e+12073
relative error = 4.6993369554930837641311208702408e+12075 %
h = 0.001
x2[1] (analytic) = 1.0019296151930724067156047390088
x2[1] (numeric) = 8.3987236965099360480615518872171e+12071
absolute error = 8.3987236965099360480615518872171e+12071
relative error = 8.3825486033682088684430398751457e+12073 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3204.3MB, alloc=4.7MB, time=236.30
NO POLE
NO POLE
t[1] = 1.108
x1[1] (analytic) = 2.0005943937293988080057281336176
x1[1] (numeric) = 7.5172506405344643201386535952226e+12093
absolute error = 7.5172506405344643201386535952226e+12093
relative error = 3.7575086004920848670340421015267e+12095 %
h = 0.001
x2[1] (analytic) = 1.0019331806421569185588046002957
x2[1] (numeric) = -6.7154722976361517401614171359249e+12091
absolute error = 6.7154722976361517401614171359249e+12091
relative error = 6.7025151251424623753912939588761e+12093 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3208.2MB, alloc=4.7MB, time=236.59
NO POLE
NO POLE
t[1] = 1.109
x1[1] (analytic) = 2.0005937996327672330370128763147
x1[1] (numeric) = -6.0106618880526343395026062707042e+12113
absolute error = 6.0106618880526343395026062707042e+12113
relative error = 3.0044389266606558311394877137081e+12115 %
h = 0.001
x2[1] (analytic) = 1.0019367535267695880727636185079
x2[1] (numeric) = 5.3695739745621982481428401891188e+12111
absolute error = 5.3695739745621982481428401891188e+12111
relative error = 5.3591945356446441786525673781947e+12113 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3212.0MB, alloc=4.7MB, time=236.86
memory used=3215.8MB, alloc=4.7MB, time=237.15
NO POLE
NO POLE
t[1] = 1.11
x1[1] (analytic) = 2.0005932061299353403188350360709
x1[1] (numeric) = 4.8060199213897453352760779456039e+12133
absolute error = 4.8060199213897453352760779456039e+12133
relative error = 2.4022974319136031300274846999163e+12135 %
h = 0.001
x2[1] (analytic) = 1.0019403338614990069115642681509
x2[1] (numeric) = -4.2934172594896519425497436737440e+12131
absolute error = 4.2934172594896519425497436737440e+12131
relative error = 4.2851027295634781043561143269322e+12133 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3219.6MB, alloc=4.7MB, time=237.44
NO POLE
NO POLE
t[1] = 1.111
x1[1] (analytic) = 2.0005926132203096269698433237353
x1[1] (numeric) = -3.8428093136808347124247951474165e+12153
absolute error = 3.8428093136808347124247951474165e+12153
relative error = 1.9208355005845741167997481534934e+12155 %
h = 0.001
x2[1] (analytic) = 1.0019439216609632703062549798668
x2[1] (numeric) = 3.4329412075166691335144669981277e+12151
absolute error = 3.4329412075166691335144669981277e+12151
relative error = 3.4262807860800658325063091535041e+12153 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3223.4MB, alloc=4.7MB, time=237.72
NO POLE
NO POLE
t[1] = 1.112
x1[1] (analytic) = 2.0005920209032971833149152531931
x1[1] (numeric) = 3.0726429900111559783477032554068e+12173
absolute error = 3.0726429900111559783477032554068e+12173
relative error = 1.5358668623619781146729815488734e+12175 %
h = 0.001
x2[1] (analytic) = 1.0019475169398100358340021197467
x2[1] (numeric) = -2.7449196344048961060440117763016e+12171
absolute error = 2.7449196344048961060440117763016e+12171
relative error = 2.7395842476745132587032230660738e+12173 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3227.2MB, alloc=4.7MB, time=237.99
memory used=3231.1MB, alloc=4.7MB, time=238.28
NO POLE
NO POLE
t[1] = 1.113
x1[1] (analytic) = 2.000591429178305692292247416834
x1[1] (numeric) = -2.4568314931613159162266202847691e+12193
absolute error = 2.4568314931613159162266202847691e+12193
relative error = 1.2280525935125093192474545994638e+12195 %
h = 0.001
x2[1] (analytic) = 1.0019511197127165823051947892928
x2[1] (numeric) = 2.1947896406859520203501433425176e+12191
absolute error = 2.1947896406859520203501433425176e+12191
relative error = 2.1905156823570902860927552676635e+12193 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3234.9MB, alloc=4.7MB, time=238.56
NO POLE
NO POLE
t[1] = 1.114
x1[1] (analytic) = 2.0005908380447434288610383743889
x1[1] (numeric) = 1.9644394110906278285541860909874e+12213
absolute error = 1.9644394110906278285541860909874e+12213
relative error = 9.8192962485550127778697638482884e+12214 %
h = 0.001
x2[1] (analytic) = 1.0019547299943898687687382909841
x2[1] (numeric) = -1.7549153375875528417920687344213e+12211
absolute error = 1.7549153375875528417920687344213e+12211
relative error = 1.7514916443354471112355035757504e+12213 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3238.7MB, alloc=4.7MB, time=238.84
memory used=3242.5MB, alloc=4.7MB, time=239.12
NO POLE
NO POLE
t[1] = 1.115
x1[1] (analytic) = 2.0005902475020192594097635628181
x1[1] (numeric) = -1.5707313304098502589439408428722e+12233
absolute error = 1.5707313304098502589439408428722e+12233
relative error = 7.8513395352751506893485220802803e+12234 %
h = 0.001
x2[1] (analytic) = 1.0019583477995665936357725768552
x2[1] (numeric) = 1.4031995527086172084938385660994e+12231
absolute error = 1.4031995527086172084938385660994e+12231
relative error = 1.4004569708813041094938868698525e+12233 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3246.3MB, alloc=4.7MB, time=239.41
NO POLE
NO POLE
t[1] = 1.116
x1[1] (analytic) = 2.0005896575495426411650416355255
x1[1] (numeric) = 1.2559292480094088502620220836704e+12253
absolute error = 1.2559292480094088502620220836704e+12253
relative error = 6.2777953653312185732560975284598e+12254 %
h = 0.001
x2[1] (analytic) = 1.0019619731430132539220524709055
x2[1] (numeric) = -1.1219737742040398636327329599572e+12251
absolute error = 1.1219737742040398636327329599572e+12251
relative error = 1.1197768021919699536190170752998e+12253 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3250.1MB, alloc=4.7MB, time=239.69
NO POLE
NO POLE
t[1] = 1.117
x1[1] (analytic) = 2.0005890681867236216010916397656
x1[1] (numeric) = -1.0042190191710887815707091631116e+12273
absolute error = 1.0042190191710887815707091631116e+12273
relative error = 5.0196166476171141490086826036440e+12274 %
h = 0.001
x2[1] (analytic) = 1.0019656060395262046092269305036
x2[1] (numeric) = 8.9711056960624645366895181655504e+12270
absolute error = 8.9711056960624645366895181655504e+12270
relative error = 8.9535066293568627760736620111256e+12272 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3253.9MB, alloc=4.7MB, time=239.97
memory used=3257.8MB, alloc=4.7MB, time=240.26
NO POLE
NO POLE
t[1] = 1.118
x1[1] (analytic) = 2.0005884794129728378497804416998
x1[1] (numeric) = 8.0295593088806598577615789010683e+12292
absolute error = 8.0295593088806598577615789010683e+12292
relative error = 4.0135986943385534786789167354899e+12294 %
h = 0.001
x2[1] (analytic) = 1.0019692465039317181252550872573
x2[1] (numeric) = -7.1731389146791530510491889326164e+12290
absolute error = 7.1731389146791530510491889326164e+12290
relative error = 7.1590409982219007355502059439599e+12292 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3261.6MB, alloc=4.7MB, time=240.54
NO POLE
NO POLE
t[1] = 1.119
x1[1] (analytic) = 2.0005878912277015161112598091492
x1[1] (numeric) = -6.4202949221227262601180193842786e+12312
absolute error = 6.4202949221227262601180193842786e+12312
relative error = 3.2092041295835203144800679597217e+12314 %
h = 0.001
x2[1] (analytic) = 1.0019728945510860439441972840656
x2[1] (numeric) = 5.7355161818980926867422431975051e+12310
absolute error = 5.7355161818980926867422431975051e+12310
relative error = 5.7242228937418274486527719736709e+12312 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3265.4MB, alloc=4.7MB, time=240.82
NO POLE
NO POLE
t[1] = 1.12
x1[1] (analytic) = 2.0005873036303214710651925626827
x1[1] (numeric) = 5.1335553174687314430613324053455e+12332
absolute error = 5.1335553174687314430613324053455e+12332
relative error = 2.5660241410875890836653010711539e+12334 %
h = 0.001
x2[1] (analytic) = 1.0019765501958754683056198022813
x2[1] (numeric) = -4.5860182361024699316573361429149e+12330
absolute error = 4.5860182361024699316573361429149e+12330
relative error = 4.5769716219465949295789553437461e+12332 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3269.2MB, alloc=4.7MB, time=241.09
memory used=3273.0MB, alloc=4.7MB, time=241.38
NO POLE
NO POLE
t[1] = 1.121
x1[1] (analytic) = 2.0005867166202451052825672062637
x1[1] (numeric) = -4.1047008770117886938443775038755e+12352
absolute error = 4.1047008770117886938443775038755e+12352
relative error = 2.0517485410211039829804554213305e+12354 %
h = 0.001
x2[1] (analytic) = 1.0019802134532163740538524510674
x2[1] (numeric) = 3.6668998211952204645036582227939e+12350
absolute error = 3.6668998211952204645036582227939e+12350
relative error = 3.6596529272346078100913776663618e+12352 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3276.8MB, alloc=4.7MB, time=241.66
NO POLE
NO POLE
t[1] = 1.122
x1[1] (analytic) = 2.0005861301968854086381004492724
x1[1] (numeric) = 3.2820468949478641949266567204437e+12372
absolute error = 3.2820468949478641949266567204437e+12372
relative error = 1.6405426616772881868345687580961e+12374 %
h = 0.001
x2[1] (analytic) = 1.0019838843380553005973386701511
x2[1] (numeric) = -2.9319888422661516685340604759904e+12370
absolute error = 2.9319888422661516685340604759904e+12370
relative error = 2.9261836323875841710486666402141e+12372 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3280.6MB, alloc=4.7MB, time=241.94
memory used=3284.5MB, alloc=4.7MB, time=242.23
NO POLE
NO POLE
t[1] = 1.123
x1[1] (analytic) = 2.0005855443596559577232270323051
x1[1] (numeric) = -2.6242671861825852671652260108086e+12392
absolute error = 2.6242671861825852671652260108086e+12392
relative error = 1.3117495493163509166658471028359e+12394 %
h = 0.001
x2[1] (analytic) = 1.0019875628653690039883182772556
x2[1] (numeric) = 2.3443669012946127097035291967981e+12390
absolute error = 2.3443669012946127097035291967981e+12390
relative error = 2.3397165675295024411146900533656e+12392 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3288.3MB, alloc=4.7MB, time=242.51
NO POLE
NO POLE
t[1] = 1.124
x1[1] (analytic) = 2.0005849591079709152596762697401
x1[1] (numeric) = 2.0983180572695811976771015474147e+12412
absolute error = 2.0983180572695811976771015474147e+12412
relative error = 1.0488522607933571188600854170364e+12414 %
h = 0.001
x2[1] (analytic) = 1.0019912490501645171230834725233
x2[1] (numeric) = -1.8745146941411174572386980946123e+12410
absolute error = 1.8745146941411174572386980946123e+12410
relative error = 1.8707894863533585671234145722807e+12412 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3292.1MB, alloc=4.7MB, time=242.79
NO POLE
NO POLE
t[1] = 1.125
x1[1] (analytic) = 2.0005843744412450295136347226475
x1[1] (numeric) = -1.6777783499508543680086858661117e+12432
absolute error = 1.6777783499508543680086858661117e+12432
relative error = 8.3864413387685832859791940141227e+12433 %
h = 0.001
x2[1] (analytic) = 1.0019949429074792100630491942501
x2[1] (numeric) = 1.4988291024798908074600552214851e+12430
absolute error = 1.4988291024798908074600552214851e+12430
relative error = 1.4958449771520329582834845109184e+12432 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3295.9MB, alloc=4.7MB, time=243.07
memory used=3299.7MB, alloc=4.7MB, time=243.35
NO POLE
NO POLE
t[1] = 1.126
x1[1] (analytic) = 2.0005837903588936337104944162043
x1[1] (numeric) = 1.3415221690589313706949322556191e+12452
absolute error = 1.3415221690589313706949322556191e+12452
relative error = 6.7056534973637356908090143851396e+12453 %
h = 0.001
x2[1] (analytic) = 1.0019986444523808504768794032085
x2[1] (numeric) = -1.1984374864929997553189014402854e+12450
absolute error = 1.1984374864929997553189014402854e+12450
relative error = 1.1960470137641533475188434119990e+12452 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3303.5MB, alloc=4.7MB, time=243.63
NO POLE
NO POLE
t[1] = 1.127
x1[1] (analytic) = 2.000583206860332645450186016365
x1[1] (numeric) = -1.0726576190050947302266676950855e+12472
absolute error = 1.0726576190050947302266676950855e+12472
relative error = 5.3617245977411651804682228489414e+12473 %
h = 0.001
x2[1] (analytic) = 1.0020023536999676642039113567721
x2[1] (numeric) = 9.5824961408562494666400642005862e+12469
absolute error = 9.5824961408562494666400642005862e+12469
relative error = 9.5633469377314085495611422475024e+12471 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3307.3MB, alloc=4.7MB, time=243.91
NO POLE
NO POLE
memory used=3311.2MB, alloc=4.7MB, time=244.19
t[1] = 1.128
x1[1] (analytic) = 2.0005826239449785661230963811179
x1[1] (numeric) = 8.5767823607179972686822778032432e+12491
absolute error = 8.5767823607179972686822778032432e+12491
relative error = 4.2871422844837634581039321862407e+12493 %
h = 0.001
x2[1] (analytic) = 1.0020060706653683959391204189545
x2[1] (numeric) = -7.6619960009955239735543589913815e+12489
absolute error = 7.6619960009955239735543589913815e+12489
relative error = 7.6466562681677971852064041382628e+12491 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3315.0MB, alloc=4.7MB, time=244.47
NO POLE
NO POLE
t[1] = 1.129
x1[1] (analytic) = 2.0005820416122484803265699022475
x1[1] (numeric) = -6.8578448854306784652936101648536e+12511
absolute error = 6.8578448854306784652936101648536e+12511
relative error = 3.4279248452635373267890477656618e+12513 %
h = 0.001
x2[1] (analytic) = 1.0020097953637423700398684383412
x2[1] (numeric) = 6.1263977419171364893035933873708e+12509
absolute error = 6.1263977419171364893035933873708e+12509
relative error = 6.1141096327238754794937122964664e+12511 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3318.8MB, alloc=4.7MB, time=244.75
NO POLE
NO POLE
t[1] = 1.13
x1[1] (analytic) = 2.0005814598615600552819930541028
x1[1] (numeric) = 5.4834126009804264375912672590663e+12531
absolute error = 5.4834126009804264375912672590663e+12531
relative error = 2.7409094360795874757327746813820e+12533 %
h = 0.001
x2[1] (analytic) = 1.0020135278102795514546792127409
x2[1] (numeric) = -4.8985602821106608144425007408392e+12529
absolute error = 4.8985602821106608144425007408392e+12529
relative error = 4.8887167150483325035832026938551e+12531 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3322.6MB, alloc=4.7MB, time=245.03
memory used=3326.4MB, alloc=4.7MB, time=245.32
NO POLE
NO POLE
t[1] = 1.131
x1[1] (analytic) = 2.0005808786923315402524615664553
x1[1] (numeric) = -4.3844406303894756583746039352426e+12551
absolute error = 4.3844406303894756583746039352426e+12551
relative error = 2.1915837930308224586325585571174e+12553 %
h = 0.001
x2[1] (analytic) = 1.0020172680202006067742850471958
x2[1] (numeric) = 3.9168029645367150093147614041940e+12549
absolute error = 3.9168029645367150093147614041940e+12549
relative error = 3.9089176300081013188266706607385e+12551 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3330.2MB, alloc=4.7MB, time=245.60
NO POLE
NO POLE
t[1] = 1.132
x1[1] (analytic) = 2.0005802981039817659610296391163
x1[1] (numeric) = 3.5057218998936830448616003965941e+12571
absolute error = 3.5057218998936830448616003965941e+12571
relative error = 1.7523525065283184832436798901590e+12573 %
h = 0.001
x2[1] (analytic) = 1.0020210160087569654051889007868
x2[1] (numeric) = -3.1318070166513122558656675242235e+12569
absolute error = 3.1318070166513122558656675242235e+12569
relative error = 3.1254903506174988698950186077193e+12571 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3334.0MB, alloc=4.7MB, time=245.88
NO POLE
NO POLE
t[1] = 1.133
x1[1] (analytic) = 2.0005797180959301440095406165601
x1[1] (numeric) = -2.8031138006999150655724024508781e+12591
absolute error = 2.8031138006999150655724024508781e+12591
relative error = 1.4011507641234131870724911287376e+12593 %
h = 0.001
x2[1] (analytic) = 1.0020247717912308808659871074358
x2[1] (numeric) = 2.5041380121367740021370501346544e+12589
absolute error = 2.5041380121367740021370501346544e+12589
relative error = 2.4990779496003361325306111054069e+12591 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3337.9MB, alloc=4.7MB, time=246.17
memory used=3341.7MB, alloc=4.7MB, time=246.47
NO POLE
NO POLE
t[1] = 1.134
x1[1] (analytic) = 2.0005791386675966662980385413845
x1[1] (numeric) = 2.2413206763242154343598169004485e+12611
absolute error = 2.2413206763242154343598169004485e+12611
relative error = 1.1203359232351861638147660216053e+12613 %
h = 0.001
x2[1] (analytic) = 1.0020285353829354922066981466669
x2[1] (numeric) = -2.0022648747154522778030300880462e+12609
absolute error = 2.0022648747154522778030300880462e+12609
relative error = 1.9982114321228049653396672626248e+12611 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3345.5MB, alloc=4.7MB, time=246.76
NO POLE
NO POLE
t[1] = 1.135
x1[1] (analytic) = 2.0005785598184019044447600060215
x1[1] (numeric) = -1.7921207383246824246111200122396e+12631
absolute error = 1.7921207383246824246111200122396e+12631
relative error = 8.9580123186332568830165706073820e+12632 %
h = 0.001
x2[1] (analytic) = 1.0020323067992148855513434320148
x2[1] (numeric) = 1.6009759083120031820129705895304e+12629
absolute error = 1.6009759083120031820129705895304e+12629
relative error = 1.5977288331411088411475006874551e+12631 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3349.3MB, alloc=4.7MB, time=247.03
memory used=3353.1MB, alloc=4.7MB, time=247.33
NO POLE
NO POLE
t[1] = 1.136
x1[1] (analytic) = 2.0005779815477670092067057226879
x1[1] (numeric) = 1.4329483391910765065011273233531e+12651
absolute error = 1.4329483391910765065011273233531e+12651
relative error = 7.1626717499033044604110230230487e+12652 %
h = 0.001
x2[1] (analytic) = 1.0020360860554441557640265774901
x2[1] (numeric) = -1.2801122825269042655962040568456e+12649
absolute error = 1.2801122825269042655962040568456e+12649
relative error = 1.2775111598686214758319252276144e+12651 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3356.9MB, alloc=4.7MB, time=247.61
NO POLE
NO POLE
t[1] = 1.137
x1[1] (analytic) = 2.0005774038551137099007912321484
x1[1] (numeric) = -1.1457603825900574937821137284201e+12671
absolute error = 1.1457603825900574937821137284201e+12671
relative error = 5.7271484741463971034072286366800e+12672 %
h = 0.001
x2[1] (analytic) = 1.0020398731670294682387580962168
x2[1] (numeric) = 1.0235553498141011637415664650555e+12669
absolute error = 1.0235553498141011637415664650555e+12669
relative error = 1.0214716771490043217935059990184e+12671 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3360.8MB, alloc=4.7MB, time=247.89
NO POLE
NO POLE
t[1] = 1.138
x1[1] (analytic) = 2.0005768267398643138255761724423
x1[1] (numeric) = 9.1612992486106927108143914574274e+12690
absolute error = 9.1612992486106927108143914574274e+12690
relative error = 4.5793288846297026374763152651003e+12692 %
h = 0.001
x2[1] (analytic) = 1.0020436681494081208132729800458
x2[1] (numeric) = -8.1841692204140545536351520808342e+12688
absolute error = 8.1841692204140545536351520808342e+12688
relative error = 8.1674776065685064262621167842429e+12690 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3364.6MB, alloc=4.7MB, time=248.18
memory used=3368.4MB, alloc=4.7MB, time=248.46
NO POLE
NO POLE
t[1] = 1.139
x1[1] (analytic) = 2.0005762502014417056835715293017
x1[1] (numeric) = -7.3252143465519011689502535459587e+12710
absolute error = 7.3252143465519011689502535459587e+12710
relative error = 3.6615521881829357170031731079113e+12712 %
h = 0.001
x2[1] (analytic) = 1.0020474710180486058070891046346
x2[1] (numeric) = 6.5439182981690107358330570365182e+12708
absolute error = 6.5439182981690107358330570365182e+12708
relative error = 6.5305471920612665902920587422106e+12710 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3372.2MB, alloc=4.7MB, time=248.74
NO POLE
NO POLE
t[1] = 1.14
x1[1] (analytic) = 2.0005756742392693470041242905698
x1[1] (numeric) = 5.8571130324191872966670889392681e+12730
absolute error = 5.8571130324191872966670889392681e+12730
relative error = 2.9277138114989771313068424561022e+12732 %
h = 0.001
x2[1] (analytic) = 1.0020512817884506721840549011547
x2[1] (numeric) = -5.2324024027138458479095521872155e+12728
absolute error = 5.2324024027138458479095521872155e+12728
relative error = 5.2216912425630638735475171836318e+12730 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3376.0MB, alloc=4.7MB, time=249.03
NO POLE
NO POLE
t[1] = 1.141
x1[1] (analytic) = 2.0005750988527712755668789275029
x1[1] (numeric) = -4.6832449470482702267856235322518e+12750
absolute error = 4.6832449470482702267856235322518e+12750
relative error = 2.3409493348856908926883563968762e+12752 %
h = 0.001
x2[1] (analytic) = 1.0020551004761453878396352334586
x2[1] (numeric) = 4.1837372742850418985731975706237e+12748
absolute error = 4.1837372742850418985731975706237e+12748
relative error = 4.1751569073367923516760591232740e+12750 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3379.8MB, alloc=4.7MB, time=249.31
memory used=3383.6MB, alloc=4.7MB, time=249.59
NO POLE
NO POLE
t[1] = 1.142
x1[1] (analytic) = 2.0005745240413721048258151264181
x1[1] (numeric) = 3.7446405955724177719988930603327e+12770
absolute error = 3.7446405955724177719988930603327e+12770
relative error = 1.8717826057326011344446104227346e+12772 %
h = 0.001
x2[1] (analytic) = 1.0020589270966952020131849182029
x2[1] (numeric) = -3.3452430132597519727692694560499e+12768
absolute error = 3.3452430132597519727692694560499e+12768
relative error = 3.3383695537268015919556698822812e+12770 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3387.5MB, alloc=4.7MB, time=249.87
NO POLE
NO POLE
t[1] = 1.143
x1[1] (analytic) = 2.000573949804497023333861194724
x1[1] (numeric) = -2.9941490032134386727318064570808e+12790
absolute error = 2.9941490032134386727318064570808e+12790
relative error = 1.4966450020535542940793444533961e+12792 %
h = 0.001
x2[1] (analytic) = 1.0020627616656940078254598250843
x2[1] (numeric) = 2.6747976950047737868118406914440e+12788
absolute error = 2.6747976950047737868118406914440e+12788
relative error = 2.6692915826535164249063005415802e+12790 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3391.3MB, alloc=4.7MB, time=250.15
memory used=3395.1MB, alloc=4.7MB, time=250.44
NO POLE
NO POLE
t[1] = 1.144
x1[1] (analytic) = 2.000573376141571794168082565948
x1[1] (numeric) = 2.3940690767610558098000080015027e+12810
absolute error = 2.3940690767610558098000080015027e+12810
relative error = 1.1966914612141864535991361886280e+12812 %
h = 0.001
x2[1] (analytic) = 1.0020666041987672049416159950124
x2[1] (numeric) = -2.1387213666821621005869832226053e+12808
absolute error = 2.1387213666821621005869832226053e+12808
relative error = 2.1343105914523932681092560613455e+12810 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3398.9MB, alloc=4.7MB, time=250.72
NO POLE
NO POLE
t[1] = 1.145
x1[1] (analytic) = 2.000572803052022754355444828949
x1[1] (numeric) = -1.9142556827172565209492316288369e+12830
absolute error = 1.9142556827172565209492316288369e+12830
relative error = 9.5685379697100598388737283319503e+12831 %
h = 0.001
x2[1] (analytic) = 1.0020704547115717623599477157023
x2[1] (numeric) = 1.7100841281735334001059009251370e+12828
absolute error = 1.7100841281735334001059009251370e+12828
relative error = 1.7065507920456060522200012723598e+12830 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3402.7MB, alloc=4.7MB, time=251.00
NO POLE
NO POLE
t[1] = 1.146
x1[1] (analytic) = 2.0005722305352768142991507070773
x1[1] (numeric) = 1.5306053005675404369009443489304e+12850
absolute error = 1.5306053005675404369009443489304e+12850
relative error = 7.6508374814240465865270169261415e+12851 %
h = 0.001
x2[1] (analytic) = 1.0020743132197962813266159968435
x2[1] (numeric) = -1.3673533032344883811522526251795e+12848
absolute error = 1.3673533032344883811522526251795e+12848
relative error = 1.3645228554367417775951723842487e+12850 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3406.5MB, alloc=4.7MB, time=251.28
memory used=3410.3MB, alloc=4.7MB, time=251.57
NO POLE
NO POLE
t[1] = 1.147
x1[1] (analytic) = 2.0005716585907614572055504136201
x1[1] (numeric) = -1.2238451776723731659656755872524e+12870
absolute error = 1.2238451776723731659656755872524e+12870
relative error = 6.1174773341259450329204787559941e+12871 %
h = 0.001
x2[1] (analytic) = 1.0020781797391610583766193906748
x2[1] (numeric) = 1.0933117412551884875377196039389e+12868
absolute error = 1.0933117412551884875377196039389e+12868
relative error = 1.0910443549821385616393968333706e+12870 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3414.2MB, alloc=4.7MB, time=251.84
NO POLE
NO POLE
t[1] = 1.148
x1[1] (analytic) = 2.000571087217904738511624810442
x1[1] (numeric) = 9.7856515873592450277656973573064e+12889
absolute error = 9.7856515873592450277656973573064e+12889
relative error = 4.8914290773679363155335249481042e+12891 %
h = 0.001
x2[1] (analytic) = 1.0020820542854181485012596084747
x2[1] (numeric) = -8.7419291030261557784054769526925e+12887
absolute error = 8.7419291030261557784054769526925e+12887
relative error = 8.7237657491631266258767202684530e+12889 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3418.0MB, alloc=4.7MB, time=252.12
NO POLE
NO POLE
memory used=3421.8MB, alloc=4.7MB, time=252.41
t[1] = 1.149
x1[1] (analytic) = 2.0005705164161352853130407973036
x1[1] (numeric) = -7.8244355361443816833349506185603e+12909
absolute error = 7.8244355361443816833349506185603e+12909
relative error = 3.9111020940972590528367840781561e+12911 %
h = 0.001
x2[1] (analytic) = 1.002085936874351428442354889177
x2[1] (numeric) = 6.9898933267285094918715524209525e+12907
absolute error = 6.9898933267285094918715524209525e+12907
relative error = 6.9753432011340075329471189649031e+12909 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3425.6MB, alloc=4.7MB, time=252.69
NO POLE
NO POLE
t[1] = 1.15
x1[1] (analytic) = 2.0005699461848822957927783599144
x1[1] (numeric) = 6.2562815478085424303115769032629e+12929
absolute error = 6.2562815478085424303115769032629e+12929
relative error = 3.1272495919172272451207215514300e+12931 %
h = 0.001
x2[1] (analytic) = 1.0020898275217766601134545830171
x2[1] (numeric) = -5.5889962207690035301116162473261e+12927
absolute error = 5.5889962207690035301116162473261e+12927
relative error = 5.5773405410080841089199583727042e+12929 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3429.4MB, alloc=4.7MB, time=252.97
NO POLE
NO POLE
t[1] = 1.151
x1[1] (analytic) = 2.0005693765235755386503287053453
x1[1] (numeric) = -5.0024130973589753605160191920282e+12949
absolute error = 5.0024130973589753605160191920282e+12949
relative error = 2.5004946871933810446253974493030e+12951 %
h = 0.001
x2[1] (analytic) = 1.0020937262435415541483089208426
x2[1] (numeric) = 4.4688634426399820869986357498999e+12947
absolute error = 4.4688634426399820869986357498999e+12947
relative error = 4.4595264151508140398110523687474e+12949 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3433.2MB, alloc=4.7MB, time=253.26
memory used=3437.0MB, alloc=4.7MB, time=253.54
NO POLE
NO POLE
t[1] = 1.152
x1[1] (analytic) = 2.0005688074316453525314629140014
x1[1] (numeric) = 3.9998418558055625248326325055908e+12969
absolute error = 3.9998418558055625248326325055908e+12969
relative error = 1.9993523046780921814329101239896e+12971 %
h = 0.001
x2[1] (analytic) = 1.0020976330555258335768484484501
x2[1] (numeric) = -3.5732249012357088167296558465819e+12967
absolute error = 3.5732249012357088167296558465819e+12967
relative error = 3.5657452760770245606924504686608e+12969 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3440.9MB, alloc=4.7MB, time=253.82
NO POLE
NO POLE
t[1] = 1.153
x1[1] (analytic) = 2.0005682389085226454585705379204
x1[1] (numeric) = -3.1982034590267286342888191480393e+12989
absolute error = 3.1982034590267286342888191480393e+12989
relative error = 1.5986475226516723084421635980670e+12991 %
h = 0.001
x2[1] (analytic) = 1.0021015479736412976289281150681
x2[1] (numeric) = 2.8570880177238711594940572558350e+12987
absolute error = 2.8570880177238711594940572558350e+12987
relative error = 2.8510963020676047876452546036950e+12989 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3444.7MB, alloc=4.7MB, time=254.11
NO POLE
NO POLE
t[1] = 1.154
x1[1] (analytic) = 2.0005676709536388942615675757385
x1[1] (numeric) = 2.5572274440011642175071774252445e+13009
absolute error = 2.5572274440011642175071774252445e+13009
relative error = 1.2782509090443186228323432945004e+13011 %
h = 0.001
x2[1] (analytic) = 1.0021054710138318856660915158783
x2[1] (numeric) = -2.2844775144711351682778465224728e+13007
absolute error = 2.2844775144711351682778465224728e+13007
relative error = 2.2796777191126650646851361712771e+13009 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3448.5MB, alloc=4.7MB, time=254.39
memory used=3452.3MB, alloc=4.7MB, time=254.68
NO POLE
NO POLE
t[1] = 1.155
x1[1] (analytic) = 2.0005671035664261440093732552291
x1[1] (numeric) = -2.0447142541527953035698015729058e+13029
absolute error = 2.0447142541527953035698015729058e+13029
relative error = 1.0220673180657962932022635295849e+13031 %
h = 0.001
x2[1] (analytic) = 1.0021094021920737412416113002628
x2[1] (numeric) = 1.8266281898734980856644715972276e+13027
absolute error = 1.8266281898734980856644715972276e+13027
relative error = 1.8227832069810171241435426642893e+13029 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3456.1MB, alloc=4.7MB, time=255.33
NO POLE
NO POLE
t[1] = 1.156
x1[1] (analytic) = 2.0005665367463170074419550548927
x1[1] (numeric) = 1.6349176882733777615968387105559e+13049
absolute error = 1.6349176882733777615968387105559e+13049
relative error = 8.1722734947490248919019642399418e+13050 %
h = 0.001
x2[1] (analytic) = 1.0021133415243752762890622702866
x2[1] (numeric) = -1.4605398927784852191925845261614e+13047
