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._|\| |/|_. Copyright (c) Maplesoft, a division of Waterloo Maple Inc. 2008
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> #BEGIN OUTFILE1
>
> # Begin Function number 3
> display_alot := proc(iter)
> global
> DEBUGL,
> INFO,
> ALWAYS,
> glob_iolevel,
> glob_max_terms,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> glob_max_minutes,
> glob_iter,
> glob_small_float,
> centuries_in_millinium,
> djd_debug2,
> djd_debug,
> glob_log10relerr,
> glob_current_iter,
> glob_large_float,
> min_in_hour,
> glob_max_opt_iter,
> glob_log10normmin,
> glob_warned,
> glob_unchanged_h_cnt,
> glob_no_eqs,
> glob_h,
> glob_dump,
> glob_log10_relerr,
> glob_dump_analytic,
> glob_disp_incr,
> glob_html_log,
> glob_optimal_expect_sec,
> glob_optimal_clock_start_sec,
> glob_last_good_h,
> glob_hmax,
> glob_reached_optimal_h,
> glob_smallish_float,
> glob_optimal_start,
> glob_relerr,
> glob_abserr,
> glob_hmin_init,
> glob_almost_1,
> sec_in_min,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_start,
> glob_max_sec,
> glob_max_iter,
> glob_max_hours,
> glob_look_poles,
> glob_not_yet_start_msg,
> glob_clock_sec,
> years_in_century,
> glob_percent_done,
> glob_orig_start_sec,
> glob_max_rel_trunc_err,
> glob_optimal_done,
> glob_not_yet_finished,
> hours_in_day,
> glob_subiter_method,
> glob_max_trunc_err,
> glob_log10_abserr,
> glob_initial_pass,
> glob_clock_start_sec,
> days_in_year,
> glob_log10abserr,
> glob_normmax,
> glob_warned2,
> MAX_UNCHANGED,
> glob_hmin,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_2,
> array_const_2D0,
> array_const_3D0,
> array_const_0D0,
> array_const_4D0,
> #END CONST
> array_norms,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_x2,
> array_t,
> array_x1,
> array_m1,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_x1_init,
> array_pole,
> array_x2_init,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_fact_1,
> array_poles,
> array_real_pole,
> array_x1_higher,
> array_x1_higher_work2,
> array_x1_higher_work,
> array_x2_higher_work2,
> array_x2_higher,
> array_complex_pole,
> array_x1_set_initial,
> array_x2_higher_work,
> array_x2_set_initial,
> array_fact_2,
> 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_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[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_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[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 DEBUGL, INFO, ALWAYS, glob_iolevel, glob_max_terms, DEBUGMASSIVE,
glob_max_minutes, glob_iter, glob_small_float, centuries_in_millinium,
djd_debug2, djd_debug, glob_log10relerr, glob_current_iter,
glob_large_float, min_in_hour, glob_max_opt_iter, glob_log10normmin,
glob_warned, glob_unchanged_h_cnt, glob_no_eqs, glob_h, glob_dump,
glob_log10_relerr, glob_dump_analytic, glob_disp_incr, glob_html_log,
glob_optimal_expect_sec, glob_optimal_clock_start_sec, glob_last_good_h,
glob_hmax, glob_reached_optimal_h, glob_smallish_float, glob_optimal_start,
glob_relerr, glob_abserr, glob_hmin_init, glob_almost_1, sec_in_min,
glob_display_flag, glob_curr_iter_when_opt, glob_start, glob_max_sec,
glob_max_iter, glob_max_hours, glob_look_poles, glob_not_yet_start_msg,
glob_clock_sec, years_in_century, glob_percent_done, glob_orig_start_sec,
glob_max_rel_trunc_err, glob_optimal_done, glob_not_yet_finished,
hours_in_day, glob_subiter_method, glob_max_trunc_err, glob_log10_abserr,
glob_initial_pass, glob_clock_start_sec, days_in_year, glob_log10abserr,
glob_normmax, glob_warned2, MAX_UNCHANGED, glob_hmin, array_const_1,
array_const_2, array_const_2D0, array_const_3D0, array_const_0D0,
array_const_4D0, array_norms, array_tmp10, array_tmp11, array_tmp12,
array_tmp13, array_tmp14, array_tmp15, array_tmp16, array_tmp17, array_x2,
array_t, array_x1, array_m1, array_tmp0, array_tmp1, array_tmp2, array_tmp3,
array_tmp4, array_tmp5, array_tmp6, array_tmp7, array_tmp8, array_tmp9,
array_x1_init, array_pole, array_x2_init, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_fact_1, array_poles,
array_real_pole, array_x1_higher, array_x1_higher_work2,
array_x1_higher_work, array_x2_higher_work2, array_x2_higher,
array_complex_pole, array_x1_set_initial, array_x2_higher_work,
array_x2_set_initial, array_fact_2, 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_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[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_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[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
> DEBUGL,
> INFO,
> ALWAYS,
> glob_iolevel,
> glob_max_terms,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> glob_max_minutes,
> glob_iter,
> glob_small_float,
> centuries_in_millinium,
> djd_debug2,
> djd_debug,
> glob_log10relerr,
> glob_current_iter,
> glob_large_float,
> min_in_hour,
> glob_max_opt_iter,
> glob_log10normmin,
> glob_warned,
> glob_unchanged_h_cnt,
> glob_no_eqs,
> glob_h,
> glob_dump,
> glob_log10_relerr,
> glob_dump_analytic,
> glob_disp_incr,
> glob_html_log,
> glob_optimal_expect_sec,
> glob_optimal_clock_start_sec,
> glob_last_good_h,
> glob_hmax,
> glob_reached_optimal_h,
> glob_smallish_float,
> glob_optimal_start,
> glob_relerr,
> glob_abserr,
> glob_hmin_init,
> glob_almost_1,
> sec_in_min,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_start,
> glob_max_sec,
> glob_max_iter,
> glob_max_hours,
> glob_look_poles,
> glob_not_yet_start_msg,
> glob_clock_sec,
> years_in_century,
> glob_percent_done,
> glob_orig_start_sec,
> glob_max_rel_trunc_err,
> glob_optimal_done,
> glob_not_yet_finished,
> hours_in_day,
> glob_subiter_method,
> glob_max_trunc_err,
> glob_log10_abserr,
> glob_initial_pass,
> glob_clock_start_sec,
> days_in_year,
> glob_log10abserr,
> glob_normmax,
> glob_warned2,
> MAX_UNCHANGED,
> glob_hmin,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_2,
> array_const_2D0,
> array_const_3D0,
> array_const_0D0,
> array_const_4D0,
> #END CONST
> array_norms,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_x2,
> array_t,
> array_x1,
> array_m1,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_x1_init,
> array_pole,
> array_x2_init,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_fact_1,
> array_poles,
> array_real_pole,
> array_x1_higher,
> array_x1_higher_work2,
> array_x1_higher_work,
> array_x2_higher_work2,
> array_x2_higher,
> array_complex_pole,
> array_x1_set_initial,
> array_x2_higher_work,
> array_x2_set_initial,
> array_fact_2,
> glob_last;
>
> local hnew, sz2, tmp;
> #TOP ADJUST FOR POLE
>
> hnew := h_param;
> glob_normmax := glob_small_float;
> 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 (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 (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 DEBUGL, INFO, ALWAYS, glob_iolevel, glob_max_terms, DEBUGMASSIVE,
glob_max_minutes, glob_iter, glob_small_float, centuries_in_millinium,
djd_debug2, djd_debug, glob_log10relerr, glob_current_iter,
glob_large_float, min_in_hour, glob_max_opt_iter, glob_log10normmin,
glob_warned, glob_unchanged_h_cnt, glob_no_eqs, glob_h, glob_dump,
glob_log10_relerr, glob_dump_analytic, glob_disp_incr, glob_html_log,
glob_optimal_expect_sec, glob_optimal_clock_start_sec, glob_last_good_h,
glob_hmax, glob_reached_optimal_h, glob_smallish_float, glob_optimal_start,
glob_relerr, glob_abserr, glob_hmin_init, glob_almost_1, sec_in_min,
glob_display_flag, glob_curr_iter_when_opt, glob_start, glob_max_sec,
glob_max_iter, glob_max_hours, glob_look_poles, glob_not_yet_start_msg,
glob_clock_sec, years_in_century, glob_percent_done, glob_orig_start_sec,
glob_max_rel_trunc_err, glob_optimal_done, glob_not_yet_finished,
hours_in_day, glob_subiter_method, glob_max_trunc_err, glob_log10_abserr,
glob_initial_pass, glob_clock_start_sec, days_in_year, glob_log10abserr,
glob_normmax, glob_warned2, MAX_UNCHANGED, glob_hmin, array_const_1,
array_const_2, array_const_2D0, array_const_3D0, array_const_0D0,
array_const_4D0, array_norms, array_tmp10, array_tmp11, array_tmp12,
array_tmp13, array_tmp14, array_tmp15, array_tmp16, array_tmp17, array_x2,
array_t, array_x1, array_m1, array_tmp0, array_tmp1, array_tmp2, array_tmp3,
array_tmp4, array_tmp5, array_tmp6, array_tmp7, array_tmp8, array_tmp9,
array_x1_init, array_pole, array_x2_init, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_fact_1, array_poles,
array_real_pole, array_x1_higher, array_x1_higher_work2,
array_x1_higher_work, array_x2_higher_work2, array_x2_higher,
array_complex_pole, array_x1_set_initial, array_x2_higher_work,
array_x2_set_initial, array_fact_2, glob_last;
hnew := h_param;
glob_normmax := glob_small_float;
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_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_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
> DEBUGL,
> INFO,
> ALWAYS,
> glob_iolevel,
> glob_max_terms,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> glob_max_minutes,
> glob_iter,
> glob_small_float,
> centuries_in_millinium,
> djd_debug2,
> djd_debug,
> glob_log10relerr,
> glob_current_iter,
> glob_large_float,
> min_in_hour,
> glob_max_opt_iter,
> glob_log10normmin,
> glob_warned,
> glob_unchanged_h_cnt,
> glob_no_eqs,
> glob_h,
> glob_dump,
> glob_log10_relerr,
> glob_dump_analytic,
> glob_disp_incr,
> glob_html_log,
> glob_optimal_expect_sec,
> glob_optimal_clock_start_sec,
> glob_last_good_h,
> glob_hmax,
> glob_reached_optimal_h,
> glob_smallish_float,
> glob_optimal_start,
> glob_relerr,
> glob_abserr,
> glob_hmin_init,
> glob_almost_1,
> sec_in_min,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_start,
> glob_max_sec,
> glob_max_iter,
> glob_max_hours,
> glob_look_poles,
> glob_not_yet_start_msg,
> glob_clock_sec,
> years_in_century,
> glob_percent_done,
> glob_orig_start_sec,
> glob_max_rel_trunc_err,
> glob_optimal_done,
> glob_not_yet_finished,
> hours_in_day,
> glob_subiter_method,
> glob_max_trunc_err,
> glob_log10_abserr,
> glob_initial_pass,
> glob_clock_start_sec,
> days_in_year,
> glob_log10abserr,
> glob_normmax,
> glob_warned2,
> MAX_UNCHANGED,
> glob_hmin,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_2,
> array_const_2D0,
> array_const_3D0,
> array_const_0D0,
> array_const_4D0,
> #END CONST
> array_norms,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_x2,
> array_t,
> array_x1,
> array_m1,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_x1_init,
> array_pole,
> array_x2_init,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_fact_1,
> array_poles,
> array_real_pole,
> array_x1_higher,
> array_x1_higher_work2,
> array_x1_higher_work,
> array_x2_higher_work2,
> array_x2_higher,
> array_complex_pole,
> array_x1_set_initial,
> array_x2_higher_work,
> array_x2_set_initial,
> array_fact_2,
> 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 DEBUGL, INFO, ALWAYS, glob_iolevel, glob_max_terms, DEBUGMASSIVE,
glob_max_minutes, glob_iter, glob_small_float, centuries_in_millinium,
djd_debug2, djd_debug, glob_log10relerr, glob_current_iter,
glob_large_float, min_in_hour, glob_max_opt_iter, glob_log10normmin,
glob_warned, glob_unchanged_h_cnt, glob_no_eqs, glob_h, glob_dump,
glob_log10_relerr, glob_dump_analytic, glob_disp_incr, glob_html_log,
glob_optimal_expect_sec, glob_optimal_clock_start_sec, glob_last_good_h,
glob_hmax, glob_reached_optimal_h, glob_smallish_float, glob_optimal_start,
glob_relerr, glob_abserr, glob_hmin_init, glob_almost_1, sec_in_min,
glob_display_flag, glob_curr_iter_when_opt, glob_start, glob_max_sec,
glob_max_iter, glob_max_hours, glob_look_poles, glob_not_yet_start_msg,
glob_clock_sec, years_in_century, glob_percent_done, glob_orig_start_sec,
glob_max_rel_trunc_err, glob_optimal_done, glob_not_yet_finished,
hours_in_day, glob_subiter_method, glob_max_trunc_err, glob_log10_abserr,
glob_initial_pass, glob_clock_start_sec, days_in_year, glob_log10abserr,
glob_normmax, glob_warned2, MAX_UNCHANGED, glob_hmin, array_const_1,
array_const_2, array_const_2D0, array_const_3D0, array_const_0D0,
array_const_4D0, array_norms, array_tmp10, array_tmp11, array_tmp12,
array_tmp13, array_tmp14, array_tmp15, array_tmp16, array_tmp17, array_x2,
array_t, array_x1, array_m1, array_tmp0, array_tmp1, array_tmp2, array_tmp3,
array_tmp4, array_tmp5, array_tmp6, array_tmp7, array_tmp8, array_tmp9,
array_x1_init, array_pole, array_x2_init, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_fact_1, array_poles,
array_real_pole, array_x1_higher, array_x1_higher_work2,
array_x1_higher_work, array_x2_higher_work2, array_x2_higher,
array_complex_pole, array_x1_set_initial, array_x2_higher_work,
array_x2_set_initial, array_fact_2, 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
> DEBUGL,
> INFO,
> ALWAYS,
> glob_iolevel,
> glob_max_terms,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> glob_max_minutes,
> glob_iter,
> glob_small_float,
> centuries_in_millinium,
> djd_debug2,
> djd_debug,
> glob_log10relerr,
> glob_current_iter,
> glob_large_float,
> min_in_hour,
> glob_max_opt_iter,
> glob_log10normmin,
> glob_warned,
> glob_unchanged_h_cnt,
> glob_no_eqs,
> glob_h,
> glob_dump,
> glob_log10_relerr,
> glob_dump_analytic,
> glob_disp_incr,
> glob_html_log,
> glob_optimal_expect_sec,
> glob_optimal_clock_start_sec,
> glob_last_good_h,
> glob_hmax,
> glob_reached_optimal_h,
> glob_smallish_float,
> glob_optimal_start,
> glob_relerr,
> glob_abserr,
> glob_hmin_init,
> glob_almost_1,
> sec_in_min,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_start,
> glob_max_sec,
> glob_max_iter,
> glob_max_hours,
> glob_look_poles,
> glob_not_yet_start_msg,
> glob_clock_sec,
> years_in_century,
> glob_percent_done,
> glob_orig_start_sec,
> glob_max_rel_trunc_err,
> glob_optimal_done,
> glob_not_yet_finished,
> hours_in_day,
> glob_subiter_method,
> glob_max_trunc_err,
> glob_log10_abserr,
> glob_initial_pass,
> glob_clock_start_sec,
> days_in_year,
> glob_log10abserr,
> glob_normmax,
> glob_warned2,
> MAX_UNCHANGED,
> glob_hmin,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_2,
> array_const_2D0,
> array_const_3D0,
> array_const_0D0,
> array_const_4D0,
> #END CONST
> array_norms,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_x2,
> array_t,
> array_x1,
> array_m1,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_x1_init,
> array_pole,
> array_x2_init,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_fact_1,
> array_poles,
> array_real_pole,
> array_x1_higher,
> array_x1_higher_work2,
> array_x1_higher_work,
> array_x2_higher_work2,
> array_x2_higher,
> array_complex_pole,
> array_x1_set_initial,
> array_x2_higher_work,
> array_x2_set_initial,
> array_fact_2,
> 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 - 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[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 - 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[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 - 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 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_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 2
> array_complex_pole[1,1] := glob_large_float;
> array_complex_pole[1,2] := 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 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 - 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 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_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 3
> array_complex_pole[2,1] := glob_large_float;
> array_complex_pole[2,2] := 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 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 DEBUGL, INFO, ALWAYS, glob_iolevel, glob_max_terms, DEBUGMASSIVE,
glob_max_minutes, glob_iter, glob_small_float, centuries_in_millinium,
djd_debug2, djd_debug, glob_log10relerr, glob_current_iter,
glob_large_float, min_in_hour, glob_max_opt_iter, glob_log10normmin,
glob_warned, glob_unchanged_h_cnt, glob_no_eqs, glob_h, glob_dump,
glob_log10_relerr, glob_dump_analytic, glob_disp_incr, glob_html_log,
glob_optimal_expect_sec, glob_optimal_clock_start_sec, glob_last_good_h,
glob_hmax, glob_reached_optimal_h, glob_smallish_float, glob_optimal_start,
glob_relerr, glob_abserr, glob_hmin_init, glob_almost_1, sec_in_min,
glob_display_flag, glob_curr_iter_when_opt, glob_start, glob_max_sec,
glob_max_iter, glob_max_hours, glob_look_poles, glob_not_yet_start_msg,
glob_clock_sec, years_in_century, glob_percent_done, glob_orig_start_sec,
glob_max_rel_trunc_err, glob_optimal_done, glob_not_yet_finished,
hours_in_day, glob_subiter_method, glob_max_trunc_err, glob_log10_abserr,
glob_initial_pass, glob_clock_start_sec, days_in_year, glob_log10abserr,
glob_normmax, glob_warned2, MAX_UNCHANGED, glob_hmin, array_const_1,
array_const_2, array_const_2D0, array_const_3D0, array_const_0D0,
array_const_4D0, array_norms, array_tmp10, array_tmp11, array_tmp12,
array_tmp13, array_tmp14, array_tmp15, array_tmp16, array_tmp17, array_x2,
array_t, array_x1, array_m1, array_tmp0, array_tmp1, array_tmp2, array_tmp3,
array_tmp4, array_tmp5, array_tmp6, array_tmp7, array_tmp8, array_tmp9,
array_x1_init, array_pole, array_x2_init, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_fact_1, array_poles,
array_real_pole, array_x1_higher, array_x1_higher_work2,
array_x1_higher_work, array_x2_higher_work2, array_x2_higher,
array_complex_pole, array_x1_set_initial, array_x2_higher_work,
array_x2_set_initial, array_fact_2, glob_last;
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[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 - 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[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 - 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[1, 1] := glob_large_float;
array_complex_pole[1, 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[1, 1] := glob_large_float;
array_complex_pole[1, 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[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 - 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[2, 1] := glob_large_float;
array_complex_pole[2, 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[2, 1] := glob_large_float;
array_complex_pole[2, 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[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
> DEBUGL,
> INFO,
> ALWAYS,
> glob_iolevel,
> glob_max_terms,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> glob_max_minutes,
> glob_iter,
> glob_small_float,
> centuries_in_millinium,
> djd_debug2,
> djd_debug,
> glob_log10relerr,
> glob_current_iter,
> glob_large_float,
> min_in_hour,
> glob_max_opt_iter,
> glob_log10normmin,
> glob_warned,
> glob_unchanged_h_cnt,
> glob_no_eqs,
> glob_h,
> glob_dump,
> glob_log10_relerr,
> glob_dump_analytic,
> glob_disp_incr,
> glob_html_log,
> glob_optimal_expect_sec,
> glob_optimal_clock_start_sec,
> glob_last_good_h,
> glob_hmax,
> glob_reached_optimal_h,
> glob_smallish_float,
> glob_optimal_start,
> glob_relerr,
> glob_abserr,
> glob_hmin_init,
> glob_almost_1,
> sec_in_min,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_start,
> glob_max_sec,
> glob_max_iter,
> glob_max_hours,
> glob_look_poles,
> glob_not_yet_start_msg,
> glob_clock_sec,
> years_in_century,
> glob_percent_done,
> glob_orig_start_sec,
> glob_max_rel_trunc_err,
> glob_optimal_done,
> glob_not_yet_finished,
> hours_in_day,
> glob_subiter_method,
> glob_max_trunc_err,
> glob_log10_abserr,
> glob_initial_pass,
> glob_clock_start_sec,
> days_in_year,
> glob_log10abserr,
> glob_normmax,
> glob_warned2,
> MAX_UNCHANGED,
> glob_hmin,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_2,
> array_const_2D0,
> array_const_3D0,
> array_const_0D0,
> array_const_4D0,
> #END CONST
> array_norms,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_x2,
> array_t,
> array_x1,
> array_m1,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_x1_init,
> array_pole,
> array_x2_init,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_fact_1,
> array_poles,
> array_real_pole,
> array_x1_higher,
> array_x1_higher_work2,
> array_x1_higher_work,
> array_x2_higher_work2,
> array_x2_higher,
> array_complex_pole,
> array_x1_set_initial,
> array_x2_higher_work,
> array_x2_set_initial,
> array_fact_2,
> 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_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
> ;
> 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
> #GET NORMS
> ;
> fi;# end if 3