absolute error = 1.4605398927784852191925845261614e+13047
relative error = 1.4574597825000209662550929240595e+13049 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3459.9MB, alloc=4.7MB, time=256.00
memory used=3463.8MB, alloc=4.7MB, time=256.67
NO POLE
NO POLE
t[1] = 1.157
x1[1] (analytic) = 2.0005659704927446644029413966419
x1[1] (numeric) = -1.3072515350252083315400544303051e+13069
absolute error = 1.3072515350252083315400544303051e+13069
relative error = 6.5344085339171736362604479745983e+13070 %
h = 0.001
x2[1] (analytic) = 1.0021172890267772354396842077708
x2[1] (numeric) = 1.1678221053541940751844847980548e+13067
absolute error = 1.1678221053541940751844847980548e+13067
relative error = 1.1653547126088841459696751929853e+13069 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3467.6MB, alloc=4.7MB, time=257.36
NO POLE
NO POLE
t[1] = 1.158
x1[1] (analytic) = 2.0005654048051428612728014421948
x1[1] (numeric) = 1.0452554205530216870673052795178e+13089
absolute error = 1.0452554205530216870673052795178e+13089
relative error = 5.2248000392410596826957129304113e+13090 %
h = 0.001
x2[1] (analytic) = 1.0021212447153527604687919831877
x2[1] (numeric) = -9.3377009179765433716604252277234e+13086
absolute error = 9.3377009179765433716604252277234e+13086
relative error = 9.3179352969698471287007783265276e+13088 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3471.4MB, alloc=4.7MB, time=258.03
NO POLE
NO POLE
t[1] = 1.159
x1[1] (analytic) = 2.0005648396829459104025914263565
x1[1] (numeric) = -8.3576791835582424242375643681485e+13108
absolute error = 8.3576791835582424242375643681485e+13108
relative error = 4.1776597377782499311777347987413e+13110 %
h = 0.001
x2[1] (analytic) = 1.0021252086062074548714910155136
x2[1] (numeric) = 7.4662620303059705326393625211520e+13106
absolute error = 7.4662620303059705326393625211520e+13106
relative error = 7.4504283159290264510914672176143e+13108 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3475.2MB, alloc=4.7MB, time=258.69
memory used=3479.0MB, alloc=4.7MB, time=259.37
NO POLE
NO POLE
t[1] = 1.16
x1[1] (analytic) = 2.0005642751255886895482669609347
x1[1] (numeric) = 6.6826538242993511332894175218726e+13128
absolute error = 6.6826538242993511332894175218726e+13128
relative error = 3.3403844642181449660450778803519e+13130 %
h = 0.001
x2[1] (analytic) = 1.0021291807154794485679566691147
x2[1] (numeric) = -5.9698922887828422076504963760665e+13126
absolute error = 5.9698922887828422076504963760665e+13126
relative error = 5.9572083157189196775165032214934e+13128 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3482.8MB, alloc=4.7MB, time=260.06
NO POLE
NO POLE
t[1] = 1.161
x1[1] (analytic) = 2.0005637111325066413055607436015
x1[1] (numeric) = -5.3433328983573008077011299392384e+13148
absolute error = 5.3433328983573008077011299392384e+13148
relative error = 2.6709136373029946519933108301554e+13150 %
h = 0.001
x2[1] (analytic) = 1.0021331610593394627385366917142
x2[1] (numeric) = 4.7734212642157050057665722286997e+13146
absolute error = 4.7734212642157050057665722286997e+13146
relative error = 4.7632604624816478745774159999228e+13148 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3486.6MB, alloc=4.7MB, time=260.73
NO POLE
NO POLE
t[1] = 1.162
x1[1] (analytic) = 2.0005631477031357725454251065801
x1[1] (numeric) = 4.2724353547762755336333354687509e+13168
absolute error = 4.2724353547762755336333354687509e+13168
relative error = 2.1356163436687796218647188871631e+13170 %
h = 0.001
x2[1] (analytic) = 1.0021371496539908747889363164975
x2[1] (numeric) = -3.8167439986278611934444850867275e+13166
absolute error = 3.8167439986278611934444850867275e+13166
relative error = 3.8086044409646654495720882288075e+13168 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3490.5MB, alloc=4.7MB, time=261.40
memory used=3494.3MB, alloc=4.7MB, time=262.08
NO POLE
NO POLE
t[1] = 1.163
x1[1] (analytic) = 2.0005625848369126538500388405975
x1[1] (numeric) = -3.4161644441719156144069715228254e+13188
absolute error = 3.4161644441719156144069715228254e+13188
relative error = 1.7076018866215094562396508906384e+13190 %
h = 0.001
x2[1] (analytic) = 1.0021411465156697834457461714614
x2[1] (numeric) = 3.0518016208350108027436545145382e+13186
absolute error = 3.0518016208350108027436545145382e+13186
relative error = 3.0452812275454173314663133174804e+13188 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3498.1MB, alloc=4.7MB, time=262.75
NO POLE
NO POLE
t[1] = 1.164
x1[1] (analytic) = 2.0005620225332744189493777301105
x1[1] (numeric) = 2.7315052284121728283574797308021e+13208
absolute error = 2.7315052284121728283574797308021e+13208
relative error = 1.3653689301535968603318247230175e+13210 %
h = 0.001
x2[1] (analytic) = 1.0021451516606450739825736602035
x2[1] (numeric) = -2.4401670995695406905880497924181e+13206
absolute error = 2.4401670995695406905880497924181e+13206
relative error = 2.4349437758851233314254845217061e+13208 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3501.9MB, alloc=4.7MB, time=263.41
memory used=3505.7MB, alloc=4.7MB, time=264.08
NO POLE
NO POLE
t[1] = 1.165
x1[1] (analytic) = 2.0005614607916587641583482363765
x1[1] (numeric) = -2.1840637167136213538211907874041e+13228
absolute error = 2.1840637167136213538211907874041e+13228
relative error = 1.0917253778593472406415118068102e+13230 %
h = 0.001
x2[1] (analytic) = 1.0021491651052184835770390004766
x2[1] (numeric) = 1.9511148539833407422740915619895e+13226
absolute error = 1.9511148539833407422740915619895e+13226
relative error = 1.9469305787212701605666383613849e+13228 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3509.5MB, alloc=4.7MB, time=264.75
NO POLE
NO POLE
t[1] = 1.166
x1[1] (analytic) = 2.0005608996115039478144837655011
x1[1] (numeric) = 1.7463390767286952275495043695626e+13248
absolute error = 1.7463390767286952275495043695626e+13248
relative error = 8.7292472679428206247767977237056e+13249 %
h = 0.001
x2[1] (analytic) = 1.0021531868657246667988976300168
x2[1] (numeric) = -1.5600772480319002909293042505719e+13246
absolute error = 1.5600772480319002909293042505719e+13246
relative error = 1.5567253275031795143933308583088e+13248 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3513.3MB, alloc=4.7MB, time=265.42
NO POLE
NO POLE
t[1] = 1.167
x1[1] (analytic) = 2.0005603389922487897162029591597
x1[1] (numeric) = -1.3963421248069358612784790306859e+13268
absolute error = 1.3963421248069358612784790306859e+13268
relative error = 6.9797551095625614931119638551496e+13269 %
h = 0.001
x2[1] (analytic) = 1.0021572169585312612295512133691
x2[1] (numeric) = 1.2474104304305441323949467080420e+13266
absolute error = 1.2474104304305441323949467080420e+13266
relative error = 1.2447252879307073035838017211465e+13268 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3517.2MB, alloc=4.7MB, time=266.11
memory used=3521.0MB, alloc=4.7MB, time=266.79
NO POLE
NO POLE
t[1] = 1.168
x1[1] (analytic) = 2.0005597789333326705616294462509
x1[1] (numeric) = 1.1164906950159586330692108697783e+13288
absolute error = 1.1164906950159586330692108697783e+13288
relative error = 5.5808914423504709773729138596929e+13289 %
h = 0.001
x2[1] (analytic) = 1.0021612554000389532132100087179
x2[1] (numeric) = -9.9740752190951623487229594187163e+13285
absolute error = 9.9740752190951623487229594187163e+13285
relative error = 9.9525651838473326239203225377007e+13287 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3524.8MB, alloc=4.7MB, time=267.47
NO POLE
NO POLE
t[1] = 1.169
x1[1] (analytic) = 2.0005592194341955313879724943023
x1[1] (numeric) = -8.9272639556696881026041221885900e+13307
absolute error = 8.9272639556696881026041221885900e+13307
relative error = 4.4623842518366064929371164785454e+13309 %
h = 0.001
x2[1] (analytic) = 1.0021653022066815437399698800462
x2[1] (numeric) = 7.9750957703497720407267678479152e+13305
absolute error = 7.9750957703497720407267678479152e+13305
relative error = 7.9578645885956130445655623345324e+13307 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3528.6MB, alloc=4.7MB, time=268.14
NO POLE
NO POLE
memory used=3532.4MB, alloc=4.7MB, time=268.82
t[1] = 1.17
x1[1] (analytic) = 2.0005586604942778730114680000078
x1[1] (numeric) = 7.1380838272960319063131885746844e+13327
absolute error = 7.1380838272960319063131885746844e+13327
relative error = 3.5680452506863388294724009167183e+13329 %
h = 0.001
x2[1] (analytic) = 1.0021693573949260144610677673311
x2[1] (numeric) = -6.3767468310732014481907582321264e+13325
absolute error = 6.3767468310732014481907582321264e+13325
relative error = 6.3629433329004786139023297619057e+13327 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3536.2MB, alloc=4.7MB, time=269.49
NO POLE
NO POLE
t[1] = 1.171
x1[1] (analytic) = 2.0005581021130207554678792588388
x1[1] (numeric) = -5.7074867482937476428011503811268e+13347
absolute error = 5.7074867482937476428011503811268e+13347
relative error = 2.8529472562008625873917835414665e+13349 %
h = 0.001
x2[1] (analytic) = 1.0021734209812725938365799559143
x2[1] (numeric) = 5.0987350269548828014954802109354e+13345
absolute error = 5.0987350269548828014954802109354e+13345
relative error = 5.0876773622298668025505302746421e+13347 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3540.0MB, alloc=4.7MB, time=270.16
NO POLE
NO POLE
t[1] = 1.172
x1[1] (analytic) = 2.000557544289865797453556954229
x1[1] (numeric) = 4.5636063921497239039418693128892e+13367
absolute error = 4.5636063921497239039418693128892e+13367
relative error = 2.2811672701820025897968419137815e+13369 %
h = 0.001
x2[1] (analytic) = 1.0021774929822548234158280156791
x2[1] (numeric) = -4.0768591828697891506547661492568e+13365
absolute error = 4.0768591828697891506547661492568e+13365
relative error = 4.0680011389379471418740320602282e+13367 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3543.9MB, alloc=4.7MB, time=270.85
memory used=3547.7MB, alloc=4.7MB, time=271.61
NO POLE
NO POLE
t[1] = 1.173
x1[1] (analytic) = 2.0005569870242551757670578073935
x1[1] (numeric) = -3.6489797034913659352085114016750e+13387
absolute error = 3.6489797034913659352085114016750e+13387
relative error = 1.8239818846245767724291339757837e+13389 %
h = 0.001
x2[1] (analytic) = 1.0021815734144396242507578112157
x2[1] (numeric) = 3.2597851641794676202522803139787e+13385
absolute error = 3.2597851641794676202522803139787e+13385
relative error = 3.2526891839303698084056408689074e+13387 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3551.5MB, alloc=4.7MB, time=272.38
NO POLE
NO POLE
t[1] = 1.174
x1[1] (analytic) = 2.0005564303156316247513213294
x1[1] (numeric) = 2.9176602301627886268085666145667e+13407
absolute error = 2.9176602301627886268085666145667e+13407
relative error = 1.4584243593181042019894877567734e+13409 %
h = 0.001
x2[1] (analytic) = 1.0021856622944273634425575157709
x2[1] (numeric) = -2.6064670963505164956961805033408e+13405
absolute error = 2.6064670963505164956961805033408e+13405
relative error = 2.6007826637463657039649669559543e+13407 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3555.3MB, alloc=4.7MB, time=273.07
NO POLE
NO POLE
t[1] = 1.175
x1[1] (analytic) = 2.0005558741634384357364041176696
x1[1] (numeric) = -2.3329099941357673821163562708804e+13427
absolute error = 2.3329099941357673821163562708804e+13427
relative error = 1.1661308860525116101986096586570e+13429 %
h = 0.001
x2[1] (analytic) = 1.0021897596388519208217810944527
x2[1] (numeric) = 2.0840854173492602566932075996616e+13425
absolute error = 2.0840854173492602566932075996616e+13425
relative error = 2.0795317426714469235338573559922e+13427 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3559.1MB, alloc=4.7MB, time=273.74
memory used=3562.9MB, alloc=4.7MB, time=274.42
NO POLE
NO POLE
t[1] = 1.176
x1[1] (analytic) = 2.0005553185671194564827711396413
x1[1] (numeric) = 1.8653539519352765050603184797076e+13447
absolute error = 1.8653539519352765050603184797076e+13447
relative error = 9.3241808143116993753849557060463e+13448 %
h = 0.001
x2[1] (analytic) = 1.00219386546438075576224425591
x2[1] (numeric) = -1.6663981804678574211680281124301e+13445
absolute error = 1.6663981804678574211680281124301e+13445
relative error = 1.6627503299431075307022826788755e+13447 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3566.7MB, alloc=4.7MB, time=275.10
NO POLE
NO POLE
t[1] = 1.177
x1[1] (analytic) = 2.0005547635261190906251434468904
x1[1] (numeric) = -1.4915043335349765795889384071561e+13467
absolute error = 1.4915043335349765795889384071561e+13467
relative error = 7.4554536607940431049697415536898e+13468 %
h = 0.001
x2[1] (analytic) = 1.0021979797877149741289604065084
x2[1] (numeric) = 1.3324227849540312706817227816639e+13465
absolute error = 1.3324227849540312706817227816639e+13465
relative error = 1.3295005695743513008172056209748e+13467 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3570.6MB, alloc=4.7MB, time=275.77
memory used=3574.4MB, alloc=4.7MB, time=276.47
NO POLE
NO POLE
t[1] = 1.178
x1[1] (analytic) = 2.0005542090398822971169017635503
x1[1] (numeric) = 1.1925807295959253180514909026770e+13487
absolute error = 1.1925807295959253180514909026770e+13487
relative error = 5.9612517581729297527407332662353e+13488 %
h = 0.001
x2[1] (analytic) = 1.0022021026255893953603846769178
x2[1] (numeric) = -1.0653819109225202267782702469888e+13485
absolute error = 1.0653819109225202267782702469888e+13485
relative error = 1.0630409855770718183624429078780e+13487 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3578.2MB, alloc=4.7MB, time=277.15
NO POLE
NO POLE
t[1] = 1.179
x1[1] (analytic) = 2.0005536551078545896750453934397
x1[1] (numeric) = -9.5356665389815781038393352031444e+13506
absolute error = 9.5356665389815781038393352031444e+13506
relative error = 4.7665137671438698390239267321773e+13508 %
h = 0.001
x2[1] (analytic) = 1.0022062339947726196852346279713
x2[1] (numeric) = 8.5186070738056297766090079960909e+13504
absolute error = 8.5186070738056297766090079960909e+13504
relative error = 8.4998544060643527669472075013778e+13506 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3582.0MB, alloc=4.7MB, time=277.87
NO POLE
NO POLE
t[1] = 1.18
x1[1] (analytic) = 2.0005531017294820362257058908545
x1[1] (numeric) = 7.6245518719275123730937832553814e+13526
absolute error = 7.6245518719275123730937832553814e+13526
relative error = 3.8112219392407392201224881517908e+13528 %
h = 0.001
x2[1] (analytic) = 1.0022103739120670954741567806905
x2[1] (numeric) = -6.8113289454159614107081619046936e+13524
absolute error = 6.8113289454159614107081619046936e+13524
relative error = 6.7963065666825559991305981275728e+13526 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3585.8MB, alloc=4.7MB, time=278.60
memory used=3589.6MB, alloc=4.7MB, time=279.28
NO POLE
NO POLE
t[1] = 1.181
x1[1] (analytic) = 2.0005525489042112583502149405385
x1[1] (numeric) = -6.0964580724445193771592319686398e+13546
absolute error = 6.0964580724445193771592319686398e+13546
relative error = 3.0473871210150475056584102919723e+13548 %
h = 0.001
x2[1] (analytic) = 1.0022145223943091867265086544755
x2[1] (numeric) = 5.4462192704393652462674581474364e+13544
absolute error = 5.4462192704393652462674581474364e+13544
relative error = 5.4341851457393032276673791652820e+13546 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3593.5MB, alloc=4.7MB, time=279.96
NO POLE
NO POLE
t[1] = 1.182
x1[1] (analytic) = 2.0005519966314894307317258929005
x1[1] (numeric) = 4.8746210470305387655508841853725e+13566
absolute error = 4.8746210470305387655508841853725e+13566
relative error = 2.4366380155269044115494796873412e+13568 %
h = 0.001
x2[1] (analytic) = 1.0022186794583692406925265376451
x2[1] (numeric) = -4.3547014950242876670655420394271e+13564
absolute error = 4.3547014950242876670655420394271e+13564
relative error = 4.3450611970011439643439006535867e+13566 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3597.3MB, alloc=4.7MB, time=280.63
NO POLE
NO POLE
t[1] = 1.183
memory used=3601.1MB, alloc=4.7MB, time=281.31
x1[1] (analytic) = 2.0005514449107642806023884010983
x1[1] (numeric) = -3.8976615716517503728352223059989e+13586
absolute error = 3.8976615716517503728352223059989e+13586
relative error = 1.9482935975313585368001840325188e+13588 %
h = 0.001
x2[1] (analytic) = 1.0022228451211516556311497557764
x2[1] (numeric) = 3.4819430083719198764097435233170e+13584
absolute error = 3.4819430083719198764097435233170e+13584
relative error = 3.4742203546068762066800425689499e+13586 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3604.9MB, alloc=4.7MB, time=281.99
NO POLE
NO POLE
t[1] = 1.184
x1[1] (analytic) = 2.000550893741484087191075607166
x1[1] (numeric) = 3.1165018943134306548496283224587e+13606
absolute error = 3.1165018943134306548496283224587e+13606
relative error = 1.5578218500029584313073868832969e+13608 %
h = 0.001
x2[1] (analytic) = 1.0022270193995949487037727456448
x2[1] (numeric) = -2.7841006157145281852916397298750e+13604
absolute error = 2.7841006157145281852916397298750e+13604
relative error = 2.7779141470187082675429391694200e+13606 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3608.7MB, alloc=4.7MB, time=282.67
NO POLE
NO POLE
t[1] = 1.185
x1[1] (analytic) = 2.0005503431230976811716633249103
x1[1] (numeric) = -2.4919003045057101861246978107886e+13626
absolute error = 2.4919003045057101861246978107886e+13626
relative error = 1.2456073965204777673334234215761e+13628 %
h = 0.001
x2[1] (analytic) = 1.0022312023106718240041967859993
x2[1] (numeric) = 2.2261180667762605118010601254768e+13624
absolute error = 2.2261180667762605118010601254768e+13624
relative error = 2.2211622045331292712133802075731e+13626 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3612.5MB, alloc=4.7MB, time=283.37
memory used=3616.3MB, alloc=4.7MB, time=284.11
NO POLE
NO POLE
t[1] = 1.186
x1[1] (analytic) = 2.0005497930550544441118606678556
x1[1] (numeric) = 1.9924798181339231026834797240463e+13646
absolute error = 1.9924798181339231026834797240463e+13646
relative error = 9.9596612143864331274529256410421e+13647 %
h = 0.001
x2[1] (analytic) = 1.0022353938713892407250537809324
x2[1] (numeric) = -1.7799649981241214211993582256671e+13644
absolute error = 1.7799649981241214211993582256671e+13644
relative error = 1.7759949498975023029112321148042e+13646 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3620.2MB, alloc=4.7MB, time=284.80
NO POLE
NO POLE
t[1] = 1.187
x1[1] (analytic) = 2.0005492435368043079225915710682
x1[1] (numeric) = -1.5931519485320942896447413376780e+13666
absolute error = 1.5931519485320942896447413376780e+13666
relative error = 7.9635727722229643341316497864730e+13667 %
h = 0.001
x2[1] (analytic) = 1.0022395940987884814609750372135
x2[1] (numeric) = 1.4232288223306693385672053208954e+13664
absolute error = 1.4232288223306693385672053208954e+13664
relative error = 1.4200484901122205162332357735462e+13666 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3624.0MB, alloc=4.7MB, time=285.47
NO POLE
NO POLE
t[1] = 1.188
x1[1] (analytic) = 2.0005486945677977543079266562412
x1[1] (numeric) = 1.2738563813854449859472690804611e+13686
absolute error = 1.2738563813854449859472690804611e+13686
relative error = 6.3675349909973137555167512837949e+13687 %
h = 0.001
x2[1] (analytic) = 1.0022438030099452206487785236628
x2[1] (numeric) = -1.1379888272227110164592764630240e+13684
absolute error = 1.1379888272227110164592764630240e+13684
relative error = 1.1354411210177558004587217622160e+13686 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3627.8MB, alloc=4.7MB, time=286.15
memory used=3631.6MB, alloc=4.7MB, time=286.84
NO POLE
NO POLE
t[1] = 1.189
x1[1] (analytic) = 2.000548146147485814215564889972
x1[1] (numeric) = -1.0185532408829932320569528861442e+13706
absolute error = 1.0185532408829932320569528861442e+13706
relative error = 5.0913707967711302225936977590991e+13707 %
h = 0.001
x2[1] (analytic) = 1.0022480206219695931449486484403
x2[1] (numeric) = 9.0991592536961700781014805220140e+13703
absolute error = 9.0991592536961700781014805220140e+13703
relative error = 9.0787500363926522016991910810960e+13705 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3635.4MB, alloc=4.7MB, time=287.51
NO POLE
NO POLE
t[1] = 1.19
x1[1] (analytic) = 2.0005475982753200672878644857138
x1[1] (numeric) = 8.1441732339160434902209754272284e+13725
absolute error = 8.1441732339160434902209754272284e+13725
relative error = 4.0709719883381765998174951543095e+13727 %
h = 0.001
x2[1] (analytic) = 1.0022522469520062629406831390182
x2[1] (numeric) = -7.2755282954918888501046798265177e+13723
absolute error = 7.2755282954918888501046798265177e+13723
relative error = 7.2591788320932384701739876216599e+13725 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3639.2MB, alloc=4.7MB, time=288.19
memory used=3643.0MB, alloc=4.7MB, time=288.89
NO POLE
NO POLE
t[1] = 1.191
x1[1] (analytic) = 2.000547050950752641313422500432
x1[1] (numeric) = -6.5119382082113383078772930972597e+13745
absolute error = 6.5119382082113383078772930972597e+13745
relative error = 3.2550787571412347346902196777055e+13747 %
h = 0.001
x2[1] (analytic) = 1.0022564820172344920147821596021
x2[1] (numeric) = 5.8173849366358837365675677686402e+13743
absolute error = 5.8173849366358837365675677686402e+13743
relative error = 5.8042876658949358505003940869803e+13745 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3646.9MB, alloc=4.7MB, time=289.61
NO POLE
NO POLE
t[1] = 1.192
x1[1] (analytic) = 2.0005465041732362116792025775455
x1[1] (numeric) = 5.2068316831679814293757096769263e+13765
absolute error = 5.2068316831679814293757096769263e+13765
relative error = 2.6027046471083177260601230705377e+13767 %
h = 0.001
x2[1] (analytic) = 1.0022607258348682093246553518592
x2[1] (numeric) = -4.6514790578118525964281743725229e+13763
absolute error = 4.6514790578118525964281743725229e+13763
relative error = 4.6409870584694816225836432757321e+13765 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3650.7MB, alloc=4.7MB, time=290.34
NO POLE
NO POLE
t[1] = 1.193
x1[1] (analytic) = 2.0005459579422240008232102882797
x1[1] (numeric) = -4.1632913750096277928151523150721e+13785
absolute error = 4.1632913750096277928151523150721e+13785
relative error = 2.0810775970835577926528631448080e+13787 %
h = 0.001
x2[1] (analytic) = 1.0022649784221560799357230370091
x2[1] (numeric) = 3.7192411471698483786073369140580e+13783
absolute error = 3.7192411471698483786073369140580e+13783
relative error = 3.7108361832865483225409552697170e+13785 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3654.5MB, alloc=4.7MB, time=291.07
memory used=3658.3MB, alloc=4.7MB, time=291.81
NO POLE
NO POLE
t[1] = 1.194
x1[1] (analytic) = 2.0005454122571697776877155241075
x1[1] (numeric) = 3.3288948304708171851829409875041e+13805
absolute error = 3.3288948304708171851829409875041e+13805
relative error = 1.6639936339734977794446601072981e+13807 %
h = 0.001
x2[1] (analytic) = 1.0022692397963815742894883706372
x2[1] (numeric) = -2.9738400493430341592405239139878e+13803
absolute error = 2.9738400493430341592405239139878e+13803
relative error = 2.9671069721217741949445066208198e+13805 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3662.1MB, alloc=4.7MB, time=292.54
NO POLE
NO POLE
t[1] = 1.195
x1[1] (analytic) = 2.0005448671175278571730213934997
x1[1] (numeric) = -2.6617259745145039581260688249452e+13825
absolute error = 2.6617259745145039581260688249452e+13825
relative error = 1.3305005142672129251058883207063e+13827 %
h = 0.001
x2[1] (analytic) = 1.0022735099748630376105577960015
x2[1] (numeric) = 2.3778303931182844611856280266460e+13823
absolute error = 2.3778303931182844611856280266460e+13823
relative error = 2.3724366347644170618108384498462e+13825 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3665.9MB, alloc=4.7MB, time=293.26
NO POLE
NO POLE
t[1] = 1.196
x1[1] (analytic) = 2.0005443225227530995917790767545
x1[1] (numeric) = 2.1282694480327454332857422027495e+13845
absolute error = 2.1282694480327454332857422027495e+13845
relative error = 1.0638451865684868663066147230952e+13847 %
h = 0.001
x2[1] (analytic) = 1.0022777889749537594528876971209
x2[1] (numeric) = -1.9012715158255151155738771382416e+13843
absolute error = 1.9012715158255151155738771382416e+13843
relative error = 1.8969506625203949303254160009934e+13845 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3669.7MB, alloc=4.7MB, time=293.98
memory used=3673.6MB, alloc=4.7MB, time=294.72
NO POLE
NO POLE
t[1] = 1.197
x1[1] (analytic) = 2.0005437784723009101238480932203
x1[1] (numeric) = -1.7017269571695067582996297611039e+13865
absolute error = 1.7017269571695067582996297611039e+13865
relative error = 8.5063220084542053728538086303495e+13866 %
h = 0.001
x2[1] (analytic) = 1.002282076814042043385535709568
x2[1] (numeric) = 1.5202233882413131264096230430464e+13863
absolute error = 1.5202233882413131264096230430464e+13863
relative error = 1.5167620208012230996606398178914e+13865 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3677.4MB, alloc=4.7MB, time=295.45
NO POLE
NO POLE
t[1] = 1.198
x1[1] (analytic) = 2.0005432349656272382717014357726
x1[1] (numeric) = 1.3606710557416377128453855569169e+13885
absolute error = 1.3606710557416377128453855569169e+13885
relative error = 6.8015078702611312161276478768744e+13886 %
h = 0.001
x2[1] (analytic) = 1.0022863735095512768181957046359
x2[1] (numeric) = -1.2155439824976541186229095913928e+13883
absolute error = 1.2155439824976541186229095913928e+13883
relative error = 1.2127711347021227419672709998972e+13885 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3681.2MB, alloc=4.7MB, time=296.19
memory used=3685.0MB, alloc=4.7MB, time=297.05
NO POLE
NO POLE
t[1] = 1.199
x1[1] (analytic) = 2.0005426920021885773163750279489
x1[1] (numeric) = -1.0879687332523374434476351806091e+13905
absolute error = 1.0879687332523374434476351806091e+13905
relative error = 5.4383679868559746515333143881831e+13906 %
h = 0.001
x2[1] (analytic) = 1.0022906790789400009667960214068
x2[1] (numeric) = 9.7192766853532867626725882904479e+13902
absolute error = 9.7192766853532867626725882904479e+13902
relative error = 9.6970638241242194920393345085226e+13904 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3688.8MB, alloc=4.7MB, time=297.78
NO POLE
NO POLE
t[1] = 1.2
x1[1] (analytic) = 2.0005421495814419637739609596927
x1[1] (numeric) = 8.6992073472859298993109595700163e+13924
absolute error = 8.6992073472859298993109595700163e+13924
relative error = 4.3484249252663824637270537828030e+13926 %
h = 0.001
x2[1] (analytic) = 1.002294993539701980959441081236
x2[1] (numeric) = -7.7713633275819601847519508860159e+13922
absolute error = 7.7713633275819601847519508860159e+13922
relative error = 7.7535689369619984422769361052225e+13924 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3692.6MB, alloc=4.7MB, time=298.46
NO POLE
NO POLE
t[1] = 1.201
x1[1] (analytic) = 2.000541607702844976852643958199
x1[1] (numeric) = -6.9557337594481756700531840185498e+13944
absolute error = 6.9557337594481756700531840185498e+13944
relative error = 3.4769253149576889442536724649099e+13946 %
h = 0.001
x2[1] (analytic) = 1.0022993169093662760829770802648
x2[1] (numeric) = 6.2138459398216511920016186931245e+13942
absolute error = 6.2138459398216511920016186931245e+13942
relative error = 6.1995911151394541173069523597543e+13944 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3696.5MB, alloc=4.7MB, time=299.12
memory used=3700.3MB, alloc=4.7MB, time=299.80
NO POLE
NO POLE
t[1] = 1.202
x1[1] (analytic) = 2.0005410663658557379102805508965
x1[1] (numeric) = 5.5616828293467275997449579676046e+13964
absolute error = 5.5616828293467275997449579676046e+13964
relative error = 2.7800893082639754091474170351638e+13966 %
h = 0.001
x2[1] (analytic) = 1.0023036492054973101704630177982
x2[1] (numeric) = -4.9684823288080661208098346483411e+13962
absolute error = 4.9684823288080661208098346483411e+13962
relative error = 4.9570629945790040809063330166167e+13964 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3704.1MB, alloc=4.7MB, time=300.47
NO POLE
NO POLE
t[1] = 1.203
x1[1] (analytic) = 2.0005405255699329099125203781481
x1[1] (numeric) = -4.4470241334688746381104783333412e+13984
absolute error = 4.4470241334688746381104783333412e+13984
relative error = 2.2229112965367019167971627706616e+13986 %
h = 0.001
x2[1] (analytic) = 1.0023079904456949421298288817407
x2[1] (numeric) = 3.9727114078381145720778559958373e+13982
absolute error = 3.9727114078381145720778559958373e+13982
relative error = 3.9635635410544560749432822085261e+13984 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3707.9MB, alloc=4.7MB, time=301.15
NO POLE
NO POLE
memory used=3711.7MB, alloc=4.7MB, time=301.82
t[1] = 1.204
x1[1] (analytic) = 2.0005399853145356968914691137893
x1[1] (numeric) = 3.5557625723107761076027098672554e+14004
absolute error = 3.5557625723107761076027098672554e+14004
relative error = 1.7774014008281468662258981365237e+14006 %
h = 0.001
x2[1] (analytic) = 1.0023123406475945366140033767501
x2[1] (numeric) = -3.1765104282363996428767626567018e+14002
absolute error = 3.1765104282363996428767626567018e+14002
relative error = 3.1691821994170545331208106086575e+14004 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3715.5MB, alloc=4.7MB, time=302.50
NO POLE
NO POLE
t[1] = 1.205
x1[1] (analytic) = 2.0005394455991238434048924521669
x1[1] (numeric) = -2.8431254455063416839575815560575e+14024
absolute error = 2.8431254455063416839575815560575e+14024
relative error = 1.4211793982671904880635283042381e+14026 %
h = 0.001
x2[1] (analytic) = 1.0023166998288670348327941463888
x2[1] (numeric) = 2.5398820767062788222703665153759e+14022
absolute error = 2.5398820767062788222703665153759e+14022
relative error = 2.5340115326223056341532745738522e+14024 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3719.3MB, alloc=4.7MB, time=303.16