> ;
> # End Function number 7
> end;
get_norms := proc()
local iii;
global DEBUGL, INFO, ALWAYS, glob_iolevel, glob_max_terms, DEBUGMASSIVE,
glob_max_minutes, glob_iter, glob_small_float, centuries_in_millinium,
djd_debug2, djd_debug, glob_log10relerr, glob_current_iter,
glob_large_float, min_in_hour, glob_max_opt_iter, glob_log10normmin,
glob_warned, glob_unchanged_h_cnt, glob_no_eqs, glob_h, glob_dump,
glob_log10_relerr, glob_dump_analytic, glob_disp_incr, glob_html_log,
glob_optimal_expect_sec, glob_optimal_clock_start_sec, glob_last_good_h,
glob_hmax, glob_reached_optimal_h, glob_smallish_float, glob_optimal_start,
glob_relerr, glob_abserr, glob_hmin_init, glob_almost_1, sec_in_min,
glob_display_flag, glob_curr_iter_when_opt, glob_start, glob_max_sec,
glob_max_iter, glob_max_hours, glob_look_poles, glob_not_yet_start_msg,
glob_clock_sec, years_in_century, glob_percent_done, glob_orig_start_sec,
glob_max_rel_trunc_err, glob_optimal_done, glob_not_yet_finished,
hours_in_day, glob_subiter_method, glob_max_trunc_err, glob_log10_abserr,
glob_initial_pass, glob_clock_start_sec, days_in_year, glob_log10abserr,
glob_normmax, glob_warned2, MAX_UNCHANGED, glob_hmin, array_const_1,
array_const_2, array_const_2D0, array_const_3D0, array_const_0D0,
array_const_4D0, array_norms, array_tmp10, array_tmp11, array_tmp12,
array_tmp13, array_tmp14, array_tmp15, array_tmp16, array_tmp17, array_x2,
array_t, array_x1, array_m1, array_tmp0, array_tmp1, array_tmp2, array_tmp3,
array_tmp4, array_tmp5, array_tmp6, array_tmp7, array_tmp8, array_tmp9,
array_x1_init, array_pole, array_x2_init, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_fact_1, array_poles,
array_real_pole, array_x1_higher, array_x1_higher_work2,
array_x1_higher_work, array_x2_higher_work2, array_x2_higher,
array_complex_pole, array_x1_set_initial, array_x2_higher_work,
array_x2_set_initial, array_fact_2, 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_x2[iii]) then
array_norms[iii] := abs(array_x2[iii])
end if;
iii := iii + 1
end do;
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
end if
end proc
> # Begin Function number 8
> atomall := proc()
> global
> DEBUGL,
> INFO,
> ALWAYS,
> glob_iolevel,
> glob_max_terms,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> glob_max_minutes,
> glob_iter,
> glob_small_float,
> centuries_in_millinium,
> djd_debug2,
> djd_debug,
> glob_log10relerr,
> glob_current_iter,
> glob_large_float,
> min_in_hour,
> glob_max_opt_iter,
> glob_log10normmin,
> glob_warned,
> glob_unchanged_h_cnt,
> glob_no_eqs,
> glob_h,
> glob_dump,
> glob_log10_relerr,
> glob_dump_analytic,
> glob_disp_incr,
> glob_html_log,
> glob_optimal_expect_sec,
> glob_optimal_clock_start_sec,
> glob_last_good_h,
> glob_hmax,
> glob_reached_optimal_h,
> glob_smallish_float,
> glob_optimal_start,
> glob_relerr,
> glob_abserr,
> glob_hmin_init,
> glob_almost_1,
> sec_in_min,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_start,
> glob_max_sec,
> glob_max_iter,
> glob_max_hours,
> glob_look_poles,
> glob_not_yet_start_msg,
> glob_clock_sec,
> years_in_century,
> glob_percent_done,
> glob_orig_start_sec,
> glob_max_rel_trunc_err,
> glob_optimal_done,
> glob_not_yet_finished,
> hours_in_day,
> glob_subiter_method,
> glob_max_trunc_err,
> glob_log10_abserr,
> glob_initial_pass,
> glob_clock_start_sec,
> days_in_year,
> glob_log10abserr,
> glob_normmax,
> glob_warned2,
> MAX_UNCHANGED,
> glob_hmin,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_2,
> array_const_2D0,
> array_const_3D0,
> array_const_0D0,
> array_const_4D0,
> #END CONST
> array_norms,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_x2,
> array_t,
> array_x1,
> array_m1,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_x1_init,
> array_pole,
> array_x2_init,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_fact_1,
> array_poles,
> array_real_pole,
> array_x1_higher,
> array_x1_higher_work2,
> array_x1_higher_work,
> array_x2_higher_work2,
> array_x2_higher,
> array_complex_pole,
> array_x1_set_initial,
> array_x2_higher_work,
> array_x2_set_initial,
> array_fact_2,
> glob_last;
>
> local kkk, order_d, adj2, temporary, term;
> #TOP ATOMALL
> #END OUTFILE1
> #BEGIN ATOMHDR1
> #emit pre diff $eq_no = 1 i = 1
> array_tmp1[1] := array_x2_higher[2,1];
> # emit pre mult $eq_no = 1 i = 1
> array_tmp2[1] := (array_const_3D0[1] * (array_tmp1[1]));
> #emit pre add $eq_no = 1 i = 1
> array_tmp3[1] := array_const_0D0[1] + array_tmp2[1];
> # emit pre mult $eq_no = 1 i = 1
> array_tmp4[1] := (array_const_2D0[1] * (array_x2[1]));
> #emit pre sub $eq_no = 1 i = 1
> array_tmp5[1] := (array_tmp3[1] - (array_tmp4[1]));
> #emit pre diff $eq_no = 1 i = 1
> array_tmp6[1] := array_x1_higher[3,1];
> #emit pre sub $eq_no = 1 i = 1
> array_tmp7[1] := (array_tmp5[1] - (array_tmp6[1]));
> #emit pre diff $eq_no = 1 i = 1
> array_tmp8[1] := array_x1_higher[2,1];
> #emit pre sub $eq_no = 1 i = 1
> array_tmp9[1] := (array_tmp7[1] - (array_tmp8[1]));
> #emit pre add $eq_no = 1 i = 1
> array_tmp10[1] := array_tmp9[1] + array_x1[1];
> #emit pre assign xxx $eq_no = 1 i = 1 $min_hdrs = 5
> if not array_x2_set_initial[1,3] then # if number 1
> if (1 <= glob_max_terms) then # if number 2
> temporary := array_tmp10[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;
> # emit pre mult $eq_no = 2 i = 1
> array_tmp12[1] := (array_const_4D0[1] * (array_x2[1]));
> #emit pre diff $eq_no = 2 i = 1
> array_tmp13[1] := array_x2_higher[2,1];
> # emit pre mult $eq_no = 2 i = 1
> array_tmp14[1] := (array_const_2D0[1] * (array_tmp13[1]));
> #emit pre sub $eq_no = 2 i = 1
> array_tmp15[1] := (array_tmp12[1] - (array_tmp14[1]));
> # emit pre mult $eq_no = 2 i = 1
> array_tmp16[1] := (array_const_2D0[1] * (array_x1[1]));
> #emit pre sub $eq_no = 2 i = 1
> array_tmp17[1] := (array_tmp15[1] - (array_tmp16[1]));
> #emit pre assign xxx $eq_no = 2 i = 1 $min_hdrs = 5
> if not array_x1_set_initial[2,2] then # if number 1
> if (1 <= glob_max_terms) then # if number 2
> temporary := array_tmp17[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;
> #END ATOMHDR1
> #BEGIN ATOMHDR2
> #emit pre diff $eq_no = 1 i = 2
> array_tmp1[2] := array_x2_higher[2,2];
> # emit pre mult $eq_no = 1 i = 2
> array_tmp2[2] := ats(2,array_const_3D0,array_tmp1,1);
> #emit pre add $eq_no = 1 i = 2
> array_tmp3[2] := array_const_0D0[2] + array_tmp2[2];
> # emit pre mult $eq_no = 1 i = 2
> array_tmp4[2] := ats(2,array_const_2D0,array_x2,1);
> #emit pre sub $eq_no = 1 i = 2
> array_tmp5[2] := (array_tmp3[2] - (array_tmp4[2]));
> #emit pre diff $eq_no = 1 i = 2
> array_tmp6[2] := array_x1_higher[3,2];
> #emit pre sub $eq_no = 1 i = 2
> array_tmp7[2] := (array_tmp5[2] - (array_tmp6[2]));
> #emit pre diff $eq_no = 1 i = 2
> array_tmp8[2] := array_x1_higher[2,2];
> #emit pre sub $eq_no = 1 i = 2
> array_tmp9[2] := (array_tmp7[2] - (array_tmp8[2]));
> #emit pre add $eq_no = 1 i = 2
> array_tmp10[2] := array_tmp9[2] + array_x1[2];
> #emit pre assign xxx $eq_no = 1 i = 2 $min_hdrs = 5
> if not array_x2_set_initial[1,4] then # if number 1
> if (2 <= glob_max_terms) then # if number 2
> temporary := array_tmp10[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;
> # emit pre mult $eq_no = 2 i = 2
> array_tmp12[2] := ats(2,array_const_4D0,array_x2,1);
> #emit pre diff $eq_no = 2 i = 2
> array_tmp13[2] := array_x2_higher[2,2];
> # emit pre mult $eq_no = 2 i = 2
> array_tmp14[2] := ats(2,array_const_2D0,array_tmp13,1);
> #emit pre sub $eq_no = 2 i = 2
> array_tmp15[2] := (array_tmp12[2] - (array_tmp14[2]));
> # emit pre mult $eq_no = 2 i = 2
> array_tmp16[2] := ats(2,array_const_2D0,array_x1,1);
> #emit pre sub $eq_no = 2 i = 2
> array_tmp17[2] := (array_tmp15[2] - (array_tmp16[2]));
> #emit pre assign xxx $eq_no = 2 i = 2 $min_hdrs = 5
> if not array_x1_set_initial[2,3] then # if number 1
> if (2 <= glob_max_terms) then # if number 2
> temporary := array_tmp17[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;
> #END ATOMHDR2
> #BEGIN ATOMHDR3
> #emit pre diff $eq_no = 1 i = 3
> array_tmp1[3] := array_x2_higher[2,3];
> # emit pre mult $eq_no = 1 i = 3
> array_tmp2[3] := ats(3,array_const_3D0,array_tmp1,1);
> #emit pre add $eq_no = 1 i = 3
> array_tmp3[3] := array_const_0D0[3] + array_tmp2[3];
> # emit pre mult $eq_no = 1 i = 3
> array_tmp4[3] := ats(3,array_const_2D0,array_x2,1);
> #emit pre sub $eq_no = 1 i = 3
> array_tmp5[3] := (array_tmp3[3] - (array_tmp4[3]));
> #emit pre diff $eq_no = 1 i = 3
> array_tmp6[3] := array_x1_higher[3,3];
> #emit pre sub $eq_no = 1 i = 3
> array_tmp7[3] := (array_tmp5[3] - (array_tmp6[3]));
> #emit pre diff $eq_no = 1 i = 3
> array_tmp8[3] := array_x1_higher[2,3];
> #emit pre sub $eq_no = 1 i = 3
> array_tmp9[3] := (array_tmp7[3] - (array_tmp8[3]));
> #emit pre add $eq_no = 1 i = 3
> array_tmp10[3] := array_tmp9[3] + array_x1[3];
> #emit pre assign xxx $eq_no = 1 i = 3 $min_hdrs = 5
> if not array_x2_set_initial[1,5] then # if number 1
> if (3 <= glob_max_terms) then # if number 2
> temporary := array_tmp10[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;
> # emit pre mult $eq_no = 2 i = 3
> array_tmp12[3] := ats(3,array_const_4D0,array_x2,1);
> #emit pre diff $eq_no = 2 i = 3
> array_tmp13[3] := array_x2_higher[2,3];
> # emit pre mult $eq_no = 2 i = 3
> array_tmp14[3] := ats(3,array_const_2D0,array_tmp13,1);
> #emit pre sub $eq_no = 2 i = 3
> array_tmp15[3] := (array_tmp12[3] - (array_tmp14[3]));
> # emit pre mult $eq_no = 2 i = 3
> array_tmp16[3] := ats(3,array_const_2D0,array_x1,1);
> #emit pre sub $eq_no = 2 i = 3
> array_tmp17[3] := (array_tmp15[3] - (array_tmp16[3]));
> #emit pre assign xxx $eq_no = 2 i = 3 $min_hdrs = 5
> if not array_x1_set_initial[2,4] then # if number 1
> if (3 <= glob_max_terms) then # if number 2
> temporary := array_tmp17[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;
> #END ATOMHDR3
> #BEGIN ATOMHDR4
> #emit pre diff $eq_no = 1 i = 4
> array_tmp1[4] := array_x2_higher[2,4];
> # emit pre mult $eq_no = 1 i = 4
> array_tmp2[4] := ats(4,array_const_3D0,array_tmp1,1);
> #emit pre add $eq_no = 1 i = 4
> array_tmp3[4] := array_const_0D0[4] + array_tmp2[4];
> # emit pre mult $eq_no = 1 i = 4
> array_tmp4[4] := ats(4,array_const_2D0,array_x2,1);
> #emit pre sub $eq_no = 1 i = 4
> array_tmp5[4] := (array_tmp3[4] - (array_tmp4[4]));
> #emit pre diff $eq_no = 1 i = 4
> array_tmp6[4] := array_x1_higher[3,4];
> #emit pre sub $eq_no = 1 i = 4
> array_tmp7[4] := (array_tmp5[4] - (array_tmp6[4]));
> #emit pre diff $eq_no = 1 i = 4
> array_tmp8[4] := array_x1_higher[2,4];
> #emit pre sub $eq_no = 1 i = 4
> array_tmp9[4] := (array_tmp7[4] - (array_tmp8[4]));
> #emit pre add $eq_no = 1 i = 4
> array_tmp10[4] := array_tmp9[4] + array_x1[4];
> #emit pre assign xxx $eq_no = 1 i = 4 $min_hdrs = 5
> if not array_x2_set_initial[1,6] then # if number 1
> if (4 <= glob_max_terms) then # if number 2
> temporary := array_tmp10[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;
> # emit pre mult $eq_no = 2 i = 4
> array_tmp12[4] := ats(4,array_const_4D0,array_x2,1);
> #emit pre diff $eq_no = 2 i = 4
> array_tmp13[4] := array_x2_higher[2,4];
> # emit pre mult $eq_no = 2 i = 4
> array_tmp14[4] := ats(4,array_const_2D0,array_tmp13,1);
> #emit pre sub $eq_no = 2 i = 4
> array_tmp15[4] := (array_tmp12[4] - (array_tmp14[4]));
> # emit pre mult $eq_no = 2 i = 4
> array_tmp16[4] := ats(4,array_const_2D0,array_x1,1);
> #emit pre sub $eq_no = 2 i = 4
> array_tmp17[4] := (array_tmp15[4] - (array_tmp16[4]));
> #emit pre assign xxx $eq_no = 2 i = 4 $min_hdrs = 5
> if not array_x1_set_initial[2,5] then # if number 1
> if (4 <= glob_max_terms) then # if number 2
> temporary := array_tmp17[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;
> #END ATOMHDR4
> #BEGIN ATOMHDR5
> #emit pre diff $eq_no = 1 i = 5
> array_tmp1[5] := array_x2_higher[2,5];
> # emit pre mult $eq_no = 1 i = 5
> array_tmp2[5] := ats(5,array_const_3D0,array_tmp1,1);
> #emit pre add $eq_no = 1 i = 5
> array_tmp3[5] := array_const_0D0[5] + array_tmp2[5];
> # emit pre mult $eq_no = 1 i = 5
> array_tmp4[5] := ats(5,array_const_2D0,array_x2,1);
> #emit pre sub $eq_no = 1 i = 5
> array_tmp5[5] := (array_tmp3[5] - (array_tmp4[5]));
> #emit pre diff $eq_no = 1 i = 5
> array_tmp6[5] := array_x1_higher[3,5];
> #emit pre sub $eq_no = 1 i = 5
> array_tmp7[5] := (array_tmp5[5] - (array_tmp6[5]));
> #emit pre diff $eq_no = 1 i = 5
> array_tmp8[5] := array_x1_higher[2,5];
> #emit pre sub $eq_no = 1 i = 5
> array_tmp9[5] := (array_tmp7[5] - (array_tmp8[5]));
> #emit pre add $eq_no = 1 i = 5
> array_tmp10[5] := array_tmp9[5] + array_x1[5];
> #emit pre assign xxx $eq_no = 1 i = 5 $min_hdrs = 5
> if not array_x2_set_initial[1,7] then # if number 1
> if (5 <= glob_max_terms) then # if number 2
> temporary := array_tmp10[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;
> # emit pre mult $eq_no = 2 i = 5
> array_tmp12[5] := ats(5,array_const_4D0,array_x2,1);
> #emit pre diff $eq_no = 2 i = 5
> array_tmp13[5] := array_x2_higher[2,5];
> # emit pre mult $eq_no = 2 i = 5
> array_tmp14[5] := ats(5,array_const_2D0,array_tmp13,1);
> #emit pre sub $eq_no = 2 i = 5
> array_tmp15[5] := (array_tmp12[5] - (array_tmp14[5]));
> # emit pre mult $eq_no = 2 i = 5
> array_tmp16[5] := ats(5,array_const_2D0,array_x1,1);
> #emit pre sub $eq_no = 2 i = 5
> array_tmp17[5] := (array_tmp15[5] - (array_tmp16[5]));
> #emit pre assign xxx $eq_no = 2 i = 5 $min_hdrs = 5
> if not array_x1_set_initial[2,6] then # if number 1
> if (5 <= glob_max_terms) then # if number 2
> temporary := array_tmp17[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;
> #END ATOMHDR5
> #BEGIN OUTFILE3
> #Top Atomall While Loop-- outfile3
> while (kkk <= glob_max_terms) do # do number 1
> #END OUTFILE3
> #BEGIN OUTFILE4
> #emit diff $eq_no = 1
> array_tmp1[kkk] := array_x2_higher[2,kkk];
> #emit mult $eq_no = 1
> array_tmp2[kkk] := ats(kkk,array_const_3D0,array_tmp1,1);
> #emit add $eq_no = 1
> array_tmp3[kkk] := array_const_0D0[kkk] + array_tmp2[kkk];
> #emit mult $eq_no = 1
> array_tmp4[kkk] := ats(kkk,array_const_2D0,array_x2,1);
> #emit sub $eq_no = 1
> array_tmp5[kkk] := (array_tmp3[kkk] - (array_tmp4[kkk]));
> #emit diff $eq_no = 1
> array_tmp6[kkk] := array_x1_higher[3,kkk];
> #emit sub $eq_no = 1
> array_tmp7[kkk] := (array_tmp5[kkk] - (array_tmp6[kkk]));
> #emit diff $eq_no = 1
> array_tmp8[kkk] := array_x1_higher[2,kkk];
> #emit sub $eq_no = 1
> array_tmp9[kkk] := (array_tmp7[kkk] - (array_tmp8[kkk]));
> #emit add $eq_no = 1
> array_tmp10[kkk] := array_tmp9[kkk] + array_x1[kkk];
> #emit assign $eq_no = 1
> order_d := 2;
> if (kkk + order_d + 1 <= glob_max_terms) then # if number 1
> if not array_x2_set_initial[1,kkk + order_d] then # if number 2
> temporary := array_tmp10[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
> ;
> #emit mult $eq_no = 2
> array_tmp12[kkk] := ats(kkk,array_const_4D0,array_x2,1);
> #emit diff $eq_no = 2
> array_tmp13[kkk] := array_x2_higher[2,kkk];
> #emit mult $eq_no = 2
> array_tmp14[kkk] := ats(kkk,array_const_2D0,array_tmp13,1);
> #emit sub $eq_no = 2
> array_tmp15[kkk] := (array_tmp12[kkk] - (array_tmp14[kkk]));
> #emit mult $eq_no = 2
> array_tmp16[kkk] := ats(kkk,array_const_2D0,array_x1,1);
> #emit sub $eq_no = 2
> array_tmp17[kkk] := (array_tmp15[kkk] - (array_tmp16[kkk]));
> #emit assign $eq_no = 2
> order_d := 1;
> if (kkk + order_d + 1 <= glob_max_terms) then # if number 1
> if not array_x1_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_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
> ;
> 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 DEBUGL, INFO, ALWAYS, glob_iolevel, glob_max_terms, DEBUGMASSIVE,
glob_max_minutes, glob_iter, glob_small_float, centuries_in_millinium,
djd_debug2, djd_debug, glob_log10relerr, glob_current_iter,
glob_large_float, min_in_hour, glob_max_opt_iter, glob_log10normmin,
glob_warned, glob_unchanged_h_cnt, glob_no_eqs, glob_h, glob_dump,
glob_log10_relerr, glob_dump_analytic, glob_disp_incr, glob_html_log,
glob_optimal_expect_sec, glob_optimal_clock_start_sec, glob_last_good_h,
glob_hmax, glob_reached_optimal_h, glob_smallish_float, glob_optimal_start,
glob_relerr, glob_abserr, glob_hmin_init, glob_almost_1, sec_in_min,
glob_display_flag, glob_curr_iter_when_opt, glob_start, glob_max_sec,
glob_max_iter, glob_max_hours, glob_look_poles, glob_not_yet_start_msg,
glob_clock_sec, years_in_century, glob_percent_done, glob_orig_start_sec,
glob_max_rel_trunc_err, glob_optimal_done, glob_not_yet_finished,
hours_in_day, glob_subiter_method, glob_max_trunc_err, glob_log10_abserr,
glob_initial_pass, glob_clock_start_sec, days_in_year, glob_log10abserr,
glob_normmax, glob_warned2, MAX_UNCHANGED, glob_hmin, array_const_1,
array_const_2, array_const_2D0, array_const_3D0, array_const_0D0,
array_const_4D0, array_norms, array_tmp10, array_tmp11, array_tmp12,
array_tmp13, array_tmp14, array_tmp15, array_tmp16, array_tmp17, array_x2,
array_t, array_x1, array_m1, array_tmp0, array_tmp1, array_tmp2, array_tmp3,
array_tmp4, array_tmp5, array_tmp6, array_tmp7, array_tmp8, array_tmp9,
array_x1_init, array_pole, array_x2_init, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_fact_1, array_poles,
array_real_pole, array_x1_higher, array_x1_higher_work2,
array_x1_higher_work, array_x2_higher_work2, array_x2_higher,
array_complex_pole, array_x1_set_initial, array_x2_higher_work,
array_x2_set_initial, array_fact_2, glob_last;
array_tmp1[1] := array_x2_higher[2, 1];
array_tmp2[1] := array_const_3D0[1]*array_tmp1[1];
array_tmp3[1] := array_const_0D0[1] + array_tmp2[1];
array_tmp4[1] := array_const_2D0[1]*array_x2[1];
array_tmp5[1] := array_tmp3[1] - array_tmp4[1];
array_tmp6[1] := array_x1_higher[3, 1];
array_tmp7[1] := array_tmp5[1] - array_tmp6[1];
array_tmp8[1] := array_x1_higher[2, 1];
array_tmp9[1] := array_tmp7[1] - array_tmp8[1];
array_tmp10[1] := array_tmp9[1] + array_x1[1];
if not array_x2_set_initial[1, 3] then
if 1 <= glob_max_terms then
temporary := array_tmp10[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_tmp12[1] := array_const_4D0[1]*array_x2[1];
array_tmp13[1] := array_x2_higher[2, 1];
array_tmp14[1] := array_const_2D0[1]*array_tmp13[1];
array_tmp15[1] := array_tmp12[1] - array_tmp14[1];
array_tmp16[1] := array_const_2D0[1]*array_x1[1];
array_tmp17[1] := array_tmp15[1] - array_tmp16[1];
if not array_x1_set_initial[2, 2] then
if 1 <= glob_max_terms then
temporary := array_tmp17[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_tmp1[2] := array_x2_higher[2, 2];
array_tmp2[2] := ats(2, array_const_3D0, array_tmp1, 1);
array_tmp3[2] := array_const_0D0[2] + array_tmp2[2];
array_tmp4[2] := ats(2, array_const_2D0, array_x2, 1);
array_tmp5[2] := array_tmp3[2] - array_tmp4[2];
array_tmp6[2] := array_x1_higher[3, 2];
array_tmp7[2] := array_tmp5[2] - array_tmp6[2];
array_tmp8[2] := array_x1_higher[2, 2];
array_tmp9[2] := array_tmp7[2] - array_tmp8[2];
array_tmp10[2] := array_tmp9[2] + array_x1[2];
if not array_x2_set_initial[1, 4] then
if 2 <= glob_max_terms then
temporary := array_tmp10[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_tmp12[2] := ats(2, array_const_4D0, array_x2, 1);
array_tmp13[2] := array_x2_higher[2, 2];
array_tmp14[2] := ats(2, array_const_2D0, array_tmp13, 1);
array_tmp15[2] := array_tmp12[2] - array_tmp14[2];
array_tmp16[2] := ats(2, array_const_2D0, array_x1, 1);
array_tmp17[2] := array_tmp15[2] - array_tmp16[2];
if not array_x1_set_initial[2, 3] then
if 2 <= glob_max_terms then
temporary := array_tmp17[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_tmp1[3] := array_x2_higher[2, 3];
array_tmp2[3] := ats(3, array_const_3D0, array_tmp1, 1);
array_tmp3[3] := array_const_0D0[3] + array_tmp2[3];
array_tmp4[3] := ats(3, array_const_2D0, array_x2, 1);
array_tmp5[3] := array_tmp3[3] - array_tmp4[3];
array_tmp6[3] := array_x1_higher[3, 3];
array_tmp7[3] := array_tmp5[3] - array_tmp6[3];
array_tmp8[3] := array_x1_higher[2, 3];
array_tmp9[3] := array_tmp7[3] - array_tmp8[3];
array_tmp10[3] := array_tmp9[3] + array_x1[3];
if not array_x2_set_initial[1, 5] then
if 3 <= glob_max_terms then
temporary := array_tmp10[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_tmp12[3] := ats(3, array_const_4D0, array_x2, 1);
array_tmp13[3] := array_x2_higher[2, 3];
array_tmp14[3] := ats(3, array_const_2D0, array_tmp13, 1);
array_tmp15[3] := array_tmp12[3] - array_tmp14[3];
array_tmp16[3] := ats(3, array_const_2D0, array_x1, 1);
array_tmp17[3] := array_tmp15[3] - array_tmp16[3];
if not array_x1_set_initial[2, 4] then
if 3 <= glob_max_terms then
temporary := array_tmp17[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_tmp1[4] := array_x2_higher[2, 4];
array_tmp2[4] := ats(4, array_const_3D0, array_tmp1, 1);
array_tmp3[4] := array_const_0D0[4] + array_tmp2[4];
array_tmp4[4] := ats(4, array_const_2D0, array_x2, 1);
array_tmp5[4] := array_tmp3[4] - array_tmp4[4];
array_tmp6[4] := array_x1_higher[3, 4];
array_tmp7[4] := array_tmp5[4] - array_tmp6[4];
array_tmp8[4] := array_x1_higher[2, 4];
array_tmp9[4] := array_tmp7[4] - array_tmp8[4];
array_tmp10[4] := array_tmp9[4] + array_x1[4];
if not array_x2_set_initial[1, 6] then
if 4 <= glob_max_terms then
temporary := array_tmp10[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_tmp12[4] := ats(4, array_const_4D0, array_x2, 1);
array_tmp13[4] := array_x2_higher[2, 4];
array_tmp14[4] := ats(4, array_const_2D0, array_tmp13, 1);
array_tmp15[4] := array_tmp12[4] - array_tmp14[4];
array_tmp16[4] := ats(4, array_const_2D0, array_x1, 1);
array_tmp17[4] := array_tmp15[4] - array_tmp16[4];
if not array_x1_set_initial[2, 5] then
if 4 <= glob_max_terms then
temporary := array_tmp17[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_tmp1[5] := array_x2_higher[2, 5];
array_tmp2[5] := ats(5, array_const_3D0, array_tmp1, 1);
array_tmp3[5] := array_const_0D0[5] + array_tmp2[5];
array_tmp4[5] := ats(5, array_const_2D0, array_x2, 1);
array_tmp5[5] := array_tmp3[5] - array_tmp4[5];
array_tmp6[5] := array_x1_higher[3, 5];
array_tmp7[5] := array_tmp5[5] - array_tmp6[5];
array_tmp8[5] := array_x1_higher[2, 5];
array_tmp9[5] := array_tmp7[5] - array_tmp8[5];
array_tmp10[5] := array_tmp9[5] + array_x1[5];
if not array_x2_set_initial[1, 7] then
if 5 <= glob_max_terms then
temporary := array_tmp10[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;
array_tmp12[5] := ats(5, array_const_4D0, array_x2, 1);
array_tmp13[5] := array_x2_higher[2, 5];
array_tmp14[5] := ats(5, array_const_2D0, array_tmp13, 1);
array_tmp15[5] := array_tmp12[5] - array_tmp14[5];
array_tmp16[5] := ats(5, array_const_2D0, array_x1, 1);
array_tmp17[5] := array_tmp15[5] - array_tmp16[5];
if not array_x1_set_initial[2, 6] then
if 5 <= glob_max_terms then
temporary := array_tmp17[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;
while kkk <= glob_max_terms do
array_tmp1[kkk] := array_x2_higher[2, kkk];
array_tmp2[kkk] := ats(kkk, array_const_3D0, array_tmp1, 1);
array_tmp3[kkk] := array_const_0D0[kkk] + array_tmp2[kkk];
array_tmp4[kkk] := ats(kkk, array_const_2D0, array_x2, 1);
array_tmp5[kkk] := array_tmp3[kkk] - array_tmp4[kkk];
array_tmp6[kkk] := array_x1_higher[3, kkk];
array_tmp7[kkk] := array_tmp5[kkk] - array_tmp6[kkk];
array_tmp8[kkk] := array_x1_higher[2, kkk];
array_tmp9[kkk] := array_tmp7[kkk] - array_tmp8[kkk];
array_tmp10[kkk] := array_tmp9[kkk] + array_x1[kkk];
order_d := 2;
if kkk + order_d + 1 <= glob_max_terms then
if not array_x2_set_initial[1, kkk + order_d] then
temporary := array_tmp10[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;
array_tmp12[kkk] := ats(kkk, array_const_4D0, array_x2, 1);
array_tmp13[kkk] := array_x2_higher[2, kkk];
array_tmp14[kkk] := ats(kkk, array_const_2D0, array_tmp13, 1);
array_tmp15[kkk] := array_tmp12[kkk] - array_tmp14[kkk];
array_tmp16[kkk] := ats(kkk, array_const_2D0, array_x1, 1);
array_tmp17[kkk] := array_tmp15[kkk] - array_tmp16[kkk];
order_d := 1;
if kkk + order_d + 1 <= glob_max_terms then
if not array_x1_set_initial[2, kkk + order_d] then
temporary := array_tmp17[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;
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)
> if (nnn <= glob_max_terms) then # if number 13
> ret := array_fact_1[nnn];
> else
> ret := nnn!;
> fi;# end if 13
> ;
> ret;
> # End Function number 17
> end;
Warning, `ret` is implicitly declared local to procedure `factorial_1`
factorial_1 := proc(nnn)
local ret;
if nnn <= glob_max_terms then ret := array_fact_1[nnn]
else ret := nnn!
end if;
ret
end proc
> # Begin Function number 18
> factorial_3 := proc(mmm,nnn)
> if (nnn <= glob_max_terms) and (mmm <= glob_max_terms) then # if number 13
> ret := array_fact_2[mmm,nnn];
> else
> ret := (mmm!)/(nnn!);
> fi;# end if 13
> ;
> ret;
> # End Function number 18
> end;
Warning, `ret` is implicitly declared local to procedure `factorial_3`
factorial_3 := proc(mmm, nnn)
local ret;
if nnn <= glob_max_terms and mmm <= glob_max_terms then
ret := array_fact_2[mmm, nnn]
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;
> 1.0 + 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; 1.0 + 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;
> 1.0 + 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;
1.0 + 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,
> 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
> DEBUGL,
> INFO,
> ALWAYS,
> glob_iolevel,
> glob_max_terms,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> glob_max_minutes,
> glob_iter,
> glob_small_float,
> centuries_in_millinium,
> djd_debug2,
> djd_debug,
> glob_log10relerr,
> glob_current_iter,
> glob_large_float,
> min_in_hour,
> glob_max_opt_iter,
> glob_log10normmin,
> glob_warned,
> glob_unchanged_h_cnt,
> glob_no_eqs,
> glob_h,
> glob_dump,
> glob_log10_relerr,
> glob_dump_analytic,
> glob_disp_incr,
> glob_html_log,
> glob_optimal_expect_sec,
> glob_optimal_clock_start_sec,
> glob_last_good_h,
> glob_hmax,
> glob_reached_optimal_h,
> glob_smallish_float,
> glob_optimal_start,
> glob_relerr,
> glob_abserr,
> glob_hmin_init,
> glob_almost_1,
> sec_in_min,
> glob_display_flag,
> glob_curr_iter_when_opt,
> glob_start,
> glob_max_sec,
> glob_max_iter,
> glob_max_hours,
> glob_look_poles,
> glob_not_yet_start_msg,
> glob_clock_sec,
> years_in_century,
> glob_percent_done,
> glob_orig_start_sec,
> glob_max_rel_trunc_err,
> glob_optimal_done,
> glob_not_yet_finished,
> hours_in_day,
> glob_subiter_method,
> glob_max_trunc_err,
> glob_log10_abserr,
> glob_initial_pass,
> glob_clock_start_sec,
> days_in_year,
> glob_log10abserr,
> glob_normmax,
> glob_warned2,
> MAX_UNCHANGED,
> glob_hmin,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_2,
> array_const_2D0,
> array_const_3D0,
> array_const_0D0,
> array_const_4D0,
> #END CONST
> array_norms,
> array_tmp10,
> array_tmp11,
> array_tmp12,
> array_tmp13,
> array_tmp14,
> array_tmp15,
> array_tmp16,
> array_tmp17,
> array_x2,
> array_t,
> array_x1,
> array_m1,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3,
> array_tmp4,
> array_tmp5,
> array_tmp6,
> array_tmp7,
> array_tmp8,
> array_tmp9,
> array_x1_init,
> array_pole,
> array_x2_init,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_fact_1,
> array_poles,
> array_real_pole,
> array_x1_higher,
> array_x1_higher_work2,
> array_x1_higher_work,
> array_x2_higher_work2,
> array_x2_higher,
> array_complex_pole,
> array_x1_set_initial,
> array_x2_higher_work,
> array_x2_set_initial,
> array_fact_2,
> glob_last;
> glob_last;
> ALWAYS := 1;
> INFO := 2;
> DEBUGL := 3;
> DEBUGMASSIVE := 4;
> glob_iolevel := INFO;
> DEBUGL := 3;
> INFO := 2;
> ALWAYS := 1;
> glob_iolevel := 5;
> glob_max_terms := 30;
> DEBUGMASSIVE := 4;
> glob_max_minutes := 0.0;
> glob_iter := 0;
> glob_small_float := 0.1e-50;
> centuries_in_millinium := 10.0;
> djd_debug2 := true;
> djd_debug := true;
> glob_log10relerr := 0.0;
> glob_current_iter := 0;
> glob_large_float := 9.0e100;
> min_in_hour := 60.0;
> glob_max_opt_iter := 10;
> glob_log10normmin := 0.1;
> glob_warned := false;
> glob_unchanged_h_cnt := 0;
> glob_no_eqs := 0;
> glob_h := 0.1;
> glob_dump := false;
> glob_log10_relerr := 0.1e-10;
> glob_dump_analytic := false;
> glob_disp_incr := 0.1;
> glob_html_log := true;
> glob_optimal_expect_sec := 0.1;
> glob_optimal_clock_start_sec := 0.0;
> glob_last_good_h := 0.1;
> glob_hmax := 1.0;
> glob_reached_optimal_h := false;
> glob_smallish_float := 0.1e-100;
> glob_optimal_start := 0.0;
> glob_relerr := 0.1e-10;
> glob_abserr := 0.1e-10;
> glob_hmin_init := 0.001;
> glob_almost_1 := 0.9990;
> sec_in_min := 60.0;
> glob_display_flag := true;
> glob_curr_iter_when_opt := 0;
> glob_start := 0;
> glob_max_sec := 10000.0;
> glob_max_iter := 1000;
> glob_max_hours := 0.0;
> glob_look_poles := false;
> glob_not_yet_start_msg := true;
> glob_clock_sec := 0.0;
> years_in_century := 100.0;
> glob_percent_done := 0.0;
> glob_orig_start_sec := 0.0;
> glob_max_rel_trunc_err := 0.1e-10;
> glob_optimal_done := false;
> glob_not_yet_finished := true;
> hours_in_day := 24.0;
> glob_subiter_method := 3;
> glob_max_trunc_err := 0.1e-10;
> glob_log10_abserr := 0.1e-10;
> glob_initial_pass := true;
> glob_clock_start_sec := 0.0;
> days_in_year := 365.0;
> glob_log10abserr := 0.0;
> glob_normmax := 0.0;
> glob_warned2 := false;
> MAX_UNCHANGED := 10;
> glob_hmin := 0.00000000001;
> #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/mtest6_revpostode.ode#################");
> 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,"diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * 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 complicatedrev.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,"1.0 + 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,"1.0 + 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_norms:= 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_x2:= Array(0..(max_terms + 1),[]);
> array_t:= Array(0..(max_terms + 1),[]);
> array_x1:= Array(0..(max_terms + 1),[]);
> array_m1:= 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_x1_init:= Array(0..(max_terms + 1),[]);
> array_pole:= Array(0..(max_terms + 1),[]);
> array_x2_init:= Array(0..(max_terms + 1),[]);
> array_1st_rel_error:= Array(0..(max_terms + 1),[]);
> array_last_rel_error:= Array(0..(max_terms + 1),[]);
> array_type_pole:= Array(0..(max_terms + 1),[]);
> array_fact_1:= Array(0..(max_terms + 1),[]);
> array_poles := Array(0..(2+ 1) ,(0..3+ 1),[]);
> array_real_pole := Array(0..(2+ 1) ,(0..3+ 1),[]);
> array_x1_higher := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_x1_higher_work2 := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_x1_higher_work := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_x2_higher_work2 := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_x2_higher := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_complex_pole := Array(0..(2+ 1) ,(0..3+ 1),[]);
> array_x1_set_initial := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_x2_higher_work := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_x2_set_initial := Array(0..(3+ 1) ,(0..max_terms+ 1),[]);
> array_fact_2 := Array(0..(max_terms+ 1) ,(0..max_terms+ 1),[]);
> 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_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_x2[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_x1[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_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_x1_init[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_x2_init[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
> ;
> 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_type_pole[term] := 0.0;
> term := term + 1;
> od;# end do number 2
> ;
> term := 1;
> while term <= max_terms do # do number 2
> array_fact_1[term] := 0.0;
> term := term + 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 <=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 <=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_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_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_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[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_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_x2_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_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 <=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
> ;
> #BEGIN ARRAYS DEFINED AND INITIALIZATED
> 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_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_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_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_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_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_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_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_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_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_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_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
> temp1 := iiif !;
> temp2 := jjjf !;
> array_fact_1[iiif] := temp1;
> array_fact_2[iiif,jjjf] := temp1/temp2;
> 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 complicatedrev.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_x2_set_initial[1,1] := true;
> array_x2_set_initial[1,2] := true;
> array_x2_set_initial[1,3] := false;
> array_x2_set_initial[1,4] := false;
> array_x2_set_initial[1,5] := false;
> array_x2_set_initial[1,6] := false;
> array_x2_set_initial[1,7] := false;
> array_x2_set_initial[1,8] := false;
> array_x2_set_initial[1,9] := false;
> array_x2_set_initial[1,10] := false;
> array_x2_set_initial[1,11] := false;
> array_x2_set_initial[1,12] := false;
> array_x2_set_initial[1,13] := false;
> array_x2_set_initial[1,14] := false;
> array_x2_set_initial[1,15] := false;
> array_x2_set_initial[1,16] := false;
> array_x2_set_initial[1,17] := false;
> array_x2_set_initial[1,18] := false;
> array_x2_set_initial[1,19] := false;
> array_x2_set_initial[1,20] := false;
> array_x2_set_initial[1,21] := false;
> array_x2_set_initial[1,22] := false;
> array_x2_set_initial[1,23] := false;
> array_x2_set_initial[1,24] := false;
> array_x2_set_initial[1,25] := false;
> array_x2_set_initial[1,26] := false;
> array_x2_set_initial[1,27] := false;
> array_x2_set_initial[1,28] := false;
> array_x2_set_initial[1,29] := false;
> array_x2_set_initial[1,30] := false;
> array_x1_set_initial[2,1] := true;
> array_x1_set_initial[2,2] := true;
> array_x1_set_initial[2,3] := false;
> array_x1_set_initial[2,4] := false;
> array_x1_set_initial[2,5] := false;
> array_x1_set_initial[2,6] := false;
> array_x1_set_initial[2,7] := false;
> array_x1_set_initial[2,8] := false;
> array_x1_set_initial[2,9] := false;
> array_x1_set_initial[2,10] := false;
> array_x1_set_initial[2,11] := false;
> array_x1_set_initial[2,12] := false;
> array_x1_set_initial[2,13] := false;
> array_x1_set_initial[2,14] := false;
> array_x1_set_initial[2,15] := false;
> array_x1_set_initial[2,16] := false;
> array_x1_set_initial[2,17] := false;
> array_x1_set_initial[2,18] := false;
> array_x1_set_initial[2,19] := false;
> array_x1_set_initial[2,20] := false;
> array_x1_set_initial[2,21] := false;
> array_x1_set_initial[2,22] := false;
> array_x1_set_initial[2,23] := false;
> array_x1_set_initial[2,24] := false;
> array_x1_set_initial[2,25] := false;
> array_x1_set_initial[2,26] := false;
> array_x1_set_initial[2,27] := false;
> array_x1_set_initial[2,28] := false;
> array_x1_set_initial[2,29] := false;
> array_x1_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_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
> ;
> 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
> ;
> current_iter := 1;
> glob_clock_start_sec := elapsed_time_seconds();
> 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)
> ;
> 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)
> ;
> 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_x2
> order_diff := 2;
> #START PART 1 SUM AND ADJUST
> #START SUM AND ADJUST EQ =1
> #sum_and_adjust array_x2
> #BEFORE ADJUST SUBSERIES EQ =1
> 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 =1
> #BEFORE SUM SUBSERIES EQ =1
> 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 =1
> #BEFORE ADJUST SUBSERIES EQ =1
> 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 =1
> #BEFORE SUM SUBSERIES EQ =1
> 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 =1
> #BEFORE ADJUST SUBSERIES EQ =1
> 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 =1
> #BEFORE SUM SUBSERIES EQ =1
> 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 =1
> #BEFORE ADJUST SUBSERIES EQ =1
> 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 =1
> #BEFORE SUM SUBSERIES EQ =1
> 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 =1
> #BEFORE ADJUST SUBSERIES EQ =1
> 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 =1
> #BEFORE SUM SUBSERIES EQ =1
> 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 =1
> #BEFORE ADJUST SUBSERIES EQ =1
> 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 =1
> #BEFORE SUM SUBSERIES EQ =1
> 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 =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_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
> #Jump Series array_x1
> order_diff := 2;
> #START PART 1 SUM AND ADJUST
> #START SUM AND ADJUST EQ =2
> #sum_and_adjust array_x1
> #BEFORE ADJUST SUBSERIES EQ =2
> 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 =2
> #BEFORE SUM SUBSERIES EQ =2
> 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 =2
> #BEFORE ADJUST SUBSERIES EQ =2
> 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 =2
> #BEFORE SUM SUBSERIES EQ =2
> 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 =2
> #BEFORE ADJUST SUBSERIES EQ =2
> 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 =2
> #BEFORE SUM SUBSERIES EQ =2
> 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 =2
> #BEFORE ADJUST SUBSERIES EQ =2
> 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 =2
> #BEFORE SUM SUBSERIES EQ =2
> 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 =2
> #BEFORE ADJUST SUBSERIES EQ =2
> 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 =2
> #BEFORE SUM SUBSERIES EQ =2
> 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 =2
> #BEFORE ADJUST SUBSERIES EQ =2
> 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 =2
> #BEFORE SUM SUBSERIES EQ =2
> 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 =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_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
> 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 (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - diff(x1,t,2) - diff (x1,t,1) + x1;");
> omniout_str(INFO,"diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * 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,"2012-06-17T00:16:17-05:00")
> ;
> logitem_str(html_log_file,"Maple")
> ;
> logitem_str(html_log_file,"mtest6_rev")
> ;
> 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;")
> ;
> 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," 091 | ")
> ;
> logitem_str(html_log_file,"mtest6_rev diffeq.mxt")
> ;
> logitem_str(html_log_file,"mtest6_rev maple results")
> ;
> logitem_str(html_log_file,"Test of revised logic - mostly for speeding factorials")
> ;
> logend(html_log_file)
> ;
> logditto(html_log_file)
> ;
> logditto(html_log_file)
> ;
> logditto(html_log_file)
> ;
> logitem_str(html_log_file,"diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * 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, `iiif` is implicitly declared local to procedure `mainprog`
Warning, `jjjf` is implicitly declared local to procedure `mainprog`
Warning, `temp1` is implicitly declared local to procedure `mainprog`
Warning, `temp2` is implicitly declared local to procedure `mainprog`
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, rows, r_order, sub_iter, calc_term, iii, temp_sum,
current_iter, t_start, t_end, it, log10norm, max_terms, opt_iter, tmp, iiif,
jjjf, temp1, temp2, subiter;
global DEBUGL, INFO, ALWAYS, glob_iolevel, glob_max_terms, DEBUGMASSIVE,
glob_max_minutes, glob_iter, glob_small_float, centuries_in_millinium,
djd_debug2, djd_debug, glob_log10relerr, glob_current_iter,
glob_large_float, min_in_hour, glob_max_opt_iter, glob_log10normmin,
glob_warned, glob_unchanged_h_cnt, glob_no_eqs, glob_h, glob_dump,
glob_log10_relerr, glob_dump_analytic, glob_disp_incr, glob_html_log,
glob_optimal_expect_sec, glob_optimal_clock_start_sec, glob_last_good_h,
glob_hmax, glob_reached_optimal_h, glob_smallish_float, glob_optimal_start,
glob_relerr, glob_abserr, glob_hmin_init, glob_almost_1, sec_in_min,
glob_display_flag, glob_curr_iter_when_opt, glob_start, glob_max_sec,
glob_max_iter, glob_max_hours, glob_look_poles, glob_not_yet_start_msg,