NO POLE
NO POLE
t[1] = 1.206
x1[1] (analytic) = 2.0005389064231576339959606208839
x1[1] (numeric) = 2.2733132863909177853279301821001e+14044
absolute error = 2.2733132863909177853279301821001e+14044
relative error = 1.1363504499172496561037646083709e+14046 %
h = 0.001
x2[1] (analytic) = 1.0023210680072190255068040072825
x2[1] (numeric) = -2.0308452024051433520425559859368e+14042
absolute error = 2.0308452024051433520425559859368e+14042
relative error = 2.0261423881299844916182374837730e+14044 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3723.2MB, alloc=4.7MB, time=303.83
memory used=3727.0MB, alloc=4.7MB, time=304.50
NO POLE
NO POLE
t[1] = 1.207
x1[1] (analytic) = 2.0005383677860978926535328789933
x1[1] (numeric) = -1.8177014687303384053752461113687e+14064
absolute error = 1.8177014687303384053752461113687e+14064
relative error = 9.0860615222386535906913223723179e+14065 %
h = 0.001
x2[1] (analytic) = 1.0023254452003928159636672811755
x2[1] (numeric) = 1.6238282375221235169790986015673e+14062
absolute error = 1.6238282375221235169790986015673e+14062
relative error = 1.6200608747366230498698600498102e+14064 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3730.8MB, alloc=4.7MB, time=305.17
NO POLE
NO POLE
t[1] = 1.208
x1[1] (analytic) = 2.0005378296874059822729814609261
x1[1] (numeric) = 1.4534022429745605338858080310800e+14084
absolute error = 1.4534022429745605338858080310800e+14084
relative error = 7.2650575330618061154763627277602e+14085 %
h = 0.001
x2[1] (analytic) = 1.0023298314261665033768908797797
x2[1] (numeric) = -1.2983846045239710488284381957552e+14082
absolute error = 1.2983846045239710488284381957552e+14082
relative error = 1.2953666186673927161206170439235e+14084 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3734.6MB, alloc=4.7MB, time=305.86
NO POLE
NO POLE
t[1] = 1.209
x1[1] (analytic) = 2.0005372921265438041175544269769
x1[1] (numeric) = -1.1621149656433827030984011500555e+14104
absolute error = 1.1621149656433827030984011500555e+14104
relative error = 5.8090142594046341168759532334738e+14105 %
h = 0.001
x2[1] (analytic) = 1.0023342267023540461475853674643
x2[1] (numeric) = 1.0381655782986720157692121993612e+14102
absolute error = 1.0381655782986720157692121993612e+14102
relative error = 1.0357479078752023797341300298988e+14104 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3738.4MB, alloc=4.7MB, time=306.55
memory used=3742.2MB, alloc=4.7MB, time=307.22
NO POLE
NO POLE
t[1] = 1.21
x1[1] (analytic) = 2.0005367551029737972802768817107
x1[1] (numeric) = 9.2920676289059441361903985918400e+14123
absolute error = 9.2920676289059441361903985918400e+14123
relative error = 4.6447872578215403768942351384144e+14125 %
h = 0.001
x2[1] (analytic) = 1.0023386310468053354293717981262
x2[1] (numeric) = -8.3009900472392558477958169550930e+14121
absolute error = 8.3009900472392558477958169550930e+14121
relative error = 8.2816223880047497980010106615023e+14123 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3746.0MB, alloc=4.7MB, time=307.89
NO POLE
NO POLE
t[1] = 1.211
x1[1] (analytic) = 2.0005362186161589381463900221908
x1[1] (numeric) = -7.4297744519932114498512496194694e+14143
absolute error = 7.4297744519932114498512496194694e+14143
relative error = 3.7138914971170314541122258244034e+14145 %
h = 0.001
x2[1] (analytic) = 1.0023430444774062667967506950117
x2[1] (numeric) = 6.6373261842574159325322121739910e+14141
absolute error = 6.6373261842574159325322121739910e+14141
relative error = 6.6218109865948467339174329962264e+14143 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3749.9MB, alloc=4.7MB, time=308.56
memory used=3753.7MB, alloc=4.7MB, time=309.23
NO POLE
NO POLE
t[1] = 1.212
x1[1] (analytic) = 2.0005356826655627398563274784687
x1[1] (numeric) = 5.9407174605325706485424252742406e+14163
absolute error = 5.9407174605325706485424252742406e+14163
relative error = 2.9695633584585770580170922472765e+14165 %
h = 0.001
x2[1] (analytic) = 1.0023474670120788120572201158413
x2[1] (numeric) = -5.3070897116520005660146726826546e+14161
absolute error = 5.3070897116520005660146726826546e+14161
relative error = 5.2946606703881133815149348775524e+14163 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3757.5MB, alloc=4.7MB, time=309.90
NO POLE
NO POLE
t[1] = 1.213
x1[1] (analytic) = 2.0005351472506492517692284093098
x1[1] (numeric) = -4.7500935827747253059870644159391e+14183
absolute error = 4.7500935827747253059870644159391e+14183
relative error = 2.3744114615045955249936218506044e+14185 %
h = 0.001
x2[1] (analytic) = 1.0023518986687810912074303203192
x2[1] (numeric) = 4.2434559377728755216724540006091e+14181
absolute error = 4.2434559377728755216724540006091e+14181
relative error = 4.2334991766949208916015510375900e+14183 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3761.3MB, alloc=4.7MB, time=310.58
NO POLE
NO POLE
t[1] = 1.214
x1[1] (analytic) = 2.0005346123708830589269868166705
x1[1] (numeric) = 3.7980915933165543996580423628219e+14203
absolute error = 3.7980915933165543996580423628219e+14203
relative error = 1.8985383056258857196805427142938e+14205 %
h = 0.001
x2[1] (analytic) = 1.0023563394655074445336631329846
x2[1] (numeric) = -3.3929930101397603920225645765611e+14201
absolute error = 3.3929930101397603920225645765611e+14201
relative error = 3.3850167615531085992846311236606e+14203 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3765.1MB, alloc=4.7MB, time=311.24
memory used=3768.9MB, alloc=4.7MB, time=311.93
NO POLE
NO POLE
t[1] = 1.215
x1[1] (analytic) = 2.000534078025729281518836542974
x1[1] (numeric) = -3.0368874843925399682036528341468e+14223
absolute error = 3.0368874843925399682036528341468e+14223
relative error = 1.5180383667293279328529784367540e+14225 %
h = 0.001
x2[1] (analytic) = 1.002360789420288504856924671393
x2[1] (numeric) = 2.7129777557910525484364426092333e+14221
absolute error = 2.7129777557910525484364426092333e+14221
relative error = 2.7065880713072313672508780866810e+14223 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3772.7MB, alloc=4.7MB, time=312.61
NO POLE
NO POLE
t[1] = 1.216
x1[1] (analytic) = 2.0005335442146535743464714157709
x1[1] (numeric) = 2.4282420174092360270584806232725e+14243
absolute error = 2.4282420174092360270584806232725e+14243
relative error = 1.2137972014673152209997521201520e+14245 %
h = 0.001
x2[1] (analytic) = 1.0023652485511912699229406878048
x2[1] (numeric) = -2.1692494742610391651224052639201e+14241
absolute error = 2.1692494742610391651224052639201e+14241
relative error = 2.1641307670995684592264379229958e+14243 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3776.6MB, alloc=4.7MB, time=313.28
NO POLE
NO POLE
t[1] = 1.217
x1[1] (analytic) = 2.0005330109371221262897000049043
x1[1] (numeric) = -1.9415797672501220860553155294595e+14263
absolute error = 1.9415797672501220860553155294595e+14263
relative error = 9.7053123174439185811407802774043e+14264 %
h = 0.001
x2[1] (analytic) = 1.002369716876319174937344351896
x2[1] (numeric) = 1.7344938680522719674007656609050e+14261
absolute error = 1.7344938680522719674007656609050e+14261
relative error = 1.7303933257854880322734525598863e+14263 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3780.4MB, alloc=4.7MB, time=313.96
memory used=3784.2MB, alloc=4.7MB, time=314.65
NO POLE
NO POLE
t[1] = 1.218
x1[1] (analytic) = 2.0005324781926016597726344578343
x1[1] (numeric) = 1.5524531597625009257455071195695e+14283
absolute error = 1.5524531597625009257455071195695e+14283
relative error = 7.7601997302492091354299539252500e+14284 %
h = 0.001
x2[1] (analytic) = 1.0023741944138121652463468825153
x2[1] (numeric) = -1.3868709035118127750516632186407e+14281
absolute error = 1.3868709035118127750516632186407e+14281
relative error = 1.3835860013563637852650576976113e+14283 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3788.0MB, alloc=4.7MB, time=315.33
NO POLE
NO POLE
t[1] = 1.219
x1[1] (analytic) = 2.0005319459805594302304128793098
x1[1] (numeric) = -1.2413143430465574533751788277464e+14303
absolute error = 1.2413143430465574533751788277464e+14303
relative error = 6.2049213737405629715611619901308e+14304 %
h = 0.001
x2[1] (analytic) = 1.0023786811818467691631820181679
x2[1] (numeric) = 1.1089176724317520572774598698724e+14301
absolute error = 1.1089176724317520572774598698724e+14301
relative error = 1.1062861703366349742147330720537e+14303 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3791.8MB, alloc=4.7MB, time=316.00
memory used=3795.6MB, alloc=4.7MB, time=316.67
NO POLE
NO POLE
t[1] = 1.22
x1[1] (analytic) = 2.0005314143004632255764547221118
x1[1] (numeric) = 9.9253319725848104416511690023347e+14322
absolute error = 9.9253319725848104416511690023347e+14322
relative error = 4.9613477207282224173435427116217e+14324 %
h = 0.001
x2[1] (analytic) = 1.0023831771986361709406158987457
x2[1] (numeric) = -8.8667113941004279634915565136966e+14320
absolute error = 8.8667113941004279634915565136966e+14320
relative error = 8.8456306887354772055660091332550e+14322 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3799.5MB, alloc=4.7MB, time=317.35
NO POLE
NO POLE
t[1] = 1.221
x1[1] (analytic) = 2.0005308831517813656702486561215
x1[1] (numeric) = -7.9361215245636961317142619697265e+14342
absolute error = 7.9361215245636961317142619697265e+14342
relative error = 3.9670077534921905413367978268399e+14344 %
h = 0.001
x2[1] (analytic) = 1.0023876824824302838898145150074
x2[1] (numeric) = 7.0896670601224372395196760469581e+14340
absolute error = 7.0896670601224372395196760469581e+14340
relative error = 7.0727795083881669381866066557538e+14342 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3803.3MB, alloc=4.7MB, time=318.01
NO POLE
NO POLE
t[1] = 1.222
x1[1] (analytic) = 2.0005303525339827017856723835024
x1[1] (numeric) = 6.3455837070849201590643930358890e+14362
absolute error = 6.3455837070849201590643930358890e+14362
relative error = 3.1719507274894639237488260075270e+14364 %
h = 0.001
x2[1] (analytic) = 1.0023921970515158236458614674866
x2[1] (numeric) = -5.6687735496644742539826193440419e+14360
absolute error = 5.6687735496644742539826193440419e+14360
relative error = 5.6552450890368808859569277509521e+14362 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3807.1MB, alloc=4.7MB, time=318.71
memory used=3810.9MB, alloc=4.7MB, time=319.38
NO POLE
NO POLE
t[1] = 1.223
x1[1] (analytic) = 2.0005298224465366160798438683157
x1[1] (numeric) = -5.0738175390825210459204328768526e+14382
absolute error = 5.0738175390825210459204328768526e+14382
relative error = 2.5362368919237227979818403347469e+14384 %
h = 0.001
x2[1] (analytic) = 1.0023967209242163815802193628337
x2[1] (numeric) = 4.5326519968937156483586512916286e+14380
absolute error = 4.5326519968937156483586512916286e+14380
relative error = 4.5218144695391467772800593451012e+14382 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3814.7MB, alloc=4.7MB, time=320.05
NO POLE
NO POLE
t[1] = 1.224
x1[1] (analytic) = 2.00052929288891302106250344942
x1[1] (numeric) = 4.0569355961939868812638218690599e+14402
absolute error = 4.0569355961939868812638218690599e+14402
relative error = 2.0279311133382457410174605745297e+14404 %
h = 0.001
x2[1] (analytic) = 1.0024012541188924983604287631111
x2[1] (numeric) = -3.6242291114557945656404623110764e+14400
absolute error = 3.6242291114557945656404623110764e+14400
relative error = 3.6155472636967921416021480261941e+14402 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3818.5MB, alloc=4.7MB, time=320.72
NO POLE
NO POLE
memory used=3822.3MB, alloc=4.7MB, time=321.40
t[1] = 1.225
x1[1] (analytic) = 2.0005287638605823590659263060375
x1[1] (numeric) = -3.2438546133927449274086103443062e+14422
absolute error = 3.2438546133927449274086103443062e+14422
relative error = 1.6214986117634299801742531648459e+14424 %
h = 0.001
x2[1] (analytic) = 1.0024057966539417376573391922448
x2[1] (numeric) = 2.8978700904735829494951005625714e+14420
absolute error = 2.8978700904735829494951005625714e+14420
relative error = 2.8909151365113344593081089540916e+14422 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3826.2MB, alloc=4.7MB, time=322.06
NO POLE
NO POLE
t[1] = 1.226
x1[1] (analytic) = 2.0005282353610156017153647458997
x1[1] (numeric) = 2.5937293070910867866393944495665e+14442
absolute error = 2.5937293070910867866393944495665e+14442
relative error = 1.2965222191043067370514334097257e+14444 %
h = 0.001
x2[1] (analytic) = 1.0024103485477987600001672936975
x2[1] (numeric) = -2.3170861452211475700117071656861e+14440
absolute error = 2.3170861452211475700117071656861e+14440
relative error = 2.3115145893874019985904938896483e+14442 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3830.0MB, alloc=4.7MB, time=322.73
NO POLE
NO POLE
t[1] = 1.227
x1[1] (analytic) = 2.000527707389684249400019786414
x1[1] (numeric) = -2.0739005042605758983760914264379e+14462
absolute error = 2.0739005042605758983760914264379e+14462
relative error = 1.0366767211470564793459404474770e+14464 %
h = 0.001
x2[1] (analytic) = 1.002414909818935396779677824473
x2[1] (numeric) = 1.8527014796230527831370702612414e+14460
absolute error = 1.8527014796230527831370702612414e+14460
relative error = 1.8482381511640756526997941975104e+14462 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3833.8MB, alloc=4.7MB, time=323.39
memory used=3837.6MB, alloc=4.7MB, time=324.07
NO POLE
NO POLE
t[1] = 1.228
x1[1] (analytic) = 2.0005271799460603307445414998228
x1[1] (numeric) = 1.6582545024314774864653854898964e+14482
absolute error = 1.6582545024314774864653854898964e+14482
relative error = 8.2890875917826247718284610775155e+14483 %
h = 0.001
x2[1] (analytic) = 1.0024194804858607243997837627924
x2[1] (numeric) = -1.4813876383822768015993662332148e+14480
absolute error = 1.4813876383822768015993662332148e+14480
relative error = 1.4778121008425194847143766839132e+14482 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3841.4MB, alloc=4.7MB, time=324.75
NO POLE
NO POLE
t[1] = 1.229
x1[1] (analytic) = 2.000526653029616402081057593856
x1[1] (numeric) = -1.3259112426970925022925580336947e+14502
absolute error = 1.3259112426970925022925580336947e+14502
relative error = 6.6278109351311067532942822280420e+14503 %
h = 0.001
x2[1] (analytic) = 1.0024240605671211385778624001849
x2[1] (numeric) = 1.1844915974257817894981491151950e+14500
absolute error = 1.1844915974257817894981491151950e+14500
relative error = 1.1816272613764438092713964689805e+14502 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3845.2MB, alloc=4.7MB, time=325.44
NO POLE
NO POLE
t[1] = 1.23
x1[1] (analytic) = 2.0005261266398255469217296999054
x1[1] (numeric) = 1.0601753958350515730943040291971e+14522
absolute error = 1.0601753958350515730943040291971e+14522
relative error = 5.2994828796151254058108460039467e+14523 %
h = 0.001
x2[1] (analytic) = 1.0024286500813004287940848833498
x2[1] (numeric) = -9.4709872556005927815614436120039e+14519
absolute error = 9.4709872556005927815614436120039e+14519
relative error = 9.4480412694035261014284925774520e+14521 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3849.0MB, alloc=4.7MB, time=326.11
memory used=3852.9MB, alloc=4.7MB, time=326.79
NO POLE
NO POLE
t[1] = 1.231
x1[1] (analytic) = 2.0005256007761613754318368412764
x1[1] (numeric) = -8.4769766914992685386950654997207e+14541
absolute error = 8.4769766914992685386950654997207e+14541
relative error = 4.2373747620177326974407274680007e+14543 %
h = 0.001
x2[1] (analytic) = 1.0024332490470198528900572669226
x2[1] (numeric) = 7.5728354503054439050213740581392e+14539
absolute error = 7.5728354503054439050213740581392e+14539
relative error = 7.5544535833230673385902001882087e+14541 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3856.7MB, alloc=4.7MB, time=327.46
NO POLE
NO POLE
t[1] = 1.232
x1[1] (analytic) = 2.000525075438098023903385554601
x1[1] (numeric) = 6.7780420212093055119698761394750e+14561
absolute error = 6.7780420212093055119698761394750e+14561
relative error = 3.3881314982892537839569629598045e+14563 %
h = 0.001
x2[1] (analytic) = 1.0024378574829382118170717352721
x2[1] (numeric) = -6.0551065279377996683507169128324e+14559
absolute error = 6.0551065279377996683507169128324e+14559
relative error = 6.0403809400632690774991740773127e+14561 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3860.5MB, alloc=4.7MB, time=328.12
memory used=3864.3MB, alloc=4.7MB, time=328.80
NO POLE
NO POLE
t[1] = 1.233
x1[1] (analytic) = 2.0005245506251101542292461380227
x1[1] (numeric) = -5.4196036291275547129542412415952e+14581
absolute error = 5.4196036291275547129542412415952e+14581
relative error = 2.7090912867997917050514159232051e+14583 %
h = 0.001
x2[1] (analytic) = 1.0024424754077519245342672496255
x2[1] (numeric) = 4.8415570766424261094572786714944e+14579
absolute error = 4.8415570766424261094572786714944e+14579
relative error = 4.8297605053826973646022816453457e+14581 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3868.1MB, alloc=4.7MB, time=329.47
NO POLE
NO POLE
t[1] = 1.234
x1[1] (analytic) = 2.0005240263366729533778145002886
x1[1] (numeric) = 4.3334200946148948196345312731491e+14601
absolute error = 4.3334200946148948196345312731491e+14601
relative error = 2.1661424894507181641186580773706e+14603 %
h = 0.001
x2[1] (analytic) = 1.0024471028401951030569994761955
x2[1] (numeric) = -3.8712242003064469549924620502705e+14599
absolute error = 3.8712242003064469549924620502705e+14599
relative error = 3.8617740420798815534151851303243e+14601 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3871.9MB, alloc=4.7MB, time=330.15
NO POLE
NO POLE
t[1] = 1.235
x1[1] (analytic) = 2.0005235025722621328681990854104
x1[1] (numeric) = -3.4649267735166682298670146676579e+14621
absolute error = 3.4649267735166682298670146676579e+14621
relative error = 1.7320100309051527830699369216803e+14623 %
h = 0.001
x2[1] (analytic) = 1.0024517397990396276557204515618
x2[1] (numeric) = 3.0953630354454480264070066279230e+14619
absolute error = 3.0953630354454480264070066279230e+14619
relative error = 3.0877925715067061196371355716427e+14621 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3875.7MB, alloc=4.7MB, time=330.82
memory used=3879.6MB, alloc=4.7MB, time=331.50
NO POLE
NO POLE
t[1] = 1.236
x1[1] (analytic) = 2.0005229793313539282459323480829
x1[1] (numeric) = 2.7704947324982487228201077213051e+14641
absolute error = 2.7704947324982487228201077213051e+14641
relative error = 1.3848852330725272617184679821929e+14643 %
h = 0.001
x2[1] (analytic) = 1.0024563863030952222056690433278
x2[1] (numeric) = -2.4749980433692273160266788644021e+14639
absolute error = 2.4749980433692273160266788644021e+14639
relative error = 2.4689333892087205495775714843851e+14641 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3883.4MB, alloc=4.7MB, time=332.17
NO POLE
NO POLE
t[1] = 1.237
x1[1] (analytic) = 2.0005224566134250985592062555688
x1[1] (numeric) = -2.2152390409712127886908810434727e+14661
absolute error = 2.2152390409712127886908810434727e+14661
relative error = 1.1073302544782574628594746527374e+14663 %
h = 0.001
x2[1] (analytic) = 1.0024610423712095296876738670628
x2[1] (numeric) = 1.9789650663060197509912586886153e+14659
absolute error = 1.9789650663060197509912586886153e+14659
relative error = 1.9741067060571242918011676114715e+14661 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3887.2MB, alloc=4.7MB, time=332.83
NO POLE
NO POLE
t[1] = 1.238
x1[1] (analytic) = 2.0005219344179529258356312922876
x1[1] (numeric) = 1.7712663197226131345980159278653e+14681
absolute error = 1.7712663197226131345980159278653e+14681
relative error = 8.8540209894672253906026112251796e+14682 %
h = 0.001
x2[1] (analytic) = 1.0024657080222681878403709247237
x2[1] (numeric) = -1.5823457897883048388896994888075e+14679
absolute error = 1.5823457897883048388896994888075e+14679
relative error = 1.5784537836312257511540286512801e+14681 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3891.0MB, alloc=4.7MB, time=333.50
memory used=3894.8MB, alloc=4.7MB, time=334.18
NO POLE
NO POLE
t[1] = 1.239
x1[1] (analytic) = 2.000521412744415214559518443866
x1[1] (numeric) = -1.4162735115069962963560770854048e+14701
absolute error = 1.4162735115069962963560770854048e+14701
relative error = 7.0795218810684037624719157229187e+14702 %
h = 0.001
x2[1] (analytic) = 1.0024703832751949049641388351459
x2[1] (numeric) = 1.2652159662092757382826767057275e+14699
absolute error = 1.2652159662092757382826767057275e+14699
relative error = 1.2620981001709581394692532326010e+14701 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3898.6MB, alloc=4.7MB, time=334.86
NO POLE
NO POLE
t[1] = 1.24
x1[1] (analytic) = 2.0005208915922902911496836379329
x1[1] (numeric) = 1.1324274825653990193577196492263e+14721
absolute error = 1.1324274825653990193577196492263e+14721
relative error = 5.6606631169148007602383260887037e+14722 %
h = 0.001
x2[1] (analytic) = 1.0024750681489515358770551338088
x2[1] (numeric) = -1.0116445163133599361075590681474e+14719
absolute error = 1.0116445163133599361075590681474e+14719
relative error = 1.0091468091883218475748955335732e+14721 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3902.4MB, alloc=4.7MB, time=335.54
memory used=3906.3MB, alloc=4.7MB, time=336.24
NO POLE
NO POLE
t[1] = 1.241
x1[1] (analytic) = 2.0005203709610570034377741194621
x1[1] (numeric) = -9.0546917163258134499587887298354e+14740
absolute error = 9.0546917163258134499587887298354e+14740
relative error = 4.5261682149109572867189374848407e+14742 %
h = 0.001
x2[1] (analytic) = 1.0024797626625381580231777268951
x2[1] (numeric) = 8.0889322828669572001850906850339e+14738
absolute error = 8.0889322828669572001850906850339e+14738
relative error = 8.0689232682195410153612225652718e+14740 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3910.1MB, alloc=4.7MB, time=336.91
NO POLE
NO POLE
t[1] = 1.242
x1[1] (analytic) = 2.0005198508501947201471162389906
x1[1] (numeric) = 7.2399728318112797227121959946764e+14760
absolute error = 7.2399728318112797227121959946764e+14760
relative error = 3.6190457339048078667029387219947e+14762 %
h = 0.001
x2[1] (analytic) = 1.0024844668349931477334561937131
x2[1] (numeric) = -6.4677685117347928584208009179228e+14758
absolute error = 6.4677685117347928584208009179228e+14758
relative error = 6.4517393792191037160776782506321e+14760 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3913.9MB, alloc=4.7MB, time=337.58
NO POLE
NO POLE
t[1] = 1.243
x1[1] (analytic) = 2.0005193312591833303720841325588
x1[1] (numeric) = -5.7889554109121169475634885096119e+14780
absolute error = 5.7889554109121169475634885096119e+14780
relative error = 2.8937263041934141284522967851152e+14782 %
h = 0.001
x2[1] (analytic) = 1.0024891806853932566395782418017
x2[1] (numeric) = 5.1715143678470240564782824488159e+14778
absolute error = 5.1715143678470240564782824488159e+14778
relative error = 5.1586734974150085371941139940632e+14780 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3917.7MB, alloc=4.7MB, time=338.24
memory used=3921.5MB, alloc=4.7MB, time=338.92
NO POLE
NO POLE
t[1] = 1.244
x1[1] (analytic) = 2.0005188121875032430579887727423
x1[1] (numeric) = 4.6287473072111957964381373194152e+14800
absolute error = 4.6287473072111957964381373194152e+14800
relative error = 2.3137734466739699778865701075449e+14802 %
h = 0.001
x2[1] (analytic) = 1.0024939042328536882410572305223
x2[1] (numeric) = -4.1350522685411858841558296319377e+14798
absolute error = 4.1350522685411858841558296319377e+14798
relative error = 4.1247654984051843418717883715067e+14800 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3925.3MB, alloc=4.7MB, time=339.60
NO POLE
NO POLE
t[1] = 1.245
x1[1] (analytic) = 2.0005182936346353864814868706631
x1[1] (numeric) = -3.7010652377160203190632672090184e+14820
absolute error = 3.7010652377160203190632672090184e+14820
relative error = 1.8500531834636470889619155328969e+14822 %
h = 0.001
x2[1] (analytic) = 1.0024986374965281746258672916471
x2[1] (numeric) = 3.3063153357700183745750587584057e+14818
absolute error = 3.3063153357700183745750587584057e+14818
relative error = 3.2980746428011666138605794535517e+14820 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3929.2MB, alloc=4.7MB, time=340.26
NO POLE
NO POLE
memory used=3933.0MB, alloc=4.7MB, time=340.93
t[1] = 1.246
x1[1] (analytic) = 2.0005177756000612077315091093909
x1[1] (numeric) = 2.9593069106386085148538210855516e+14840
absolute error = 2.9593069106386085148538210855516e+14840
relative error = 1.4792704902364367534404753254651e+14842 %
h = 0.001
x2[1] (analytic) = 1.0025033804956090533449331893796
x2[1] (numeric) = -2.6436718062102356675482256747980e+14838
absolute error = 2.6436718062102356675482256747980e+14838
relative error = 2.6370702160657850292332615681681e+14840 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3936.8MB, alloc=4.7MB, time=341.61
NO POLE
NO POLE
t[1] = 1.247
x1[1] (analytic) = 2.0005172580832626721907071896607
x1[1] (numeric) = -2.3662099500731310342393947745603e+14860
absolute error = 2.3662099500731310342393947745603e+14860
relative error = 1.1827990688469471944453066576618e+14862 %
h = 0.001
x2[1] (analytic) = 1.0025081332493273444407826774069
x2[1] (numeric) = 2.1138336514182483739055472752199e+14858
absolute error = 2.1138336514182483739055472752199e+14858
relative error = 2.1085451392467959296881068930443e+14860 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3940.6MB, alloc=4.7MB, time=342.29
NO POLE
NO POLE
t[1] = 1.248
x1[1] (analytic) = 2.000516741083722263017419169355
x1[1] (numeric) = 1.8919800131906070923176653281172e+14880
absolute error = 1.8919800131906070923176653281172e+14880
relative error = 9.4574565377827404341849475243063e+14881 %
h = 0.001
x2[1] (analytic) = 1.0025128957769528276306697269726
x2[1] (numeric) = -1.6901843471537433875960678559536e+14878
absolute error = 1.6901843471537433875960678559536e+14878
relative error = 1.6859477362072649716014943427195e+14880 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3944.4MB, alloc=4.7MB, time=342.96
memory used=3948.2MB, alloc=4.7MB, time=343.64
NO POLE
NO POLE
t[1] = 1.249
x1[1] (analytic) = 2.0005162246009229806281525787157
x1[1] (numeric) = -1.5127940655486203125946955737679e+14900
absolute error = 1.5127940655486203125946955737679e+14900
relative error = 7.5620184777576752322942662684036e+14901 %
h = 0.001
x2[1] (analytic) = 1.0025176680977941196444776175826
x2[1] (numeric) = 1.3514417870331686821595891988095e+14898
absolute error = 1.3514417870331686821595891988095e+14898
relative error = 1.3480478499670067953689519648997e+14900 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3952.0MB, alloc=4.7MB, time=344.31
NO POLE
NO POLE
t[1] = 1.25
x1[1] (analytic) = 2.000515708634348342180584793768
x1[1] (numeric) = 1.2096036262559420076214280756932e+14920
absolute error = 1.2096036262559420076214280756932e+14920
relative error = 6.0464590257163123545882720438300e+14921 %
h = 0.001
x2[1] (analytic) = 1.0025224502311987517177115008182
x2[1] (numeric) = -1.0805891717167056543105739997718e+14918
absolute error = 1.0805891717167056543105739997718e+14918
relative error = 1.0778702975354850028613040835140e+14920 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3955.9MB, alloc=4.7MB, time=345.00
NO POLE
NO POLE
t[1] = 1.251
x1[1] (analytic) = 2.0005151931834823810570801509575
x1[1] (numeric) = -9.6717786377679318502271504642469e+14939
absolute error = 9.6717786377679318502271504642469e+14939
relative error = 4.8346439310850361885697040569713e+14941 %
h = 0.001
x2[1] (analytic) = 1.002527242196553247239890667831
x2[1] (numeric) = 8.6402016663610651615287825335982e+14937
absolute error = 8.6402016663610651615287825335982e+14937
relative error = 8.6184208295729150484235058114466e+14939 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3959.7MB, alloc=4.7MB, time=345.66
memory used=3963.5MB, alloc=4.7MB, time=346.34
NO POLE
NO POLE
t[1] = 1.252
x1[1] (analytic) = 2.0005146782478096463487232865179
x1[1] (numeric) = 7.7333847210368011400849612149813e+14959
absolute error = 7.7333847210368011400849612149813e+14959
relative error = 3.8656975652936668898254476977740e+14961 %
h = 0.001
x2[1] (analytic) = 1.0025320440132831995586513724313
x2[1] (numeric) = -6.9085538509319867222471922591806e+14957
absolute error = 6.9085538509319867222471922591806e+14957
relative error = 6.8911052690904818557382585005323e+14959 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3967.3MB, alloc=4.7MB, time=347.02
NO POLE
NO POLE
t[1] = 1.253
x1[1] (analytic) = 2.0005141638268152023398681846005
x1[1] (numeric) = -6.1834789115239085872112968399357e+14979
absolute error = 6.1834789115239085872112968399357e+14979
relative error = 3.0909448297508846041493632596139e+14981 %
h = 0.001
x2[1] (analytic) = 1.002536855700853349939871684272
x2[1] (numeric) = 5.5239586012265508632976239270798e+14977
absolute error = 5.5239586012265508632976239270798e+14977
relative error = 5.5099805755917696599697671764555e+14979 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3971.1MB, alloc=4.7MB, time=347.69
memory used=3974.9MB, alloc=4.7MB, time=348.38
NO POLE
NO POLE
t[1] = 1.254
x1[1] (analytic) = 2.0005136499199846279932024187178
x1[1] (numeric) = 4.9442013850999446577408772490608e+14999
absolute error = 4.9442013850999446577408772490608e+14999
relative error = 2.4714659584040828343284318275493e+15001 %
h = 0.001
x2[1] (analytic) = 1.0025416772787676656841304704534
x2[1] (numeric) = -4.4168605017022972237815707245309e+14997
absolute error = 4.4168605017022972237815707245309e+14997
relative error = 4.4056627288464745880778607718528e+14999 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3978.7MB, alloc=4.7MB, time=349.05
NO POLE
NO POLE
t[1] = 1.255
x1[1] (analytic) = 2.0005131365268040164353260715618
x1[1] (numeric) = -3.9532967907219316978774281456429e+15019