glob_clock_sec, years_in_century, glob_percent_done, glob_orig_start_sec,
glob_max_rel_trunc_err, glob_optimal_done, glob_not_yet_finished,
hours_in_day, glob_subiter_method, glob_max_trunc_err, glob_log10_abserr,
glob_initial_pass, glob_clock_start_sec, days_in_year, glob_log10abserr,
glob_normmax, glob_warned2, MAX_UNCHANGED, glob_hmin, array_const_1,
array_const_2, array_const_2D0, array_const_3D0, array_const_0D0,
array_const_4D0, array_norms, array_tmp10, array_tmp11, array_tmp12,
array_tmp13, array_tmp14, array_tmp15, array_tmp16, array_tmp17, array_x2,
array_t, array_x1, array_m1, array_tmp0, array_tmp1, array_tmp2, array_tmp3,
array_tmp4, array_tmp5, array_tmp6, array_tmp7, array_tmp8, array_tmp9,
array_x1_init, array_pole, array_x2_init, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_fact_1, array_poles,
array_real_pole, array_x1_higher, array_x1_higher_work2,
array_x1_higher_work, array_x2_higher_work2, array_x2_higher,
array_complex_pole, array_x1_set_initial, array_x2_higher_work,
array_x2_set_initial, array_fact_2, glob_last;
glob_last;
ALWAYS := 1;
INFO := 2;
DEBUGL := 3;
DEBUGMASSIVE := 4;
glob_iolevel := INFO;
DEBUGL := 3;
INFO := 2;
ALWAYS := 1;
glob_iolevel := 5;
glob_max_terms := 30;
DEBUGMASSIVE := 4;
glob_max_minutes := 0.;
glob_iter := 0;
glob_small_float := 0.1*10^(-50);
centuries_in_millinium := 10.0;
djd_debug2 := true;
djd_debug := true;
glob_log10relerr := 0.;
glob_current_iter := 0;
glob_large_float := 0.90*10^101;
min_in_hour := 60.0;
glob_max_opt_iter := 10;
glob_log10normmin := 0.1;
glob_warned := false;
glob_unchanged_h_cnt := 0;
glob_no_eqs := 0;
glob_h := 0.1;
glob_dump := false;
glob_log10_relerr := 0.1*10^(-10);
glob_dump_analytic := false;
glob_disp_incr := 0.1;
glob_html_log := true;
glob_optimal_expect_sec := 0.1;
glob_optimal_clock_start_sec := 0.;
glob_last_good_h := 0.1;
glob_hmax := 1.0;
glob_reached_optimal_h := false;
glob_smallish_float := 0.1*10^(-100);
glob_optimal_start := 0.;
glob_relerr := 0.1*10^(-10);
glob_abserr := 0.1*10^(-10);
glob_hmin_init := 0.001;
glob_almost_1 := 0.9990;
sec_in_min := 60.0;
glob_display_flag := true;
glob_curr_iter_when_opt := 0;
glob_start := 0;
glob_max_sec := 10000.0;
glob_max_iter := 1000;
glob_max_hours := 0.;
glob_look_poles := false;
glob_not_yet_start_msg := true;
glob_clock_sec := 0.;
years_in_century := 100.0;
glob_percent_done := 0.;
glob_orig_start_sec := 0.;
glob_max_rel_trunc_err := 0.1*10^(-10);
glob_optimal_done := false;
glob_not_yet_finished := true;
hours_in_day := 24.0;
glob_subiter_method := 3;
glob_max_trunc_err := 0.1*10^(-10);
glob_log10_abserr := 0.1*10^(-10);
glob_initial_pass := true;
glob_clock_start_sec := 0.;
days_in_year := 365.0;
glob_log10abserr := 0.;
glob_normmax := 0.;
glob_warned2 := false;
MAX_UNCHANGED := 10;
glob_hmin := 0.1*10^(-10);
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/mtest6_revpostode.ode#################");
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,
"diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * 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 complicatedrev.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, "1.0 + 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, "1.0 + 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_norms := 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_x2 := Array(0 .. max_terms + 1, []);
array_t := Array(0 .. max_terms + 1, []);
array_x1 := Array(0 .. max_terms + 1, []);
array_m1 := 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_x1_init := Array(0 .. max_terms + 1, []);
array_pole := Array(0 .. max_terms + 1, []);
array_x2_init := Array(0 .. max_terms + 1, []);
array_1st_rel_error := Array(0 .. max_terms + 1, []);
array_last_rel_error := Array(0 .. max_terms + 1, []);
array_type_pole := Array(0 .. max_terms + 1, []);
array_fact_1 := Array(0 .. max_terms + 1, []);
array_poles := Array(0 .. 3, 0 .. 4, []);
array_real_pole := Array(0 .. 3, 0 .. 4, []);
array_x1_higher := Array(0 .. 4, 0 .. max_terms + 1, []);
array_x1_higher_work2 := Array(0 .. 4, 0 .. max_terms + 1, []);
array_x1_higher_work := Array(0 .. 4, 0 .. max_terms + 1, []);
array_x2_higher_work2 := Array(0 .. 4, 0 .. max_terms + 1, []);
array_x2_higher := Array(0 .. 4, 0 .. max_terms + 1, []);
array_complex_pole := Array(0 .. 3, 0 .. 4, []);
array_x1_set_initial := Array(0 .. 4, 0 .. max_terms + 1, []);
array_x2_higher_work := Array(0 .. 4, 0 .. max_terms + 1, []);
array_x2_set_initial := Array(0 .. 4, 0 .. max_terms + 1, []);
array_fact_2 := Array(0 .. max_terms + 1, 0 .. max_terms + 1, []);
term := 1;
while term <= max_terms do array_norms[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_x2[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_x1[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_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_x1_init[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_x2_init[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;
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_type_pole[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_fact_1[term] := 0.; term := term + 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 <= 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 <= 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_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_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_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[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_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_x2_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_set_initial[ord, term] := 0.; term := term + 1
end do;
ord := ord + 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;
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_x1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_x1[term] := 0.; term := term + 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_x2 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_x2[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_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_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_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_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_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_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_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
temp1 := iiif!;
temp2 := jjjf!;
array_fact_1[iiif] := temp1;
array_fact_2[iiif, jjjf] := temp1/temp2;
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_x2_set_initial[1, 1] := true;
array_x2_set_initial[1, 2] := true;
array_x2_set_initial[1, 3] := false;
array_x2_set_initial[1, 4] := false;
array_x2_set_initial[1, 5] := false;
array_x2_set_initial[1, 6] := false;
array_x2_set_initial[1, 7] := false;
array_x2_set_initial[1, 8] := false;
array_x2_set_initial[1, 9] := false;
array_x2_set_initial[1, 10] := false;
array_x2_set_initial[1, 11] := false;
array_x2_set_initial[1, 12] := false;
array_x2_set_initial[1, 13] := false;
array_x2_set_initial[1, 14] := false;
array_x2_set_initial[1, 15] := false;
array_x2_set_initial[1, 16] := false;
array_x2_set_initial[1, 17] := false;
array_x2_set_initial[1, 18] := false;
array_x2_set_initial[1, 19] := false;
array_x2_set_initial[1, 20] := false;
array_x2_set_initial[1, 21] := false;
array_x2_set_initial[1, 22] := false;
array_x2_set_initial[1, 23] := false;
array_x2_set_initial[1, 24] := false;
array_x2_set_initial[1, 25] := false;
array_x2_set_initial[1, 26] := false;
array_x2_set_initial[1, 27] := false;
array_x2_set_initial[1, 28] := false;
array_x2_set_initial[1, 29] := false;
array_x2_set_initial[1, 30] := false;
array_x1_set_initial[2, 1] := true;
array_x1_set_initial[2, 2] := true;
array_x1_set_initial[2, 3] := false;
array_x1_set_initial[2, 4] := false;
array_x1_set_initial[2, 5] := false;
array_x1_set_initial[2, 6] := false;
array_x1_set_initial[2, 7] := false;
array_x1_set_initial[2, 8] := false;
array_x1_set_initial[2, 9] := false;
array_x1_set_initial[2, 10] := false;
array_x1_set_initial[2, 11] := false;
array_x1_set_initial[2, 12] := false;
array_x1_set_initial[2, 13] := false;
array_x1_set_initial[2, 14] := false;
array_x1_set_initial[2, 15] := false;
array_x1_set_initial[2, 16] := false;
array_x1_set_initial[2, 17] := false;
array_x1_set_initial[2, 18] := false;
array_x1_set_initial[2, 19] := false;
array_x1_set_initial[2, 20] := false;
array_x1_set_initial[2, 21] := false;
array_x1_set_initial[2, 22] := false;
array_x1_set_initial[2, 23] := false;
array_x1_set_initial[2, 24] := false;
array_x1_set_initial[2, 25] := false;
array_x1_set_initial[2, 26] := false;
array_x1_set_initial[2, 27] := false;
array_x1_set_initial[2, 28] := false;
array_x1_set_initial[2, 29] := false;
array_x1_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_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;
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;
current_iter := 1;
glob_clock_start_sec := elapsed_time_seconds();
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);
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);
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_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;
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;
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 (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - di\
ff(x1,t,2) - diff (x1,t,1) + x1;");
omniout_str(INFO,
"diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * 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, "2012-06-17T00:16:17-05:00");
logitem_str(html_log_file, "Maple");
logitem_str(html_log_file,
"mtest6_rev");
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;");
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, " 091 | ");
logitem_str(html_log_file, "mtest6_rev diffeq.mxt");
logitem_str(html_log_file, "mtest6_rev maple results");
logitem_str(html_log_file,
"Test of revised logic - mostly for speeding factorials");
logend(html_log_file);
logditto(html_log_file);
logditto(html_log_file);
logditto(html_log_file);
logitem_str(html_log_file,
"diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * 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/mtest6_revpostode.ode#################
diff (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - diff(x1,t,2) - diff (x1,t,1) + x1;
diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * x1;
!
#BEGIN FIRST INPUT BLOCK
Digits := 32;
max_terms := 30;
!
#END FIRST INPUT BLOCK
#BEGIN SECOND INPUT BLOCK
#
# was complicatedrev.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;
1.0 + 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;
1.0 + 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
x2[1] (analytic) = 2.0007256155636055990741531973548
x2[1] (numeric) = 2.0007256155636055990741531973548
absolute error = 0
relative error = 0 %
h = 0.001
x1[1] (analytic) = 3.001091755187482740162486839163
x1[1] (numeric) = 3.001091755187482740162486839163
absolute error = 0
relative error = 0 %
h = 0.001
t[1] = 0.5
x2[1] (analytic) = 2.0007256155636055990741531973548
x2[1] (numeric) = 2.0007256155636055990741531973548
absolute error = 0
relative error = 0 %
h = 0.001
x1[1] (analytic) = 3.001091755187482740162486839163
x1[1] (numeric) = 3.001091755187482740162486839163
absolute error = 0
relative error = 0 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3.8MB, alloc=3.1MB, time=0.20
NO POLE
NO POLE
t[1] = 0.501
x2[1] (analytic) = 2.0007265220961263180267211517279
x2[1] (numeric) = -41394603454041.776599648624211238
absolute error = 41394603454043.777326170720337556
relative error = 2068978593369941.0610203901204482 %
h = 0.001
x1[1] (analytic) = 3.001090663977990937446483678202
x1[1] (numeric) = 4633681676255505.3572248195902647
absolute error = 4633681676255502.3561341556122738
relative error = 154399923063753342.56758855986258 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=7.6MB, alloc=4.6MB, time=0.48
memory used=11.4MB, alloc=4.6MB, time=0.76
NO POLE
NO POLE
t[1] = 0.502
x2[1] (analytic) = 2.0007274309894041739636559251805
x2[1] (numeric) = 3.3098399567874852148530424506409e+33
absolute error = 3.3098399567874852148530424506409e+33
relative error = 1.6543182772031549576565142393278e+35 %
h = 0.001
x1[1] (analytic) = 3.0010895738591632036100858259251
x1[1] (numeric) = -3.7050106727393350977048925122387e+35
absolute error = 3.7050106727393350977048925122387e+35
relative error = 1.2345551778966014607621406650493e+37 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=15.2MB, alloc=4.6MB, time=1.04
NO POLE
NO POLE
t[1] = 0.503
x2[1] (analytic) = 2.0007283422476198008492141699459
x2[1] (numeric) = -2.6464900314141795118955903930351e+53
absolute error = 2.6464900314141795118955903930351e+53
relative error = 1.3227633035083166358775020484509e+55 %
h = 0.001
x1[1] (analytic) = 3.0010884848299094197347162072617
x1[1] (numeric) = 2.9624616113477417308516753796743e+55
absolute error = 2.9624616113477417308516753796743e+55
relative error = 9.8712904545220134786840715438276e+56 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=19.0MB, alloc=4.6MB, time=1.33
NO POLE
NO POLE
t[1] = 0.504
memory used=22.8MB, alloc=4.6MB, time=1.61
x2[1] (analytic) = 2.0007292558749627476146876084142
x2[1] (numeric) = 2.1160870549078106514470929107109e+73
absolute error = 2.1160870549078106514470929107109e+73
relative error = 1.0576578758440753695892983738257e+75 %
h = 0.001
x1[1] (analytic) = 3.0010873968891405564758385060019
x1[1] (numeric) = -2.3687323934806121880805630507125e+75
absolute error = 2.3687323934806121880805630507125e+75
relative error = 7.8929137349881469997225234258800e+76 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=26.7MB, alloc=4.7MB, time=1.89
NO POLE
NO POLE
t[1] = 0.505
x2[1] (analytic) = 2.0007301718756314954611192435145
x2[1] (numeric) = -1.6919861290978071557909754189936e+93
absolute error = 1.6919861290978071557909754189936e+93
relative error = 8.4568431709690018590887803270331e+94 %
h = 0.001
x1[1] (analytic) = 3.0010863100357686729739277295073
x1[1] (numeric) = 1.8939969147386760856244237075941e+95
absolute error = 1.8939969147386760856244237075941e+95
relative error = 6.3110378012290567574532633256151e+96 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=30.5MB, alloc=4.7MB, time=2.18
NO POLE
NO POLE
t[1] = 0.506
x2[1] (analytic) = 2.0007310902538334751972044172794
x2[1] (numeric) = 1.3528824603031762771802009397762e+113
absolute error = 1.3528824603031762771802009397762e+113
relative error = 6.7619405071150046025446933088212e+114 %
h = 0.001
x1[1] (analytic) = 3.0010852242687069157665292585244
x1[1] (numeric) = -1.5144067446844686733573933962775e+115
absolute error = 1.5144067446844686733573933962775e+115
relative error = 5.0461970637754666723908778829427e+116 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=34.3MB, alloc=4.7MB, time=2.46
memory used=38.1MB, alloc=4.7MB, time=2.74
NO POLE
NO POLE
t[1] = 0.507
x2[1] (analytic) = 2.00073201101378508461244661319
x2[1] (numeric) = -1.0817411088186133199124917115583e+133
absolute error = 1.0817411088186133199124917115583e+133
relative error = 5.4067266523640386812133174876756e+134 %
h = 0.001
x1[1] (analytic) = 3.0010841395868695177014052941589
x1[1] (numeric) = 1.2108930962341323614273688490354e+135
absolute error = 1.2108930962341323614273688490354e+135
relative error = 4.0348522064457159979280541448295e+136 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=41.9MB, alloc=4.7MB, time=3.03
NO POLE
NO POLE
t[1] = 0.508
x2[1] (analytic) = 2.0007329341597117058856380383748
x2[1] (numeric) = 8.6494123535749983806146135810574e+152
absolute error = 8.6494123535749983806146135810574e+152
relative error = 4.3231218949308029974297723949183e+154 %
h = 0.001
x1[1] (analytic) = 3.0010830559891717968507676151575
x1[1] (numeric) = -9.6820890137608570620725162811492e+154
absolute error = 9.6820890137608570620725162811492e+154
relative error = 3.2261982867946960920503210271933e+156 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=45.7MB, alloc=4.7MB, time=3.31
NO POLE
NO POLE
t[1] = 0.509
x2[1] (analytic) = 2.0007338596958477230287351624915
x2[1] (numeric) = -6.9159185550301895632536165196575e+172
absolute error = 6.9159185550301895632536165196575e+172
relative error = 3.4566909144435382203545564437068e+174 %
h = 0.001
x1[1] (analytic) = 3.0010819734745301554265955597291
x1[1] (numeric) = 7.7416287170129366766006182925666e+174
absolute error = 7.7416287170129366766006182925666e+174
relative error = 2.5796125482203990211210389060639e+176 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=49.5MB, alloc=4.7MB, time=3.60
memory used=53.4MB, alloc=4.7MB, time=3.89
NO POLE
NO POLE
t[1] = 0.51
x2[1] (analytic) = 2.0007347876264365393661995311595
x2[1] (numeric) = 5.5298472895724147133625192455686e+192
absolute error = 5.5298472895724147133625192455686e+192
relative error = 2.7639082020124847382722913507227e+194 %
h = 0.001
x1[1] (analytic) = 3.0010808920418620786970381472244
x1[1] (numeric) = -6.1900706662476135409193765565478e+194
absolute error = 6.1900706662476135409193765565478e+194
relative error = 2.0626137344921885039426897310954e+196 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=57.2MB, alloc=4.7MB, time=4.18
NO POLE
NO POLE
t[1] = 0.511
x2[1] (analytic) = 2.0007357179557305950498743131264
x2[1] (numeric) = -4.4215689937166844189729613530235e+212
absolute error = 4.4215689937166844189729613530235e+212
relative error = 2.2099715389868990902678655862377e+214 %
h = 0.001
x1[1] (analytic) = 3.0010798116900861339038992560756
x1[1] (numeric) = 4.9494720366702835859181843054635e+214
absolute error = 4.9494720366702835859181843054635e+214
relative error = 1.6492303928041627681427731511071e+216 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=61.0MB, alloc=4.7MB, time=4.47
NO POLE
NO POLE
t[1] = 0.512
x2[1] (analytic) = 2.0007366506879913846094671819592
x2[1] (numeric) = 3.5354090886130893801667988960377e+232
absolute error = 3.5354090886130893801667988960377e+232
relative error = 1.7670536936469733099532836998184e+234 %
h = 0.001
x1[1] (analytic) = 3.001078732418121969181204775481
x1[1] (numeric) = -3.9575111113604129711434968428226e+234
absolute error = 3.9575111113604129711434968428226e+234
relative error = 1.3186961970076822098177725518002e+236 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=64.8MB, alloc=4.7MB, time=4.75
memory used=68.6MB, alloc=4.8MB, time=5.04
NO POLE
NO POLE
t[1] = 0.513
x2[1] (analytic) = 2.000737585827489474538710274928
x2[1] (numeric) = -2.8268511565939677057268667616396e+252
absolute error = 2.8268511565939677057268667616396e+252
relative error = 1.4129045091262201164160348901227e+254 %
h = 0.001
x1[1] (analytic) = 3.0010776542248903124748506494008
x1[1] (numeric) = 3.1643565375262814697779523501817e+254
absolute error = 3.1643565375262814697779523501817e+254
relative error = 1.0544067505456010456742950479359e+256 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=72.4MB, alloc=4.8MB, time=5.33
NO POLE
NO POLE
t[1] = 0.514
x2[1] (analytic) = 2.0007385233785045209172681139251
x2[1] (numeric) = 2.2603006501495101103511515814216e+272
absolute error = 2.2603006501495101103511515814216e+272
relative error = 1.1297331579004644389784081136438e+274 %
h = 0.001
x1[1] (analytic) = 3.0010765771093129704633307325147
x1[1] (numeric) = -2.5301640386660212838524573739186e+274
absolute error = 2.5301640386660212838524573739186e+274
relative error = 8.4308546405140967764866939072999e+275 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=76.2MB, alloc=4.8MB, time=5.61
NO POLE
NO POLE
t[1] = 0.515
x2[1] (analytic) = 2.0007394633453252870684645157082
x2[1] (numeric) = -1.8072967928109838442606166098017e+292
absolute error = 1.8072967928109838442606166098017e+292
relative error = 9.0331441245683398381885120813804e+293 %
h = 0.001
x1[1] (analytic) = 3.0010755010703128274795433788656
x1[1] (numeric) = 2.0230748294764752836725238177430e+294
absolute error = 2.0230748294764752836725238177430e+294
relative error = 6.7411660544859988815473689800006e+295 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=80.1MB, alloc=4.8MB, time=5.90
memory used=83.9MB, alloc=4.8MB, time=6.19
NO POLE
NO POLE
t[1] = 0.516
x2[1] (analytic) = 2.0007404057322496612528996614975
x2[1] (numeric) = 1.4450828464296613678421584810616e+312
absolute error = 1.4450828464296613678421584810616e+312
relative error = 7.2227403529683624806101981281845e+313 %
h = 0.001
x1[1] (analytic) = 3.0010744261068138444336756849985
x1[1] (numeric) = -1.6176151834879187410291584734316e+314
absolute error = 1.6176151834879187410291584734316e+314
relative error = 5.3901201830118984032102562409226e+315 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=87.7MB, alloc=4.8MB, time=6.47
NO POLE
NO POLE
t[1] = 0.517
x2[1] (analytic) = 2.0007413505435846743980286389765
x2[1] (numeric) = -1.1554629219461318550048799079792e+332
absolute error = 1.1554629219461318550048799079792e+332
relative error = 5.7751738955772681603393837586923e+333 %
h = 0.001
x1[1] (analytic) = 3.0010733522177410577371643104778
x1[1] (numeric) = 1.2934167553890177440022465444796e+334
absolute error = 1.2934167553890177440022465444796e+334
relative error = 4.3098471899502397614828959134628e+335 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=91.5MB, alloc=4.8MB, time=6.76
NO POLE
NO POLE
t[1] = 0.518
x2[1] (analytic) = 2.000742297783646517863772913053
x2[1] (numeric) = 9.2388790531344654438970308125624e+351
absolute error = 9.2388790531344654438970308125624e+351
relative error = 4.6177256628047389192521851103524e+353 %
h = 0.001
x1[1] (analytic) = 3.0010722794020205782277317997435
x1[1] (numeric) = -1.0341933731815447683625690189140e+354
absolute error = 1.0341933731815447683625690189140e+354
relative error = 3.4460795239080787233533396913794e+355 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=95.3MB, alloc=4.8MB, time=7.04
memory used=99.1MB, alloc=4.8MB, time=7.33
NO POLE
NO POLE
t[1] = 0.519
x2[1] (analytic) = 2.0007432474567605612442363253337
x2[1] (numeric) = -7.3872457988250504011430602989944e+371
absolute error = 7.3872457988250504011430602989944e+371
relative error = 3.6922507714147370887201102531385e+373 %
h = 0.001
x1[1] (analytic) = 3.0010712076585795900954973303432
x1[1] (numeric) = 8.2692289911686990713329234819056e+373
absolute error = 8.2692289911686990713329234819056e+373
relative error = 2.7554257859880336676924309705691e+375 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=102.9MB, alloc=4.8MB, time=7.61
NO POLE
NO POLE
t[1] = 0.52
x2[1] (analytic) = 2.000744199567261370205597366143
x2[1] (numeric) = 5.9067122946851405580326298103885e+391
absolute error = 5.9067122946851405580326298103885e+391
relative error = 2.9522576129235793722402261384715e+393 %
h = 0.001
x1[1] (analytic) = 3.0010701369863463498101608136496
x1[1] (numeric) = -6.6119306003695777396105656689779e+393
absolute error = 6.6119306003695777396105656689779e+393
relative error = 2.2031909614112625246849039346650e+395 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=106.8MB, alloc=4.8MB, time=7.92
NO POLE
NO POLE
t[1] = 0.521
x2[1] (analytic) = 2.0007451541194927243602496070893
x2[1] (numeric) = -4.7229036480326365338573208054035e+411
absolute error = 4.7229036480326365338573208054035e+411
relative error = 2.3605723289186911184318715961506e+413 %
h = 0.001
x1[1] (analytic) = 3.0010690673842501850492592752488
x1[1] (numeric) = 5.2867838477798575702664427876845e+413
absolute error = 5.2867838477798575702664427876845e+413
relative error = 1.7616335142822454630346943081968e+415 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=110.6MB, alloc=4.8MB, time=8.21
memory used=114.4MB, alloc=4.8MB, time=8.50
NO POLE
NO POLE
t[1] = 0.522
x2[1] (analytic) = 2.0007461111178076351772623266334
x2[1] (numeric) = 3.7763509979436041046438239885304e+431
absolute error = 3.7763509979436041046438239885304e+431
relative error = 1.8874713672859642341691752049540e+433 %
h = 0.001
x1[1] (analytic) = 3.0010679988512214936274944432543
x1[1] (numeric) = -4.2272197248385683161519778814026e+433
absolute error = 4.2272197248385683161519778814026e+433
relative error = 1.4085717905947833617465178337096e+435 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=118.2MB, alloc=4.8MB, time=8.79
NO POLE
NO POLE
t[1] = 0.523
x2[1] (analytic) = 2.0007470705665683639292335058661
x2[1] (numeric) = -3.0195040852908605569055363343246e+451
absolute error = 3.0195040852908605569055363343246e+451
relative error = 1.5091883075634353954736476918122e+453 %
h = 0.001
x1[1] (analytic) = 3.0010669313861917424271304738756
x1[1] (numeric) = 3.3800108187832129093684219057802e+453
absolute error = 3.3800108187832129093684219057802e+453
relative error = 1.1262697220891328541155751016045e+455 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=122.0MB, alloc=4.8MB, time=9.08
NO POLE
NO POLE
t[1] = 0.524
x2[1] (analytic) = 2.0007480324701464396756075167266
x2[1] (numeric) = 2.4143425560952995701157005457155e+471
absolute error = 2.4143425560952995701157005457155e+471
relative error = 1.2067199451969594561099664938913e+473 %
h = 0.001
x1[1] (analytic) = 3.0010658649880934663294607446376
x1[1] (numeric) = -2.7025974230681491699151452025053e+473
absolute error = 2.7025974230681491699151452025053e+473
relative error = 9.0054585425730786133570059968705e+474 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=125.8MB, alloc=4.8MB, time=9.37
memory used=129.7MB, alloc=4.8MB, time=9.66
NO POLE
NO POLE
t[1] = 0.525
x2[1] (analytic) = 2.0007489968329226772825299702296
x2[1] (numeric) = -1.9304660015425308938142737603267e+491
absolute error = 1.9304660015425308938142737603267e+491
relative error = 9.6487165786330721183215061156155e+492 %
h = 0.001
x1[1] (analytic) = 3.0010647996558602671473426467186
x1[1] (numeric) = 2.1609495421094586843169260927871e+493
absolute error = 2.1609495421094586843169260927871e+493
relative error = 7.2006094048927576106138683103136e+494 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=133.5MB, alloc=4.8MB, time=9.96
NO POLE
NO POLE
t[1] = 0.526
x2[1] (analytic) = 2.0007499636592871954793123378719
x2[1] (numeric) = 1.5435667874482454510514134631275e+511
absolute error = 1.5435667874482454510514134631275e+511
relative error = 7.7149409745589947623598692613443e+512 %
h = 0.001
x1[1] (analytic) = 3.0010637353884268125587993089415
x1[1] (numeric) = -1.7278573877428458958427428046800e+513
absolute error = 1.7278573877428458958427428046800e+513
relative error = 5.7574831462858279254621084085525e+514 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=137.3MB, alloc=4.8MB, time=10.25
NO POLE
NO POLE
memory used=141.1MB, alloc=4.8MB, time=10.53
t[1] = 0.527
x2[1] (analytic) = 2.000750932953639434951579105303
x2[1] (numeric) = -1.2342089554591956073385710466408e+531
absolute error = 1.2342089554591956073385710466408e+531
relative error = 6.1687286264921321009526451825978e+532 %
h = 0.001
x1[1] (analytic) = 3.0010626721847288350416871870186
x1[1] (numeric) = 1.3815644901468537275223393921500e+533
absolute error = 1.3815644901468537275223393921500e+533
relative error = 4.6035842668393705963211945148011e+534 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=144.9MB, alloc=4.8MB, time=10.82
NO POLE
NO POLE
t[1] = 0.528
x2[1] (analytic) = 2.0007519047203881764711703635398
x2[1] (numeric) = 9.8685185385070534833196293320062e+550
absolute error = 9.8685185385070534833196293320062e+550
relative error = 4.9324049199824264155222616722799e+552 %
h = 0.001
x1[1] (analytic) = 3.0010616100437031308094284527197
x1[1] (numeric) = -1.1046747572889433036676863331303e+553
absolute error = 1.1046747572889433036676863331303e+553
relative error = 3.6809466143311080325632595497864e+554 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=148.7MB, alloc=4.8MB, time=11.11
NO POLE
NO POLE
t[1] = 0.529
x2[1] (analytic) = 2.0007528789639515590628728894916
x2[1] (numeric) = -7.8906944982119067771434374739176e+570
absolute error = 7.8906944982119067771434374739176e+570
relative error = 3.9438626235029782885999924437349e+572 %
h = 0.001
x1[1] (analytic) = 3.0010605489642875587478071186937
x1[1] (numeric) = 8.8327857881008004546812778500157e+572
absolute error = 8.8327857881008004546812778500157e+572
relative error = 2.9432214525458779998435534118637e+574 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=152.5MB, alloc=4.8MB, time=11.40
NO POLE
memory used=156.4MB, alloc=4.8MB, time=11.69
NO POLE
t[1] = 0.53
x2[1] (analytic) = 2.0007538556887570982080529143471
x2[1] (numeric) = 6.3092610528277980614383648072407e+590
absolute error = 6.3092610528277980614383648072407e+590
relative error = 3.1534419063537641238984271201350e+592 %
h = 0.001
x1[1] (analytic) = 3.0010594889454210393528278357407
x1[1] (numeric) = -7.0625407400405312288607175164975e+592
absolute error = 7.0625407400405312288607175164975e+592
relative error = 2.3533491308838811820248744434229e+594 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=160.2MB, alloc=4.8MB, time=11.97
NO POLE
NO POLE
t[1] = 0.531
x2[1] (analytic) = 2.0007548348992417040852639254503
x2[1] (numeric) = -5.0447745812171871664917595942174e+610
absolute error = 5.0447745812171871664917595942174e+610
relative error = 2.5214356567936234558838081805407e+612 %
h = 0.001
x1[1] (analytic) = 3.0010584299860435536696363003938
x1[1] (numeric) = 5.6470838194590920258734391531117e+612
absolute error = 5.6470838194590920258734391531117e+612
relative error = 1.8816973915050877015173494239964e+614 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=164.0MB, alloc=4.8MB, time=12.26
NO POLE
NO POLE
t[1] = 0.532
x2[1] (analytic) = 2.0007558165998516998479029946599
x2[1] (numeric) = 4.0337133560020502474248738494606e+630
absolute error = 4.0337133560020502474248738494606e+630
relative error = 2.0160947790505847352023382489724e+632 %
h = 0.001
x1[1] (analytic) = 3.0010573720850961422325002117293
x1[1] (numeric) = -4.5153092686887178266880028208979e+632
absolute error = 4.5153092686887178266880028208979e+632
relative error = 1.5045727918062222525205728066157e+634 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=167.8MB, alloc=4.8MB, time=12.55
memory used=171.6MB, alloc=4.8MB, time=12.84
NO POLE
NO POLE
t[1] = 0.533
x2[1] (analytic) = 2.000756800795042839938989273852
x2[1] (numeric) = -3.2252865170565352793268951736991e+650
absolute error = 3.2252865170565352793268951736991e+650
relative error = 1.6120332645001630256323835567517e+652 %
h = 0.001
x1[1] (analytic) = 3.0010563152415209040058497173883
x1[1] (numeric) = 3.6103621698781721790360502284874e+652
absolute error = 3.6103621698781721790360502284874e+652
relative error = 1.2030304634878586655072103244917e+654 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=175.4MB, alloc=4.8MB, time=13.13
NO POLE
NO POLE
t[1] = 0.534
x2[1] (analytic) = 2.0007577874892803284431384461841
x2[1] (numeric) = 2.5788825826277649090157211753306e+670
absolute error = 2.5788825826277649090157211753306e+670
relative error = 1.2889529151172088395122824949325e+672 %
h = 0.001
x1[1] (analytic) = 3.0010552594542609953263762898481
x1[1] (numeric) = -2.8867823269773080220236512321484e+672
absolute error = 2.8867823269773080220236512321484e+672
relative error = 9.6192241641770588527340114255944e+673 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=179.2MB, alloc=4.8MB, time=13.41
NO POLE
NO POLE
t[1] = 0.535
x2[1] (analytic) = 2.0007587766870388374758070699952
x2[1] (numeric) = -2.0620293235375445869296582568892e+690
absolute error = 2.0620293235375445869296582568892e+690
relative error = 1.0306236551674463873541688910870e+692 %
h = 0.001
x1[1] (analytic) = 3.0010542047222606288461889750434
x1[1] (numeric) = 2.3082205638194261293794859023552e+692
absolute error = 2.3082205638194261293794859023552e+692
relative error = 7.6913657880199656010789916606017e+693 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=183.1MB, alloc=4.8MB, time=13.70
memory used=186.9MB, alloc=4.8MB, time=13.99
NO POLE
NO POLE
t[1] = 0.536
x2[1] (analytic) = 2.0007597683928025256098809007619
x2[1] (numeric) = 1.6487625143429924801522621464704e+710
absolute error = 1.6487625143429924801522621464704e+710
relative error = 8.2406820668302063103678237685904e+711 %
h = 0.001
x1[1] (analytic) = 3.0010531510444650724770269564933
x1[1] (numeric) = -1.8456127160850358275607475776967e+712
absolute error = 1.8456127160850358275607475776967e+712
relative error = 6.1498834682174888482899499403222e+713 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=190.7MB, alloc=4.8MB, time=14.28
NO POLE
NO POLE
t[1] = 0.537
x2[1] (analytic) = 2.0007607626110650563396814253878
x2[1] (numeric) = -1.3183216153488084202536854406512e+730
absolute error = 1.3183216153488084202536854406512e+730
relative error = 6.5891017056349660647508904381451e+731 %
h = 0.001
x1[1] (analytic) = 3.0010520984198206483355273791457
x1[1] (numeric) = 1.4757195872730555324673176544805e+732
absolute error = 1.4757195872730555324673176544805e+732
relative error = 4.9173407820880003028358833241635e+733 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=194.5MB, alloc=4.8MB, time=14.57
NO POLE
NO POLE
t[1] = 0.538
x2[1] (analytic) = 2.0007617593463296165824649922391
x2[1] (numeric) = 1.0541068627997329988625282243202e+750
absolute error = 1.0541068627997329988625282243202e+750
relative error = 5.2685276389134958628956140766965e+751 %
h = 0.001
x1[1] (analytic) = 3.0010510468472747316895473782086
x1[1] (numeric) = -1.1799595230796072006163887388709e+752
absolute error = 1.1799595230796072006163887388709e+752
relative error = 3.9318209009446950630991087911713e+753 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=198.3MB, alloc=4.8MB, time=14.86
memory used=202.1MB, alloc=4.8MB, time=15.15
NO POLE
NO POLE
t[1] = 0.539
x2[1] (analytic) = 2.0007627586031089352174890697879
x2[1] (numeric) = -8.4284537647325426283894516051599e+769
absolute error = 8.4284537647325426283894516051599e+769
relative error = 4.2126202761876246894547247231825e+771 %
h = 0.001
x1[1] (analytic) = 3.0010499963257757499055392592878
x1[1] (numeric) = 9.4347495832799637484507051255760e+771
absolute error = 9.4347495832799637484507051255760e+771
relative error = 3.1438161959417701982371756493221e+773 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=205.9MB, alloc=4.8MB, time=15.44
NO POLE
NO POLE
t[1] = 0.54
x2[1] (analytic) = 2.0007637603859253016627203164664
x2[1] (numeric) = 6.7392439392295895506421336893954e+789
absolute error = 6.7392439392295895506421336893954e+789
relative error = 3.3683356689395771500306095840483e+791 %
h = 0.001
x1[1] (analytic) = 3.0010489468542731813969777772086
x1[1] (numeric) = -7.5438604425073989161145095945711e+791
absolute error = 7.5438604425073989161145095945711e+791
relative error = 2.5137412205205590160513462567934e+793 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=209.8MB, alloc=4.8MB, time=15.73
NO POLE
NO POLE
t[1] = 0.541
x2[1] (analytic) = 2.0007647646993105844892592943753
x2[1] (numeric) = -5.3885813626319360256059140121307e+809
absolute error = 5.3885813626319360256059140121307e+809
relative error = 2.6932608259131208006692906155644e+811 %
h = 0.001
x1[1] (analytic) = 3.0010478984317175545738384619469
x1[1] (numeric) = 6.0319386194289842065771545252329e+811
absolute error = 6.0319386194289842065771545252329e+811
relative error = 2.0099441340410275718294885794585e+813 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=213.6MB, alloc=4.8MB, time=16.02
memory used=217.4MB, alloc=4.8MB, time=16.31
NO POLE
NO POLE
t[1] = 0.542
x2[1] (analytic) = 2.0007657715478062500735568098295
x2[1] (numeric) = 4.3086152339254326831788121932103e+829
absolute error = 4.3086152339254326831788121932103e+829
relative error = 2.1534830789274539188998882041261e+831 %
h = 0.001
x1[1] (analytic) = 3.001046851057060446793125941149
x1[1] (numeric) = -4.8230324229679908681657125836716e+831
absolute error = 4.8230324229679908681657125836716e+831
relative error = 1.6071166703942563917354635781986e+833 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=221.2MB, alloc=4.8MB, time=16.60
NO POLE
NO POLE
t[1] = 0.543
x2[1] (analytic) = 2.0007667809359633812874970143707
x2[1] (numeric) = -3.4450932415627563221085959213410e+849
absolute error = 3.4450932415627563221085959213410e+849
relative error = 1.7218864659233964506696553979822e+851 %
h = 0.001
x1[1] (analytic) = 3.0010458047292544833104512097672
x1[1] (numeric) = 3.8564122118342379695119316502164e+851
absolute error = 3.8564122118342379695119316502164e+851
relative error = 1.2850227763125235354555024237337e+853 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=225.0MB, alloc=4.8MB, time=16.89
NO POLE
NO POLE
t[1] = 0.544
x2[1] (analytic) = 2.0007677928683426962264225508125
x2[1] (numeric) = 2.7546361878891286290055432014876e+869
absolute error = 2.7546361878891286290055432014876e+869
relative error = 1.3767895493459660208235228471463e+871 %
h = 0.001
x1[1] (analytic) = 3.00104475944725333623265679839
x1[1] (numeric) = -3.0835196290122348806415926707402e+871
absolute error = 3.0835196290122348806415926707402e+871
relative error = 1.0274820524770087591859448022183e+873 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=228.8MB, alloc=4.8MB, time=17.18
memory used=232.7MB, alloc=4.8MB, time=17.47
NO POLE
NO POLE
t[1] = 0.545
x2[1] (analytic) = 2.0007688073495145669751771801329
x2[1] (numeric) = -2.2025588265896362304070003480971e+889
absolute error = 2.2025588265896362304070003480971e+889
relative error = 1.1008562401107400603046153747928e+891 %
h = 0.001
x1[1] (analytic) = 3.0010437152100117234714887928907
x1[1] (numeric) = 2.4655282631161944887424956519295e+891
absolute error = 2.4655282631161944887424956519295e+891
relative error = 8.2155693055062941721514101430187e+892 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=236.5MB, alloc=4.8MB, time=17.76
NO POLE
NO POLE
t[1] = 0.546
x2[1] (analytic) = 2.000769824384059038412241476574
x2[1] (numeric) = 1.7611274424973806585372330247054e+909
absolute error = 1.7611274424973806585372330247054e+909
relative error = 8.8022491194835329806925783280205e+910 %
h = 0.001
x1[1] (analytic) = 3.0010426720164854076983146590661
x1[1] (numeric) = -1.9713931959538172930379860446780e+911
absolute error = 1.9713931959538172930379860446780e+911
relative error = 6.5690275394490891241850977019971e+912 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=240.3MB, alloc=4.8MB, time=18.04
NO POLE
NO POLE
t[1] = 0.547
x2[1] (analytic) = 2.0007708439765658470520373301571
x2[1] (numeric) = -1.4081666429403501193293733002454e+929
absolute error = 1.4081666429403501193293733002454e+929
relative error = 7.0381205682785497383812208730608e+930 %
h = 0.001
x1[1] (analytic) = 3.0010416298656311952998858269846
x1[1] (numeric) = 1.5762914549358988580092132435536e+931
absolute error = 1.5762914549358988580092132435536e+931
relative error = 5.2524811360463394145094137991294e+932 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=244.1MB, alloc=4.8MB, time=18.33
memory used=247.9MB, alloc=4.8MB, time=18.63
NO POLE
NO POLE
t[1] = 0.548
x2[1] (analytic) = 2.0007718661316344399254771479759
x2[1] (numeric) = 1.1259453725154502780760481265954e+949
absolute error = 1.1259453725154502780760481265954e+949
relative error = 5.6275550030218801216329574364094e+950 %
h = 0.001
x1[1] (analytic) = 3.0010405887564069353351439908049
x1[1] (numeric) = -1.2603750261508665523199043222753e+951
absolute error = 1.2603750261508665523199043222753e+951
relative error = 4.1997933345951510063138673169764e+952 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=251.7MB, alloc=4.8MB, time=18.92
NO POLE
NO POLE
t[1] = 0.549
x2[1] (analytic) = 2.0007728908538739934988337980875
x2[1] (numeric) = -9.0028619002208395463433680784875e+968
absolute error = 9.0028619002208395463433680784875e+968
relative error = 4.4996920646893958631916593218000e+970 %
h = 0.001
x1[1] (analytic) = 3.0010395486877715184930700808716
x1[1] (numeric) = 1.0077737854700208319946939853081e+971
absolute error = 1.0077737854700208319946939853081e+971
relative error = 3.3580823215431398048455443297475e+972 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=255.5MB, alloc=4.8MB, time=19.21
NO POLE
NO POLE
t[1] = 0.55
x2[1] (analytic) = 2.0007739181479034326310074925802
x2[1] (numeric) = 7.1985306190630303316593673223354e+988
absolute error = 7.1985306190630303316593673223354e+988
relative error = 3.5978730798963226753598684825034e+990 %
h = 0.001
x1[1] (analytic) = 3.0010385096586848760515748659368
x1[1] (numeric) = -8.0579825973083630878467852895897e+990
absolute error = 8.0579825973083630878467852895897e+990
relative error = 2.6850647105574184325746065879525e+992 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=259.4MB, alloc=4.8MB, time=19.49
memory used=263.2MB, alloc=4.8MB, time=19.78
NO POLE