absolute error = 3.9532967907219316978774281456429e+15019
relative error = 1.9761413801988113922310408472601e+15021 %
h = 0.001
x2[1] (analytic) = 1.0025465087665694183998132289591
x2[1] (numeric) = 3.5316442609048748880532528378363e+15017
absolute error = 3.5316442609048748880532528378363e+15017
relative error = 3.5226737413407866829269848571932e+15019 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3982.6MB, alloc=4.7MB, time=349.72
NO POLE
NO POLE
t[1] = 1.256
x1[1] (analytic) = 2.0005126236467599744428448187792
x1[1] (numeric) = 3.1609868405909199995604713759449e+15039
absolute error = 3.1609868405909199995604713759449e+15039
relative error = 1.5800884249501594123269230433295e+15041 %
h = 0.001
x2[1] (analytic) = 1.0025513501838412624331781236613
x2[1] (numeric) = -2.8238408663292226554332977460397e+15037
absolute error = 2.8238408663292226554332977460397e+15037
relative error = 2.8166545941127158414513183224183e+15039 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3986.4MB, alloc=4.7MB, time=350.38
memory used=3990.2MB, alloc=4.7MB, time=351.06
NO POLE
NO POLE
t[1] = 1.257
x1[1] (analytic) = 2.0005121112793396219289766627939
x1[1] (numeric) = -2.5274696880434078923108596008274e+15059
absolute error = 2.5274696880434078923108596008274e+15059
relative error = 1.2634113404227659015338910604372e+15061 %
h = 0.001
x2[1] (analytic) = 1.0025562015502053134556961982165
x2[1] (numeric) = 2.2578936748028702774090159555348e+15057
absolute error = 2.2578936748028702774090159555348e+15057
relative error = 2.2521367593274031984149946424645e+15059 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3994.0MB, alloc=4.7MB, time=351.72
NO POLE
NO POLE
t[1] = 1.258
x1[1] (analytic) = 2.000511599424030591430671803285
x1[1] (numeric) = 2.0209204739315014935354383210339e+15079
absolute error = 2.0209204739315014935354383210339e+15079
relative error = 1.0102018276291658807330401991850e+15081 %
h = 0.001
x2[1] (analytic) = 1.0025610628853232272089803750151
x2[1] (numeric) = -1.8053722175010269441869802188366e+15077
absolute error = 1.8053722175010269441869802188366e+15077
relative error = 1.8007603569853902559709414994724e+15079 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3997.8MB, alloc=4.7MB, time=352.38
NO POLE
NO POLE
t[1] = 1.259
x1[1] (analytic) = 2.0005110880803210275962451314402
x1[1] (numeric) = -1.6158925985447395465641836812802e+15099
absolute error = 1.6158925985447395465641836812802e+15099
relative error = 8.0773988615846204641354227294325e+15100 %
h = 0.001
x2[1] (analytic) = 1.0025659342088962784076184754457
x2[1] (numeric) = 1.4435439897359829246621775101900e+15097
absolute error = 1.4435439897359829246621775101900e+15097
relative error = 1.4398494308257672528252361651817e+15099 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4001.6MB, alloc=4.7MB, time=353.05
memory used=4005.4MB, alloc=4.7MB, time=353.75
NO POLE
NO POLE
t[1] = 1.26
x1[1] (analytic) = 2.0005105772476995866735208356153
x1[1] (numeric) = 1.2920394066531554057617619346769e+15119
absolute error = 1.2920394066531554057617619346769e+15119
relative error = 6.4585482393736798164470605295349e+15120 %
h = 0.001
x2[1] (analytic) = 1.0025708155406654398002261290955
x2[1] (numeric) = -1.1542324790991164363657261507659e+15117
absolute error = 1.1542324790991164363657261507659e+15117
relative error = 1.1512727691725826252891747574880e+15119 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4009.3MB, alloc=4.7MB, time=354.41
NO POLE
NO POLE
t[1] = 1.261
x1[1] (analytic) = 2.0005100669256554359984886065469
x1[1] (numeric) = -1.0330920692675094338336751208911e+15139
absolute error = 1.0330920692675094338336751208911e+15139
relative error = 5.1641433169848778979822603428218e+15140 %
h = 0.001
x2[1] (analytic) = 1.0025757069004114613890360721311
x2[1] (numeric) = 9.2290406477391429763144031198120e+15136
absolute error = 9.2290406477391429763144031198120e+15136
relative error = 9.2053304146695112170141564407231e+15138 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4013.1MB, alloc=4.7MB, time=355.10
memory used=4016.9MB, alloc=4.7MB, time=355.77
NO POLE
NO POLE
t[1] = 1.262
x1[1] (analytic) = 2.0005095571136782534844709307727
x1[1] (numeric) = 8.2604231580525842419073424330683e+15158
absolute error = 8.2604231580525842419073424330683e+15158
relative error = 4.1291595577132194600296994210322e+15160 %
h = 0.001
x2[1] (analytic) = 1.0025806083079549498083409689945
x2[1] (numeric) = -7.3793791822684589421320504825905e+15156
absolute error = 7.3793791822684589421320504825905e+15156
relative error = 7.3603849118152821643682789987223e+15158 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4020.7MB, alloc=4.7MB, time=356.44
NO POLE
NO POLE
t[1] = 1.263
x1[1] (analytic) = 2.000509047811258227111800961427
x1[1] (numeric) = -6.6048896105137679012394708265329e+15178
absolute error = 6.6048896105137679012394708265329e+15178
relative error = 3.3016044679928478793383793447483e+15180 %
h = 0.001
x2[1] (analytic) = 1.0025855197831564478621075267095
x2[1] (numeric) = 5.9004222859325168266016488006827e+15176
absolute error = 5.9004222859325168266016488006827e+15176
relative error = 5.8852059694705004258237853656515e+15178 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4024.5MB, alloc=4.7MB, time=357.12
NO POLE
NO POLE
t[1] = 1.264
x1[1] (analytic) = 2.0005085390178860544180104560896
x1[1] (numeric) = 5.2811539956697951001872757626403e+15198
absolute error = 5.2811539956697951001872757626403e+15198
relative error = 2.6399057502961138834104525394463e+15200 %
h = 0.001
x2[1] (analytic) = 1.0025904413459165142210803075194
x2[1] (numeric) = -4.7178742672533061630937670173952e+15196
absolute error = 4.7178742672533061630937670173952e+15196
relative error = 4.7056844676474750022286243945202e+15198 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4028.3MB, alloc=4.7MB, time=357.78
memory used=4032.2MB, alloc=4.7MB, time=358.46
NO POLE
NO POLE
t[1] = 1.265
x1[1] (analytic) = 2.0005080307330529419885272718756
x1[1] (numeric) = -4.2227181937427634161314302495987e+15218
absolute error = 4.2227181937427634161314302495987e+15218
relative error = 2.1108229154148501308289045498772e+15220 %
h = 0.001
x2[1] (analytic) = 1.0025953730161758032796942832859
x2[1] (numeric) = 3.7723295932018465225800811270408e+15216
absolute error = 3.7723295932018465225800811270408e+15216
relative error = 3.7625643352545015406387783321539e+15218 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4036.0MB, alloc=4.7MB, time=359.13
NO POLE
NO POLE
t[1] = 1.266
x1[1] (analytic) = 2.0005075229562506049478819084638
x1[1] (numeric) = 3.3764114733989389319519413493323e+15238
absolute error = 3.3764114733989389319519413493323e+15238
relative error = 1.6877774438005840851320943235524e+15240 %
h = 0.001
x2[1] (analytic) = 1.002600314813915145173115814057
x2[1] (numeric) = -3.0162886405260711386125911234290e+15236
absolute error = 3.0162886405260711386125911234290e+15236
relative error = 3.0084656826443357325487428847238e+15238 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4039.8MB, alloc=4.7MB, time=359.81
NO POLE
NO POLE
memory used=4043.6MB, alloc=4.7MB, time=360.49
t[1] = 1.267
x1[1] (analytic) = 2.0005070156869712664514225902704
x1[1] (numeric) = -2.6997194495698948153649510609241e+15258
absolute error = 2.6997194495698948153649510609241e+15258
relative error = 1.3495176114855138324542434793662e+15260 %
h = 0.001
x2[1] (analytic) = 1.0026052667591556259547323734693
x2[1] (numeric) = 2.4117715428053284366242135919570e+15256
absolute error = 2.4117715428053284366242135919570e+15256
relative error = 2.4055045617316517419187955391459e+15258 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4047.4MB, alloc=4.7MB, time=361.16
NO POLE
NO POLE
t[1] = 1.268
x1[1] (analytic) = 2.0005065089247076571775383794821
x1[1] (numeric) = 2.1586483649307298044504527278379e+15278
absolute error = 2.1586483649307298044504527278379e+15278
relative error = 1.0790509080078049750244851000923e+15280 %
h = 0.001
x2[1] (analytic) = 1.0026102288719586679344119851967
x2[1] (numeric) = -1.9284102643675086718450753180423e+15276
absolute error = 1.9284102643675086718450753180423e+15276
relative error = 1.9233897768399708407054355441683e+15278 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4051.2MB, alloc=4.7MB, time=361.82
NO POLE
NO POLE
t[1] = 1.269
x1[1] (analytic) = 2.0005060026689530148203898121728
x1[1] (numeric) = -1.7260174067940586462436844450883e+15298
absolute error = 1.7260174067940586462436844450883e+15298
relative error = 8.6279041627033938592577229694402e+15299 %
h = 0.001
x2[1] (analytic) = 1.002615201172426110177853977475
x2[1] (numeric) = 1.5419230560255985480988148097925e+15296
absolute error = 1.5419230560255985480988148097925e+15296
relative error = 1.5379011351738165373404184169668e+15298 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4055.0MB, alloc=4.7MB, time=362.49
memory used=4058.9MB, alloc=4.7MB, time=363.17
NO POLE
NO POLE
t[1] = 1.27
x1[1] (analytic) = 2.0005054969192010835831465502343
x1[1] (numeric) = 1.3800932736220270211418771464238e+15318
absolute error = 1.3800932736220270211418771464238e+15318
relative error = 6.8987227265677838486768072936119e+15319 %
h = 0.001
x2[1] (analytic) = 1.0026201836807002891673533068502
x2[1] (numeric) = -1.2328946566166076168789623610873e+15316
absolute error = 1.2328946566166076168789623610873e+15316
relative error = 1.2296726883061051069703031338008e+15318 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4062.7MB, alloc=4.7MB, time=363.83
NO POLE
NO POLE
t[1] = 1.271
x1[1] (analytic) = 2.0005049916749461136717315423574
x1[1] (numeric) = -1.1034983983356890319081018530394e+15338
absolute error = 1.1034983983356890319081018530394e+15338
relative error = 5.5160991995914598553925895653330e+15339 %
h = 0.001
x2[1] (analytic) = 1.0026251764169641196243013476962
x2[1] (numeric) = 9.8580096352651447375299489398083e+15335
absolute error = 9.8580096352651447375299489398083e+15335
relative error = 9.8321983799511840664792178658618e+15337 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4066.5MB, alloc=4.7MB, time=364.52
NO POLE
NO POLE
t[1] = 1.272
x1[1] (analytic) = 2.0005044869356828607890711878095
x1[1] (numeric) = 8.8233798280429192042161570465604e+15357
absolute error = 8.8233798280429192042161570465604e+15357
relative error = 4.4105773746892850249451206154870e+15359 %
h = 0.001
x2[1] (analytic) = 1.0026301794014411754937466907389
x2[1] (numeric) = -7.8822917633262594482571168476710e+15355
absolute error = 7.8822917633262594482571168476710e+15355
relative error = 7.8616143073130893254818865051021e+15357 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4070.3MB, alloc=4.7MB, time=365.19
memory used=4074.1MB, alloc=4.7MB, time=365.89
NO POLE
NO POLE
t[1] = 1.273
x1[1] (analytic) = 2.0005039827009065856298509972572
x1[1] (numeric) = -7.0550198991980563314682083320829e+15377
absolute error = 7.0550198991980563314682083320829e+15377
relative error = 3.5266212715422749192117873077534e+15379 %
h = 0.001
x2[1] (analytic) = 1.0026351926543957710913401418168
x2[1] (numeric) = 6.3025423732536153631964600497217e+15375
absolute error = 6.3025423732536153631964600497217e+15375
relative error = 6.2859776112268141863055497436937e+15377 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4077.9MB, alloc=4.7MB, time=366.55
NO POLE
NO POLE
t[1] = 1.274
x1[1] (analytic) = 2.0005034789701130533757762453899
x1[1] (numeric) = 5.6410702869084786126085838308016e+15397
absolute error = 5.6410702869084786126085838308016e+15397
relative error = 2.8198252820897766508228290252563e+15399 %
h = 0.001
x2[1] (analytic) = 1.0026402161961330424129887613835
x2[1] (numeric) = -5.0394024427604991731797002500450e+15395
absolute error = 5.0394024427604991731797002500450e+15395
relative error = 5.0261323666820766548346280658161e+15397 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4081.7MB, alloc=4.7MB, time=367.22
memory used=4085.6MB, alloc=4.7MB, time=367.91
NO POLE
NO POLE
t[1] = 1.275
x1[1] (analytic) = 2.0005029757427985331913371106061
x1[1] (numeric) = -4.5105009534358468489146848235508e+15417
absolute error = 4.5105009534358468489146848235508e+15417
relative error = 2.2546834511761079928262991285731e+15419 %
h = 0.001
x2[1] (analytic) = 1.0026452500469990286075444358516
x2[1] (numeric) = 4.0294178882275900034328464765097e+15415
absolute error = 4.0294178882275900034328464765097e+15415
relative error = 4.0187871912211332066501200557630e+15417 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4089.4MB, alloc=4.7MB, time=368.65
NO POLE
NO POLE
t[1] = 1.276
x1[1] (analytic) = 2.0005024730184597977200777975254
x1[1] (numeric) = 3.6065175252576598415882255670446e+15437
absolute error = 3.6065175252576598415882255670446e+15437
relative error = 1.8028058319847827604266150373994e+15439 %
h = 0.001
x2[1] (analytic) = 1.0026502942273807536128531237544
x2[1] (numeric) = -3.2218519362931791174295748386998e+15435
absolute error = 3.2218519362931791174295748386998e+15435
relative error = 3.2133356513657277553353885434434e+15437 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4093.2MB, alloc=4.7MB, time=369.39
NO POLE
NO POLE
t[1] = 1.277
x1[1] (analytic) = 2.0005019707965941225813691385973
x1[1] (numeric) = -2.8837082165081143158923216713862e+15457
absolute error = 2.8837082165081143158923216713862e+15457
relative error = 1.4414923147313021692406297448701e+15459 %
h = 0.001
x2[1] (analytic) = 1.0026553487577063079554915728988
x2[1] (numeric) = 2.5761363520332405465942385411015e+15455
absolute error = 2.5761363520332405465942385411015e+15455
relative error = 2.5693139274877284917437932939222e+15457 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4097.0MB, alloc=4.7MB, time=370.05
memory used=4100.8MB, alloc=4.7MB, time=370.74
NO POLE
NO POLE
t[1] = 1.278
x1[1] (analytic) = 2.0005014690766992858676841715786
x1[1] (numeric) = 2.3057625589556249544051299092690e+15477
absolute error = 2.3057625589556249544051299092690e+15477
relative error = 1.1525922847833819557498370682731e+15479 %
h = 0.001
x2[1] (analytic) = 1.002660413658444930714518959179
x2[1] (numeric) = -2.0598334856761189479758361541323e+15475
absolute error = 2.0598334856761189479758361541323e+15475
relative error = 2.0543680169443677252238123778059e+15477 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4104.6MB, alloc=4.7MB, time=371.42
NO POLE
NO POLE
t[1] = 1.279
x1[1] (analytic) = 2.0005009678582735676423761901543
x1[1] (numeric) = -1.8436473384673424384683991696259e+15497
absolute error = 1.8436473384673424384683991696259e+15497
relative error = 9.2159282504179048297664004073986e+15498 %
h = 0.001
x2[1] (analytic) = 1.0026654889501070916495715535289
x2[1] (numeric) = 1.6470067608664693530355219431234e+15495
absolute error = 1.6470067608664693530355219431234e+15495
relative error = 1.6426283531420366447983458921023e+15497 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4108.4MB, alloc=4.7MB, time=372.09
NO POLE
NO POLE
memory used=4112.3MB, alloc=4.7MB, time=372.76
t[1] = 1.28
x1[1] (analytic) = 2.0005004671408157494379587654808
x1[1] (numeric) = 1.4741481057690862256987881749634e+15517
absolute error = 1.4741481057690862256987881749634e+15517
relative error = 7.3688965835433646824764319973571e+15518 %
h = 0.001
x2[1] (analytic) = 1.0026705746532445734936291806118
x2[1] (numeric) = -1.3169177456348935523621014624715e+15515
absolute error = 1.3169177456348935523621014624715e+15515
relative error = 1.3134101856836934318897931871765e+15517 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4116.1MB, alloc=4.7MB, time=373.44
NO POLE
NO POLE
t[1] = 1.281
x1[1] (analytic) = 2.0004999669238251137548872369318
x1[1] (numeric) = -1.1787029940059648753354394968286e+15537
absolute error = 1.1787029940059648753354394968286e+15537
relative error = 5.8920420569586914603506431878299e+15538 %
h = 0.001
x2[1] (analytic) = 1.002675670788450554410782891284
x2[1] (numeric) = 1.0529843531763716165520217572665e+15535
absolute error = 1.0529843531763716165520217572665e+15535
relative error = 1.0501744321255556179144132849888e+15537 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4119.9MB, alloc=4.7MB, time=374.11
NO POLE
NO POLE
t[1] = 1.282
x1[1] (analytic) = 2.0004994672068014435608411708265
x1[1] (numeric) = 9.4247025969875989764841043470073e+15556
absolute error = 9.4247025969875989764841043470073e+15556
relative error = 4.7111747598447729230416266250549e+15558 %
h = 0.001
x2[1] (analytic) = 1.0026807773763596906193339306225
x2[1] (numeric) = -8.4194783744805144279934799549424e+15554
absolute error = 8.4194783744805144279934799549424e+15554
relative error = 8.3969679727092585516318996574032e+15556 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4123.7MB, alloc=4.7MB, time=374.79
memory used=4127.5MB, alloc=4.7MB, time=375.47
NO POLE
NO POLE
t[1] = 1.283
x1[1] (analytic) = 2.000498967989245021790507286425
x1[1] (numeric) = -7.5358270483204770584473519826814e+15576
absolute error = 7.5358270483204770584473519826814e+15576
relative error = 3.7669737245078102828444773737141e+15578 %
h = 0.001
x2[1] (analytic) = 1.0026858944376481991805547443803
x2[1] (numeric) = 6.7320673744590380907871296871163e+15574
absolute error = 6.7320673744590380907871296871163e+15574
relative error = 6.7140341873809716918618266438281e+15576 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4131.3MB, alloc=4.7MB, time=376.14
NO POLE
NO POLE
t[1] = 1.284
x1[1] (analytic) = 2.0004984692706566308458623489714
x1[1] (numeric) = 6.0255152582055779676012162758111e+15596
absolute error = 6.0255152582055779676012162758111e+15596
relative error = 3.0120069326533227749872812904705e+15598 %
h = 0.001
x2[1] (analytic) = 1.002691021993033940953443429134
x2[1] (numeric) = -5.3828431071957134061284653319887e+15594
absolute error = 5.3828431071957134061284653319887e+15594
relative error = 5.3683966337868635808576733775079e+15596 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4135.1MB, alloc=4.7MB, time=376.81
NO POLE
NO POLE
t[1] = 1.285
x1[1] (analytic) = 2.0004979710505375520969555300697
x1[1] (numeric) = -4.8178964158897463663968888206104e+15616
absolute error = 4.8178964158897463663968888206104e+15616
relative error = 2.4083485640126321954542349199710e+15618 %
h = 0.001
x2[1] (analytic) = 1.0026961600632765037158036951094
x2[1] (numeric) = 4.3040270254295720331038247350495e+15614
absolute error = 4.3040270254295720331038247350495e+15614
relative error = 4.2924538826975866338666290454301e+15616 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4139.0MB, alloc=4.7MB, time=377.49
memory used=4142.8MB, alloc=4.7MB, time=378.16
NO POLE
NO POLE
t[1] = 1.286
x1[1] (analytic) = 2.0004974733283895653831897361724
x1[1] (numeric) = 3.8523055505722718622932098292669e+15636
absolute error = 3.8523055505722718622932098292669e+15636
relative error = 1.9256737896113806705383069386282e+15638 %
h = 0.001
x2[1] (analytic) = 1.0027013086691772854519830757256
x2[1] (numeric) = -3.4414245904482381890050062715807e+15634
absolute error = 3.4414245904482381890050062715807e+15634
relative error = 3.4321532850254536323758010454760e+15636 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4146.6MB, alloc=4.7MB, time=378.83
NO POLE
NO POLE
t[1] = 1.287
x1[1] (analytic) = 2.0004969761037149485151014064657
x1[1] (numeric) = -3.0802360146278291956821753049658e+15656
absolute error = 3.0802360146278291956821753049658e+15656
relative error = 1.5397354014636289146744983819011e+15658 %
h = 0.001
x2[1] (analytic) = 1.0027064678315795778076027842803
x2[1] (numeric) = 2.7517027987434092345377452508162e+15654
absolute error = 2.7517027987434092345377452508162e+15654
relative error = 2.7442755053671412776445094359670e+15656 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4150.4MB, alloc=4.7MB, time=379.50
memory used=4154.2MB, alloc=4.7MB, time=380.17
NO POLE
NO POLE
t[1] = 1.288
x1[1] (analytic) = 2.0004964793760164767766382819286
x1[1] (numeric) = 2.4629027425929084092525451796959e+15676
absolute error = 2.4629027425929084092525451796959e+15676
relative error = 1.2311457520590703929775668777919e+15678 %
h = 0.001
x2[1] (analytic) = 1.0027116375713686497116132859188
x2[1] (numeric) = -2.2002133400302377984304317169527e+15674
absolute error = 2.2002133400302377984304317169527e+15674
relative error = 2.1942632932428055020753012323788e+15676 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4158.0MB, alloc=4.7MB, time=380.83
NO POLE
NO POLE
t[1] = 1.289
x1[1] (analytic) = 2.0004959831447974224279346478457
x1[1] (numeric) = -1.9692938757501618731750163767334e+15696
absolute error = 1.9692938757501618731750163767334e+15696
relative error = 9.8440281427329558553651857087452e+15697 %
h = 0.001
x2[1] (analytic) = 1.002716817909471831166010322078
x2[1] (numeric) = 1.7592520325442393972104987003646e+15694
absolute error = 1.7592520325442393972104987003646e+15694
relative error = 1.7544854151464623674933216453457e+15696 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4161.9MB, alloc=4.7MB, time=381.50
NO POLE
NO POLE
t[1] = 1.29
x1[1] (analytic) = 2.0004954874095615542085835525468
x1[1] (numeric) = 1.5746128752872584096103017170071e+15716
absolute error = 1.5746128752872584096103017170071e+15716
relative error = 7.8711143574046354579608598086957e+15717 %
h = 0.001
x2[1] (analytic) = 1.0027220088668585972035467949987
x2[1] (numeric) = -1.4066670980044612578351457615416e+15714
absolute error = 1.4066670980044612578351457615416e+15714
relative error = 1.4028485318618736723850852484505e+15716 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4165.7MB, alloc=4.7MB, time=382.17
memory used=4169.5MB, alloc=4.7MB, time=382.84
NO POLE
NO POLE
t[1] = 1.291
x1[1] (analytic) = 2.0004949921698131368414055056484
x1[1] (numeric) = -1.2590328632774165076942799968987e+15736
absolute error = 1.2590328632774165076942799968987e+15736
relative error = 6.2936066733754802549842657421751e+15737 %
h = 0.001
x2[1] (analytic) = 1.0027272104645406520137765916255
x2[1] (numeric) = 1.1247463626611069509314209474807e+15734
absolute error = 1.1247463626611069509314209474807e+15734
relative error = 1.1216872853585349579128345751236e+15736 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4173.3MB, alloc=4.7MB, time=383.53
NO POLE
NO POLE
t[1] = 1.292
x1[1] (analytic) = 2.0004944974250569305367131595618
x1[1] (numeric) = 1.0067006155550116095364057429430e+15756
absolute error = 1.0067006155550116095364057429430e+15756
relative error = 5.0322588582512454626410293558825e+15757 %
h = 0.001
x2[1] (analytic) = 1.0027324227235720132377670992996
x2[1] (numeric) = -8.9932748275269475917202868328390e+15753
absolute error = 8.9932748275269475917202868328390e+15753
relative error = 8.9687683610547478761474754342684e+15755 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4177.1MB, alloc=4.7MB, time=384.21
NO POLE
NO POLE
t[1] = 1.293
x1[1] (analytic) = 2.0004940031747981904970714785365
x1[1] (numeric) = -8.0494017187185652613850238333536e+15775
absolute error = 8.0494017187185652613850238333536e+15775
relative error = 4.0237069973437098872217606696894e+15777 %
h = 0.001
x2[1] (analytic) = 1.0027376456650490964318178400745
x2[1] (numeric) = 7.1908649637304219922870317787952e+15773
absolute error = 7.1908649637304219922870317787952e+15773
relative error = 7.1712326696991616236780175405792e+15775 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4180.9MB, alloc=4.7MB, time=384.89
memory used=4184.7MB, alloc=4.7MB, time=385.56
NO POLE
NO POLE
t[1] = 1.294
x1[1] (analytic) = 2.0004935094185426664225528999963
x1[1] (numeric) = 6.4361605653323211764893427611593e+15795
absolute error = 6.4361605653323211764893427611593e+15795
relative error = 3.2172864020953689318425703339027e+15797 %
h = 0.001
x2[1] (analytic) = 1.002742879310110799700523326261
x2[1] (numeric) = -5.7496896201074961429244095335372e+15793
absolute error = 5.7496896201074961429244095335372e+15793
relative error = 5.7339620542240047010461471846929e+15795 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4188.6MB, alloc=4.7MB, time=386.23
NO POLE
NO POLE
t[1] = 1.295
x1[1] (analytic) = 2.0004930161557966020164869934241
x1[1] (numeric) = -5.1462412077668595205986325520455e+15815
absolute error = 5.1462412077668595205986325520455e+15815
relative error = 2.5724864651894765078193645933395e+15817 %
h = 0.001
x2[1] (analytic) = 1.0027481236799385884995189169393
x2[1] (numeric) = 4.5973510689348036067858376325207e+15813
absolute error = 4.5973510689348036067858376325207e+15813
relative error = 4.5847516044838850047013852528170e+15815 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4192.4MB, alloc=4.7MB, time=386.89
memory used=4196.2MB, alloc=4.7MB, time=387.57
NO POLE
NO POLE
t[1] = 1.296
x1[1] (analytic) = 2.0004925233860667344917041225451
x1[1] (numeric) = 4.1148442926004371805119089922654e+15835
absolute error = 4.1148442926004371805119089922654e+15835
relative error = 2.0569156067804660767918062923044e+15837 %
h = 0.001
x2[1] (analytic) = 1.0027533787957565806082491336593
x2[1] (numeric) = -3.6759613557437261591950887485590e+15833
absolute error = 3.6759613557437261591950887485590e+15833
relative error = 3.6658678329843409487449240665730e+15835 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4200.0MB, alloc=4.7MB, time=388.24
NO POLE
NO POLE
t[1] = 1.297
x1[1] (analytic) = 2.0004920311088602940772726170519
x1[1] (numeric) = -3.2901573923103724729215457225315e+15855
absolute error = 3.2901573923103724729215457225315e+15855
relative error = 1.6446740807493537917671930271402e+15857 %
h = 0.001
x2[1] (analytic) = 1.0027586446788316312730985733938
x2[1] (numeric) = 2.9392342865066676376661574384236e+15853
absolute error = 2.9392342865066676376661574384236e+15853
relative error = 2.9311482898739404559525065913490e+15855 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4203.8MB, alloc=4.7MB, time=388.93
NO POLE
NO POLE
t[1] = 1.298
x1[1] (analytic) = 2.000491539323685003525728960609
x1[1] (numeric) = 2.6307521977541182751426520430511e+15875
absolute error = 2.6307521977541182751426520430511e+15875
relative error = 1.3150528987708232306437653149760e+15877 %
h = 0.001
x2[1] (analytic) = 1.0027639213504734185212262380139
x2[1] (numeric) = -2.3501602315480500850435165395422e+15873
absolute error = 2.3501602315480500850435165395422e+15873
relative error = 2.3436824775097305033797524920248e+15875 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4207.6MB, alloc=4.7MB, time=389.60
memory used=4211.4MB, alloc=4.7MB, time=390.28
NO POLE
NO POLE
t[1] = 1.299
x1[1] (analytic) = 2.0004910480300490776208005023656
x1[1] (numeric) = -2.1035033588858942613561346562147e+15895
absolute error = 2.1035033588858942613561346562147e+15895
relative error = 1.0514935125339775332902329485382e+15897 %
h = 0.001
x2[1] (analytic) = 1.0027692088320345286454447821229
x2[1] (numeric) = 1.8791469394957518706521163530977e+15893
absolute error = 1.8791469394957518706521163530977e+15893
relative error = 1.8739575596706540233034117742454e+15895 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4215.3MB, alloc=4.7MB, time=390.95
NO POLE
NO POLE
t[1] = 1.3
x1[1] (analytic) = 2.0004905572274612226856201997016
x1[1] (numeric) = 1.6819244262616762625944797230096e+15915
absolute error = 1.6819244262616762625944797230096e+15915
relative error = 8.4075599366622597673921257601547e+15916 %
h = 0.001
x2[1] (analytic) = 1.0027745071449105418604868650168
x2[1] (numeric) = -1.5025329646950304566884095992554e+15913
absolute error = 1.5025329646950304566884095992554e+15913
relative error = 1.4983757105802651009731256976754e+15915 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4219.1MB, alloc=4.7MB, time=391.62
NO POLE
NO POLE
memory used=4222.9MB, alloc=4.7MB, time=392.29
t[1] = 1.301
x1[1] (analytic) = 2.0004900669154306360914329004187
x1[1] (numeric) = -1.3448372990257357249856989698075e+15935
absolute error = 1.3448372990257357249856989698075e+15935
relative error = 6.7225392480920916854112602018275e+15936 %
h = 0.001
x2[1] (analytic) = 1.0027798163105401181310014778455
x2[1] (numeric) = 1.2013990298177751092661556954259e+15933
absolute error = 1.2013990298177751092661556954259e+15933
relative error = 1.1980686191291735560348936285591e+15935 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4226.7MB, alloc=4.7MB, time=392.96
NO POLE
NO POLE
t[1] = 1.302
x1[1] (analytic) = 2.0004895770934670057667926730853
x1[1] (numeric) = 1.0753083388358220201699921198186e+15955
absolute error = 1.0753083388358220201699921198186e+15955
relative error = 5.3752259004425764781005112748242e+15956 %
h = 0.001
x2[1] (analytic) = 1.0027851363504050831716238037209
x2[1] (numeric) = -9.6061761223325333204523638805180e+15952
absolute error = 9.6061761223325333204523638805180e+15952
relative error = 9.5794959200271086346188461948148e+15954 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4230.5MB, alloc=4.7MB, time=393.63
NO POLE
NO POLE
t[1] = 1.303
x1[1] (analytic) = 2.0004890877610805097072506947315
x1[1] (numeric) = -8.5979770520011990101698279434263e+15974
absolute error = 8.5979770520011990101698279434263e+15974
relative error = 4.2979374916880626569026490622280e+15976 %
h = 0.001
x2[1] (analytic) = 1.0027904672860305146194628565668
x2[1] (numeric) = 7.6809300992417375807432221679389e+15972
absolute error = 7.6809300992417375807432221679389e+15972
relative error = 7.6595563577997902267303560224790e+15974 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4234.3MB, alloc=4.7MB, time=394.32
memory used=4238.1MB, alloc=4.7MB, time=395.01
NO POLE
NO POLE
t[1] = 1.304
x1[1] (analytic) = 2.0004885989177818154855332055813
x1[1] (numeric) = 6.8747917891880240598467770281269e+15994
absolute error = 6.8747917891880240598467770281269e+15994
relative error = 3.4365563457383000479549597894750e+15996 %
h = 0.001
x2[1] (analytic) = 1.0027958091389848283793518339332
x2[1] (numeric) = -6.1415371150942784048483866497648e+15992
absolute error = 6.1415371150942784048483866497648e+15992
relative error = 6.1244144212843212207542820747074e+15994 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4242.0MB, alloc=4.7MB, time=395.67
NO POLE
NO POLE
t[1] = 1.305
x1[1] (analytic) = 2.0004881105630820797622090410016
x1[1] (numeric) = -5.4969630482657029231595870371503e+16014
absolute error = 5.4969630482657029231595870371503e+16014
relative error = 2.7478109063684761631541738197797e+16016 %
h = 0.001
x2[1] (analytic) = 1.0028011619308798651422068098018
x2[1] (numeric) = 4.9106654596172050754136731823180e+16012
absolute error = 4.9106654596172050754136731823180e+16012
relative error = 4.8969483144213616331032140823584e+16014 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4245.8MB, alloc=4.7MB, time=396.35
NO POLE
NO POLE
t[1] = 1.306
x1[1] (analytic) = 2.0004876226964929477968462513335
x1[1] (numeric) = 4.3952753305954923216039401725121e+16034
absolute error = 4.3952753305954923216039401725121e+16034
relative error = 2.1971019869000850444340275269671e+16036 %
h = 0.001
x2[1] (analytic) = 1.0028065256833709770768400855997
x2[1] (numeric) = -3.9264820523529920093507588752133e+16032
absolute error = 3.9264820523529920093507588752133e+16032
relative error = 3.9154931203476738944844057129859e+16034 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4249.6MB, alloc=4.7MB, time=397.01
memory used=4253.4MB, alloc=4.7MB, time=397.69
NO POLE
NO POLE
t[1] = 1.307
x1[1] (analytic) = 2.0004871353175265529596573207649
x1[1] (numeric) = -3.5143851363229196510373660624756e+16054
absolute error = 3.5143851363229196510373660624756e+16054
relative error = 1.7567646771020600533658835543530e+16056 %
h = 0.001
x2[1] (analytic) = 1.002811900418157114695575211212
x2[1] (numeric) = 3.1395462456634068187774604488809e+16052
absolute error = 3.1395462456634068187774604488809e+16052
relative error = 3.1307429083702181808569846559293e+16054 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4257.2MB, alloc=4.7MB, time=398.35
NO POLE
NO POLE
t[1] = 1.308
x1[1] (analytic) = 2.0004866484256955162436324968867
x1[1] (numeric) = 2.8100407727436062204543417140034e+16074
absolute error = 2.8100407727436062204543417140034e+16074
relative error = 1.4046785940585997058852582878000e+16076 %
h = 0.001
x2[1] (analytic) = 1.0028172861569809138940113827466
x2[1] (numeric) = -2.5103261640410187012539105225379e+16072
absolute error = 2.5103261640410187012539105225379e+16072
relative error = 2.5032737256266766267909826632842e+16074 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4261.0MB, alloc=4.7MB, time=399.02
memory used=4264.9MB, alloc=4.7MB, time=399.69
NO POLE
NO POLE
t[1] = 1.309
x1[1] (analytic) = 2.0004861620205129457771607430686
x1[1] (numeric) = -2.2468593617896318518611115683744e+16094
absolute error = 2.2468593617896318518611115683744e+16094
relative error = 1.1231566628385368456935358953531e+16096 %
h = 0.001
x2[1] (analytic) = 1.0028226829216287831652856201577
x2[1] (numeric) = 2.0072128125436473280439685906542e+16092
absolute error = 2.0072128125436473280439685906542e+16092
relative error = 2.0015630347488981346153130836091e+16094 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4268.7MB, alloc=4.7MB, time=400.36
NO POLE
NO POLE
t[1] = 1.31
x1[1] (analytic) = 2.0004856761014924363371378262734
x1[1] (numeric) = 1.7965493741689333993172226226896e+16114
absolute error = 1.7965493741689333993172226226896e+16114
relative error = 8.9805660476910480339302769746581e+16115 %
h = 0.001
x2[1] (analytic) = 1.0028280907339309909891818255845
x2[1] (numeric) = -1.6049321926971505979449153965186e+16112
absolute error = 1.6049321926971505979449153965186e+16112
relative error = 1.6004060990379347707470711714366e+16114 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4272.5MB, alloc=4.7MB, time=401.05
NO POLE
NO POLE
t[1] = 1.311
x1[1] (analytic) = 2.0004851906681480688625610534194
x1[1] (numeric) = -1.4364893988095450169343283994159e+16134
absolute error = 1.4364893988095450169343283994159e+16134
relative error = 7.1807049885221474687300496978547e+16135 %
h = 0.001
x2[1] (analytic) = 1.0028335096157617533964365224015
x2[1] (numeric) = 1.2832756581956464496659351563007e+16132
absolute error = 1.2832756581956464496659351563007e+16132
relative error = 1.2796497583006942289573746948740e+16134 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4276.3MB, alloc=4.7MB, time=401.71
memory used=4280.1MB, alloc=4.7MB, time=402.39
NO POLE
NO POLE
t[1] = 1.312
x1[1] (analytic) = 2.000484705719994409968610169884
x1[1] (numeric) = 1.1485917518113101208060320401780e+16154
absolute error = 1.1485917518113101208060320401780e+16154
relative error = 5.7415672738068771520353394824292e+16155 %
h = 0.001
x2[1] (analytic) = 1.0028389395890393217085917755241
x2[1] (numeric) = -1.0260847295672750977750582274214e+16152
absolute error = 1.0260847295672750977750582274214e+16152
relative error = 1.0231799834056721389076146773440e+16154 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4283.9MB, alloc=4.7MB, time=403.06
NO POLE
NO POLE
t[1] = 1.313
x1[1] (analytic) = 2.0004842212565465114612139342311
x1[1] (numeric) = -9.1839383807655019740104212962611e+16173
absolute error = 9.1839383807655019740104212962611e+16173
relative error = 4.5908576949419154892490416653269e+16175 %
h = 0.001
x2[1] (analytic) = 1.0028443806757260704537464954586
x2[1] (numeric) = 8.2043936976994542305741460277411e+16171
absolute error = 8.2043936976994542305741460277411e+16171
relative error = 8.1811234682007748974072231752959e+16173 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4287.7MB, alloc=4.7MB, time=403.74
NO POLE
NO POLE
t[1] = 1.314
x1[1] (analytic) = 2.0004837372773199098521018837272
x1[1] (numeric) = 7.3433161999193743805679949571981e+16193
absolute error = 7.3433161999193743805679949571981e+16193
relative error = 3.6707702557550942510632443314625e+16195 %
h = 0.001
x2[1] (analytic) = 1.0028498328978285854585580319335
x2[1] (numeric) = -6.5600894358146879515312634798234e+16191
absolute error = 6.5600894358146879515312634798234e+16191
relative error = 6.5414474038039121714909357934106e+16193 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4291.6MB, alloc=4.7MB, time=404.42
memory used=4295.4MB, alloc=4.7MB, time=405.09
NO POLE
NO POLE
t[1] = 1.315
x1[1] (analytic) = 2.000483253781830625874340805699
x1[1] (numeric) = -5.8715869571746418619911639995796e+16213
absolute error = 5.8715869571746418619911639995796e+16213
relative error = 2.9350842832973733871027000026728e+16215 %
h = 0.001
x2[1] (analytic) = 1.0028552962773977521168466677132
x2[1] (numeric) = 5.2453325610099133230833156970677e+16211
absolute error = 5.2453325610099133230833156970677e+16211
relative error = 5.2303982244303894197616917089138e+16213 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4299.2MB, alloc=4.7MB, time=405.77
NO POLE
NO POLE
t[1] = 1.316
x1[1] (analytic) = 2.0004827707695951639983554302688
x1[1] (numeric) = 4.6948180436574271743804194511081e+16233
absolute error = 4.6948180436574271743804194511081e+16233
relative error = 2.3468425283419504352455787479746e+16235 %
h = 0.001
x2[1] (analytic) = 1.0028607708365288438351563293586
x2[1] (numeric) = -4.1940760022845561840797860935197e+16231
absolute error = 4.1940760022845561840797860935197e+16231
relative error = 4.1821119384160364747814540528599e+16233 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4303.0MB, alloc=4.7MB, time=406.43
memory used=4306.8MB, alloc=4.7MB, time=407.13
NO POLE
NO POLE
t[1] = 1.317
x1[1] (analytic) = 2.0004822882401305119484328604875
x1[1] (numeric) = -3.7538942408267504246340877204628e+16253
absolute error = 3.7538942408267504246340877204628e+16253
relative error = 1.8764946147706891429976633882380e+16255 %
h = 0.001
x2[1] (analytic) = 1.0028662565973616106556255392876
x2[1] (numeric) = 3.3535096790035464264073063732179e+16251
absolute error = 3.3535096790035464264073063732179e+16251
relative error = 3.3439251315342032247241253744308e+16253 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4310.6MB, alloc=4.7MB, time=407.80
NO POLE
NO POLE
t[1] = 1.318
x1[1] (analytic) = 2.0004818061929541402197102563714
x1[1] (numeric) = 3.0015480558079949548088453135440e+16273
absolute error = 3.0015480558079949548088453135440e+16273
relative error = 1.5004125738689593144158381638729e+16275 %
h = 0.001
x2[1] (analytic) = 1.0028717535820803680565233424832
x2[1] (numeric) = -2.6814075760774584751443205981302e+16271
absolute error = 2.6814075760774584751443205981302e+16271
relative error = 2.6737292844273909359787503126382e+16273 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4314.4MB, alloc=4.7MB, time=408.46
NO POLE
NO POLE
t[1] = 1.319
x1[1] (analytic) = 2.0004813246275840015956452898278
x1[1] (numeric) = -2.3999852295627182048977877353507e+16293
absolute error = 2.3999852295627182048977877353507e+16293
relative error = 1.1997038912670215141116525825413e+16295 %
h = 0.001
x2[1] (analytic) = 1.0028772618129140859308056516203
x2[1] (numeric) = 2.1440065117635188131061370764987e+16291
absolute error = 2.1440065117635188131061370764987e+16291
relative error = 2.1378553422257981495188798337880e+16293 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4318.3MB, alloc=4.7MB, time=409.12
memory used=4322.1MB, alloc=4.7MB, time=409.80
NO POLE
NO POLE
t[1] = 1.32
x1[1] (analytic) = 2.0004808435435385306659688879425
x1[1] (numeric) = 1.9189861348292430006471007105984e+16313
absolute error = 1.9189861348292430006471007105984e+16313
relative error = 9.5926243983924364107186096423599e+16314 %
h = 0.001
x2[1] (analytic) = 1.0028827813121364777430481662166
x2[1] (numeric) = -1.7143100375694559808647784671024e+16311
absolute error = 1.7143100375694559808647784671024e+16311
relative error = 1.7093822623283183305399417468779e+16313 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4325.9MB, alloc=4.7MB, time=410.47
NO POLE
NO POLE
t[1] = 1.321
x1[1] (analytic) = 2.0004803629403366433451197825801
x1[1] (numeric) = -1.5343876871849904671452110998581e+16333
absolute error = 1.5343876871849904671452110998581e+16333
relative error = 7.6700962209382748926584690640761e+16334 %
h = 0.001
x2[1] (analytic) = 1.0028883121020660898651127346853
x2[1] (numeric) = 1.3707322663372311482203942554197e+16331
absolute error = 1.3707322663372311482203942554197e+16331
relative error = 1.3667845659345253112167807308846e+16333 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4329.7MB, alloc=4.7MB, time=411.13
NO POLE
NO POLE
memory used=4333.5MB, alloc=4.7MB, time=411.80
t[1] = 1.322
x1[1] (analytic) = 2.0004798828174977363911603847327
x1[1] (numeric) = 1.2268695077332597375813251933447e+16353
absolute error = 1.2268695077332597375813251933447e+16353
relative error = 6.1328760077573152629704826643281e+16354 %
h = 0.001
x2[1] (analytic) = 1.0028938542050663910909047428545
x2[1] (numeric) = -1.0960135009428697318098411945600e+16351
absolute error = 1.0960135009428697318098411945600e+16351
relative error = 1.0928509496267814715011794126514e+16353 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4337.3MB, alloc=4.7MB, time=412.49
NO POLE
NO POLE
t[1] = 1.323
x1[1] (analytic) = 2.0004794031745416869251735025316
x1[1] (numeric) = -9.8098336005754098898582085689573e+16372
absolute error = 9.8098336005754098898582085689573e+16372
relative error = 4.9037413656987812534075808957628e+16374 %
h = 0.001
x2[1] (analytic) = 1.0028994076435458623305798286455
x2[1] (numeric) = 8.7635319000618923052807277044032e+16370
absolute error = 8.7635319000618923052807277044032e+16370
relative error = 8.7381963068988655087953495179582e+16372 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4341.1MB, alloc=4.7MB, time=413.17
NO POLE
NO POLE
t[1] = 1.324
x1[1] (analytic) = 2.00047892401098885195113942232
x1[1] (numeric) = 7.8437710501727463281032681871355e+16392
absolute error = 7.8437710501727463281032681871355e+16392
relative error = 3.9209466073483409647392990340327e+16394 %
h = 0.001
x2[1] (analytic) = 1.0029049724399580864845589401583
x2[1] (numeric) = -7.0071665446943808608159842189992e+16390
absolute error = 7.0071665446943808608159842189992e+16390
relative error = 6.9868698802506793812009298265281e+16392 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4345.0MB, alloc=4.7MB, time=413.86
memory used=4348.8MB, alloc=4.7MB, time=414.53
NO POLE
NO POLE
t[1] = 1.325
x1[1] (analytic) = 2.0004784453263600678762928726634
x1[1] (numeric) = -6.2717418860111190353852182407417e+16412
absolute error = 6.2717418860111190353852182407417e+16412
relative error = 3.1351209510222644508470093271877e+16414 %
h = 0.001
x2[1] (analytic) = 1.0029105486168018384977114734055
x2[1] (numeric) = 5.6028075831774421831593196651350e+16410
absolute error = 5.6028075831774421831593196651350e+16410
relative error = 5.5865476645995444379145409611035e+16412 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4352.6MB, alloc=4.7MB, time=415.20
NO POLE
NO POLE
t[1] = 1.326
x1[1] (analytic) = 2.0004779671201766500319593916534
x1[1] (numeric) = 5.0147749128756154201430003755211e+16432
absolute error = 5.0147749128756154201430003755211e+16432
relative error = 2.5067883752275078123212841500450e+16434 %
h = 0.001
x2[1] (analytic) = 1.0029161361966211755940669463684
x2[1] (numeric) = -4.4799067660064865715534749572601e+16430
absolute error = 4.4799067660064865715534749572601e+16430
relative error = 4.4668807334137888778680173012998e+16432 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4356.4MB, alloc=4.7MB, time=415.86
NO POLE
NO POLE
t[1] = 1.327
x1[1] (analytic) = 2.0004774893919603921948706183434
x1[1] (numeric) = -4.0097261468776669520040018852622e+16452
absolute error = 4.0097261468776669520040018852622e+16452
relative error = 2.0043845372618574877997589722050e+16454 %
h = 0.001
x2[1] (analytic) = 1.0029217352020055276924163879259
x2[1] (numeric) = 3.5820549490883862782867702032140e+16450
absolute error = 3.5820549490883862782867702032140e+16450
relative error = 3.5716196223097103103120087998064e+16452 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4360.2MB, alloc=4.7MB, time=416.53
memory used=4364.0MB, alloc=4.7MB, time=417.20
NO POLE
NO POLE
t[1] = 1.328
x1[1] (analytic) = 2.0004770121412335661089580296296
x1[1] (numeric) = 3.2061067649664242885567931209069e+16472
absolute error = 3.2061067649664242885567931209069e+16472
relative error = 1.6026711356881482269008258885188e+16474 %
h = 0.001
x2[1] (analytic) = 1.0029273456555897880031653435225
x2[1] (numeric) = -2.8641483692587237894299695128950e+16470
absolute error = 2.8641483692587237894299695128950e+16470
relative error = 2.8557884892314886670009162260657e+16472 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4367.8MB, alloc=4.7MB, time=417.88
NO POLE
NO POLE
t[1] = 1.329
x1[1] (analytic) = 2.0004765353675189210076246443713
x1[1] (numeric) = -2.5635467889416132453339840452503e+16492
absolute error = 2.5635467889416132453339840452503e+16492
relative error = 1.2814680620438517094957556560623e+16494 %
h = 0.001
x2[1] (analytic) = 1.0029329675800544038068011242133
x2[1] (numeric) = 2.2901228478404872634915883971805e+16490
absolute error = 2.2901228478404872634915883971805e+16490
relative error = 2.2834256344830832232921674171431e+16492 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4371.7MB, alloc=4.7MB, time=418.54
memory used=4375.5MB, alloc=4.7MB, time=419.22
NO POLE
NO POLE
t[1] = 1.33
x1[1] (analytic) = 2.0004760590703396831364942170239
x1[1] (numeric) = 2.0497670916338553543177146184093e+16512
absolute error = 2.0497670916338553543177146184093e+16512
relative error = 1.0246396513170081011776749031946e+16514 %
h = 0.001
x2[1] (analytic) = 1.0029386009981254674143376519395
x2[1] (numeric) = -1.8311420995129542313891449635304e+16510
absolute error = 1.8311420995129542313891449635304e+16510
relative error = 1.8257768697810612133630482972699e+16512 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4379.3MB, alloc=4.7MB, time=419.89
NO POLE
NO POLE
t[1] = 1.331
x1[1] (analytic) = 2.0004755832492195552766374435306
x1[1] (numeric) = -1.6389578485828086840837102240502e+16532
absolute error = 1.6389578485828086840837102240502e+16532
relative error = 8.1928410539296598037630608853550e+16533 %
h = 0.001
x2[1] (analytic) = 1.0029442459325748073101019815605
x2[1] (numeric) = 1.4641491358293546060850398639453e+16530
absolute error = 1.4641491358293546060850398639453e+16530
relative error = 1.4598509755324777439411649740928e+16532 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4383.1MB, alloc=4.7MB, time=420.56
NO POLE
NO POLE
t[1] = 1.332
x1[1] (analytic) = 2.0004751079036827162682747027022
x1[1] (numeric) = 1.3104819764132571978034362007905e+16552
absolute error = 1.3104819764132571978034362007905e+16552
relative error = 6.5508537008817069533000198160332e+16553 %
h = 0.001
x2[1] (analytic) = 1.0029499024062200794772273092971
x2[1] (numeric) = -1.1707079928532221819930041211329e+16550
absolute error = 1.1707079928532221819930041211329e+16550
relative error = 1.1672646759768623343927732104507e+16552 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4386.9MB, alloc=4.7MB, time=421.22
memory used=4390.7MB, alloc=4.7MB, time=421.90
NO POLE
NO POLE
t[1] = 1.333
x1[1] (analytic) = 2.0004746330332538205349548567858
x1[1] (numeric) = -1.0478384248801665709351201381950e+16572
absolute error = 1.0478384248801665709351201381950e+16572
relative error = 5.2379490725726607556141087485073e+16573 %
h = 0.001
x2[1] (analytic) = 1.0029555704419248589062180078294
x2[1] (numeric) = 9.3607759687272557308880618636391e+16569
absolute error = 9.3607759687272557308880618636391e+16569
relative error = 9.3331910650864490301449328454044e+16571 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4394.6MB, alloc=4.7MB, time=422.57
NO POLE
NO POLE
t[1] = 1.334
x1[1] (analytic) = 2.0004741586374579976082096354011
x1[1] (numeric) = 8.3783324335405271036853536754915e+16591
absolute error = 8.3783324335405271036853536754915e+16591
relative error = 4.1881732875005439316447618196263e+16593 %
h = 0.001
x2[1] (analytic) = 1.0029612500625987312869529603405
x2[1] (numeric) = -7.4847124365441648231371707761080e+16589
absolute error = 7.4847124365441648231371707761080e+16589
relative error = 7.4626137710475002588435531339843e+16591 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4398.4MB, alloc=4.7MB, time=423.24
NO POLE
NO POLE
t[1] = 1.335
x1[1] (analytic) = 2.0004736847158208516526831274998
x1[1] (numeric) = -6.6991678010801115173440869075211e+16611
absolute error = 6.6991678010801115173440869075211e+16611
relative error = 3.3487907650391152358228908155230e+16613 %
h = 0.001
x2[1] (analytic) = 1.0029669412911973848844941993161
x2[1] (numeric) = 5.9846449103060641933614327140457e+16609
absolute error = 5.9846449103060641933614327140457e+16609
relative error = 5.9669413456455156259734524635227e+16611 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4402.2MB, alloc=4.7MB, time=423.92
memory used=4406.0MB, alloc=4.7MB, time=424.62
NO POLE
NO POLE
t[1] = 1.336
x1[1] (analytic) = 2.0004732112678684609917359064769
x1[1] (numeric) = 5.3565371848182409147043731490629e+16631
absolute error = 5.3565371848182409147043731490629e+16631
relative error = 2.6776350488709378348510078948912e+16633 %
h = 0.001
x2[1] (analytic) = 1.0029726441507227025990685908914
x2[1] (numeric) = -4.7852172018767899477426166313906e+16629
absolute error = 4.7852172018767899477426166313906e+16629
relative error = 4.7710346137393620843023876842061e+16631 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4409.8MB, alloc=4.7MB, time=425.29
NO POLE
NO POLE
t[1] = 1.337
x1[1] (analytic) = 2.0004727382931273776335233140374
x1[1] (numeric) = -4.2829932708528983654182202494495e+16651
absolute error = 4.2829932708528983654182202494495e+16651
relative error = 2.1409905713123071881179241311499e+16653 %
h = 0.001
x2[1] (analytic) = 1.0029783586642228542105910419931
x2[1] (numeric) = 3.8261758236824914084732362056709e+16649
absolute error = 3.8261758236824914084732362056709e+16649
relative error = 3.8148139395332843316187376960266e+16651 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4413.6MB, alloc=4.7MB, time=425.96
memory used=4417.4MB, alloc=4.7MB, time=426.64
NO POLE
NO POLE
t[1] = 1.338
x1[1] (analytic) = 2.0004722657911246267975474288979
x1[1] (numeric) = 3.4246063688613527547069066625663e+16671
absolute error = 3.4246063688613527547069066625663e+16671
relative error = 1.7118989487749920580589390512509e+16673 %
h = 0.001
x2[1] (analytic) = 1.0029840848547923888080984454541
x2[1] (numeric) = -3.0593431428756561196913876286653e+16669
absolute error = 3.0593431428756561196913876286653e+16669
relative error = 3.0502409650085069134271990917640e+16671 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4421.3MB, alloc=4.7MB, time=427.31
NO POLE
NO POLE
t[1] = 1.339
x1[1] (analytic) = 2.0004717937613877064416822468742
x1[1] (numeric) = -2.7382552434667463909459981263898e+16691
absolute error = 2.7382552434667463909459981263898e+16691
relative error = 1.3688047249684741247614851741932e+16693 %
h = 0.001
x2[1] (analytic) = 1.0029898227455723274044643176817
x2[1] (numeric) = 2.4461971684438163632525433401722e+16689
absolute error = 2.4461971684438163632525433401722e+16689
relative error = 2.4389052739813705525430847145049e+16691 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4425.1MB, alloc=4.7MB, time=427.97
NO POLE
NO POLE
t[1] = 1.34
x1[1] (analytic) = 2.0004713222034445867896715993799
x1[1] (numeric) = 2.1894609104713410282891481367884e+16711
absolute error = 2.1894609104713410282891481367884e+16711
relative error = 1.0944725306332966849408356083211e+16713 %
h = 0.001
x2[1] (analytic) = 1.0029955723597502557367648243525
x2[1] (numeric) = -1.9559363913908475243374153550889e+16709
absolute error = 1.9559363913908475243374153550889e+16709
relative error = 1.9500947414843626471937162296545e+16711 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4428.9MB, alloc=4.7MB, time=428.64
memory used=4432.7MB, alloc=4.7MB, time=429.31
NO POLE
NO POLE
t[1] = 1.341
x1[1] (analytic) = 2.0004708511168237098590993378345
x1[1] (numeric) = -1.7506545782828185777903234308260e+16731
absolute error = 1.7506545782828185777903234308260e+16731
relative error = 8.7512126322933543471226067366106e+16732 %
h = 0.001
x2[1] (analytic) = 1.0030013337205604172526676319688
x2[1] (numeric) = 1.5639324648555687701603924507263e+16729
absolute error = 1.5639324648555687701603924507263e+16729
relative error = 1.5592526273661822206003966588495e+16731 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4436.5MB, alloc=4.7MB, time=429.98
NO POLE
NO POLE
t[1] = 1.342
x1[1] (analytic) = 2.0004703805010539889898313119506
x1[1] (numeric) = 1.3997927242294604921510848760206e+16751
absolute error = 1.3997927242294604921510848760206e+16751
relative error = 6.9973179201926353267816435874510e+16752 %
h = 0.001
x2[1] (analytic) = 1.003007106851283806283215766975
x2[1] (numeric) = -1.2504929942481257077882246374120e+16749
absolute error = 1.2504929942481257077882246374120e+16749
relative error = 1.2467439021182695522523996359173e+16751 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4440.3MB, alloc=4.7MB, time=430.67
NO POLE
NO POLE
memory used=4444.1MB, alloc=4.7MB, time=431.34
t[1] = 1.343
x1[1] (analytic) = 2.0004699103556648083729286703431
x1[1] (numeric) = -1.1192497338496605541394177500137e+16771
absolute error = 1.1192497338496605541394177500137e+16771
relative error = 5.5949341105094074487332263743972e+16772 %
h = 0.001
x2[1] (analytic) = 1.0030128917752482614023794094686
x2[1] (numeric) = 9.9987228592256107327552271935168e+16768
absolute error = 9.9987228592256107327552271935168e+16768
relative error = 9.9686882802958935001300599322983e+16770 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4448.0MB, alloc=4.7MB, time=432.02
NO POLE
NO POLE
t[1] = 1.344
x1[1] (analytic) = 2.0004694406801860225800320123714
x1[1] (numeric) = 8.9493247467200318178253913364197e+16790
absolute error = 8.9493247467200318178253913364197e+16790
relative error = 4.4736123255535177000965017611687e+16792 %
h = 0.001
x2[1] (analytic) = 1.0030186885158285589737492953855
x2[1] (numeric) = -7.9948035914996585150827985663914e+16788
absolute error = 7.9948035914996585150827985663914e+16788
relative error = 7.9707424029452599266232070313518e+16790 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4451.8MB, alloc=4.7MB, time=432.68
NO POLE
NO POLE
t[1] = 1.345
x1[1] (analytic) = 2.0004689714741479560932159206023
x1[1] (numeric) = -7.1557232492505945350622632027710e+16810
absolute error = 7.1557232492505945350622632027710e+16810
relative error = 3.5770228637825527438791070914019e+16812 %
h = 0.001
x2[1] (analytic) = 1.003024497096446506884746149361
x2[1] (numeric) = 6.3925048595262421161448419091429e+16808
absolute error = 6.3925048595262421161448419091429e+16808
relative error = 6.3732290467792696762086967627743e+16810 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4455.6MB, alloc=4.7MB, time=433.37
memory used=4459.4MB, alloc=4.7MB, time=434.05
NO POLE
NO POLE
t[1] = 1.346
x1[1] (analytic) = 2.0004685027370814028353134037439
x1[1] (numeric) = 5.7215909209945836924265053847781e+16830
absolute error = 5.7215909209945836924265053847781e+16830
relative error = 2.8601254721912329300442933248853e+16832 %
h = 0.001
x2[1] (analytic) = 1.0030303175405710384687213203071
x2[1] (numeric) = -5.1113348703793939718793677855276e+16828
absolute error = 5.1113348703793939718793677855276e+16828
relative error = 5.0958926973537350861007781518633e+16830 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4463.2MB, alloc=4.7MB, time=434.71
NO POLE
NO POLE
t[1] = 1.347
x1[1] (analytic) = 2.0004680344685176257007097803791
x1[1] (numeric) = -4.5748838414951404668698071563250e+16850
absolute error = 4.5748838414951404668698071563250e+16850
relative error = 2.2869067451560609882908787757166e+16852 %
h = 0.001
x2[1] (analytic) = 1.0030361498717183066153245430666
x2[1] (numeric) = 4.0869337968860853213465436543365e+16848
absolute error = 4.0869337968860853213465436543365e+16848
relative error = 4.0745628135225007980693793163908e+16850 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4467.0MB, alloc=4.7MB, time=435.38
NO POLE
NO POLE
t[1] = 1.348
x1[1] (analytic) = 2.0004675666679883560866055342886
x1[1] (numeric) = 3.6579969543742126543528739262872e+16870
absolute error = 3.6579969543742126543528739262872e+16870
relative error = 1.8285709877651415650334900409843e+16872 %
h = 0.001
x2[1] (analytic) = 1.0030419941134517780695155023491
x2[1] (numeric) = -3.2678406490103268591732255750282e+16868
absolute error = 3.2678406490103268591732255750282e+16868
relative error = 3.2579300449914252570594285020183e+16870 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4470.8MB, alloc=4.7MB, time=436.05
memory used=4474.7MB, alloc=4.7MB, time=436.75
NO POLE
NO POLE
t[1] = 1.349
x1[1] (analytic) = 2.0004670993350257934247476726296
x1[1] (numeric) = -2.9248702659602224393747200439435e+16890
absolute error = 2.9248702659602224393747200439435e+16890
relative error = 1.4620936614915971434190546856117e+16892 %
h = 0.001
x2[1] (analytic) = 1.003047850289382327919596629484
x2[1] (numeric) = 2.6129081208657226630150530054390e+16888
absolute error = 2.6129081208657226630150530054390e+16888
relative error = 2.6049685666659778943107025022136e+16890 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4478.5MB, alloc=4.7MB, time=437.42
NO POLE
NO POLE
t[1] = 1.35
x1[1] (analytic) = 2.0004666324691626047136291186993
x1[1] (numeric) = 2.3386750124185752843800480052369e+16910
absolute error = 2.3386750124185752843800480052369e+16910
relative error = 1.1690647444251366167284702721351e+16912 %
h = 0.001
x2[1] (analytic) = 1.0030537184231683342746453183871
x2[1] (numeric) = -2.0892355476861156797455994212227e+16908
absolute error = 2.0892355476861156797455994212227e+16908
relative error = 2.0828750338221755349505856385425e+16910 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4482.3MB, alloc=4.7MB, time=438.09
memory used=4486.1MB, alloc=4.7MB, time=438.76
NO POLE
NO POLE
t[1] = 1.351
x1[1] (analytic) = 2.0004661660699319240511556714831
x1[1] (numeric) = -1.8699635595343037513967020180205e+16930
absolute error = 1.8699635595343037513967020180205e+16930
relative error = 9.3476390215985982998379628153445e+16931 %
h = 0.001
x2[1] (analytic) = 1.0030595985385157731317245044926
x2[1] (numeric) = 1.6705161344399282083868131691989e+16928
absolute error = 1.6705161344399282083868131691989e+16928
relative error = 1.6654206159573311194167329636584e+16930 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4489.9MB, alloc=4.7MB, time=439.43
NO POLE
NO POLE
t[1] = 1.352
x1[1] (analytic) = 2.0004657001368673521677800646554
x1[1] (numeric) = 1.4951900949974121291750321987152e+16950
absolute error = 1.4951900949974121291750321987152e+16950
relative error = 7.4742101046527045903265624477486e+16951 %
h = 0.001
x2[1] (analytic) = 1.0030654906591783134332513092882
x2[1] (numeric) = -1.3357154287915554964685391469487e+16948
absolute error = 1.3357154287915554964685391469487e+16948
relative error = 1.3316333192898219347049334604118e+16950 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4493.7MB, alloc=4.7MB, time=440.10
NO POLE
NO POLE
t[1] = 1.353
x1[1] (analytic) = 2.0004652346695029559601026581653
x1[1] (numeric) = -1.1955277998760163641124425022184e+16970
absolute error = 1.1955277998760163641124425022184e+16970
relative error = 5.9762488203076901812207899926930e+16971 %
h = 0.001
x2[1] (analytic) = 1.0030713948089574123149042134864
x2[1] (numeric) = 1.0680146512382975823919119634210e+16968
absolute error = 1.0680146512382975823919119634210e+16968
relative error = 1.0647444008127747556258458133928e+16970 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4497.6MB, alloc=4.7MB, time=440.76