NO POLE
t[1] = 0.551
x2[1] (analytic) = 2.0007749480183514495692659594676
x2[1] (numeric) = -5.7558189437868487421066497344443e+1008
absolute error = 5.7558189437868487421066497344443e+1008
relative error = 2.8767947886830775070365410807012e+1010 %
h = 0.001
x1[1] (analytic) = 3.001037471668107978837430144399
x1[1] (numeric) = 6.4430216854907462261688105835925e+1010
absolute error = 6.4430216854907462261688105835925e+1010
relative error = 2.1469314349845264575967552286208e+1012 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=267.0MB, alloc=4.8MB, time=20.07
NO POLE
NO POLE
t[1] = 0.552
x2[1] (analytic) = 2.0007759804698565229835344064281
x2[1] (numeric) = 4.6022519687452167204340811676728e+1028
absolute error = 4.6022519687452167204340811676728e+1028
relative error = 2.3002335162302563220735704628877e+1030 %
h = 0.001
x1[1] (analytic) = 3.0010364347150028361872394844887
x1[1] (numeric) = -5.1517272392187339269933733360092e+1030
absolute error = 5.1517272392187339269933733360092e+1030
relative error = 1.7166493480802988393099208775526e+1032 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=270.8MB, alloc=4.8MB, time=20.35
NO POLE
NO POLE
memory used=274.6MB, alloc=4.8MB, time=20.65
t[1] = 0.553
x2[1] (analytic) = 2.0007770155070669370393119330918
x2[1] (numeric) = -3.6798800293540981677753942256033e+1048
absolute error = 3.6798800293540981677753942256033e+1048
relative error = 1.8392254613248282175896038624687e+1050 %
h = 0.001
x1[1] (analytic) = 3.0010353987983324949094474743729
x1[1] (numeric) = 4.1192308272181115897397023900654e+1050
absolute error = 4.1192308272181115897397023900654e+1050
relative error = 1.3726032118339971153900886558715e+1052 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=278.4MB, alloc=4.8MB, time=20.94
NO POLE
NO POLE
t[1] = 0.554
x2[1] (analytic) = 2.0007780531346408005092912025585
x2[1] (numeric) = 2.9423675892589496889863954907396e+1068
absolute error = 2.9423675892589496889863954907396e+1068
relative error = 1.4706116876127815832893339385602e+1070 %
h = 0.001
x1[1] (analytic) = 3.001034363917061038247386444187
x1[1] (numeric) = -3.2936647885258064346867185673719e+1070
absolute error = 3.2936647885258064346867185673719e+1070
relative error = 1.0975098546445144146787238893205e+1072 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=282.2MB, alloc=4.8MB, time=21.23
NO POLE
NO POLE
t[1] = 0.555
x2[1] (analytic) = 2.000779093357246065923758337132
x2[1] (numeric) = -2.3526655655241875547125558607802e+1088
absolute error = 2.3526655655241875547125558607802e+1088
relative error = 1.1758747246686223421595439570785e+1090 %
h = 0.001
x1[1] (analytic) = 3.0010333300701535848433596230406
x1[1] (numeric) = 2.6335566503081853138091020925661e+1090
absolute error = 2.6335566503081853138091020925661e+1090
relative error = 8.7754995051875083270104796436244e+1091 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=286.1MB, alloc=4.8MB, time=21.51
memory used=289.9MB, alloc=4.8MB, time=21.81
NO POLE
NO POLE
t[1] = 0.556
x2[1] (analytic) = 2.0007801361795605487598501578497
x2[1] (numeric) = 1.8811501606423255076805774930779e+1108
absolute error = 1.8811501606423255076805774930779e+1108
relative error = 9.4020833505191356172584014183004e+1109 %
h = 0.001
x1[1] (analytic) = 3.0010322972565762877037596950806
x1[1] (numeric) = -2.1057457500059519718666141597227e+1110
absolute error = 2.1057457500059519718666141597227e+1110
relative error = 7.0167380468745388909786008295711e+1111 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=293.7MB, alloc=4.8MB, time=22.10
NO POLE
NO POLE
t[1] = 0.557
x2[1] (analytic) = 2.0007811816062719466697460423075
x2[1] (numeric) = -1.5041347052215635971256283373067e+1128
absolute error = 1.5041347052215635971256283373067e+1128
relative error = 7.5177371671099513527466706293916e+1129 %
h = 0.001
x1[1] (analytic) = 3.0010312654752963331652217197299
x1[1] (numeric) = 1.6837174029080529567281020549719e+1130
absolute error = 1.6837174029080529567281020549719e+1130
relative error = 5.6104627175265024139228648867127e+1131 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=297.5MB, alloc=4.8MB, time=22.38
NO POLE
NO POLE
t[1] = 0.558
x2[1] (analytic) = 2.0007822296420778587478718304928
x2[1] (numeric) = 1.2026797534756332973563865524982e+1148
absolute error = 1.2026797534756332973563865524982e+1148
relative error = 6.0110477575102314148905305153207e+1149 %
h = 0.001
x1[1] (analytic) = 3.0010302347252819398618093822552
x1[1] (numeric) = -1.3462709317340071888903756563361e+1150
absolute error = 1.3462709317340071888903756563361e+1150
relative error = 4.4860292180869897611744183079380e+1151 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=301.3MB, alloc=4.8MB, time=22.67
memory used=305.1MB, alloc=4.8MB, time=22.96
NO POLE
NO POLE
t[1] = 0.559
x2[1] (analytic) = 2.0007832802916858048371933638772
x2[1] (numeric) = -9.6164165642806925184834789104135e+1167
absolute error = 9.6164165642806925184834789104135e+1167
relative error = 4.8063259319513882936448593034049e+1169 %
h = 0.001
x1[1] (analytic) = 3.001029205005502357693233541848
x1[1] (numeric) = 1.0764546464279366165049904325851e+1170
absolute error = 1.0764546464279366165049904325851e+1170
relative error = 3.5869515852511103684509266980214e+1171 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=308.9MB, alloc=4.8MB, time=23.25
NO POLE
NO POLE
t[1] = 0.56
x2[1] (analytic) = 2.0007843335598132448746773988584
x2[1] (numeric) = 7.6891181771811262994292478065830e+1187
absolute error = 7.6891181771811262994292478065830e+1187
relative error = 3.8430519712739748373311250024721e+1189 %
h = 0.001
x1[1] (analytic) = 3.0010281763149278667941020454403
x1[1] (numeric) = -8.6071427266412808740036833869932e+1189
absolute error = 8.6071427266412808740036833869932e+1189
relative error = 2.8680646168441863380869837425819e+1191 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=312.8MB, alloc=4.8MB, time=23.54
NO POLE
NO POLE
t[1] = 0.561
x2[1] (analytic) = 2.000785389451187598275997791795
x2[1] (numeric) = -6.1480841587356474198196209926177e+1207
absolute error = 6.1480841587356474198196209926177e+1207
relative error = 3.0728353931163289792006687844044e+1209 %
h = 0.001
x1[1] (analytic) = 3.0010271486525297765041997765023
x1[1] (numeric) = 6.8821205020209267113213869307833e+1209
absolute error = 6.8821205020209267113213869307833e+1209
relative error = 2.2932549960805984489087249304965e+1211 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=316.6MB, alloc=4.8MB, time=23.83
memory used=320.4MB, alloc=4.8MB, time=24.12
NO POLE
NO POLE
t[1] = 0.562
x2[1] (analytic) = 2.0007864479705462633595650093473
x2[1] (numeric) = 4.9159003609895765319208730622527e+1227
absolute error = 4.9159003609895765319208730622527e+1227
relative error = 2.4569840354406198440177031180021e+1229 %
h = 0.001
x1[1] (analytic) = 3.0010261220172804243397979091028
x1[1] (numeric) = -5.5028229586265045032150432668647e+1229
absolute error = 5.5028229586265045032150432668647e+1229
relative error = 1.8336471376422155323668755319028e+1231 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=324.2MB, alloc=4.8MB, time=24.41
NO POLE
NO POLE
t[1] = 0.563
x2[1] (analytic) = 2.0007875091226366368099571746115
x2[1] (numeric) = -3.9306677877596260522399534039419e+1247
absolute error = 3.9306677877596260522399534039419e+1247
relative error = 1.9645603392852344018805966419408e+1249 %
h = 0.001
x1[1] (analytic) = 3.0010250964081531749659913385423
x1[1] (numeric) = 4.3999608122372978150177778733236e+1249
absolute error = 4.3999608122372978150177778733236e+1249
relative error = 1.4661526214837368249633855662698e+1251 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=328.0MB, alloc=4.8MB, time=24.69
NO POLE
NO POLE
t[1] = 0.564
x2[1] (analytic) = 2.0007885729122161331808310166308
x2[1] (numeric) = 3.1428930863482797353528011944223e+1267
absolute error = 3.1428930863482797353528011944223e+1267
relative error = 1.5708271872893053652789606320395e+1269 %
h = 0.001
x1[1] (analytic) = 3.0010240718241224191700632608944
x1[1] (numeric) = -3.5181315653404265398811399021303e+1269
absolute error = 3.5181315653404265398811399021303e+1269
relative error = 1.1723103451156221339906612279570e+1271 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=331.8MB, alloc=4.8MB, time=24.98
memory used=335.6MB, alloc=4.8MB, time=25.27
NO POLE
NO POLE
t[1] = 0.565
x2[1] (analytic) = 2.0007896393440522044373912482691
x2[1] (numeric) = -2.5130022392062495029553485127317e+1287
absolute error = 2.5130022392062495029553485127317e+1287
relative error = 1.2560052240325091651687048115672e+1289 %
h = 0.001
x1[1] (analytic) = 3.001023048264163572835875874822
x1[1] (numeric) = 2.8130363517376601026695920275608e+1289
absolute error = 2.8130363517376601026695920275608e+1289
relative error = 9.3735912936915370402217264017675e+1290 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=339.5MB, alloc=4.8MB, time=25.55
NO POLE
NO POLE
t[1] = 0.566
x2[1] (analytic) = 2.0007907084229223595384970551573
x2[1] (numeric) = 2.0093525553531372241761739874565e+1307
absolute error = 2.0093525553531372241761739874565e+1307
relative error = 1.0042792316528516594300582316442e+1309 %
h = 0.001
x1[1] (analytic) = 3.0010220257272530759192861800574
x1[1] (numeric) = -2.2492545742620113231894465861010e+1309
absolute error = 2.2492545742620113231894465861010e+1309
relative error = 7.4949618995779876479008907798413e+1310 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=343.3MB, alloc=4.8MB, time=25.84
NO POLE
NO POLE
t[1] = 0.567
x2[1] (analytic) = 2.0007917801536141840584845364564
x2[1] (numeric) = -1.6066430935530945434150656133520e+1327
absolute error = 1.6066430935530945434150656133520e+1327
relative error = 8.0300364560161367396260756516962e+1328 %
h = 0.001
x1[1] (analytic) = 3.0010210042123683914245858479624
x1[1] (numeric) = 1.7984645440907515204997630525365e+1329
absolute error = 1.7984645440907515204997630525365e+1329
relative error = 5.9928422412450482596366092561492e+1330 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=347.1MB, alloc=4.8MB, time=26.13
memory used=350.9MB, alloc=4.8MB, time=26.42
NO POLE
NO POLE
t[1] = 0.568
x2[1] (analytic) = 2.0007928545409253598487840965324
x2[1] (numeric) = 1.2846436645400947109863077730751e+1347
absolute error = 1.2846436645400947109863077730751e+1347
relative error = 6.4206729928313919601516067204456e+1348 %
h = 0.001
x1[1] (analytic) = 3.0010199837184880043819641406087
x1[1] (numeric) = -1.4380207351196774777755745850715e+1349
absolute error = 1.4380207351196774777755745850715e+1349
relative error = 4.7917732734917090890406963732572e+1350 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=354.7MB, alloc=4.8MB, time=26.71
NO POLE
NO POLE
t[1] = 0.569
x2[1] (analytic) = 2.0007939315896636847394119453095
x2[1] (numeric) = -1.0271785634688416356208760547939e+1367
absolute error = 1.0271785634688416356208760547939e+1367
relative error = 5.1338548525721055812837640458463e+1368 %
h = 0.001
x1[1] (analytic) = 3.0010189642445914208259928558409
x1[1] (numeric) = 1.1498161814914211883157928822164e+1369
absolute error = 1.1498161814914211883157928822164e+1369
relative error = 3.8314192452324268638598567620358e+1370 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=358.5MB, alloc=4.8MB, time=26.99
NO POLE
NO POLE
t[1] = 0.57
x2[1] (analytic) = 2.0007950113046470922804150240494
x2[1] (numeric) = 8.2131398019048322458628612523937e+1386
absolute error = 8.2131398019048322458628612523937e+1386
relative error = 4.1049381648294577689531553579695e+1388 %
h = 0.001
x1[1] (analytic) = 3.0010179457896591667751322768074
x1[1] (numeric) = -9.1937287059319391731657137609093e+1388
absolute error = 9.1937287059319391731657137609093e+1388
relative error = 3.0635367305385404188723160073806e+1390 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=362.4MB, alloc=4.8MB, time=27.28
memory used=366.2MB, alloc=4.8MB, time=27.58
NO POLE
NO POLE
t[1] = 0.571
x2[1] (analytic) = 2.0007960936907036715233488326121
x2[1] (numeric) = -6.5670826674800970583026997949629e+1406
absolute error = 6.5670826674800970583026997949629e+1406
relative error = 3.2822348505120983341764769570949e+1408 %
h = 0.001
x1[1] (analytic) = 3.001016928352672787212257105464
x1[1] (numeric) = 7.3511443723674547811626253825663e+1408
absolute error = 7.3511443723674547811626253825663e+1408
relative error = 2.4495511181280363510543683110416e+1410 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=370.0MB, alloc=4.8MB, time=27.87
NO POLE
NO POLE
t[1] = 0.572
x2[1] (analytic) = 2.0007971787526716868428677938712
x2[1] (numeric) = 5.2509242265077939184854300248157e+1426
absolute error = 5.2509242265077939184854300248157e+1426
relative error = 2.6244160488977210382611245986351e+1428 %
h = 0.001
x1[1] (analytic) = 3.0010159119326148450662013605777
x1[1] (numeric) = -5.8778462266917528674947941825577e+1428
absolute error = 5.8778462266917528674947941825577e+1428
relative error = 1.9586188141556693951121332570015e+1430 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=373.8MB, alloc=4.8MB, time=28.16
NO POLE
NO POLE
t[1] = 0.573
x2[1] (analytic) = 2.0007982664953995977985079509009
x2[1] (numeric) = -4.1985470000344010880679448247755e+1446
absolute error = 4.1985470000344010880679448247755e+1446
relative error = 2.0984359444635967938082703265607e+1448 %
h = 0.001
x1[1] (analytic) = 3.0010148965284689201943212217741
x1[1] (numeric) = 4.6998228458826824771547966302473e+1448
absolute error = 4.6998228458826824771547966302473e+1448
relative error = 1.5660778129823248389459987837089e+1450 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=377.6MB, alloc=4.8MB, time=28.44
memory used=381.4MB, alloc=4.8MB, time=28.75
NO POLE
NO POLE
t[1] = 0.574
x2[1] (analytic) = 2.0007993569237460790367419528101
x2[1] (numeric) = 3.3570846104594239142192622834725e+1466
absolute error = 3.3570846104594239142192622834725e+1466
relative error = 1.6778716960510139797672995917391e+1468 %
h = 0.001
x1[1] (analytic) = 3.0010138821392196083660748021921
x1[1] (numeric) = -3.7578959929873574135434577635117e+1468
absolute error = 3.7578959929873574135434577635117e+1468
relative error = 1.2522088002833921561897831733355e+1470 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=385.2MB, alloc=4.8MB, time=29.03
NO POLE
NO POLE
t[1] = 0.575
x2[1] (analytic) = 2.0008004500425800402333864456798
x2[1] (numeric) = -2.6842660286263701065976856340134e+1486
absolute error = 2.6842660286263701065976856340134e+1486
relative error = 1.3415960739959074338422837701762e+1488 %
h = 0.001
x1[1] (analytic) = 3.001012868763852520247617833325
x1[1] (numeric) = 3.0047477867132668017460791536011e+1488
absolute error = 3.0047477867132668017460791536011e+1488
relative error = 1.0012445524603673998524918382287e+1490 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=389.1MB, alloc=4.8MB, time=29.32
NO POLE
NO POLE
t[1] = 0.576
x2[1] (analytic) = 2.0008015458567806460764421459638
x2[1] (numeric) = 2.1462920803332171219770543689481e+1506
absolute error = 2.1462920803332171219770543689481e+1506
relative error = 1.0727161245840275016877468885587e+1508 %
h = 0.001
x1[1] (analytic) = 3.0010118564013542803874142466435
x1[1] (numeric) = -2.4025436783259716601276540889381e+1508
absolute error = 2.4025436783259716601276540889381e+1508
relative error = 8.0057786949464697663711622990203e+1509 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=392.9MB, alloc=4.8MB, time=29.60
memory used=396.7MB, alloc=4.8MB, time=29.89
NO POLE
NO POLE
t[1] = 0.577
x2[1] (analytic) = 2.0008026443712373362894470349332
x2[1] (numeric) = -1.7161375381479706627067929862258e+1526
absolute error = 1.7161375381479706627067929862258e+1526
relative error = 8.5772454518485296807829024260903e+1527 %
h = 0.001
x1[1] (analytic) = 3.0010108450507125262028606376118
x1[1] (numeric) = 1.9210318256288688585063300981631e+1528
absolute error = 1.9210318256288688585063300981631e+1528
relative error = 6.4012825171793284131497134225946e+1529 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=400.5MB, alloc=4.8MB, time=30.18
NO POLE
NO POLE
t[1] = 0.578
x2[1] (analytic) = 2.0008037455908498456954232742926
x2[1] (numeric) = 1.3721935037766803348990356771465e+1546
absolute error = 1.3721935037766803348990356771465e+1546
relative error = 6.8582113903003666195580770616873e+1547 %
h = 0.001
x1[1] (analytic) = 3.0010098347109159069679235987209
x1[1] (numeric) = -1.5360233857019121856928371564112e+1548
absolute error = 1.5360233857019121856928371564112e+1548
relative error = 5.1183550548073285090595152369880e+1549 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=404.3MB, alloc=4.8MB, time=30.47
NO POLE
NO POLE
memory used=408.1MB, alloc=4.8MB, time=30.76
t[1] = 0.579
x2[1] (analytic) = 2.0008048495205282243214986049643
x2[1] (numeric) = -1.0971818807943187700989810087703e+1566
absolute error = 1.0971818807943187700989810087703e+1566
relative error = 5.4837026262568627502547535100064e+1567 %
h = 0.001
x1[1] (analytic) = 3.0010088253809540828017889091757
x1[1] (numeric) = 1.2281773836051897677972693281964e+1568
absolute error = 1.2281773836051897677972693281964e+1568
relative error = 4.0925483897878323166274366213557e+1569 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=411.9MB, alloc=4.8MB, time=31.05
NO POLE
NO POLE
t[1] = 0.58
x2[1] (analytic) = 2.0008059561651928575442831532282
x2[1] (numeric) = 8.7728740606199098676317255937331e+1585
absolute error = 8.7728740606199098676317255937331e+1585
relative error = 4.3846701043584826692228007437786e+1587 %
h = 0.001
x1[1] (analytic) = 3.0010078170598177236585215698858
x1[1] (numeric) = -9.8202911468694290583707262100603e+1587
absolute error = 9.8202911468694290583707262100603e+1587
relative error = 3.2723310785943499800594413295145e+1589 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=415.8MB, alloc=4.8MB, time=31.34
NO POLE
NO POLE
t[1] = 0.581
x2[1] (analytic) = 2.0008070655297744862760827309214
x2[1] (numeric) = -7.0146363725747177517552343475435e+1605
absolute error = 7.0146363725747177517552343475435e+1605
relative error = 3.5059034393790385572357285937609e+1607 %
h = 0.001
x1[1] (analytic) = 3.0010068097464985083177356734196
x1[1] (numeric) = 7.8521327209427844107869541746629e+1607
absolute error = 7.8521327209427844107869541746629e+1607
relative error = 2.6164994679255895886793879217920e+1609 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=419.6MB, alloc=4.8MB, time=31.63
memory used=423.4MB, alloc=4.8MB, time=31.91
NO POLE
NO POLE
t[1] = 0.582
x2[1] (analytic) = 2.0008081776192142271920298792437
x2[1] (numeric) = 5.6087803266574256743233512802965e+1625
absolute error = 5.6087803266574256743233512802965e+1625
relative error = 2.8032573983835776830508844907080e+1627 %
h = 0.001
x1[1] (analytic) = 3.0010058034399891233762730995919
x1[1] (numeric) = -6.2784277314380234496143679467677e+1627
absolute error = 6.2784277314380234496143679467677e+1627
relative error = 2.0921078273961334158172249074643e+1629 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=427.2MB, alloc=4.8MB, time=32.20
NO POLE
NO POLE
t[1] = 0.583
x2[1] (analytic) = 2.0008092924384635929982140688804
x2[1] (numeric) = -4.4846824670332251439970932152436e+1645
absolute error = 4.4846824670332251439970932152436e+1645
relative error = 2.2414342456234643632351681184635e+1647 %
h = 0.001
x1[1] (analytic) = 3.0010047981392832622408900283627
x1[1] (numeric) = 5.0201207977234895589748829439526e+1647
absolute error = 5.0201207977234895589748829439526e+1647
relative error = 1.6728133193376169546322491175385e+1649 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=431.0MB, alloc=4.8MB, time=32.50
NO POLE
NO POLE
t[1] = 0.584
x2[1] (analytic) = 2.0008104099924845127408926326463
x2[1] (numeric) = 3.5858735159451793470431643218716e+1665
absolute error = 3.5858735159451793470431643218716e+1665
relative error = 1.7922105453053139015615398940609e+1667 %
h = 0.001
x1[1] (analytic) = 3.0010037938433756241219502627347
x1[1] (numeric) = -4.0140006227265593053374694113169e+1667
absolute error = 4.0140006227265593053374694113169e+1667
relative error = 1.3375526651986807373987061340225e+1669 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=434.8MB, alloc=4.8MB, time=32.81
memory used=438.6MB, alloc=4.8MB, time=33.13
NO POLE
NO POLE
t[1] = 0.585
x2[1] (analytic) = 2.0008115302862493521568641706782
x2[1] (numeric) = -2.8672016284050059176452861074553e+1685
absolute error = 2.8672016284050059176452861074553e+1685
relative error = 1.4330193449029179967483353801309e+1687 %
h = 0.001
x1[1] (analytic) = 3.001002790551261913028124355342
x1[1] (numeric) = 3.2095245609539360218891662487853e+1687
absolute error = 3.2095245609539360218891662487853e+1687
relative error = 1.0694840308243666141689579679230e+1689 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=442.5MB, alloc=4.8MB, time=33.44
NO POLE
NO POLE
t[1] = 0.586
x2[1] (analytic) = 2.0008126533247409340650863323436
x2[1] (numeric) = 2.2925641803518642296475156235310e+1705
absolute error = 2.2925641803518642296475156235310e+1705
relative error = 1.1458165143759567700524063011416e+1707 %
h = 0.001
x1[1] (analytic) = 3.001001788261938836762093533429
x1[1] (numeric) = -2.5662795987234905466349198379534e+1707
absolute error = 2.5662795987234905466349198379534e+1707
relative error = 8.5514097617708447498848780845396e+1708 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=446.3MB, alloc=4.8MB, time=33.73
NO POLE
NO POLE
t[1] = 0.587
x2[1] (analytic) = 2.0008137791129525587996200435147
x2[1] (numeric) = -1.8330941462097973814118816048785e+1725
absolute error = 1.8330941462097973814118816048785e+1725
relative error = 9.1617429135383475930022439084113e+1726 %
h = 0.001
x1[1] (analytic) = 3.0010007869744041059172574179246
x1[1] (numeric) = 2.0519521984486601173037041336788e+1727
absolute error = 2.0519521984486601173037041336788e+1727
relative error = 6.8375596812736239467115315166517e+1728 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=450.1MB, alloc=4.8MB, time=34.02
memory used=453.9MB, alloc=4.8MB, time=34.31
NO POLE
NO POLE
t[1] = 0.588
x2[1] (analytic) = 2.0008149076558880246839824126574
x2[1] (numeric) = 1.4657099581626086097851075550512e+1745
absolute error = 1.4657099581626086097851075550512e+1745
relative error = 7.3255649613276975478230270867695e+1746 %
h = 0.001
x1[1] (analytic) = 3.0009997866876564328754445333169
x1[1] (numeric) = -1.6407050217024929404810895155509e+1747
absolute error = 1.6407050217024929404810895155509e+1747
relative error = 5.4671947295051815706073932831092e+1748 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=457.7MB, alloc=4.8MB, time=34.60
NO POLE
NO POLE
t[1] = 0.589
x2[1] (analytic) = 2.0008160389585616485469907143189
x2[1] (numeric) = -1.1719559990407402575027837064503e+1765
absolute error = 1.1719559990407402575027837064503e+1765
relative error = 5.8573900659590440054336315580486e+1766 %
h = 0.001
x1[1] (analytic) = 3.0009987874006955308056246060418
x1[1] (numeric) = 1.3118789854241965393647866031398e+1767
absolute error = 1.3118789854241965393647866031398e+1767
relative error = 4.3714745601762667671330693061545e+1768 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=461.5MB, alloc=4.8MB, time=34.89
NO POLE
NO POLE
t[1] = 0.59
x2[1] (analytic) = 2.0008171730259982862801800140618
x2[1] (numeric) = 9.3707548075156288061141838973940e+1784
absolute error = 9.3707548075156288061141838973940e+1784
relative error = 4.6834638036135382437388637618950e+1786 %
h = 0.001
x1[1] (analytic) = 3.000997789112522112663621650095
x1[1] (numeric) = -1.0489554488056482143962302897763e+1787
absolute error = 1.0489554488056482143962302897763e+1787
relative error = 3.4953556200914539711041917063904e+1788 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=465.4MB, alloc=4.8MB, time=35.18
memory used=469.2MB, alloc=4.8MB, time=35.48
NO POLE
NO POLE
t[1] = 0.591
x2[1] (analytic) = 2.0008183098632333534368771646859
x2[1] (numeric) = -7.4926913411810376107835649011012e+1804
absolute error = 7.4926913411810376107835649011012e+1804
relative error = 3.7448134616946819073961723170579e+1806 %
h = 0.001
x1[1] (analytic) = 3.0009967918221378901928268395824
x1[1] (numeric) = 8.3872639611135629043522492404857e+1806
absolute error = 8.3872639611135629043522492404857e+1806
relative error = 2.7948260337929266800984547708921e+1808 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=473.0MB, alloc=4.8MB, time=35.77
NO POLE
NO POLE
t[1] = 0.592
x2[1] (analytic) = 2.0008194494753128458730140697052
x2[1] (numeric) = 5.9910247026400667665699796077441e+1824
absolute error = 5.9910247026400667665699796077441e+1824
relative error = 2.9942855184715092178359433388488e+1826 %
h = 0.001
x1[1] (analytic) = 3.0009957955285455729259101689204
x1[1] (numeric) = -6.7063092940211425024986709100438e+1826
absolute error = 6.7063092940211425024986709100438e+1826
relative error = 2.2346946650220163105760481053260e+1828 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=476.8MB, alloc=4.8MB, time=36.05
NO POLE
NO POLE
t[1] = 0.593
x2[1] (analytic) = 2.0008205918672933604297632765047
x2[1] (numeric) = -4.7903183720345210774836815574285e+1844
absolute error = 4.7903183720345210774836815574285e+1844
relative error = 2.3941768649851261845533135183411e+1846 %
h = 0.001
x1[1] (analytic) = 3.0009948002307488671875299023983
x1[1] (numeric) = 5.3622473974341395322282079172190e+1846
absolute error = 5.3622473974341395322282079172190e+1846
relative error = 1.7868232884048423151431297111240e+1848 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=480.6MB, alloc=4.8MB, time=36.34
memory used=484.4MB, alloc=4.8MB, time=36.64
NO POLE
NO POLE
t[1] = 0.594
x2[1] (analytic) = 2.0008217370442421156580791283924
x2[1] (numeric) = 3.8302546299532593032613314451579e+1864
absolute error = 3.8302546299532593032613314451579e+1864
relative error = 1.9143407726125502490931956720877e+1866 %
h = 0.001
x1[1] (analytic) = 3.0009938059277524750980388158125
x1[1] (numeric) = -4.2875590568010198061061681641601e+1866
absolute error = 4.2875590568010198061061681641601e+1866
relative error = 1.4287130644295107848037646094197e+1868 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=488.2MB, alloc=4.8MB, time=36.92
NO POLE
NO POLE
t[1] = 0.595
x2[1] (analytic) = 2.0008228850112369725852278718869
x2[1] (numeric) = -3.0626044848972002633923797025380e+1884
absolute error = 3.0626044848972002633923797025380e+1884
relative error = 1.5306724587368962140477465894396e+1886 %
h = 0.001
x1[1] (analytic) = 3.0009928126185620935781862338771
x1[1] (numeric) = 3.4282570912996069386834587912869e+1886
absolute error = 3.4282570912996069386834587912869e+1886
relative error = 1.1423743092234295875815246309315e+1888 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=492.1MB, alloc=4.8MB, time=37.21
NO POLE
NO POLE
t[1] = 0.596
x2[1] (analytic) = 2.000824035773366455523390283036
x2[1] (numeric) = 2.4488048803760350007105826145059e+1904
absolute error = 2.4488048803760350007105826145059e+1904
relative error = 1.2238981722495717667227920476407e+1906 %
h = 0.001
x1[1] (analytic) = 3.0009918203021844133548148681153
x1[1] (numeric) = -2.7411742971570877416239888899355e+1906
absolute error = 2.7411742971570877416239888899355e+1906
relative error = 9.1342278196581875858319566442268e+1907 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=495.9MB, alloc=4.8MB, time=37.49
memory used=499.7MB, alloc=4.8MB, time=37.79
NO POLE
NO POLE
t[1] = 0.597
x2[1] (analytic) = 2.0008251893357297729204205443582
x2[1] (numeric) = -1.9580214721571437851965981140506e+1924
absolute error = 1.9580214721571437851965981140506e+1924
relative error = 9.7860696806161424731590138062345e+1925 %
h = 0.001
x1[1] (analytic) = 3.000990828977627117967551460926
x1[1] (numeric) = 2.1917949346518180943094983578129e+1926
absolute error = 2.1917949346518180943094983578129e+1926
relative error = 7.3035709189371810884930854623339e+1927 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=503.5MB, alloc=4.8MB, time=38.08
NO POLE
NO POLE
t[1] = 0.598
x2[1] (analytic) = 2.0008263457034368382528452721242
x2[1] (numeric) = 1.5655996588996132376175597558667e+1944
absolute error = 1.5655996588996132376175597558667e+1944
relative error = 7.8247653138992950453657411665204e+1945 %
h = 0.001
x1[1] (analytic) = 3.0009898386438988827764902425173
x1[1] (numeric) = -1.7525208231186285678813705970580e+1946
absolute error = 1.7525208231186285678813705970580e+1946
relative error = 5.8398092541045249032489371496041e+1947 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=507.3MB, alloc=4.8MB, time=38.38
NO POLE
NO POLE
t[1] = 0.599
x2[1] (analytic) = 2.0008275048816082909611867621606
x2[1] (numeric) = -1.2518260533916497493160636719712e+1964
absolute error = 1.2518260533916497493160636719712e+1964
relative error = 6.2565416075971127489855768046321e+1965 %
h = 0.001
x1[1] (analytic) = 3.000988849300009373970868208391
x1[1] (numeric) = 1.4012849408981308102990610372487e+1966
absolute error = 1.4012849408981308102990610372487e+1966
relative error = 4.6694106884968439033082830129483e+1967 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=511.1MB, alloc=4.8MB, time=38.69
memory used=514.9MB, alloc=4.8MB, time=38.98
NO POLE
NO POLE
t[1] = 0.6
x2[1] (analytic) = 2.0008286668753755174276946911611
x2[1] (numeric) = 1.0009381766546453187125197723018e+1984
absolute error = 1.0009381766546453187125197723018e+1984
relative error = 5.0026181313054436975667200105381e+1985 %
h = 0.001
x1[1] (analytic) = 3.000987860944969247578731226051
x1[1] (numeric) = -1.1204428841499485129434039190852e+1986
absolute error = 1.1204428841499485129434039190852e+1986
relative error = 3.7335801944801491673749322105551e+1987 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=518.8MB, alloc=4.8MB, time=39.27
NO POLE
NO POLE
t[1] = 0.601
x2[1] (analytic) = 2.0008298316898806719965706796246
x2[1] (numeric) = -8.0033262670183130170835158027077e+2003
absolute error = 8.0033262670183130170835158027077e+2003
relative error = 4.0000034686901806474090501059051e+2005 %
h = 0.001
x1[1] (analytic) = 3.0009868735777901484775899806045
x1[1] (numeric) = 8.9588649674464615266104696098428e+2005
absolute error = 8.9588649674464615266104696098428e+2005
relative error = 2.9853062825182111239388917587846e+2007 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=522.6MB, alloc=4.8MB, time=39.56
NO POLE
NO POLE
t[1] = 0.602
x2[1] (analytic) = 2.0008309993302766980367702920204
x2[1] (numeric) = 6.3993194415288682362012815304335e+2023
absolute error = 6.3993194415288682362012815304335e+2023
relative error = 3.1983308153816413833299380256492e+2025 %
h = 0.001
x1[1] (analytic) = 3.0009858871974847094060647699092
x1[1] (numeric) = -7.1633514425710029484985318599298e+2025
absolute error = 7.1633514425710029484985318599298e+2025
relative error = 2.3869993768149990204255046131198e+2027 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=526.4MB, alloc=4.8MB, time=39.84
memory used=530.2MB, alloc=4.8MB, time=40.14
NO POLE
NO POLE
t[1] = 0.603
x2[1] (analytic) = 2.0008321698017273490474672195941
x2[1] (numeric) = -5.1167836907373755459367497989769e+2043
absolute error = 5.1167836907373755459367497989769e+2043
relative error = 2.5573277798929151085224071214125e+2045 %
h = 0.001
x1[1] (analytic) = 3.0009849018030665499765181609133
x1[1] (numeric) = 5.7276902907054247603341687717793e+2045
absolute error = 5.7276902907054247603341687717793e+2045
relative error = 1.9086035012252429627709445290045e+2047 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=534.0MB, alloc=4.8MB, time=40.42
NO POLE
NO POLE
t[1] = 0.604
x2[1] (analytic) = 2.0008333431094072098062645613823
x2[1] (numeric) = 4.0912905781651297320181118732623e+2063
absolute error = 4.0912905781651297320181118732623e+2063
relative error = 2.0447932818867536257447742595226e+2065 %
h = 0.001
x1[1] (analytic) = 3.0009839173935502756886745198199
x1[1] (numeric) = -4.5797607906372125035002574913718e+2065
absolute error = 4.5797607906372125035002574913718e+2065
relative error = 1.5260864158895193352021539533358e+2067 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=537.8MB, alloc=4.8MB, time=40.71
NO POLE
NO POLE
memory used=541.6MB, alloc=4.8MB, time=41.00
t[1] = 0.605
x2[1] (analytic) = 2.0008345192585017175602382895013
x2[1] (numeric) = -3.2713242549775573977964646393027e+2083
absolute error = 3.2713242549775573977964646393027e+2083
relative error = 1.6349799163750394498451884085353e+2085 %
h = 0.001
x1[1] (analytic) = 3.0009829339679514769442254296945
x1[1] (numeric) = 3.6618964774498645827249968536341e+2085
absolute error = 3.6618964774498645827249968536341e+2085
relative error = 1.2202323565392762168693319144455e+2087 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=545.5MB, alloc=4.8MB, time=41.29
NO POLE
NO POLE
t[1] = 0.606
x2[1] (analytic) = 2.0008356982542071832598981556067
x2[1] (numeric) = 2.6156935511542006616156374532566e+2103
absolute error = 2.6156935511542006616156374532566e+2103
relative error = 1.3073005211954567388213120580779e+2105 %
h = 0.001
x1[1] (analytic) = 3.0009819515252867280624200101232
x1[1] (numeric) = -2.9279882562805154422517337295611e+2105
absolute error = 2.9279882562805154422517337295611e+2105
relative error = 9.7567672967587448354955180142479e+2106 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=549.3MB, alloc=4.8MB, time=41.58
NO POLE
NO POLE
t[1] = 0.607
x2[1] (analytic) = 2.000836880101730812836151466605
x2[1] (numeric) = -2.0914627289359338728617471663156e+2123
absolute error = 2.0914627289359338728617471663156e+2123
relative error = 1.0452939716053191040129213446696e+2125 %
h = 0.001
x1[1] (analytic) = 3.000980970064573586296639154509
x1[1] (numeric) = 2.3411681028424127035975352379596e+2125
absolute error = 2.3411681028424127035975352379596e+2125
relative error = 7.8013427149191040551462965204539e+2126 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=553.1MB, alloc=4.8MB, time=41.87
memory used=556.9MB, alloc=4.8MB, time=42.15
NO POLE
NO POLE
t[1] = 0.608
x2[1] (analytic) = 2.0008380648062907285203553292093
x2[1] (numeric) = 1.6722969495405825966212629497588e+2143
absolute error = 1.6722969495405825966212629497588e+2143
relative error = 8.3579824822179423420169184595846e+2144 %
h = 0.001
x1[1] (analytic) = 3.0009799895848305908519527015831
x1[1] (numeric) = -1.8719569909510009531544633030859e+2145
absolute error = 1.8719569909510009531544633030859e+2145
relative error = 6.2378189706289115069884617345096e+2146 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=560.7MB, alloc=4.8MB, time=42.44
NO POLE
NO POLE
t[1] = 0.609
x2[1] (analytic) = 2.0008392523731159902075431348015
x2[1] (numeric) = -1.3371393373409730956311710346775e+2163
absolute error = 1.3371393373409730956311710346775e+2163
relative error = 6.6828923700644378163192306440825e+2164 %
h = 0.001
x1[1] (analytic) = 3.0009790100850772619036585586858
x1[1] (numeric) = 1.4967840078274806435395474040276e+2165
absolute error = 1.4967840078274806435395474040276e+2165
relative error = 4.9876523721005534884597114789869e+2166 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=564.5MB, alloc=4.8MB, time=42.73
NO POLE
NO POLE
t[1] = 0.61
x2[1] (analytic) = 2.0008404428074466168629112282639
x2[1] (numeric) = 1.0691531835633882048145025544448e+2183
absolute error = 1.0691531835633882048145025544448e+2183
relative error = 5.3435204561500334436407402704947e+2184 %
h = 0.001
x1[1] (analytic) = 3.0009780315643340996168027953581
x1[1] (numeric) = -1.1968022646449454706617408383916e+2185
absolute error = 1.1968022646449454706617408383916e+2185
relative error = 3.9880407389089838115479620070099e+2186 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=568.4MB, alloc=4.8MB, time=43.02
memory used=572.2MB, alloc=4.8MB, time=43.32
NO POLE
NO POLE
t[1] = 0.611
x2[1] (analytic) = 2.0008416361145336079716518769977
x2[1] (numeric) = -8.5487615090052376990817467737426e+2202
absolute error = 8.5487615090052376990817467737426e+2202
relative error = 4.2725827745199337597942948815875e+2204 %
h = 0.001
x1[1] (analytic) = 3.0009770540216225831666797267625
x1[1] (numeric) = 9.5694211934976869014297512690047e+2204
absolute error = 9.5694211934976869014297512690047e+2204
relative error = 3.1887685314600001232328536949978e+2206 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=576.0MB, alloc=4.8MB, time=43.62
NO POLE
NO POLE
t[1] = 0.612
x2[1] (analytic) = 2.0008428322996389650322188292359
x2[1] (numeric) = 6.8354399034080644549347694937945e+2222
absolute error = 6.8354399034080644549347694937945e+2222
relative error = 3.4162802760234062046344343712191e+2224 %
h = 0.001
x1[1] (analytic) = 3.0009760774559651697603110074342
x1[1] (numeric) = -7.6515415021987645620842644491252e+2224
absolute error = 7.6515415021987645620842644491252e+2224
relative error = 2.5496842709540191181749031696760e+2226 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=579.8MB, alloc=4.8MB, time=43.93
NO POLE
NO POLE
t[1] = 0.613
x2[1] (analytic) = 2.0008440313680357130931119240064
x2[1] (numeric) = -5.4654979699556644740154638789968e+2242
absolute error = 5.4654979699556644740154638789968e+2242
relative error = 2.7315962085354265754483925063908e+2244 %
h = 0.001
x1[1] (analytic) = 3.0009751018663852936589027568408
x1[1] (numeric) = 6.1180385078725062831559023520369e+2244
absolute error = 6.1180385078725062831559023520369e+2244
relative error = 2.0386835279198209036195267123193e+2246 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=583.6MB, alloc=4.8MB, time=44.22
memory used=587.4MB, alloc=4.8MB, time=44.52
NO POLE
NO POLE
t[1] = 0.614
x2[1] (analytic) = 2.0008452333250079223332673886798
x2[1] (numeric) = 4.3701164053385724392815655846710e+2262
absolute error = 4.3701164053385724392815655846710e+2262
relative error = 2.1841351507614138448646021463428e+2264 %
h = 0.001
x1[1] (analytic) = 3.0009741272519073652012797392075
x1[1] (numeric) = -4.8918763850466940142869551945429e+2264
absolute error = 4.8918763850466940142869551945429e+2264
relative error = 1.6300961546530723511777753892350e+2266 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=591.2MB, alloc=4.8MB, time=44.81
NO POLE
NO POLE
t[1] = 0.615
x2[1] (analytic) = 2.0008464381758507296861406339776
x2[1] (numeric) = -3.4942685005451106588532805676751e+2282
absolute error = 3.4942685005451106588532805676751e+2282
relative error = 1.7463951425131836123057863909299e+2284 %
h = 0.001
x1[1] (analytic) = 3.0009731536115567698282956210436
x1[1] (numeric) = 3.9114586375657047951045357697855e+2284
absolute error = 3.9114586375657047951045357697855e+2284
relative error = 1.3033967441056290224248399580713e+2286 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=595.1MB, alloc=4.8MB, time=45.10
NO POLE
NO POLE
t[1] = 0.616
x2[1] (analytic) = 2.0008476459258703605075685305955
x2[1] (numeric) = 2.7939558632777013080301943963015e+2302
absolute error = 2.7939558632777013080301943963015e+2302
relative error = 1.3963861111398258391140032002429e+2304 %
h = 0.001
x1[1] (analytic) = 3.0009721809443598671082183307772
x1[1] (numeric) = -3.1275337864534617580326148009578e+2304
absolute error = 3.1275337864534617580326148009578e+2304
relative error = 1.0421735350673177173380995904535e+2306 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=598.9MB, alloc=4.8MB, time=45.39
memory used=602.7MB, alloc=4.8MB, time=45.68
NO POLE
NO POLE
t[1] = 0.617
x2[1] (analytic) = 2.0008488565803841502874983262271
x2[1] (numeric) = -2.2339981500351415356610155488504e+2322
absolute error = 2.2339981500351415356610155488504e+2322
relative error = 1.1165251901401631967681867858574e+2324 %
h = 0.001
x1[1] (analytic) = 3.0009712092493439897630895458875
x1[1] (numeric) = 2.5007212121500079033264900095383e+2324
absolute error = 2.5007212121500079033264900095383e+2324
relative error = 8.3330396654339530773657340225670e+2325 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=606.5MB, alloc=4.8MB, time=45.97
NO POLE
NO POLE
t[1] = 0.618
x2[1] (analytic) = 2.0008500701447205664056705367518
x2[1] (numeric) = 1.7862657746159200544287771523026e+2342
absolute error = 1.7862657746159200544287771523026e+2342
relative error = 8.9275343578678050152008933748955e+2343 %
h = 0.001
x1[1] (analytic) = 3.00097023852553744269605733389
x1[1] (numeric) = -1.9995328613183183528101176597897e+2344
absolute error = 1.9995328613183183528101176597897e+2344
relative error = 6.6629546526284314916818024384378e+2345 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=610.3MB, alloc=4.8MB, time=46.26
NO POLE
NO POLE
t[1] = 0.619
x2[1] (analytic) = 2.0008512866242192299313433206843
x2[1] (numeric) = -1.4282668128055618187223607768396e+2362
absolute error = 1.4282668128055618187223607768396e+2362
relative error = 7.1382956962048586477088076097722e+2363 %
h = 0.001
x1[1] (analytic) = 3.0009692687719695020196809745104
x1[1] (numeric) = 1.5987914382724842432360555935205e+2364