memory used=4501.4MB, alloc=4.7MB, time=441.15
NO POLE
NO POLE
t[1] = 1.354
x1[1] (analytic) = 2.0004647696673732680249382960094
x1[1] (numeric) = 9.5592307965286650629317715045462e+16989
absolute error = 9.5592307965286650629317715045462e+16989
relative error = 4.7785049461871420744433648098475e+16991 %
h = 0.001
x2[1] (analytic) = 1.003077311011702410544449983788
x2[1] (numeric) = -8.5396580040378263605404681081779e+16987
absolute error = 8.5396580040378263605404681081779e+16987
relative error = 8.5134594415506606579020890508969e+16989 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4505.2MB, alloc=4.7MB, time=441.42
NO POLE
NO POLE
t[1] = 1.355
x1[1] (analytic) = 2.0004643051300132861938488642576
x1[1] (numeric) = -7.6433934393477603288076787739725e+17009
absolute error = 7.6433934393477603288076787739725e+17009
relative error = 3.8208097088995568469452317079673e+17011 %
h = 0.001
x2[1] (analytic) = 1.0030832392913106281518723416396
x2[1] (numeric) = 6.8281609003560354748098287977207e+17007
absolute error = 6.8281609003560354748098287977207e+17007
relative error = 6.8071727578463044209866502042952e+17009 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4509.0MB, alloc=4.7MB, time=441.70
NO POLE
NO POLE
t[1] = 1.356
x1[1] (analytic) = 2.0004638410569584730681410838651
x1[1] (numeric) = 6.1115234595946286448309260235480e+17029
absolute error = 6.1115234595946286448309260235480e+17029
relative error = 3.0550532002445814162571793284534e+17031 %
h = 0.001
x2[1] (analytic) = 1.0030891796717274602511851273605
x2[1] (numeric) = -5.4596778066645893838532564999418e+17027
absolute error = 5.4596778066645893838532564999418e+17027
relative error = 5.4428638223884860509966494107977e+17029 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4512.8MB, alloc=4.7MB, time=441.99
memory used=4516.6MB, alloc=4.7MB, time=442.28
NO POLE
NO POLE
t[1] = 1.357
x1[1] (analytic) = 2.0004633774477447555543290732672
x1[1] (numeric) = -4.8866670666063183353097678754909e+17049
absolute error = 4.8866670666063183353097678754909e+17049
relative error = 2.4427675716017779245187790193370e+17051 %
h = 0.001
x2[1] (analytic) = 1.0030951321769464730543134795211
x2[1] (numeric) = 4.3654627047572358565602218980274e+17047
absolute error = 4.3654627047572358565602218980274e+17047
relative error = 4.3519927120802397587545536136426e+17049 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4520.4MB, alloc=4.7MB, time=442.56
NO POLE
NO POLE
t[1] = 1.358
x1[1] (analytic) = 2.0004629143019085244000612162208
x1[1] (numeric) = 3.9072933578232071191643453234472e+17069
absolute error = 3.9072933578232071191643453234472e+17069
relative error = 1.9531945980546785683623458760930e+17071 %
h = 0.001
x2[1] (analytic) = 1.0031010968310095000774273174941
x2[1] (numeric) = -3.4905474831066579966889903144861e+17067
absolute error = 3.4905474831066579966889903144861e+17067
relative error = 3.4797564214952740441138797972909e+17069 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4524.3MB, alloc=4.7MB, time=442.84
memory used=4528.1MB, alloc=4.7MB, time=443.13
NO POLE
NO POLE
t[1] = 1.359
x1[1] (analytic) = 2.0004624516189866337305108708192
x1[1] (numeric) = -3.1242033017591894853427007644355e+17089
absolute error = 3.1242033017591894853427007644355e+17089
relative error = 1.5617405361599026424838400723837e+17091 %
h = 0.001
x2[1] (analytic) = 1.0031070736580067385401121846779
x2[1] (numeric) = 2.7909806029369743311573110527927e+17087
absolute error = 2.7909806029369743311573110527927e+17087
relative error = 2.7823356810346991782759434081801e+17089 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4531.9MB, alloc=4.7MB, time=443.41
NO POLE
NO POLE
t[1] = 1.36
x1[1] (analytic) = 2.0004619893985164005852304560691
x1[1] (numeric) = 2.4980582149482567984537181924254e+17109
absolute error = 2.4980582149482567984537181924254e+17109
relative error = 1.2487406550020747069330335197129e+17111 %
h = 0.001
x2[1] (analytic) = 1.0031130626820768459577632810076
x2[1] (numeric) = -2.2316191840019202910248780400573e+17107
absolute error = 2.2316191840019202910248780400573e+17107
relative error = 2.2246935734593278730700389707618e+17109 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4535.7MB, alloc=4.7MB, time=443.68
NO POLE
NO POLE
t[1] = 1.361
x1[1] (analytic) = 2.0004615276400356044554684528867
x1[1] (numeric) = -1.9974035754192628238223210558582e+17129
absolute error = 1.9974035754192628238223210558582e+17129
relative error = 9.9847137664057939802742535660953e+17130 %
h = 0.001
x2[1] (analytic) = 1.0031190639274070369275892860332
x2[1] (numeric) = 1.7843635950621679335323218343853e+17127
absolute error = 1.7843635950621679335323218343853e+17127
relative error = 1.7788153562509678422393988632564e+17129 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4539.5MB, alloc=4.7MB, time=443.96
memory used=4543.3MB, alloc=4.7MB, time=444.25
NO POLE
NO POLE
t[1] = 1.362
x1[1] (analytic) = 2.0004610663430824868219488568277
x1[1] (numeric) = 1.5970888985788881002026113433372e+17149
absolute error = 1.5970888985788881002026113433372e+17149
relative error = 7.9836040073422985005924835248129e+17150 %
h = 0.001
x2[1] (analytic) = 1.0031250774182331801086133480496
x2[1] (numeric) = -1.4267458633661058599640406759615e+17147
absolute error = 1.4267458633661058599640406759615e+17147
relative error = 1.4223010624339644173310047929037e+17149 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4547.1MB, alloc=4.7MB, time=444.52
NO POLE
NO POLE
t[1] = 1.363
x1[1] (analytic) = 2.0004606055071957506931126203314
x1[1] (numeric) = -1.2770042976560335296798531381628e+17169
absolute error = 1.2770042976560335296798531381628e+17169
relative error = 6.3835513388291019024656478675843e+17170 %
h = 0.001
x2[1] (analytic) = 1.0031311031788398953960593905228
x2[1] (numeric) = 1.1408009916058467731526315442238e+17167
absolute error = 1.1408009916058467731526315442238e+17167
relative error = 1.1372401752779296079365314691318e+17169 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4551.0MB, alloc=4.7MB, time=444.80
NO POLE
NO POLE
memory used=4554.8MB, alloc=4.7MB, time=445.09
t[1] = 1.364
x1[1] (analytic) = 2.00046014513191456014382062272
x1[1] (numeric) = 1.0210702595722971830762075898607e+17189
absolute error = 1.0210702595722971830762075898607e+17189
relative error = 5.1041769667696411773774369053983e+17190 %
h = 0.001
x2[1] (analytic) = 1.0031371412335606512905126643663
x2[1] (numeric) = -9.1216448273306436592818490649685e+17186
absolute error = 9.1216448273306436592818490649685e+17186
relative error = 9.0931184305604820551434238228798e+17188 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4558.6MB, alloc=4.7MB, time=445.37
NO POLE
NO POLE
t[1] = 1.365
x1[1] (analytic) = 2.0004596852167785398545177066568
x1[1] (numeric) = -8.1642988743007570822436609085866e+17208
absolute error = 8.1642988743007570822436609085866e+17208
relative error = 4.0812114008766130340307347954090e+17210 %
h = 0.001
x2[1] (analytic) = 1.0031431916067778624622442534882
x2[1] (numeric) = 7.2935073661572940332529155754164e+17206
absolute error = 7.2935073661572940332529155754164e+17206
relative error = 7.2706543065651152432668251167090e+17208 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4562.4MB, alloc=4.7MB, time=445.65
NO POLE
NO POLE
t[1] = 1.366
x1[1] (analytic) = 2.0004592257613277746508573202265
x1[1] (numeric) = 6.5280303176031372072218769026726e+17228
absolute error = 6.5280303176031372072218769026726e+17228
relative error = 3.2632658709245734631840744397630e+17230 %
h = 0.001
x2[1] (analytic) = 1.0031492543229229875110900214548
x2[1] (numeric) = -5.8317606864942751451532945638448e+17226
absolute error = 5.8317606864942751451532945638448e+17226
relative error = 5.8134526456189515833261763232821e+17228 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4566.2MB, alloc=4.7MB, time=445.93
memory used=4570.0MB, alloc=4.7MB, time=446.21
NO POLE
NO POLE
t[1] = 1.367
x1[1] (analytic) = 2.0004587667651028090437863042617
x1[1] (numeric) = -5.2196986518570529122878757062297e+17248
absolute error = 5.2196986518570529122878757062297e+17248
relative error = 2.6092508071524568431098390530775e+17250 %
h = 0.001
x2[1] (analytic) = 1.003155329406476626922275269106
x2[1] (numeric) = 4.6629736554936278900528469389987e+17246
absolute error = 4.6629736554936278900528469389987e+17246
relative error = 4.6483067166203528735686449730886e+17248 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4573.8MB, alloc=4.7MB, time=446.49
NO POLE
NO POLE
t[1] = 1.368
x1[1] (analytic) = 2.0004583082276446467700893650029
x1[1] (numeric) = 4.1735795777066539826438095157571e+17268
absolute error = 4.1735795777066539826438095157571e+17268
relative error = 2.0863117019441108453245697119723e+17270 %
h = 0.001
x2[1] (analytic) = 1.0031614168819686212185771565075
x2[1] (numeric) = -3.7284320260573764287949195672000e+17266
absolute error = 3.7284320260573764287949195672000e+17266
relative error = 3.7166820446963636910116422639124e+17268 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4577.7MB, alloc=4.7MB, time=446.77
NO POLE
NO POLE
t[1] = 1.369
x1[1] (analytic) = 2.0004578501484947503333927726324
x1[1] (numeric) = -3.3371210970680925684220447310686e+17288
absolute error = 3.3371210970680925684220447310686e+17288
relative error = 1.6681786606103081825509212609357e+17290 %
h = 0.001
x2[1] (analytic) = 1.0031675167739781493092177277503
x2[1] (numeric) = 2.9811889150505429804601651715577e+17286
absolute error = 2.9811889150505429804601651715577e+17286
relative error = 2.9717757654649310567823788646643e+17288 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4581.5MB, alloc=4.7MB, time=447.05
memory used=4585.3MB, alloc=4.7MB, time=447.34
NO POLE
NO POLE
t[1] = 1.37
x1[1] (analytic) = 2.0004573925271950405456268266899
x1[1] (numeric) = 2.6683035531375426724102946702083e+17308
absolute error = 2.6683035531375426724102946702083e+17308
relative error = 1.3338467308052244139383212587180e+17310 %
h = 0.001
x2[1] (analytic) = 1.0031736291071338270358811637969
x2[1] (numeric) = -2.3837064173644840936243101740082e+17306
absolute error = 2.3837064173644840936243101740082e+17306
relative error = 2.3761653498468473058567252071583e+17308 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4589.1MB, alloc=4.7MB, time=447.62
NO POLE
NO POLE
t[1] = 1.371
x1[1] (analytic) = 2.0004569353632878960689466298291
x1[1] (numeric) = -2.1335287646413981957440430563331e+17328
absolute error = 2.1335287646413981957440430563331e+17328
relative error = 1.0665207168051053937944290046397e+17330 %
h = 0.001
x2[1] (analytic) = 1.0031797539061138059162496768448
x2[1] (numeric) = 1.9059698818477227017229633645167e+17326
absolute error = 1.9059698818477227017229633645167e+17326
relative error = 1.8999285765351478223760143120309e+17328 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4592.9MB, alloc=4.7MB, time=447.90
memory used=4596.7MB, alloc=4.7MB, time=448.19
NO POLE
NO POLE
t[1] = 1.372
x1[1] (analytic) = 2.0004564786563161529581107118378
x1[1] (numeric) = 1.7059322145712453054863082967704e+17348
absolute error = 1.7059322145712453054863082967704e+17348
relative error = 8.5277147129794123623599052259993e+17349 %
h = 0.001
x2[1] (analytic) = 1.0031858911956458720854532495221
x2[1] (numeric) = -1.5239801193836176693278826030463e+17346
absolute error = 1.5239801193836176693278826030463e+17346
relative error = 1.5191403036652198488676117098767e+17348 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4600.5MB, alloc=4.7MB, time=448.47
NO POLE
NO POLE
t[1] = 1.373
x1[1] (analytic) = 2.0004560224058231042033170462996
x1[1] (numeric) = -1.3640335058717139958730412507691e+17368
absolute error = 1.3640335058717139958730412507691e+17368
relative error = 6.8186128092497448274922291365188e+17369 %
h = 0.001
x2[1] (analytic) = 1.0031920410005075454358292136571
x2[1] (numeric) = 1.2185477988901729825388742412209e+17366
absolute error = 1.2185477988901729825388742412209e+17366
relative error = 1.2146705207857171207960302752226e+17368 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4604.4MB, alloc=4.7MB, time=448.75
NO POLE
NO POLE
t[1] = 1.374
x1[1] (analytic) = 2.0004555666113524992734960027328
x1[1] (numeric) = 1.0906572894564299279713337941473e+17388
absolute error = 1.0906572894564299279713337941473e+17388
relative error = 5.4520445625489980067113041817725e+17389 %
h = 0.001
x2[1] (analytic) = 1.0031982033455261789553884563728
x2[1] (numeric) = -9.7432946748717754154716452243790e+17385
absolute error = 9.7432946748717754154716452243790e+17385
relative error = 9.7122329788662357334380958261596e+17387 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4608.2MB, alloc=4.7MB, time=449.03
memory used=4612.0MB, alloc=4.7MB, time=449.32
NO POLE
NO POLE
t[1] = 1.375
x1[1] (analytic) = 2.0004551112724485436600597774997
x1[1] (numeric) = -8.7207045715805254654328511965784e+17407
absolute error = 8.7207045715805254654328511965784e+17407
relative error = 4.3593602887862171596928918594871e+17409 %
h = 0.001
x2[1] (analytic) = 1.0032043782555790582653858358591
x2[1] (numeric) = 7.7905676911358356932375538876368e+17405
absolute error = 7.7905676911358356932375538876368e+17405
relative error = 7.7656835037766248828663726684688e+17407 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4615.8MB, alloc=4.7MB, time=449.60
NO POLE
NO POLE
t[1] = 1.376
x1[1] (analytic) = 2.0004546563886558984211078472363
x1[1] (numeric) = 6.9729225633001725410128796238485e+17427
absolute error = 6.9729225633001725410128796238485e+17427
relative error = 3.4856688908351076199783927414754e+17429 %
h = 0.001
x2[1] (analytic) = 1.0032105657555935013573931853633
x2[1] (numeric) = -6.2292014124029644592586861505409e+17425
absolute error = 6.2292014124029644592586861505409e+17425
relative error = 6.2092661551179769565655794942172e+17427 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4619.6MB, alloc=4.7MB, time=449.88
NO POLE
NO POLE
memory used=4623.4MB, alloc=4.7MB, time=450.16
t[1] = 1.377
x1[1] (analytic) = 2.0004542019595196797260879890068
x1[1] (numeric) = -5.5754266957088932624983492377172e+17447
absolute error = 5.5754266957088932624983492377172e+17447
relative error = 2.7870803991651267853847603854143e+17449 %
h = 0.001
x2[1] (analytic) = 1.0032167658705469585302740817163
x2[1] (numeric) = 4.9807602956114950306203504088113e+17445
absolute error = 4.9807602956114950306203504088113e+17445
relative error = 4.9647897294553410218385464986679e+17447 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4627.3MB, alloc=4.7MB, time=450.44
NO POLE
NO POLE
t[1] = 1.378
x1[1] (analytic) = 2.0004537479845854584009124118441
x1[1] (numeric) = 4.4580134881795064942791153235230e+17467
absolute error = 4.4580134881795064942791153235230e+17467
relative error = 2.2285011551358586162315869544243e+17469 %
h = 0.001
x2[1] (analytic) = 1.003222978625467112527460354104
x2[1] (numeric) = -3.9825286549484089562872074536350e+17465
absolute error = 3.9825286549484089562872074536350e+17465
relative error = 3.9697342861952178240473132790644e+17467 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4631.1MB, alloc=4.7MB, time=450.73
NO POLE
NO POLE
t[1] = 1.379
x1[1] (analytic) = 2.000453294463399259473528544793
x1[1] (numeric) = -3.5645494677719058034976861609275e+17487
absolute error = 3.5645494677719058034976861609275e+17487
relative error = 1.7818708777842569106514791856469e+17489 %
h = 0.001
x2[1] (analytic) = 1.003229204045431978874931109758
x2[1] (numeric) = 3.1843601269990374053489868917917e+17485
absolute error = 3.1843601269990374053489868917917e+17485
relative error = 3.1741102772510909623462412676583e+17487 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4634.9MB, alloc=4.7MB, time=451.01
memory used=4638.7MB, alloc=4.7MB, time=451.29
NO POLE
NO POLE
t[1] = 1.38
x1[1] (analytic) = 2.0004528413955075617199440270268
x1[1] (numeric) = 2.8501512931450682644641760924579e+17507
absolute error = 2.8501512931450682644641760924579e+17507
relative error = 1.4247530529921488203791179048698e+17509 %
h = 0.001
x2[1] (analytic) = 1.0032354421555700064202958558358
x2[1] (numeric) = -2.5461585582873061864836733848317e+17505
absolute error = 2.5461585582873061864836733848317e+17505
relative error = 2.5379471770022233005032389626590e+17507 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4642.5MB, alloc=4.7MB, time=451.57
NO POLE
NO POLE
t[1] = 1.381
x1[1] (analytic) = 2.0004523887804572972107054460608
x1[1] (numeric) = -2.2789310310495362143489134149750e+17527
absolute error = 2.2789310310495362143489134149750e+17527
relative error = 1.1392078331036155347695289507443e+17529 %
h = 0.001
x2[1] (analytic) = 1.0032416929810601780733841009407
x2[1] (numeric) = 2.0358637670951007001534534090697e+17525
absolute error = 2.0358637670951007001534534090697e+17525
relative error = 2.0292854467059464654369555127809e+17527 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4646.3MB, alloc=4.7MB, time=451.85
NO POLE
NO POLE
t[1] = 1.382
x1[1] (analytic) = 2.0004519366177958508578303705439
x1[1] (numeric) = 1.8221933189201264519625297828160e+17547
absolute error = 1.8221933189201264519625297828160e+17547
relative error = 9.1089082700029533649204834457275e+17548 %
h = 0.001
x2[1] (analytic) = 1.0032479565471321117487446255385
x2[1] (numeric) = -1.6278409939083478084654845788916e+17545
absolute error = 1.6278409939083478084654845788916e+17545
relative error = 1.6225709539552624176647380793935e+17547 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4650.1MB, alloc=4.7MB, time=452.13
memory used=4654.0MB, alloc=4.7MB, time=452.42
NO POLE
NO POLE
t[1] = 1.383
x1[1] (analytic) = 2.0004514849070710599621922245578
x1[1] (numeric) = -1.4569938476760210959914059453506e+17567
absolute error = 1.4569938476760210959914059453506e+17567
relative error = 7.2833250827060385519925319593248e+17568 %
h = 0.001
x2[1] (analytic) = 1.0032542328790661615104584179323
x2[1] (numeric) = 1.3015931342152204177864111824676e+17565
absolute error = 1.3015931342152204177864111824676e+17565
relative error = 1.2973711862445902037721075088553e+17567 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4657.8MB, alloc=4.7MB, time=452.70
NO POLE
NO POLE
t[1] = 1.384
x1[1] (analytic) = 2.0004510336478312137613575508104
x1[1] (numeric) = 1.1649867498272987517114813995340e+17587
absolute error = 1.1649867498272987517114813995340e+17587
relative error = 5.8236204247546130407384985055878e+17588 %
h = 0.001
x2[1] (analytic) = 1.0032605220021935189196700814953
x2[1] (numeric) = -1.0407310624170127484144757639577e+17585
absolute error = 1.0407310624170127484144757639577e+17585
relative error = 1.0373487639482113542931364232480e+17587 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4661.6MB, alloc=4.7MB, time=452.99
memory used=4665.4MB, alloc=4.7MB, time=453.27
NO POLE
NO POLE
t[1] = 1.385
x1[1] (analytic) = 2.0004505828396250529778752105596
x1[1] (numeric) = -9.3150299120203319229870816286564e+17606
absolute error = 9.3150299120203319229870816286564e+17606
relative error = 4.6564658941975535888953000047443e+17608 %
h = 0.001
x2[1] (analytic) = 1.003266823941896314585243329497
x2[1] (numeric) = 8.3215032087019932413456597804533e+17604
absolute error = 8.3215032087019932413456597804533e+17604
relative error = 8.2944068418472181505987443351599e+17606 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4669.2MB, alloc=4.7MB, time=453.55
NO POLE
NO POLE
t[1] = 1.386
x1[1] (analytic) = 2.0004501324820017693680170685574
x1[1] (numeric) = 7.4481346912054179390030540608546e+17626
absolute error = 7.4481346912054179390030540608546e+17626
relative error = 3.7232293723634870363071273196637e+17628 %
h = 0.001
x2[1] (analytic) = 1.0032731387236077199179469961431
x2[1] (numeric) = -6.6537281487127050560947683288379e+17624
absolute error = 6.6537281487127050560947683288379e+17624
relative error = 6.6320206251886350544882452151183e+17626 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4673.0MB, alloc=4.7MB, time=453.84
NO POLE
NO POLE
t[1] = 1.387
x1[1] (analytic) = 2.0004496825745110052709697117545
x1[1] (numeric) = -5.9553979860818016172052092623879e+17646
absolute error = 5.9553979860818016172052092623879e+17646
relative error = 2.9770296338658246388881114842124e+17648 %
h = 0.001
x2[1] (analytic) = 1.0032794663728120490885788063318
x2[1] (numeric) = 5.3202044350202759345575521607424e+17644
absolute error = 5.3202044350202759345575521607424e+17644
relative error = 5.3028140347121616145394498950230e+17646 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4676.8MB, alloc=4.7MB, time=454.12
memory used=4680.7MB, alloc=4.7MB, time=454.40
NO POLE
NO POLE
t[1] = 1.388
x1[1] (analytic) = 2.0004492331167028531584767509566
x1[1] (numeric) = 4.7618318737583384123216972177342e+17666
absolute error = 4.7618318737583384123216972177342e+17666
relative error = 2.3803812638321230155544305482717e+17668 %
h = 0.001
x2[1] (analytic) = 1.0032858069150448611904349621665
x2[1] (numeric) = -4.2539422407700097872381897536628e+17664
absolute error = 4.2539422407700097872381897536628e+17664
relative error = 4.2400103853260434472363278609877e+17666 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4684.5MB, alloc=4.7MB, time=454.68
NO POLE
NO POLE
t[1] = 1.389
x1[1] (analytic) = 2.0004487841081278551849312550764
x1[1] (numeric) = -3.8074773250980157703833502694077e+17686
absolute error = 3.8074773250980157703833502694077e+17686
relative error = 1.9033115745552697799425564153170e+17688 %
h = 0.001
x2[1] (analytic) = 1.0032921603758930626065344214163
x2[1] (numeric) = 3.4013776742657081386677730688448e+17684
absolute error = 3.4013776742657081386677730688448e+17684
relative error = 3.3902165377145469385576884324392e+17686 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4688.3MB, alloc=4.7MB, time=454.96
NO POLE
NO POLE
t[1] = 1.39
x1[1] (analytic) = 2.0004483355483370027379178680713
x1[1] (numeric) = 3.0443921510596478300199790717113e+17706
absolute error = 3.0443921510596478300199790717113e+17706
relative error = 1.5218549246987468246755438166136e+17708 %
h = 0.001
x2[1] (analytic) = 1.0032985267809950095820075619118
x2[1] (numeric) = -2.7196819863024317861381321563754e+17704
absolute error = 2.7196819863024317861381321563754e+17704
relative error = 2.7107405360479488586560806157479e+17706 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4692.1MB, alloc=4.7MB, time=455.25
memory used=4695.9MB, alloc=4.7MB, time=455.53
NO POLE
NO POLE
t[1] = 1.391
x1[1] (analytic) = 2.0004478874368817359892041591108
x1[1] (numeric) = -2.4342426173726446044260573714166e+17726
absolute error = 2.4342426173726446044260573714166e+17726
relative error = 1.2168488030405890732995133727644e+17728 %
h = 0.001
x2[1] (analytic) = 1.0033049061560406110020597462978
x2[1] (numeric) = 2.1746100595002991621214452406753e+17724
absolute error = 2.1746100595002991621214452406753e+17724
relative error = 2.1674468510593423044296915653742e+17726 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4699.7MB, alloc=4.7MB, time=455.81
NO POLE
NO POLE
t[1] = 1.392
x1[1] (analytic) = 2.0004474397733139434461807569642
x1[1] (numeric) = 1.9463777418328806598665340548942e+17746
absolute error = 1.9463777418328806598665340548942e+17746
relative error = 9.7297119791032333439426474787817e+17747 %
h = 0.001
x2[1] (analytic) = 1.0033112985267714313759211236367
x2[1] (numeric) = -1.7387800980765227936486810462104e+17744
absolute error = 1.7387800980765227936486810462104e+17744
relative error = 1.7330414803757208885704357287819e+17746 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4703.5MB, alloc=4.7MB, time=456.09
memory used=4707.4MB, alloc=4.7MB, time=456.37
NO POLE
NO POLE
t[1] = 1.393
x1[1] (analytic) = 2.0004469925571859615037498200487
x1[1] (numeric) = -1.5562895361643900336268439392725e+17766
absolute error = 1.5562895361643900336268439392725e+17766
relative error = 7.7797089448242454242582695982395e+17767 %
h = 0.001
x2[1] (analytic) = 1.0033177039189807940271948280813
x2[1] (numeric) = 1.3902980979319737671602599058508e+17764
absolute error = 1.3902980979319737671602599058508e+17764
relative error = 1.3857007531128366712179336442842e+17766 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4711.2MB, alloc=4.7MB, time=456.65
NO POLE
NO POLE
t[1] = 1.394
x1[1] (analytic) = 2.0004465457880505739966613940258
x1[1] (numeric) = 1.2443818423930232894710647884889e+17786
absolute error = 1.2443818423930232894710647884889e+17786
relative error = 6.2205203383868216641035048026344e+17787 %
h = 0.001
x2[1] (analytic) = 1.003324122358513884491016560202
x2[1] (numeric) = -1.1116579970356878010615278857284e+17784
absolute error = 1.1116579970356878010615278857284e+17784
relative error = 1.1079749527226690128777481869406e+17786 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4715.0MB, alloc=4.7MB, time=456.93
NO POLE
NO POLE
t[1] = 1.395
x1[1] (analytic) = 2.0004460994654610117522972092837
x1[1] (numeric) = -9.9498591598439513363749949795249e+17805
absolute error = 9.9498591598439513363749949795249e+17805
relative error = 4.9738201706622598520034185311976e+17807 %
h = 0.001
x2[1] (analytic) = 1.0033305538712678541184393635765
x2[1] (numeric) = 8.8886225494488392705072652731860e+17803
absolute error = 8.8886225494488392705072652731860e+17803
relative error = 8.8591167837487109803441574537183e+17805 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4718.8MB, alloc=4.7MB, time=457.22
memory used=4722.6MB, alloc=4.7MB, time=457.50
NO POLE
NO POLE
t[1] = 1.396
x1[1] (analytic) = 2.0004456535889709521439014710884
x1[1] (numeric) = 7.9557330337083701579002588112759e+17825
absolute error = 7.9557330337083701579002588112759e+17825
relative error = 3.9769803390734975697630536071157e+17827 %
h = 0.001
x2[1] (analytic) = 1.0033369984831919238884582379273
x2[1] (numeric) = -7.1071868359917878972912913616000e+17823
absolute error = 7.1071868359917878972912913616000e+17823
relative error = 7.0835490435777533312558144376553e+17825 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4726.4MB, alloc=4.7MB, time=457.78
NO POLE
NO POLE
t[1] = 1.397
x1[1] (analytic) = 2.0004452081581345186442581956339
x1[1] (numeric) = -6.3612647261462597103312993557497e+17845
absolute error = 6.3612647261462597103312993557497e+17845
relative error = 3.1799244989085469020110808980482e+17847 %
h = 0.001
x2[1] (analytic) = 1.0033434562202874884280900604304
x2[1] (numeric) = 5.6827820554521225904340885595401e+17843
absolute error = 5.6827820554521225904340885595401e+17843
relative error = 5.6638452368641833732753988852968e+17845 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4730.3MB, alloc=4.7MB, time=458.06
NO POLE
NO POLE
memory used=4734.1MB, alloc=4.7MB, time=458.34
t[1] = 1.398
x1[1] (analytic) = 2.0004447631725062803798146456701
x1[1] (numeric) = 5.0863558071468567693587185442939e+17865
absolute error = 5.0863558071468567693587185442939e+17865
relative error = 2.5426124733783714822466683584109e+17867 %
h = 0.001
x2[1] (analytic) = 1.0033499271086082202409251188118
x2[1] (numeric) = -4.5438529526517101821555048174206e+17863
absolute error = 4.5438529526517101821555048174206e+17863
relative error = 4.5286821973923939585435929090139e+17865 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4737.9MB, alloc=4.7MB, time=458.62
NO POLE
NO POLE
t[1] = 1.399
x1[1] (analytic) = 2.000444318631641251685250419831
x1[1] (numeric) = -4.0669609756312663599164595972154e+17885
absolute error = 4.0669609756312663599164595972154e+17885
relative error = 2.0330288315213787840417629702252e+17887 %
h = 0.001
x2[1] (analytic) = 1.0033564111742601741445673935177
x2[1] (numeric) = 3.6331851994065290034449072763519e+17883
absolute error = 3.6331851994065290034449072763519e+17883
relative error = 3.6210315287211808313915135956963e+17885 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4741.7MB, alloc=4.7MB, time=458.90
NO POLE
NO POLE
t[1] = 1.4
x1[1] (analytic) = 2.0004438745350948916584917502317
x1[1] (numeric) = 3.2518707311169555969436681420634e+17905
absolute error = 3.2518707311169555969436681420634e+17905
relative error = 1.6255745899757840133423202684261e+17907 %
h = 0.001
x2[1] (analytic) = 1.0033629084434018919173815615742
x2[1] (numeric) = -2.9050312214622524367331654125269e+17903
absolute error = 2.9050312214622524367331654125269e+17903
relative error = 2.8952946107695594908913494316490e+17905 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4745.5MB, alloc=4.7MB, time=459.18
memory used=4749.3MB, alloc=4.7MB, time=459.47
NO POLE
NO POLE
t[1] = 1.401
x1[1] (analytic) = 2.00044343088242310371617056335
x1[1] (numeric) = -2.6001388543576430890639344631868e+17925
absolute error = 2.6001388543576430890639344631868e+17925
relative error = 1.2997812456064734048309479151386e+17927 %
h = 0.001
x2[1] (analytic) = 1.0033694189422445071549655317555
x2[1] (numeric) = 2.3228120600758221603191075809504e+17923
absolute error = 2.3228120600758221603191075809504e+17923
relative error = 2.3150118154134482432939180958594e+17925 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4753.1MB, alloc=4.7MB, time=459.75
NO POLE
NO POLE
t[1] = 1.402
x1[1] (analytic) = 2.0004429876731822351495278596499
x1[1] (numeric) = 2.0790254659409839361099529448110e+17945
absolute error = 2.0790254659409839361099529448110e+17945
relative error = 1.0392825382937831229625887068419e+17947 %
h = 0.001
x2[1] (analytic) = 1.0033759426970518503367681593631
x2[1] (numeric) = -1.8572798208061505490965331604028e+17943
absolute error = 1.8572798208061505490965331604028e+17943
relative error = 1.8510308467370907646777216909655e+17945 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4757.0MB, alloc=4.7MB, time=460.04
NO POLE
NO POLE
t[1] = 1.403
x1[1] (analytic) = 2.000442544906929076680760967852
x1[1] (numeric) = -1.6623523319868810873198381615839e+17965
absolute error = 1.6623523319868810873198381615839e+17965
relative error = 8.3099229029055783606539396613673e+17966 %
h = 0.001
x2[1] (analytic) = 1.0033824797341405541032726292729
x2[1] (numeric) = 1.4850483997664137821976764054247e+17963
absolute error = 1.4850483997664137821976764054247e+17963
relative error = 1.4800421870630001213037187341358e+17965 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4760.8MB, alloc=4.7MB, time=460.32
memory used=4764.6MB, alloc=4.7MB, time=460.61
NO POLE
NO POLE
t[1] = 1.404
x1[1] (analytic) = 2.0004421025832208620198142301962
x1[1] (numeric) = 1.3291877954036880208571933611788e+17985
absolute error = 1.3291877954036880208571933611788e+17985
relative error = 6.6444702082968290606513551337610e+17986 %
h = 0.001
x2[1] (analytic) = 1.0033890300798801587441668379533
x2[1] (numeric) = -1.1874186780813394627272840492528e+17983
absolute error = 1.1874186780813394627272840492528e+17983
relative error = 1.1834080725267732277626325068038e+17985 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4768.4MB, alloc=4.7MB, time=460.89
NO POLE
NO POLE
t[1] = 1.405
x1[1] (analytic) = 2.0004416607016152674216126754892
x1[1] (numeric) = -1.0627952699645017998077985385620e+18005
absolute error = 1.0627952699645017998077985385620e+18005
relative error = 5.3128031216453841573797161184187e+18006 %
h = 0.001
x2[1] (analytic) = 1.0033955937606932178979229488792
x2[1] (numeric) = 9.4943916796126751349369989278221e+18002
absolute error = 9.4943916796126751349369989278221e+18002
relative error = 9.4622616828802404823743461031851e+18004 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4772.2MB, alloc=4.7MB, time=461.17
memory used=4776.0MB, alloc=4.7MB, time=461.45
NO POLE
NO POLE
t[1] = 1.406
x1[1] (analytic) = 2.0004412192616704112437382371692
x1[1] (numeric) = 8.4979247459601238610281514536945e+18024
absolute error = 8.4979247459601238610281514536945e+18024
relative error = 4.2480252177050053852832113832566e+18026 %
h = 0.001
x2[1] (analytic) = 1.0034021708030554044632091411852
x2[1] (numeric) = -7.5915492176318510884354117489371e+18022
absolute error = 7.5915492176318510884354117489371e+18022
relative error = 7.5658090430042494798613290820261e+18024 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4779.8MB, alloc=4.7MB, time=461.73
NO POLE
NO POLE
t[1] = 1.407
x1[1] (analytic) = 2.000440778262944853504548074064
x1[1] (numeric) = -6.7947917184852981540447591267845e+18044
absolute error = 6.7947917184852981540447591267845e+18044
relative error = 3.3966472750997716533685993818156e+18046 %
h = 0.001
x2[1] (analytic) = 1.0034087612334956167225574185075
x2[1] (numeric) = 6.0700697283723036059966868249556e+18042
absolute error = 6.0700697283723036059966868249556e+18042
relative error = 6.0494486024921042858289133813824e+18044 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4783.7MB, alloc=4.7MB, time=462.01
NO POLE
NO POLE
t[1] = 1.408
x1[1] (analytic) = 2.0004403377049975954417345519622
x1[1] (numeric) = 5.4329963935659731246091383113598e+18064
absolute error = 5.4329963935659731246091383113598e+18064
relative error = 2.7159002401436129338798979449942e+18066 %
h = 0.001
x2[1] (analytic) = 1.0034153650785960846787121937702
x2[1] (numeric) = -4.8535213895110164453015332586062e+18062
absolute error = 4.8535213895110164453015332586062e+18062
relative error = 4.8370012643077745618744451535486e+18064 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4787.5MB, alloc=4.7MB, time=462.29
memory used=4791.3MB, alloc=4.7MB, time=462.57
NO POLE
NO POLE
t[1] = 1.409
x1[1] (analytic) = 2.0004398975873880790713264445548
x1[1] (numeric) = -4.3441287143796263590447609660706e+18084
absolute error = 4.3441287143796263590447609660706e+18084
relative error = 2.1715867193104988384723079181208e+18086 %
h = 0.001
x2[1] (analytic) = 1.0034219823649924766040852161682
x2[1] (numeric) = 3.8807906552265746000678428328214e+18082
absolute error = 3.8807906552265746000678428328214e+18082
relative error = 3.8675559469803859415296461726435e+18084 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4795.1MB, alloc=4.7MB, time=462.86
NO POLE
NO POLE
t[1] = 1.41
x1[1] (analytic) = 2.0004394579096761867471309127516
x1[1] (numeric) = 3.4734891982343496827641958093283e+18104
absolute error = 3.4734891982343496827641958093283e+18104
relative error = 1.7363630698746118296306514497308e+18106 %
h = 0.001
x2[1] (analytic) = 1.0034286131193740058037432588128
x2[1] (numeric) = -3.1030122051674378516778580555254e+18102
absolute error = 3.1030122051674378516778580555254e+18102
relative error = 3.0924095292848546053783467930544e+18104 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4798.9MB, alloc=4.7MB, time=463.15
NO POLE
NO POLE
t[1] = 1.411
x1[1] (analytic) = 2.0004390186714222407206158218113
x1[1] (numeric) = -2.7773410972638950906433864467424e+18124
absolute error = 2.7773410972638950906433864467424e+18124
relative error = 1.3883657893797967408962809752277e+18126 %
h = 0.001
x2[1] (analytic) = 1.0034352573684835375923558394087
x2[1] (numeric) = 2.4811141854432052494749516748332e+18122
absolute error = 2.4811141854432052494749516748332e+18122
relative error = 2.4726200990285569049553017730875e+18124 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4802.7MB, alloc=4.7MB, time=463.43
memory used=4806.5MB, alloc=4.7MB, time=463.71
NO POLE
NO POLE
t[1] = 1.412
x1[1] (analytic) = 2.0004385798721870027012319561699
x1[1] (numeric) = 2.2207132742695788048957568588724e+18144
absolute error = 2.2207132742695788048957568588724e+18144
relative error = 1.1101132004819991526009708153378e+18146 %
h = 0.001
x2[1] (analytic) = 1.0034419151391176964855311019558
x2[1] (numeric) = -1.9838554263357553881257916708740e+18142
absolute error = 1.9838554263357553881257916708740e+18142
relative error = 1.9770505859930244839005680592510e+18144 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4810.4MB, alloc=4.7MB, time=464.00
NO POLE
NO POLE
t[1] = 1.413
x1[1] (analytic) = 2.0004381415115316734171746922881
x1[1] (numeric) = -1.7756434207434802364310983738472e+18164
absolute error = 1.7756434207434802364310983738472e+18164
relative error = 8.8762725719766746848188524621268e+18165 %
h = 0.001
x2[1] (analytic) = 1.0034485864581269736059688448024
x2[1] (numeric) = 1.5862560359747347827289041057105e+18162
absolute error = 1.5862560359747347827289041057105e+18162
relative error = 1.5808044950003303941789508232279e+18164 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4814.2MB, alloc=4.7MB, time=464.27
memory used=4818.0MB, alloc=4.7MB, time=464.56
NO POLE
NO POLE
t[1] = 1.414
x1[1] (analytic) = 2.0004377035890178921765846902802
x1[1] (numeric) = 1.4197733647837272183970322194816e+18184
absolute error = 1.4197733647837272183970322194816e+18184
relative error = 7.0973135641089381668800668769750e+18185 %
h = 0.001
x2[1] (analytic) = 1.0034552713524158343048605394222
x2[1] (numeric) = -1.2683425305410467196958564018098e+18182
absolute error = 1.2683425305410467196958564018098e+18182
relative error = 1.2639751534033267950900114449255e+18184 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4821.8MB, alloc=4.7MB, time=464.84
NO POLE
NO POLE
t[1] = 1.415
x1[1] (analytic) = 2.0004372661042077364291871655247
x1[1] (numeric) = -1.1352259039178533558334080487049e+18204
absolute error = 1.1352259039178533558334080487049e+18204
relative error = 5.6748888013302818774123499982085e+18205 %
h = 0.001
x2[1] (analytic) = 1.0034619698489428259989670450611
x2[1] (numeric) = 1.0141444623665335014638125126010e+18202
absolute error = 1.0141444623665335014638125126010e+18202
relative error = 1.0106456376410545736998305917730e+18204 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4825.6MB, alloc=4.7MB, time=465.12
NO POLE
NO POLE
t[1] = 1.416
x1[1] (analytic) = 2.0004368290566637213283693018958
x1[1] (numeric) = 9.0770674030951375175577968427920e+18223
absolute error = 9.0770674030951375175577968427920e+18223
relative error = 4.5375426363128727750983483034779e+18225 %
h = 0.001
x2[1] (analytic) = 1.0034686819747206862238055868856
x2[1] (numeric) = -8.1089214134447951715910380657454e+18221
absolute error = 8.1089214134447951715910380657454e+18221
relative error = 8.0808913712058176222734292091779e+18223 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4829.4MB, alloc=4.7MB, time=465.40
memory used=4833.2MB, alloc=4.7MB, time=465.69
NO POLE
NO POLE
t[1] = 1.417
x1[1] (analytic) = 2.0004363924459487992936953686937
x1[1] (numeric) = -7.2578640388648491828250981799062e+18243
absolute error = 7.2578640388648491828250981799062e+18243
relative error = 3.6281403729066354337041094704408e+18245 %
h = 0.001
x2[1] (analytic) = 1.0034754077568164509033784294896
x2[1] (numeric) = 6.4837514702770632949141966862300e+18241
absolute error = 6.4837514702770632949141966862300e+18241
relative error = 6.4612958326212854707588921908403e+18243 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4837.1MB, alloc=4.7MB, time=465.98
NO POLE
NO POLE
t[1] = 1.418
x1[1] (analytic) = 2.0004359562716263595738591037882
x1[1] (numeric) = 5.8032609065661108182691974844821e+18263
absolute error = 5.8032609065661108182691974844821e+18263
relative error = 2.9009980991254104740122342530971e+18265 %
h = 0.001
x2[1] (analytic) = 1.0034821472223515628368765435593
x2[1] (numeric) = -5.1842940614294532718282225309566e+18261
absolute error = 5.1842940614294532718282225309566e+18261
relative error = 5.1663042295068528531645202082363e+18263 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4840.9MB, alloc=4.7MB, time=466.25
NO POLE
NO POLE
memory used=4844.7MB, alloc=4.7MB, time=466.54
t[1] = 1.419
x1[1] (analytic) = 2.000435520533260227810072925928
x1[1] (numeric) = -4.6401857308621930345229541689520e+18283
absolute error = 4.6401857308621930345229541689520e+18283
relative error = 2.3195877513838832164880424659105e+18285 %
h = 0.001
x2[1] (analytic) = 1.0034889003985019804027924311781
x2[1] (numeric) = 4.1452706875922548985982381700269e+18281
absolute error = 4.1452706875922548985982381700269e+18281
relative error = 4.1308585336081939642696573718320e+18283 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4848.5MB, alloc=4.7MB, time=466.82
NO POLE
NO POLE
t[1] = 1.42
x1[1] (analytic) = 2.0004350852304146655998935396058
x1[1] (numeric) = 3.7102112008328708136297529259235e+18303
absolute error = 3.7102112008328708136297529259235e+18303
relative error = 1.8547021236660225063078385052268e+18305 %
h = 0.001
x2[1] (analytic) = 1.0034956673124982864808771446776
x2[1] (numeric) = -3.3144858045867990621540544851573e+18301
absolute error = 3.3144858045867990621540544851573e+18301
relative error = 3.3029398258025921563259700547113e+18303 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4852.3MB, alloc=4.7MB, time=467.10
NO POLE
NO POLE
t[1] = 1.421
x1[1] (analytic) = 2.0004346503626543700614834963026
x1[1] (numeric) = -2.9666198624829386432658771706809e+18323
absolute error = 2.9666198624829386432658771706809e+18323
relative error = 1.4829876406835517944186869889456e+18325 %
h = 0.001
x2[1] (analytic) = 1.0035024479916257975923774050897
x2[1] (numeric) = 2.6502047699057304003026864730155e+18321
absolute error = 2.6502047699057304003026864730155e+18321
relative error = 2.6409549625013433865664950153286e+18323 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4856.1MB, alloc=4.7MB, time=467.37
memory used=4860.0MB, alloc=4.7MB, time=467.66
NO POLE
NO POLE
t[1] = 1.422
x1[1] (analytic) = 2.000434215929544473398308276376
x1[1] (numeric) = 2.3720572582236484349138685822823e+18343
absolute error = 2.3720572582236484349138685822823e+18343
relative error = 1.1857711887423508099232716270686e+18345 %
h = 0.001
x2[1] (analytic) = 1.0035092424632246732589895991681
x2[1] (numeric) = -2.1190572947126204017536324722666e+18341
absolute error = 2.1190572947126204017536324722666e+18341
relative error = 2.1116470133460449026518179020631e+18343 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4863.8MB, alloc=4.7MB, time=467.94
NO POLE
NO POLE
t[1] = 1.423
x1[1] (analytic) = 2.0004337819306505424642684562857
x1[1] (numeric) = -1.8966554183258967731324386574223e+18363
absolute error = 1.8966554183258967731324386574223e+18363
relative error = 9.4812207005192862933175299170574e+18364 %
h = 0.001
x2[1] (analytic) = 1.003516050754690025580968308589
x2[1] (numeric) = 1.6943610807984833933099814510679e+18361
absolute error = 1.6943610807984833933099814510679e+18361
relative error = 1.6884244945800779851042829949667e+18363 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4867.6MB, alloc=4.7MB, time=468.22
NO POLE
NO POLE
t[1] = 1.424
x1[1] (analytic) = 2.0004333483655385783292665262923
x1[1] (numeric) = 1.5165324375680868909652201906496e+18383
absolute error = 1.5165324375680868909652201906496e+18383
relative error = 7.5810195766191125260767815815999e+18384 %
h = 0.001
x2[1] (analytic) = 1.0035228728934720290348279013472
x2[1] (numeric) = -1.3547814300669682048513889800933e+18381
absolute error = 1.3547814300669682048513889800933e+18381
relative error = 1.3500254619615268879531254749223e+18383 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4871.4MB, alloc=4.7MB, time=468.50
memory used=4875.2MB, alloc=4.7MB, time=468.78
NO POLE
NO POLE
t[1] = 1.425
x1[1] (analytic) = 2.0004329152337750158452079241924
x1[1] (numeric) = -1.2125927630155449222978920860963e+18403
absolute error = 1.2125927630155449222978920860963e+18403
relative error = 6.0616517243910608694724804951464e+18404 %
h = 0.001
x2[1] (analytic) = 1.0035297089070760304910765935161
x2[1] (numeric) = 1.0832594917662619740120030184224e+18401
absolute error = 1.0832594917662619740120030184224e+18401
relative error = 1.0794493497816004294074523046459e+18403 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4879.0MB, alloc=4.7MB, time=469.07
NO POLE
NO POLE
t[1] = 1.426
x1[1] (analytic) = 2.0004324825349267232124358510942
x1[1] (numeric) = 9.6956792515139236773280463977459e+18422
absolute error = 9.6956792515139236773280463977459e+18422
relative error = 4.8467915494091868858730445184385e+18424 %
h = 0.001
x2[1] (analytic) = 1.0035365588230626594524232694551
x2[1] (numeric) = -8.6615530775594947989952472039275e+18420
absolute error = 8.6615530775594947989952472039275e+18420
relative error = 8.6310289360236910961650973489755e+18422 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4882.8MB, alloc=4.7MB, time=469.34
memory used=4886.7MB, alloc=4.7MB, time=469.63
NO POLE
NO POLE
t[1] = 1.427
x1[1] (analytic) = 2.0004320502685610015465994356657
x1[1] (numeric) = -7.7524952329797534764673458616350e+18442
absolute error = 7.7524952329797534764673458616350e+18442
relative error = 3.8754104304312507739848454926749e+18444 %
h = 0.001
x2[1] (analytic) = 1.0035434226690479385128982302198
x2[1] (numeric) = 6.9256260651873593162106090255218e+18440
absolute error = 6.9256260651873593162106090255218e+18440
relative error = 6.9011722948348359748692916144734e+18442 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4890.5MB, alloc=4.7MB, time=469.91
NO POLE
NO POLE
t[1] = 1.428
x1[1] (analytic) = 2.0004316184342455844459548137265
x1[1] (numeric) = 6.1987593420016811712023370095669e+18462
absolute error = 6.1987593420016811712023370095669e+18462
relative error = 3.0987109406186558423834682769347e+18464 %
h = 0.001
x2[1] (analytic) = 1.0035503004727033940383299233728
x2[1] (numeric) = -5.5376092445902449535444211994819e+18460
absolute error = 5.5376092445902449535444211994819e+18460
relative error = 5.5180186204735914316201703208033e+18462 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4894.3MB, alloc=4.7MB, time=470.18
NO POLE
NO POLE
t[1] = 1.429
x1[1] (analytic) = 2.0004311870315486375590986904809
x1[1] (numeric) = -4.9564193495523385865705816923292e+18482
absolute error = 4.9564193495523385865705816923292e+18482
relative error = 2.4776755040033133117243907396328e+18484 %
h = 0.001
x2[1] (analytic) = 1.0035571922617561670686205925983
x2[1] (numeric) = 4.4277753169368895752786727465666e+18480
absolute error = 4.4277753169368895752786727465666e+18480
relative error = 4.4120806976210681603803765420052e+18482 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4898.1MB, alloc=4.7MB, time=470.46
memory used=4901.9MB, alloc=4.7MB, time=470.75
NO POLE
NO POLE
t[1] = 1.43
x1[1] (analytic) = 2.0004307560600387581531339531289
x1[1] (numeric) = 3.9630660610037544064613316204467e+18502
absolute error = 3.9630660610037544064613316204467e+18502
relative error = 1.9811063437203078284480588105227e+18504 %
h = 0.001
x2[1] (analytic) = 1.0035640980639891244422646725048
x2[1] (numeric) = -3.5403715559071120480823584346392e+18500
absolute error = 3.5403715559071120480823584346392e+18500
relative error = 3.5277981373954763914455713927798e+18502 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4905.7MB, alloc=4.7MB, time=471.02
NO POLE
NO POLE
t[1] = 1.431
x1[1] (analytic) = 2.0004303255192849746822669020187
x1[1] (numeric) = -3.1687981779222055361101434826261e+18522
absolute error = 3.1687981779222055361101434826261e+18522
relative error = 1.5840582586147447466785177634759e+18524 %
h = 0.001
x2[1] (analytic) = 1.0035710179072409701435546427538
x2[1] (numeric) = 2.8308190584853923389288908923041e+18520
absolute error = 2.8308190584853923389288908923041e+18520
relative error = 2.8207461235663563301727741245489e+18522 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4909.5MB, alloc=4.7MB, time=471.31
NO POLE
NO POLE
t[1] = 1.432
x1[1] (analytic) = 2.0004298954088567463568356689386
x1[1] (numeric) = 2.5337154964961299885103032108115e+18542
absolute error = 2.5337154964961299885103032108115e+18542
relative error = 1.2665854986026780821373706873149e+18544 %
h = 0.001
x2[1] (analytic) = 1.0035779518194063568729199461898
x2[1] (numeric) = -2.2634733149726990214181502256745e+18540
absolute error = 2.2634733149726990214181502256745e+18540
relative error = 2.2554035895958090681381879265833e+18542 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4913.4MB, alloc=4.7MB, time=471.59
memory used=4917.2MB, alloc=4.7MB, time=471.87
NO POLE
NO POLE
t[1] = 1.433
x1[1] (analytic) = 2.000429465728323962712769391577
x1[1] (numeric) = -2.0259145129255484662499645637471e+18562
absolute error = 2.0259145129255484662499645637471e+18562
relative error = 1.0127397879474574779347106662969e+18564 %
h = 0.001
x2[1] (analytic) = 1.0035848998284359978408454679601
x2[1] (numeric) = 1.8098336000092803486535446980935e+18560
absolute error = 1.8098336000092803486535446980935e+18560
relative error = 1.8033687038522336285201192427252e+18562 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4921.0MB, alloc=4.7MB, time=472.15
NO POLE
NO POLE
t[1] = 1.434
x1[1] (analytic) = 2.0004290364772569431814777136087
x1[1] (numeric) = 1.6198857446142755041442294413845e+18582
absolute error = 1.6198857446142755041442294413845e+18582
relative error = 8.0976916205279853235457843712177e+18583 %
h = 0.001
x2[1] (analytic) = 1.0035918619623367787858169667182
x2[1] (numeric) = -1.4471112330131708782278852836855e+18580
absolute error = 1.4471112330131708782278852836855e+18580
relative error = 1.4419320122660367712125520499359e+18582 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4924.8MB, alloc=4.7MB, time=472.44
memory used=4928.6MB, alloc=4.7MB, time=472.73
NO POLE
NO POLE
t[1] = 1.435
x1[1] (analytic) = 2.0004286076552264366601701802981
x1[1] (numeric) = -1.2952322562788106294212184243746e+18602
absolute error = 1.2952322562788106294212184243746e+18602
relative error = 6.4747737126045125520050057340232e+18603 %
h = 0.001
x2[1] (analytic) = 1.0035988382491718702167417448991
x2[1] (numeric) = 1.1570847843150671920579405402396e+18600
absolute error = 1.1570847843150671920579405402396e+18600
relative error = 1.1529355557382461650431516827529e+18602 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4932.4MB, alloc=4.7MB, time=473.01
NO POLE
NO POLE
t[1] = 1.436
x1[1] (analytic) = 2.0004281792618036210826050999375
x1[1] (numeric) = 1.0356450158801614917586064570967e+18622
absolute error = 1.0356450158801614917586064570967e+18622
relative error = 5.1771167123947152793601275730435e+18623 %
h = 0.001
x2[1] (analytic) = 1.0036058287170608398802937427361
x2[1] (numeric) = -9.2518471804389626251716621719847e+18619
absolute error = 9.2518471804389626251716621719847e+18619
relative error = 9.2186064645179212044178526583320e+18621 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4936.2MB, alloc=4.7MB, time=473.29
NO POLE
NO POLE
t[1] = 1.437
x1[1] (analytic) = 2.0004277512965601029902674418707
x1[1] (numeric) = -8.2808360718167710356380793381424e+18641
absolute error = 8.2808360718167710356380793381424e+18641
relative error = 4.1395326906705918791071748703928e+18643 %
h = 0.001
x2[1] (analytic) = 1.0036128333941797654536331401768
x2[1] (numeric) = 7.3976148861783775000095359839668e+18639
absolute error = 7.3976148861783775000095359839668e+18639
relative error = 7.3709847463388149616610116974499e+18641 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4940.1MB, alloc=4.7MB, time=473.57
memory used=4943.9MB, alloc=4.7MB, time=473.85
NO POLE
NO POLE
t[1] = 1.438
x1[1] (analytic) = 2.000427323759067917103975342278
x1[1] (numeric) = 6.6212114186659275286489517152184e+18661
absolute error = 6.6212114186659275286489517152184e+18661
relative error = 3.3098985101962085931220629336688e+18663 %
h = 0.001
x2[1] (analytic) = 1.0036198523087613474629514521401
x2[1] (numeric) = -5.9150032352362594630307817465149e+18659
absolute error = 5.9150032352362594630307817465149e+18659
relative error = 5.8936690238133335307296404256450e+18661 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4947.7MB, alloc=4.7MB, time=474.13
NO POLE
NO POLE
t[1] = 1.439
x1[1] (analytic) = 2.0004268966488995258959147893308
x1[1] (numeric) = -5.2942046274626599404509324124245e+18681
absolute error = 5.2942046274626599404509324124245e+18681
relative error = 2.6465374147545570026923395112141e+18683 %
h = 0.001
x2[1] (analytic) = 1.0036268854890950224282940056369
x2[1] (numeric) = 4.7295329388158925497584979014451e+18679
absolute error = 4.7295329388158925497584979014451e+18679
relative error = 4.7124414532907424968684849461597e+18681 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4951.5MB, alloc=4.7MB, time=474.41
NO POLE
NO POLE
memory used=4955.3MB, alloc=4.7MB, time=474.69
t[1] = 1.44
x1[1] (analytic) = 2.0004264699656278191621020597496
x1[1] (numeric) = 4.2331532502392704358463487861945e+18701
absolute error = 4.2331532502392704358463487861945e+18701
relative error = 2.1161253931577931382479838554544e+18703 %
h = 0.001
x2[1] (analytic) = 1.003633932963527076235112592183
x2[1] (numeric) = -3.7816516626894190074559536703221e+18699
absolute error = 3.7816516626894190074559536703221e+18699
relative error = 3.7679591517227501855957548253912e+18701 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4959.1MB, alloc=4.7MB, time=474.98
NO POLE
NO POLE
t[1] = 1.441
x1[1] (analytic) = 2.0004260437088261135952734792275
x1[1] (numeric) = -3.3847551617209730349846967824121e+18721
absolute error = 3.3847551617209730349846967824121e+18721
relative error = 1.6920171442307238041206902647797e+18723 %
h = 0.001
x2[1] (analytic) = 1.0036409947604607577330019956325
x2[1] (numeric) = 3.0237424039385341976940457819883e+18719
absolute error = 3.0237424039385341976940457819883e+18719
relative error = 3.0127729135458556458500939682778e+18721 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4963.0MB, alloc=4.7MB, time=475.26
NO POLE
NO POLE
t[1] = 1.442
x1[1] (analytic) = 2.0004256178780681523582020796099
x1[1] (numeric) = 2.7063909165464800948464831601723e+18741
absolute error = 2.7063909165464800948464831601723e+18741
relative error = 1.3529075474534552835325748961994e+18743 %
h = 0.001
x2[1] (analytic) = 1.0036480709083563925620750040845
x2[1] (numeric) = -2.4177314414182962628749211692289e+18739
absolute error = 2.4177314414182962628749211692289e+18739
relative error = 2.4089434449170186571115913826420e+18741 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4966.8MB, alloc=4.7MB, time=475.54
memory used=4970.6MB, alloc=4.7MB, time=475.82
NO POLE
NO POLE
t[1] = 1.443
x1[1] (analytic) = 2.0004251924729281046574407261456
x1[1] (numeric) = -2.1639827530216810775498040356427e+18761
absolute error = 2.1639827530216810775498040356427e+18761
relative error = 1.0817613981088505057431821130821e+18763 %
h = 0.001
x2[1] (analytic) = 1.0036551614357314972074314248571
x2[1] (numeric) = 1.9331756948636609883217860073119e+18759
absolute error = 1.9331756948636609883217860073119e+18759
relative error = 1.9261353591787918325093307117056e+18761 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4974.4MB, alloc=4.7MB, time=476.10
NO POLE
NO POLE
t[1] = 1.444
x1[1] (analytic) = 2.0004247674929805653174912885542
x1[1] (numeric) = 1.7302826900375721318028442905373e+18781
absolute error = 1.7302826900375721318028442905373e+18781
relative error = 8.6495764207420694488802910456694e+18782 %
h = 0.001
x2[1] (analytic) = 1.0036622663711608932821775336853
x2[1] (numeric) = -1.5457334107461044465067608882855e+18779
absolute error = 1.5457334107461044465067608882855e+18779
relative error = 1.5400931792871468641471818168261e+18781 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4978.2MB, alloc=4.7MB, time=476.38
NO POLE
NO POLE
t[1] = 1.445
x1[1] (analytic) = 2.0004243429378005543553994300777
x1[1] (numeric) = -1.3835037193633590235648113301999e+18801
absolute error = 1.3835037193633590235648113301999e+18801
relative error = 6.9160512080729887352905119447254e+18802 %
h = 0.001
x2[1] (analytic) = 1.0036693857432768220394533032888
x2[1] (numeric) = 1.2359413494826150621904471303314e+18799
absolute error = 1.2359413494826150621904471303314e+18799
relative error = 1.2314227842740536003379771284244e+18801 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4982.0MB, alloc=4.7MB, time=476.67
memory used=4985.8MB, alloc=4.7MB, time=476.95
NO POLE
NO POLE
t[1] = 1.446
x1[1] (analytic) = 2.0004239188069635165557745891106
x1[1] (numeric) = 1.1062253309895187346876230711035e+18821
absolute error = 1.1062253309895187346876230711035e+18821
relative error = 5.5299545290843277118289330281839e+18822 %
h = 0.001
x2[1] (analytic) = 1.0036765195807690591139256722729
x2[1] (numeric) = -9.8823704575524415249262456419867e+18818
absolute error = 9.8823704575524415249262456419867e+18818
relative error = 9.8461708177454036495490191229008e+18820 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4989.7MB, alloc=4.7MB, time=477.23
NO POLE
NO POLE
t[1] = 1.447
x1[1] (analytic) = 2.00042349510004532104623472843
x1[1] (numeric) = -8.8451839037049421908420796060584e+18840
absolute error = 8.8451839037049421908420796060584e+18840
relative error = 4.4216556770958022711441527388418e+18842 %
h = 0.001
x2[1] (analytic) = 1.0036836679123850294932070329803
x2[1] (numeric) = 7.9017702499546456272531947678061e+18838
absolute error = 7.9017702499546456272531947678061e+18838
relative error = 7.8727695812665331741979076306141e+18840 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4993.5MB, alloc=4.7MB, time=477.52
memory used=4997.3MB, alloc=4.7MB, time=477.81
NO POLE
NO POLE
t[1] = 1.448
x1[1] (analytic) = 2.0004230718166222608732754274695
x1[1] (numeric) = 7.0724540560265187709002913137978e+18860
absolute error = 7.0724540560265187709002913137978e+18860
relative error = 3.5354791472205370283028177411642e+18862 %
h = 0.001
x2[1] (analytic) = 1.0036908307669299227196590363969
x2[1] (numeric) = -6.3181170298418729504239934152010e+18858
absolute error = 6.3181170298418729504239934152010e+18858
relative error = 6.2948836794833906140086521745907e+18860 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5001.1MB, alloc=4.7MB, time=478.08
NO POLE
NO POLE
t[1] = 1.449
x1[1] (analytic) = 2.0004226489562710525785628935057
x1[1] (numeric) = -5.6550103332113276175598710438381e+18880
absolute error = 5.6550103332113276175598710438381e+18880
relative error = 2.8269077717960517447020729653133e+18882 %
h = 0.001
x2[1] (analytic) = 1.0036980081732668083230427335477
x2[1] (numeric) = 5.0518556652551387754244566247928e+18878
absolute error = 5.0518556652551387754244566247928e+18878
relative error = 5.0332426926397216467878996557758e+18880 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5004.9MB, alloc=4.7MB, time=478.36
NO POLE
NO POLE
t[1] = 1.45
x1[1] (analytic) = 2.0004222265185688357756504680507
x1[1] (numeric) = 4.5216471701894053400613765672550e+18900
absolute error = 4.5216471701894053400613765672550e+18900
relative error = 2.2603463959999313370146512128011e+18902 %
h = 0.001
x2[1] (analytic) = 1.0037052001603167514844769959899
x2[1] (numeric) = -4.0393752667175864664380631724682e+18898
absolute error = 4.0393752667175864664380631724682e+18898
relative error = 4.0244638227164684410455966697254e+18900 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5008.7MB, alloc=4.7MB, time=478.64
memory used=5012.5MB, alloc=4.7MB, time=478.93
NO POLE
NO POLE
t[1] = 1.451
x1[1] (analytic) = 2.0004218045030931727271182051673
x1[1] (numeric) = -3.6154298448596339574910650691510e+18920
absolute error = 3.6154298448596339574910650691510e+18920
relative error = 1.8073337516722931531221429980867e+18922 %
h = 0.001
x2[1] (analytic) = 1.0037124067570589289321680830329
x2[1] (numeric) = 3.2298136816515168780899264922403e+18918
absolute error = 3.2298136816515168780899264922403e+18918
relative error = 3.2178676480515689102785991940493e+18920 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5016.4MB, alloc=4.7MB, time=479.21
NO POLE
NO POLE
t[1] = 1.452
x1[1] (analytic) = 2.0004213829094220479221350988457
x1[1] (numeric) = 2.8908343510920639575394639505717e+18940
absolute error = 2.8908343510920639575394639505717e+18940
relative error = 1.4451127026484895890892767322480e+18942 %
h = 0.001
x2[1] (analytic) = 1.0037196279925307450693741501884
x2[1] (numeric) = -2.5825024241088070337397096060363e+18938
absolute error = 2.5825024241088070337397096060363e+18938
relative error = 2.5729320739436859147674044246660e+18940 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5020.2MB, alloc=4.7MB, time=479.49
NO POLE
NO POLE
t[1] = 1.453
x1[1] (analytic) = 2.0004209617371338676544435370047
x1[1] (numeric) = -2.3114604912983244636782478230199e+18960
absolute error = 2.3114604912983244636782478230199e+18960
relative error = 1.1554870377338421792956431617247e+18962 %
h = 0.001
x2[1] (analytic) = 1.0037268638958279483350694220831
x2[1] (numeric) = 2.0649236853556234595060213307795e+18958
absolute error = 2.0649236853556234595060213307795e+18958
relative error = 2.0572565701199884366316797538787e+18960 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5024.0MB, alloc=4.7MB, time=479.77
memory used=5027.8MB, alloc=4.7MB, time=480.06
NO POLE
NO POLE
t[1] = 1.454
x1[1] (analytic) = 2.000420540985807459600765560101
x1[1] (numeric) = 1.8482033053242000143388368661105e+18980
absolute error = 1.8482033053242000143388368661105e+18980
relative error = 9.2390738220144711420751294844283e+18981 %
h = 0.001
x2[1] (analytic) = 1.0037341144961047477977736836531
x2[1] (numeric) = -1.6510767953350819644771167354611e+18978
absolute error = 1.6510767953350819644771167354611e+18978
relative error = 1.6449344218652532397377286070511e+18980 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5031.6MB, alloc=4.7MB, time=480.34
NO POLE
NO POLE
t[1] = 1.455
x1[1] (analytic) = 2.0004201206550220723996305027539
x1[1] (numeric) = -1.4777909770340248919344595015329e+19000
absolute error = 1.4777909770340248919344595015329e+19000
relative error = 7.3874030848586630097726922156083e+19001 %
h = 0.001
x2[1] (analytic) = 1.0037413798225739299830136758895
x2[1] (numeric) = 1.3201720738771418455589149145417e+18998
absolute error = 1.3201720738771418455589149145417e+18998
relative error = 1.3152512195028780227436266494340e+19000 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5035.4MB, alloc=4.7MB, time=480.62
memory used=5039.2MB, alloc=4.7MB, time=480.90
NO POLE
NO POLE
t[1] = 1.456
x1[1] (analytic) = 2.0004197007443573752306235972118
x1[1] (numeric) = 1.1816157700356985542783006280157e+19020
absolute error = 1.1816157700356985542783006280157e+19020
relative error = 5.9068392977534595101208717525801e+19021 %
h = 0.001
x2[1] (analytic) = 1.0037486599045069759348839167252
x2[1] (numeric) = -1.0555864570135671267858557106639e+19018
absolute error = 1.0555864570135671267858557106639e+19018
relative error = 1.0516442005651014385796128557124e+19020 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5043.1MB, alloc=4.7MB, time=481.18
NO POLE
NO POLE
t[1] = 1.457
x1[1] (analytic) = 2.0004192812533934573940551179101
x1[1] (numeric) = -9.4479926437181796146137142726799e+19039
absolute error = 9.4479926437181796146137142726799e+19039
relative error = 4.7230061878819697036167417850714e+19041 %
h = 0.001
x2[1] (analytic) = 1.0037559547712341785121754038352
x2[1] (numeric) = 8.4402843407983736466927748603015e+19037
absolute error = 8.4402843407983736466927748603015e+19037
relative error = 8.4087016377621362998553229548346e+19039 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5046.9MB, alloc=4.7MB, time=481.46
NO POLE
NO POLE
t[1] = 1.458
x1[1] (analytic) = 2.0004188621817108278910496467884
x1[1] (numeric) = 7.5544493615768184673256723393919e+19059
absolute error = 7.5544493615768184673256723393919e+19059
relative error = 3.7764337781427095737030878259134e+19061 %
h = 0.001
x2[1] (analytic) = 1.00376326445214475991954159419
x2[1] (numeric) = -6.7487034605456890227081774611184e+19057
absolute error = 6.7487034605456890227081774611184e+19057
relative error = 6.7234015225981992656690156035030e+19059 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5050.7MB, alloc=4.7MB, time=481.74
memory used=5054.5MB, alloc=4.7MB, time=482.02
NO POLE
NO POLE
t[1] = 1.459
x1[1] (analytic) = 2.0004184435288904150040550394581
x1[1] (numeric) = -6.0404053335681989004871133255029e+19079
absolute error = 6.0404053335681989004871133255029e+19079
relative error = 3.0195709068311048312200746277746e+19081 %
h = 0.001
x2[1] (analytic) = 1.0037705889766869894741719951352
x2[1] (numeric) = 5.3961450301179330180941298123068e+19077
absolute error = 5.3961450301179330180941298123068e+19077
relative error = 5.3758748157974379983157179066636e+19079 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5058.3MB, alloc=4.7MB, time=482.30
NO POLE
NO POLE
t[1] = 1.46
x1[1] (analytic) = 2.0004180252945135658777706727272
x1[1] (numeric) = 4.8298022592322232246518649542108e+19099
absolute error = 4.8298022592322232246518649542108e+19099
relative error = 2.4143964902141644643879457809135e+19101 %
h = 0.001
x2[1] (analytic) = 1.0037779283743683016084446435969
x2[1] (numeric) = -4.3146630099097588735576486258238e+19097
absolute error = 4.3146630099097588735576486258238e+19097
relative error = 4.2984238723971675424757170339630e+19099 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5062.1MB, alloc=4.7MB, time=482.59
NO POLE
NO POLE
memory used=5065.9MB, alloc=4.7MB, time=482.88
t[1] = 1.461
x1[1] (analytic) = 2.0004176074781620461004945544123
x1[1] (numeric) = -3.8618252542838755102013195345502e+19119
absolute error = 3.8618252542838755102013195345502e+19119
relative error = 1.9305095295338395427065023316478e+19121 %
h = 0.001
x2[1] (analytic) = 1.0037852826747554141090296937147
x2[1] (numeric) = 3.4499289372651793733837235810160e+19117
absolute error = 3.4499289372651793733837235810160e+19117
relative error = 3.4369192264627162738899248529522e+19119 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5069.8MB, alloc=4.7MB, time=483.16
NO POLE
NO POLE
t[1] = 1.462
x1[1] (analytic) = 2.0004171900794180392858888767832
x1[1] (numeric) = 3.0878478029027005286825604321010e+19139
absolute error = 3.0878478029027005286825604321010e+19139
relative error = 1.5436019137488569028216961388265e+19141 %
h = 0.001
x2[1] (analytic) = 1.0037926519074744465929172788013
x2[1] (numeric) = -2.7585027254373176063574316383199e+19137
absolute error = 2.7585027254373176063574316383199e+19137
relative error = 2.7480802137726599426669255866310e+19139 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5073.6MB, alloc=4.7MB, time=483.45
NO POLE
NO POLE
t[1] = 1.463
x1[1] (analytic) = 2.0004167730978641466551635954075
x1[1] (numeric) = -2.4689889951168021909823077586686e+19159
absolute error = 2.4689889951168021909823077586686e+19159
relative error = 1.2342372991070769285812320900929e+19161 %
h = 0.001
x2[1] (analytic) = 1.0038000361022110392208437610144
x2[1] (numeric) = 2.2056504422601723406640901470538e+19157
absolute error = 2.2056504422601723406640901470538e+19157
relative error = 2.1973006205745782228230141214951e+19159 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5077.4MB, alloc=4.7MB, time=483.73
memory used=5081.2MB, alloc=4.7MB, time=484.01
NO POLE
NO POLE
t[1] = 1.464
x1[1] (analytic) = 2.0004163565330833866196776155775
x1[1] (numeric) = 1.9741603366194021675740542666228e+19179
absolute error = 1.9741603366194021675740542666228e+19179
relative error = 9.8687472244068956631047317509705e+19180 %
h = 0.001
x2[1] (analytic) = 1.0038074352887104716485914315148
x2[1] (numeric) = -1.7635994442134331235488717141964e+19177
absolute error = 1.7635994442134331235488717141964e+19177
relative error = 1.7569101226135018350456260537384e+19179 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5085.0MB, alloc=4.7MB, time=484.29
NO POLE
NO POLE
t[1] = 1.465
x1[1] (analytic) = 2.0004159403846591943639571689199
x1[1] (numeric) = -1.5785040121237391549440622656424e+19199
absolute error = 1.5785040121237391549440622656424e+19199
relative error = 7.8908789929968726369831726119823e+19200 %
h = 0.001
x2[1] (analytic) = 1.0038148494967777822166376751655
x2[1] (numeric) = 1.4101432121958380347473621521756e+19197
absolute error = 1.4101432121958380347473621521756e+19197
relative error = 1.4047841720041864705331597714764e+19199 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5088.8MB, alloc=4.7MB, time=484.58
NO POLE
NO POLE
t[1] = 1.466
x1[1] (analytic) = 2.000415524652175421429130963209
x1[1] (numeric) = 1.2621441481078195605728164135689e+19219
absolute error = 1.2621441481078195605728164135689e+19219
relative error = 6.3094098828655928568974514154554e+19220 %
h = 0.001
x2[1] (analytic) = 1.0038222787562778873786305670182
x2[1] (numeric) = -1.1275258026568900079536255124125e+19217
absolute error = 1.1275258026568900079536255124125e+19217
relative error = 1.1232324949530698796022232764655e+19219 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5092.7MB, alloc=4.7MB, time=484.85
memory used=5096.5MB, alloc=4.7MB, time=485.14
NO POLE
NO POLE
t[1] = 1.467
x1[1] (analytic) = 2.0004151093352163352967816888159
x1[1] (numeric) = -1.0091883443866327315559900953855e+19239
absolute error = 1.0091883443866327315559900953855e+19239
relative error = 5.0448946305050109604844019562977e+19240 %
h = 0.001
x2[1] (analytic) = 1.0038297230971357013691688229333
x2[1] (numeric) = 9.0154987426944144657219510725077e+19236
absolute error = 9.0154987426944144657219510725077e+19236
relative error = 8.9811036027890445999434390373080e+19238 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5100.3MB, alloc=4.7MB, time=485.42
NO POLE
NO POLE
t[1] = 1.468
x1[1] (analytic) = 2.0004146944333666189732134656474
x1[1] (numeric) = 8.0692931625336828329381587453423e+19258
absolute error = 8.0692931625336828329381587453423e+19258
relative error = 4.0338101819529846708901803120681e+19260 %
h = 0.001
x2[1] (analytic) = 1.0038371825493362561113649836854
x2[1] (numeric) = -7.2086348168706268086695755408892e+19256
absolute error = 7.2086348168706268086695755408892e+19256
relative error = 7.1810797031483133185086272943017e+19258 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5104.1MB, alloc=4.7MB, time=485.70
memory used=5107.9MB, alloc=4.7MB, time=485.98
NO POLE
NO POLE
t[1] = 1.469
x1[1] (analytic) = 2.0004142799462113705741348148396
x1[1] (numeric) = -6.4520654152508768924634312209327e+19278
absolute error = 6.4520654152508768924634312209327e+19278
relative error = 3.2253646056877602543419515792026e+19280 %
h = 0.001
x2[1] (analytic) = 1.0038446571429248213646716708333
x2[1] (numeric) = 5.7638980832988375451325859323002e+19276
absolute error = 5.7638980832988375451325859323002e+19276
relative error = 5.7418227434747292331445374671531e+19278 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5111.7MB, alloc=4.7MB, time=486.26
NO POLE
NO POLE
t[1] = 1.47
x1[1] (analytic) = 2.0004138658733361029097567398918
x1[1] (numeric) = 5.1589584470624569568211655695499e+19298
absolute error = 5.1589584470624569568211655695499e+19298
relative error = 2.5789455547540762003345742616552e+19300 %
h = 0.001
x2[1] (analytic) = 1.0038521469080070251134517134794
x2[1] (numeric) = -4.6087119071289551999889273448065e+19296
absolute error = 4.6087119071289551999889273448065e+19296
relative error = 4.5910265982140668714851184244830e+19298 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5115.5MB, alloc=4.7MB, time=486.54
NO POLE
NO POLE
t[1] = 1.471
x1[1] (analytic) = 2.0004134522143267430703055023367
x1[1] (numeric) = -4.1250127742981364538364588135518e+19318
absolute error = 4.1250127742981364538364588135518e+19318
relative error = 2.0620801013570556321986359160158e+19320 %
h = 0.001
x2[1] (analytic) = 1.0038596518747489741967739078099
x2[1] (numeric) = 3.6850452828888059806960321016277e+19316
absolute error = 3.6850452828888059806960321016277e+19316
relative error = 3.6708769756876204119999344351911e+19318 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5119.4MB, alloc=4.7MB, time=486.82
memory used=5123.2MB, alloc=4.7MB, time=487.11
NO POLE
NO POLE
t[1] = 1.472
x1[1] (analytic) = 2.0004130389687696320119496774608
x1[1] (numeric) = 3.2982879320944465459601711823403e+19338
absolute error = 3.2982879320944465459601711823403e+19338
relative error = 1.6488034560076366731936997821973e+19340 %
h = 0.001
x2[1] (analytic) = 1.0038671720733773751799171360024
x2[1] (numeric) = -2.9464976354750207875154530824219e+19336
absolute error = 2.9464976354750207875154530824219e+19336
relative error = 2.9351469172852356317092886651406e+19338 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5127.0MB, alloc=4.7MB, time=487.39
NO POLE
NO POLE
t[1] = 1.473
x1[1] (analytic) = 2.0004126261362515241431410760011
x1[1] (numeric) = -2.6372532348947337107586146418025e+19358
absolute error = 2.6372532348947337107586146418025e+19358
relative error = 1.3183546236600817595138350945014e+19360 %
h = 0.001
x2[1] (analytic) = 1.0038747075341796554680665377181
x2[1] (numeric) = 2.3559678781081231063188994045461e+19356
absolute error = 2.3559678781081231063188994045461e+19356
relative error = 2.3468744260875879742277591556184e+19358 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5130.8MB, alloc=4.7MB, time=487.66
NO POLE
NO POLE
memory used=5134.6MB, alloc=4.7MB, time=487.95
t[1] = 1.474
x1[1] (analytic) = 2.0004122137163595869113691181598
x1[1] (numeric) = 2.1087014742664310032193142446939e+19378
absolute error = 2.1087014742664310032193142446939e+19378
relative error = 1.0541334729949943491747584221235e+19380 %
h = 0.001
x2[1] (analytic) = 1.0038822582875040846626863959501
x2[1] (numeric) = -1.8837906319183087704183527061521e+19376
absolute error = 1.8837906319183087704183527061521e+19376
relative error = 1.8765055526848505764998252402520e+19378 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5138.4MB, alloc=4.7MB, time=488.24
NO POLE
NO POLE
t[1] = 1.475
x1[1] (analytic) = 2.0004118017086814003903282466914
x1[1] (numeric) = -1.6860807482338369520341619340624e+19398
absolute error = 1.6860807482338369520341619340624e+19398
relative error = 8.4286682711711962583560508741209e+19399 %
h = 0.001
x2[1] (analytic) = 1.0038898243637598961610553695083
x2[1] (numeric) = 1.5062459797850949663020057220485e+19396
absolute error = 1.5062459797850949663020057220485e+19396
relative error = 1.5004096497737844465900756432733e+19398 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5142.2MB, alloc=4.7MB, time=488.52
NO POLE
NO POLE
t[1] = 1.476
x1[1] (analytic) = 2.0004113901128049568674979662282
x1[1] (numeric) = 1.3481606212438127613446703081728e+19418
absolute error = 1.3481606212438127613446703081728e+19418
relative error = 6.7394168414917333515733174880002e+19419 %
h = 0.001
x2[1] (analytic) = 1.003897405793417408999450676857
x2[1] (numeric) = -1.2043678916209553630494003400340e+19416
absolute error = 1.2043678916209553630494003400340e+19416
relative error = 1.1996922042737013377753681079280e+19418 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5146.1MB, alloc=4.7MB, time=488.80
memory used=5149.9MB, alloc=4.7MB, time=489.08
NO POLE
NO POLE
t[1] = 1.477
x1[1] (analytic) = 2.0004109789283186604321350964264
x1[1] (numeric) = -1.0779656090471148515400339217159e+19438
absolute error = 1.0779656090471148515400339217159e+19438
relative error = 5.3887207199023372462504606520619e+19439 %
h = 0.001
x2[1] (analytic) = 1.0039050026070081499404688104167
x2[1] (numeric) = 9.6299146210797322493280384477331e+19435
absolute error = 9.6299146210797322493280384477331e+19435
relative error = 9.5924560551766562927136493222666e+19437 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5153.7MB, alloc=4.7MB, time=489.37
NO POLE
NO POLE
t[1] = 1.478
x1[1] (analytic) = 2.0004105681548113265636778269229
x1[1] (numeric) = 8.6192241189795854225526643094301e+19457
absolute error = 8.6192241189795854225526643094301e+19457
relative error = 4.3087275463306518561162467729084e+19459 %
h = 0.001
x2[1] (analytic) = 1.0039126148351249758049713367788
x2[1] (numeric) = -7.6999109868723819145001502953480e+19455
absolute error = 7.6999109868723819145001502953480e+19455
relative error = 7.6699016160255712386041247196980e+19457 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5157.5MB, alloc=4.7MB, time=489.65
NO POLE
NO POLE
t[1] = 1.479
x1[1] (analytic) = 2.0004101577918721817205611625083
x1[1] (numeric) = -6.8917805716334646386278052637216e+19477
absolute error = 6.8917805716334646386278052637216e+19477
relative error = 3.4451837513367112267809668346357e+19479 %
h = 0.001
x2[1] (analytic) = 1.003920242508422196049145316577
x2[1] (numeric) = 6.1567139002433248804522593398628e+19475
absolute error = 6.1567139002433248804522593398628e+19475
relative error = 6.1326723374558057202647114461999e+19477 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5161.3MB, alloc=4.7MB, time=489.93
memory used=5165.1MB, alloc=4.7MB, time=490.22
NO POLE
NO POLE
t[1] = 1.48
x1[1] (analytic) = 2.0004097478390908629294433473304
x1[1] (numeric) = 5.5105469810161436071765408311982e+19497
absolute error = 5.5105469810161436071765408311982e+19497
relative error = 2.7547091224529473123477475481154e+19499 %
h = 0.001
x2[1] (analytic) = 1.0039278856576156955871688580143
x2[1] (numeric) = -4.9228005510809175447781427066446e+19495
absolute error = 4.9228005510809175447781427066446e+19495
relative error = 4.9035400066173803634181787210374e+19497 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5168.9MB, alloc=4.7MB, time=490.50
NO POLE
NO POLE
t[1] = 1.481
x1[1] (analytic) = 2.0004093382960574173748428573563
x1[1] (numeric) = -4.4061368051926914307342467422306e+19517
absolute error = 4.4061368051926914307342467422306e+19517
relative error = 2.2026175947297993237892764069018e+19519 %
h = 0.001
x2[1] (analytic) = 1.003935544313483057859973300257
x2[1] (numeric) = 3.9361850588452410806621818412405e+19515
absolute error = 3.9361850588452410806621818412405e+19515
relative error = 3.9207547547655618128201702557521e+19517 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5172.8MB, alloc=4.7MB, time=490.78
memory used=5176.6MB, alloc=4.7MB, time=491.06
NO POLE
NO POLE
t[1] = 1.482
x1[1] (analytic) = 2.0004089291623623019891855507274
x1[1] (numeric) = 3.5230697810861804501450957649360e+19537
absolute error = 3.5230697810861804501450957649360e+19537
relative error = 1.7611747926767187793335315079332e+19539 %
h = 0.001
x2[1] (analytic) = 1.0039432185068636881505945070912
x2[1] (numeric) = -3.1473045996296838043609678754261e+19535
absolute error = 3.1473045996296838043609678754261e+19535
relative error = 3.1349428350246548673423984098652e+19537 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5180.4MB, alloc=4.7MB, time=491.34
NO POLE
NO POLE
t[1] = 1.483
x1[1] (analytic) = 2.0004085204375963830432615660568
x1[1] (numeric) = -2.8169848625160467746145759018070e+19557
absolute error = 2.8169848625160467746145759018070e+19557
relative error = 1.4082047910392930397394974663230e+19559 %
h = 0.001
x2[1] (analytic) = 1.0039509082686589371466067373873
x2[1] (numeric) = 2.5165296079235027833488219940865e+19555
absolute error = 2.5165296079235027833488219940865e+19555
relative error = 2.5066261579097802498734310695908e+19557 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5184.2MB, alloc=4.7MB, time=491.62
NO POLE
NO POLE
t[1] = 1.484
x1[1] (analytic) = 2.0004081121213509357370915591255
x1[1] (numeric) = 2.2524117342910038407324359857712e+19577
absolute error = 2.2524117342910038407324359857712e+19577
relative error = 1.1259761048971219062850734335244e+19579 %
h = 0.001
x2[1] (analytic) = 1.0039586136298322247501335470448
x2[1] (numeric) = -2.0121729775696826054785291791963e+19575
absolute error = 2.0121729775696826054785291791963e+19575
relative error = 2.0042389698661296470762275075127e+19577 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5188.0MB, alloc=4.7MB, time=491.90
memory used=5191.8MB, alloc=4.7MB, time=492.19
NO POLE
NO POLE
t[1] = 1.485
x1[1] (analytic) = 2.0004077042132176437912018688418
x1[1] (numeric) = -1.8009889539272977272760488620714e+19597
absolute error = 1.8009889539272977272760488620714e+19597
relative error = 9.0031094668056504772658704234552e+19598 %
h = 0.001
x2[1] (analytic) = 1.0039663346214091641359311671921
x2[1] (numeric) = 1.6088982537354349522248644801695e+19595
absolute error = 1.6088982537354349522248644801695e+19595
relative error = 1.6025420357766704209826524061171e+19597 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5195.7MB, alloc=4.7MB, time=492.47
NO POLE
NO POLE
t[1] = 1.486
x1[1] (analytic) = 2.000407296712788599038308203742
x1[1] (numeric) = 1.4400392089899693246629315005263e+19617
absolute error = 1.4400392089899693246629315005263e+19617
relative error = 7.1987300354100090973845477382626e+19618 %
h = 0.001
x2[1] (analytic) = 1.0039740712744776860580407955044
x2[1] (numeric) = -1.2864468511049215006196802010992e+19615
absolute error = 1.2864468511049215006196802010992e+19615
relative error = 1.2813546563726128735040104658508e+19617 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5199.5MB, alloc=4.7MB, time=492.75
NO POLE
NO POLE
t[1] = 1.487
x1[1] (analytic) = 2.0004068896196563010154074407134
x1[1] (numeric) = -1.1514301178285672794264058798296e+19637
absolute error = 1.1514301178285672794264058798296e+19637
relative error = 5.7559795649748653651589477475818e+19638 %
h = 0.001
x2[1] (analytic) = 1.0039818236201881634055072315712
x2[1] (numeric) = 1.0286203598489982970704996070332e+19635
absolute error = 1.0286203598489982970704996070332e+19635
relative error = 1.0245408190159934879528156825693e+19637 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5203.3MB, alloc=4.7MB, time=493.03
memory used=5207.1MB, alloc=4.7MB, time=493.32
NO POLE
NO POLE
t[1] = 1.488
x1[1] (analytic) = 2.000406482933413656556277128033
x1[1] (numeric) = 9.2066334580751210905931280497206e+19656
absolute error = 9.2066334580751210905931280497206e+19656
relative error = 4.6023813343048323018147952800210e+19658 %
h = 0.001
x2[1] (analytic) = 1.0039895916897535360076622833087
x2[1] (numeric) = -8.2246681531158592380472083149086e+19654
absolute error = 8.2246681531158592380472083149086e+19654
relative error = 8.1919854759384734389096211540317e+19656 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5210.9MB, alloc=4.7MB, time=493.60
NO POLE
NO POLE
t[1] = 1.489
x1[1] (analytic) = 2.0004060766536539793843822852204
x1[1] (numeric) = -7.3614627860523115467316708420420e+19676
absolute error = 7.3614627860523115467316708420420e+19676
relative error = 3.6799842151883541971415658429594e+19678 %
h = 0.001
x2[1] (analytic) = 1.0039973755144494356894723694689
x2[1] (numeric) = 6.5763005350981546561618636303522e+19674
absolute error = 6.5763005350981546561618636303522e+19674
relative error = 6.5501172567592126719676053683873e+19676 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5214.7MB, alloc=4.7MB, time=493.87
memory used=5218.5MB, alloc=4.7MB, time=494.16
NO POLE
NO POLE
t[1] = 1.49
x1[1] (analytic) = 2.0004056707799709897061890926124
x1[1] (numeric) = 5.8860966494655131088900704525237e+19696
absolute error = 5.8860966494655131088900704525237e+19696
relative error = 2.9424514914369775341376226479391e+19698 %
h = 0.001
x2[1] (analytic) = 1.004005175125614311577450743346
x2[1] (numeric) = -5.2582946719313130257733313885383e+19694
absolute error = 5.2582946719313130257733313885383e+19694
relative error = 5.2373182949713689410400845510701e+19696 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5222.4MB, alloc=4.7MB, time=494.44
NO POLE
NO POLE
t[1] = 1.491
x1[1] (analytic) = 2.0004052653119588138048850639726
x1[1] (numeric) = -4.7064197393611519380013999639573e+19716
absolute error = 4.7064197393611519380013999639573e+19716
relative error = 2.3527331291178120858636871330939e+19718 %
h = 0.001
x2[1] (analytic) = 1.0040129905546495556566357648431
x2[1] (numeric) = 4.2044402790433830884583103830451e+19714
absolute error = 4.2044402790433830884583103830451e+19714
relative error = 4.1876353379857296557413063949458e+19716 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5226.2MB, alloc=4.7MB, time=494.72
NO POLE
NO POLE
t[1] = 1.492
x1[1] (analytic) = 2.000404860249211983634505295856
x1[1] (numeric) = 3.7631707534159600959687477306047e+19736
absolute error = 3.7631707534159600959687477306047e+19736
relative error = 1.8812045642336328731443888555638e+19738 %
h = 0.001
x2[1] (analytic) = 1.0040208218330196285791376521169
x2[1] (numeric) = -3.3617967730875985982387196380952e+19734
absolute error = 3.3617967730875985982387196380952e+19734
relative error = 3.3483337197629399426994482914952e+19736 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5230.0MB, alloc=4.7MB, time=495.00
memory used=5233.8MB, alloc=4.7MB, time=495.30
NO POLE
NO POLE
t[1] = 1.493
x1[1] (analytic) = 2.0004044555913254364144643878552
x1[1] (numeric) = -3.0089653927228166126262635423561e+19756
absolute error = 3.0089653927228166126262635423561e+19756
relative error = 1.5041785096571171148276662524717e+19758 %
h = 0.001
x2[1] (analytic) = 1.0040286689922521857247571500936
x2[1] (numeric) = 2.6880337912930492337283552256614e+19754
absolute error = 2.6880337912930492337283552256614e+19754
relative error = 2.6772480451091502192459983561489e+19756 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5237.6MB, alloc=4.7MB, time=495.58
NO POLE
NO POLE
t[1] = 1.494
x1[1] (analytic) = 2.0004040513378945142244936282596
x1[1] (numeric) = 2.4059160021864702660943613756839e+19776
absolute error = 2.4059160021864702660943613756839e+19776
relative error = 1.2027150217864058194997839016544e+19778 %
h = 0.001
x2[1] (analytic) = 1.0040365320639382035141805612314
x2[1] (numeric) = -2.1493047173393214765977875725528e+19774
absolute error = 2.1493047173393214765977875725528e+19774
relative error = 2.1406638590342161724484012405705e+19776 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5241.4MB, alloc=4.7MB, time=495.86
NO POLE
NO POLE
memory used=5245.2MB, alloc=4.7MB, time=496.14
t[1] = 1.495
x1[1] (analytic) = 2.0004036474885149635999830400653
x1[1] (numeric) = -1.9237282766947905267393409023006e+19796
absolute error = 1.9237282766947905267393409023006e+19796
relative error = 9.6167005049706366438431812869429e+19797 %
h = 0.001
x2[1] (analytic) = 1.0040444110797321059752565940121
x2[1] (numeric) = 1.7185463899078796539161749066402e+19794
absolute error = 1.7185463899078796539161749066402e+19794
relative error = 1.7116238793259995322856037569446e+19796 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5249.1MB, alloc=4.7MB, time=496.43
NO POLE
NO POLE
t[1] = 1.496
x1[1] (analytic) = 2.0004032440427829351277278826773
x1[1] (numeric) = 1.5381794207245493913840159340838e+19816
absolute error = 1.5381794207245493913840159340838e+19816
relative error = 7.6893467619854155216254652587178e+19817 %
h = 0.001
x2[1] (analytic) = 1.0040523060713518915628614967645
x2[1] (numeric) = -1.3741195794338070300141901198285e+19814
absolute error = 1.3741195794338070300141901198285e+19814
relative error = 1.3685736999205265584855661483786e+19816 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5252.9MB, alloc=4.7MB, time=496.71
NO POLE
NO POLE
t[1] = 1.497
x1[1] (analytic) = 2.0004028410002949830420792050509
x1[1] (numeric) = -1.2299013114292792906478305351854e+19836
absolute error = 1.2299013114292792906478305351854e+19836
relative error = 6.1482681698965749827337055423862e+19837 %
h = 0.001
x2[1] (analytic) = 1.0040602170705792602328599585772
x2[1] (numeric) = 1.0987219371393037305138038787950e+19834
absolute error = 1.0987219371393037305138038787950e+19834
relative error = 1.0942789271592764772857189074772e+19836 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5256.7MB, alloc=4.7MB, time=496.99
memory used=5260.5MB, alloc=4.7MB, time=497.27
NO POLE
NO POLE
t[1] = 1.498
x1[1] (analytic) = 2.0004024383606480648214980464218
x1[1] (numeric) = 9.8340753716684995912467686714811e+19855
absolute error = 9.8340753716684995912467686714811e+19855
relative error = 4.9160484825881502047203015687619e+19857 %
h = 0.001
x2[1] (analytic) = 1.0040681441092597407706702752387
x2[1] (numeric) = -8.7851880812916971274462095312255e+19853
absolute error = 8.7851880812916971274462095312255e+19853
relative error = 8.7495934741414511131156514895272e+19855 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5264.3MB, alloc=4.7MB, time=497.55
NO POLE
NO POLE
t[1] = 1.499
x1[1] (analytic) = 2.0004020361234395407855128811804
x1[1] (numeric) = -7.8631543455523680774353166385341e+19875
absolute error = 7.8631543455523680774353166385341e+19875
relative error = 3.9307870135896789966835192133770e+19877 %
h = 0.001
x2[1] (analytic) = 1.0040760872193028183749432963576
x2[1] (numeric) = 7.0244824477263827232312399428912e+19873
absolute error = 7.0244824477263827232312399428912e+19873
relative error = 6.9959662789899184213842212354575e+19875 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5268.1MB, alloc=4.7MB, time=497.83
NO POLE
NO POLE
t[1] = 1.5
x1[1] (analytic) = 2.0004016342882671736920799048474
x1[1] (numeric) = 6.2872404293448924253183359607339e+19895
absolute error = 6.2872404293448924253183359607339e+19895
relative error = 3.1429890485876656984058484154899e+19897 %
h = 0.001
x2[1] (analytic) = 1.0040840464326820624968656900721
x2[1] (numeric) = -5.6166530758167921367845060802515e+19893
absolute error = 5.6166530758167921367845060802515e+19893
relative error = 5.5938077054123932187204696372004e+19895 %
h = 0.001
Finished!
Maximum Iterations Reached before Solution Completed!
diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * x1;
diff (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - diff(x1,t,2) - diff (x1,t,1) + x1;
Iterations = 1000
Total Elapsed Time = 8 Minutes 18 Seconds
Elapsed Time(since restart) = 8 Minutes 18 Seconds
Expected Time Remaining = 29 Minutes 0 Seconds
Optimized Time Remaining = 29 Minutes 0 Seconds
Time to Timeout = 6 Minutes 41 Seconds
Percent Done = 22.24 %
> quit
memory used=5271.8MB, alloc=4.7MB, time=498.08