absolute error = 1.5987914382724842432360555935205e+2364
relative error = 5.3275835074669983075391466938164e+2365 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=614.1MB, alloc=4.8MB, time=46.55
memory used=617.9MB, alloc=4.8MB, time=46.84
NO POLE
NO POLE
t[1] = 0.62
x2[1] (analytic) = 2.0008525060242309374671460216572
x2[1] (numeric) = 1.1420171161261731266407383191436e+2382
absolute error = 1.1420171161261731266407383191436e+2382
relative error = 5.7076526764854048124021375142711e+2383 %
h = 0.001
x1[1] (analytic) = 3.0009682999876704140852069913503
x1[1] (numeric) = -1.2783656185615803971706111453745e+2384
absolute error = 1.2783656185615803971706111453745e+2384
relative error = 4.2598437929745296149030260130438e+2385 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=621.8MB, alloc=4.8MB, time=47.13
NO POLE
NO POLE
t[1] = 0.621
x2[1] (analytic) = 2.0008537283501176830371497397433
x2[1] (numeric) = -9.1313687458947480954636055159709e+2401
absolute error = 9.1313687458947480954636055159709e+2401
relative error = 4.5637362774261244368276899896981e+2403 %
h = 0.001
x1[1] (analytic) = 3.0009673321716713945128154223205
x1[1] (numeric) = 1.0221587479140665215360513733196e+2404
absolute error = 1.0221587479140665215360513733196e+2404
relative error = 3.4060975504667491991962817520315e+2405 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=625.6MB, alloc=4.8MB, time=47.41
NO POLE
NO POLE
t[1] = 0.622
x2[1] (analytic) = 2.000854953607252680019242968807
x2[1] (numeric) = 7.3012824410497861813295383842056e+2421
absolute error = 7.3012824410497861813295383842056e+2421
relative error = 3.6490813229048051682472112224313e+2423 %
h = 0.001
x1[1] (analytic) = 3.0009663653230046272228353590896
x1[1] (numeric) = -8.1730022363466944109803820223574e+2423
absolute error = 8.1730022363466944109803820223574e+2423
relative error = 2.7234567940474085468337465127518e+2425 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=629.4MB, alloc=4.8MB, time=47.70
memory used=633.2MB, alloc=4.8MB, time=48.00
NO POLE
NO POLE
t[1] = 0.623
x2[1] (analytic) = 2.0008561818010203831219005138068
x2[1] (numeric) = -5.8379775001363615586293673026267e+2441
absolute error = 5.8379775001363615586293673026267e+2441
relative error = 2.9177396922558686353122725049726e+2443 %
h = 0.001
x1[1] (analytic) = 3.0009653994407032634679287867612
x1[1] (numeric) = 6.5349893733868246240576738380629e+2443
absolute error = 6.5349893733868246240576738380629e+2443
relative error = 2.1776290305129027592924058629498e+2445 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=637.0MB, alloc=4.8MB, time=48.29
NO POLE
NO POLE
t[1] = 0.624
x2[1] (analytic) = 2.0008574129368165104054340790651
x2[1] (numeric) = 4.6679445107451640755471997091905e+2461
absolute error = 4.6679445107451640755471997091905e+2461
relative error = 2.3329720951447775122620356430212e+2463 %
h = 0.001
x1[1] (analytic) = 3.0009644345238014208662417559653
x1[1] (numeric) = -5.2252629909187697999252937533827e+2463
absolute error = 5.2252629909187697999252937533827e+2463
relative error = 1.7411945742529015283648086874418e+2465 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=640.8MB, alloc=4.8MB, time=48.60
NO POLE
NO POLE
t[1] = 0.625
x2[1] (analytic) = 2.0008586470200480653478130959583
x2[1] (numeric) = -3.7324066348126474323330601082715e+2481
absolute error = 3.7324066348126474323330601082715e+2481
relative error = 1.8654024562761877710942886183597e+2483 %
h = 0.001
x1[1] (analytic) = 3.0009634705713341824355219205144
x1[1] (numeric) = 4.1780287257169811121397808389145e+2483
absolute error = 4.1780287257169811121397808389145e+2483
relative error = 1.3922291179777516676192777169788e+2485 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=644.6MB, alloc=4.8MB, time=48.91
memory used=648.5MB, alloc=4.8MB, time=49.23
NO POLE
NO POLE
t[1] = 0.626
x2[1] (analytic) = 2.0008598840561333589551445362852
x2[1] (numeric) = 2.9843669425645396667100970077523e+2501
absolute error = 2.9843669425645396667100970077523e+2501
relative error = 1.4915421946061738290633471490892e+2503 %
h = 0.001
x1[1] (analytic) = 3.0009625075823375956282014747412
x1[1] (numeric) = -3.3406785578551226986000360301444e+2503
absolute error = 3.3406785578551226986000360301444e+2503
relative error = 1.1132023640463506498828958403197e+2505 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=652.3MB, alloc=4.8MB, time=49.54
NO POLE
NO POLE
t[1] = 0.627
x2[1] (analytic) = 2.0008611240505020319169006357167
x2[1] (numeric) = -2.3862475124763805378951229756987e+2521
absolute error = 2.3862475124763805378951229756987e+2521
relative error = 1.1926102635477819880421693929359e+2523 %
h = 0.001
x1[1] (analytic) = 3.0009615455558486713674445256013
x1[1] (numeric) = 2.6711480364457809431419300590378e+2523
absolute error = 2.6711480364457809431419300590378e+2523
relative error = 8.9009738908567770135522506028434e+2524 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=656.1MB, alloc=4.8MB, time=49.85
NO POLE
NO POLE
t[1] = 0.628
x2[1] (analytic) = 2.000862367008595076805983630248
x2[1] (numeric) = 1.9080016969718099929184549758541e+2541
absolute error = 1.9080016969718099929184549758541e+2541
relative error = 9.5358967634759548476672124901614e+2542 %
h = 0.001
x1[1] (analytic) = 3.0009605844909053830841579355885
x1[1] (numeric) = -2.1358031636510358553298370453118e+2543
absolute error = 2.1358031636510358553298370453118e+2543
relative error = 7.1170650314068080467733150405207e+2544 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=659.9MB, alloc=4.8MB, time=50.16
memory used=663.7MB, alloc=4.8MB, time=50.47
NO POLE
NO POLE
t[1] = 0.629
x2[1] (analytic) = 2.0008636129358648603237167874342
x2[1] (numeric) = -1.5256047231535209863299043763050e+2561
absolute error = 1.5256047231535209863299043763050e+2561
relative error = 7.6247312075159532946572680705199e+2562 %
h = 0.001
x1[1] (analytic) = 3.0009596243865466657549646734725
x1[1] (numeric) = 1.7077507841652587061210113930031e+2563
absolute error = 1.7077507841652587061210113930031e+2563
relative error = 5.6906823080445659435385726411409e+2564 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=667.5MB, alloc=4.8MB, time=51.12
NO POLE
NO POLE
t[1] = 0.63
x2[1] (analytic) = 2.0008648618377751455898511934167
x2[1] (numeric) = 1.2198468035967993705114632479223e+2581
absolute error = 1.2198468035967993705114632479223e+2581
relative error = 6.0965976606555117628987212800536e+2582 %
h = 0.001
x1[1] (analytic) = 3.0009586652418124149411387108333
x1[1] (numeric) = -1.3654876022524528103410071188910e+2583
absolute error = 1.3654876022524528103410071188910e+2583
relative error = 4.5501713104816257742179275890108e+2584 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=671.3MB, alloc=4.8MB, time=51.86
NO POLE
NO POLE
memory used=675.2MB, alloc=4.8MB, time=52.59
t[1] = 0.631
x2[1] (analytic) = 2.0008661137198011144776779363305
x2[1] (numeric) = -9.7536812888825131178892770435655e+2600
absolute error = 9.7536812888825131178892770435655e+2600
relative error = 4.8747296093437698758738965649079e+2602 %
h = 0.001
x1[1] (analytic) = 3.0009577070557434858285005033265
x1[1] (numeric) = 1.0918199594424662934135596521729e+2603
absolute error = 1.0918199594424662934135596521729e+2603
relative error = 3.6382384092765406116825969203778e+2604 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=679.0MB, alloc=4.8MB, time=53.47
NO POLE
NO POLE
t[1] = 0.632
x2[1] (analytic) = 2.0008673685874293899943355066245
x2[1] (numeric) = 7.7988726456951020477464103365620e+2620
absolute error = 7.7988726456951020477464103365620e+2620
relative error = 3.8977459316561014216914170518118e+2622 %
h = 0.001
x1[1] (analytic) = 3.0009567498273816922682720965747
x1[1] (numeric) = -8.7300010770552379665243154163683e+2622
absolute error = 8.7300010770552379665243154163683e+2622
relative error = 2.9090726074467408292673651531110e+2624 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=682.8MB, alloc=4.8MB, time=54.21
NO POLE
NO POLE
t[1] = 0.633
x2[1] (analytic) = 2.0008686264461580587064024151242
x2[1] (numeric) = -6.2358419085415689493480047575828e+2640
absolute error = 6.2358419085415689493480047575828e+2640
relative error = 3.1165673878436271176556538927026e+2642 %
h = 0.001
x1[1] (analytic) = 3.0009557935557698058188908975412
x1[1] (numeric) = 6.9803558861759086954795630466096e+2642
absolute error = 6.9803558861759086954795630466096e+2642
relative error = 2.3260442226991390904184204020406e+2644 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=686.6MB, alloc=4.8MB, time=54.92
memory used=690.4MB, alloc=4.8MB, time=55.61
NO POLE
NO POLE
t[1] = 0.634
x2[1] (analytic) = 2.0008698873014966932108652103333
x2[1] (numeric) = 4.9860699199630961217666868578741e+2660
absolute error = 4.9860699199630961217666868578741e+2660
relative error = 2.4919511016719005202208014872324e+2662 %
h = 0.001
x1[1] (analytic) = 3.0009548382399515547887811531979
x1[1] (numeric) = -5.5813702504268719746867854106894e+2662
absolute error = 5.5813702504268719746867854106894e+2662
relative error = 1.8598647934669767015658997421020e+2664 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=694.2MB, alloc=4.8MB, time=56.29
NO POLE
NO POLE
t[1] = 0.635
x2[1] (analytic) = 2.000871151158966374651552257488
x2[1] (numeric) = -3.9867741375398708527787079726300e+2680
absolute error = 3.9867741375398708527787079726300e+2680
relative error = 1.9925191760751851146732525788272e+2682 %
h = 0.001
x1[1] (analytic) = 3.0009538838789716232800821792605
x1[1] (numeric) = 4.4627658503836181428417285853360e+2682
absolute error = 4.4627658503836181428417285853360e+2682
relative error = 1.4871157715409935805151223714197e+2684 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=698.1MB, alloc=4.8MB, time=56.99
NO POLE
NO POLE
t[1] = 0.636
x2[1] (analytic) = 2.0008724180240997152811238232684
x2[1] (numeric) = 3.1877547404859540333980306437417e+2700
absolute error = 3.1877547404859540333980306437417e+2700
relative error = 1.5931824097180187082437615131963e+2702 %
h = 0.001
x1[1] (analytic) = 3.000952930471875650233332382718
x1[1] (numeric) = -3.5683493733150905105098113766422e+2702
absolute error = 3.5683493733150905105098113766422e+2702
relative error = 1.1890720900957271411856441699227e+2704 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=701.9MB, alloc=4.8MB, time=57.68
memory used=705.7MB, alloc=4.8MB, time=58.38
NO POLE
NO POLE
t[1] = 0.637
x2[1] (analytic) = 2.0008736879024408810687091918124
x2[1] (numeric) = -2.5488728317479325510406499645171e+2720
absolute error = 2.5488728317479325510406499645171e+2720
relative error = 1.2738799291323436877296057424593e+2722 %
h = 0.001
x1[1] (analytic) = 3.0009519780177102284731081228412
x1[1] (numeric) = 2.8531896310319896960086722902160e+2722
absolute error = 2.8531896310319896960086722902160e+2722
relative error = 9.5076150899178150476254998468080e+2723 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=709.5MB, alloc=4.8MB, time=59.07
NO POLE
NO POLE
t[1] = 0.638
x2[1] (analytic) = 2.0008749607995456143532817197936
x2[1] (numeric) = 2.0380340525922435334644770029126e+2740
absolute error = 2.0380340525922435334644770029126e+2740
relative error = 1.0185714212635502323881430417328e+2742 %
h = 0.001
x1[1] (analytic) = 3.0009510265155229037546164563083
x1[1] (numeric) = -2.2813604327833922767292864444613e+2742
absolute error = 2.2813604327833922767292864444613e+2742
relative error = 7.6021248351804503248682984874384e+2743 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=713.3MB, alloc=4.8MB, time=59.75
NO POLE
NO POLE
t[1] = 0.639
x2[1] (analytic) = 2.0008762367209812565428629207967
x2[1] (numeric) = -1.6295763161621422256209015033754e+2760
absolute error = 1.6295763161621422256209015033754e+2760
relative error = 8.1443134075732632880037653623427e+2761 %
h = 0.001
x1[1] (analytic) = 3.0009500759643621738112408130409
x1[1] (numeric) = 1.8241358259763258475795888650061e+2762
absolute error = 1.8241358259763258475795888650061e+2762
relative error = 6.0785277322220551297836288286127e+2763 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=717.1MB, alloc=4.8MB, time=60.44
memory used=720.9MB, alloc=4.8MB, time=61.13
NO POLE
NO POLE
t[1] = 0.64
x2[1] (analytic) = 2.000877515672326770859646852064
x2[1] (numeric) = 1.3029806674814559196932735298192e+2780
absolute error = 1.3029806674814559196932735298192e+2780
relative error = 6.5120461261399782651143296947418e+2781 %
h = 0.001
x1[1] (analytic) = 3.0009491263632774874030386502954
x1[1] (numeric) = -1.4585470422797786337129409529125e+2782
absolute error = 1.4585470422797786337129409529125e+2782
relative error = 4.8602857991375872207831746654479e+2783 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=724.8MB, alloc=4.8MB, time=61.81
NO POLE
NO POLE
t[1] = 0.641
x2[1] (analytic) = 2.0008787976591727651311362598939
x2[1] (numeric) = -1.0418405097030718388230485703553e+2800
absolute error = 1.0418405097030718388230485703553e+2800
relative error = 5.2069146363184046822635694898429e+2801 %
h = 0.001
x1[1] (analytic) = 3.000948177711319243366190133508
x1[1] (numeric) = 1.1662286570159714829783440591986e+2802
absolute error = 1.1662286570159714829783440591986e+2802
relative error = 3.8862005871270950536574199167820e+2803 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=728.6MB, alloc=4.8MB, time=62.50
NO POLE
NO POLE
t[1] = 0.642
x2[1] (analytic) = 2.0008800826871215146273821235389
x2[1] (numeric) = 8.3303741547938541388328723221923e+2819
absolute error = 8.3303741547938541388328723221923e+2819
relative error = 4.1633550290562207342400010062110e+2821 %
h = 0.001
x1[1] (analytic) = 3.0009472300075387896633968933414
x1[1] (numeric) = -9.3249599842826598040262262757426e+2821
absolute error = 9.3249599842826598040262262757426e+2821
relative error = 3.1073388732194515229273552154274e+2823 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=732.4MB, alloc=4.8MB, time=63.20
memory used=736.2MB, alloc=4.8MB, time=63.90
NO POLE
NO POLE
t[1] = 0.643
x2[1] (analytic) = 2.0008813707617869849444184213975
x2[1] (numeric) = -6.6608212017629525301015634245240e+2839
absolute error = 6.6608212017629525301015634245240e+2839
relative error = 3.3289435841101397401247401805981e+2841 %
h = 0.001
x1[1] (analytic) = 3.000946283250988422435229909332
x1[1] (numeric) = 7.4560746029825965160854027090734e+2841
absolute error = 7.4560746029825965160854027090734e+2841
relative error = 2.4845744972500052852821489207116e+2843 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=740.0MB, alloc=4.8MB, time=64.58
NO POLE
NO POLE
t[1] = 0.644
x2[1] (analytic) = 2.0008826618887948549339841275898
x2[1] (numeric) = 5.3258759159483119824476473259980e+2859
absolute error = 5.3258759159483119824476473259980e+2859
relative error = 2.6617632394899095535400821351815e+2861 %
h = 0.001
x1[1] (analytic) = 3.0009453374407213850524255714857
x1[1] (numeric) = -5.9617466004084611345219184763705e+2861
absolute error = 5.9617466004084611345219184763705e+2861
relative error = 1.9866228571470023938470974535260e+2863 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=743.8MB, alloc=4.8MB, time=65.26
NO POLE
NO POLE
t[1] = 0.645
x2[1] (analytic) = 2.0008839560737825396796246316935
x2[1] (numeric) = -4.2584770575392082611943918579407e+2879
absolute error = 4.2584770575392082611943918579407e+2879
relative error = 2.1282978678560492387241883626873e+2881 %
h = 0.001
x1[1] (analytic) = 3.0009443925757918671691289721178
x1[1] (numeric) = 4.7669081145277275022454288214763e+2881
absolute error = 4.7669081145277275022454288214763e+2881
relative error = 1.5884693252966813999837575547609e+2883 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=747.6MB, alloc=4.8MB, time=65.94
memory used=751.5MB, alloc=4.8MB, time=66.65
NO POLE
NO POLE
t[1] = 0.646
x2[1] (analytic) = 2.0008852533223992135192649594507
x2[1] (numeric) = 3.4050036342911657041669940128963e+2899
absolute error = 3.4050036342911657041669940128963e+2899
relative error = 1.7017485778543659949995237339178e+2901 %
h = 0.001
x1[1] (analytic) = 3.0009434486552550037770834811805
x1[1] (numeric) = -3.8115361982667008392024738906502e+2901
absolute error = 3.8115361982667008392024738906502e+2901
relative error = 1.2701126374023070821240293167904e+2903 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=755.3MB, alloc=4.8MB, time=67.33
NO POLE
NO POLE
t[1] = 0.647
x2[1] (analytic) = 2.0008865536403058331143473576768
x2[1] (numeric) = -2.7225812404014105320227464219923e+2919
absolute error = 2.7225812404014105320227464219923e+2919
relative error = 1.3606874589906619333382497263378e+2921 %
h = 0.001
x1[1] (analytic) = 3.0009425056781668742607656592677
x1[1] (numeric) = 3.0476375549220525325144041631657e+2921
absolute error = 3.0476375549220525325144041631657e+2921
relative error = 1.0155601279116586390397010520174e+2923 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=759.1MB, alloc=4.8MB, time=68.04
NO POLE
NO POLE
t[1] = 0.648
x2[1] (analytic) = 2.0008878570331751605656259923846
x2[1] (numeric) = 2.1769282522744691792342763574193e+2939
absolute error = 2.1769282522744691792342763574193e+2939
relative error = 1.0879811402835532477385596032874e+2941 %
h = 0.001
x1[1] (analytic) = 3.0009415636435845014534645634316
x1[1] (numeric) = -2.4368375854320982989438523598793e+2941
absolute error = 2.4368375854320982989438523598793e+2941
relative error = 8.1202433761269879831155639559293e+2942 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=762.9MB, alloc=4.8MB, time=68.74
memory used=766.7MB, alloc=4.8MB, time=69.43
NO POLE
NO POLE
t[1] = 0.649
x2[1] (analytic) = 2.0008891635066917865757116952936
x2[1] (numeric) = -1.7406336843972620012328487803937e+2959
absolute error = 1.7406336843972620012328487803937e+2959
relative error = 8.6993008715519519817411212646425e+2960 %
h = 0.001
x1[1] (analytic) = 3.0009406225505658506943045018897
x1[1] (numeric) = 1.9484526328218238287172905398116e+2961
absolute error = 1.9484526328218238287172905398116e+2961
relative error = 6.4928063493831837756473180790232e+2962 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=770.5MB, alloc=4.8MB, time=70.11
NO POLE
NO POLE
t[1] = 0.65
x2[1] (analytic) = 2.0008904730665521536584598804244
x2[1] (numeric) = 1.3917801930738075286500616804586e+2979
absolute error = 1.3917801930738075286500616804586e+2979
relative error = 6.9558039873155773433075177524759e+2980 %
h = 0.001
x1[1] (analytic) = 3.000939682398169828886210294647
x1[1] (numeric) = -1.5579485826410175368676730291377e+2981
absolute error = 1.5579485826410175368676730291377e+2981
relative error = 5.1915358105298507107219579779288e+2982 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=774.3MB, alloc=4.8MB, time=70.80
NO POLE
NO POLE
t[1] = 0.651
x2[1] (analytic) = 2.0008917857184645793952949393756
x2[1] (numeric) = -1.1128430543404758695448444362437e+2999
absolute error = 1.1128430543404758695448444362437e+2999
relative error = 5.5617353336321728455007150357248e+3000 %
h = 0.001
x1[1] (analytic) = 3.0009387431854562835548140979959
x1[1] (numeric) = 1.2457083868844098303112178483781e+3001
absolute error = 1.2457083868844098303112178483781e+3001
relative error = 4.1510623624463159208740363234088e+3002 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=778.2MB, alloc=4.8MB, time=71.48
memory used=782.0MB, alloc=4.8MB, time=72.19
NO POLE
NO POLE
t[1] = 0.652
x2[1] (analytic) = 2.0008931014681492797385646111628
x2[1] (numeric) = 8.8980980600013803064780599951614e+3018
absolute error = 8.8980980600013803064780599951614e+3018
relative error = 4.4470631906684208597382513266879e+3020 %
h = 0.001
x1[1] (analytic) = 3.0009378049114860019083028518026
x1[1] (numeric) = -9.9604659771478590727242936281765e+3020
absolute error = 9.9604659771478590727242936281765e+3020
relative error = 3.3191177640689715847540574685079e+3022 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=785.8MB, alloc=4.8MB, time=72.87
NO POLE
NO POLE
t[1] = 0.653
x2[1] (analytic) = 2.00089442032133839236201801014
x2[1] (numeric) = -7.1147632881910655869774937006535e+3038
absolute error = 7.1147632881910655869774937006535e+3038
relative error = 3.5557914580262827042521973621298e+3040 %
h = 0.001
x1[1] (analytic) = 3.000936867575320709898205409426
x1[1] (numeric) = 7.9642140589622524232612688712947e+3040
absolute error = 7.9642140589622524232612688712947e+3040
relative error = 2.6539092324848310378075989087892e+3042 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=789.6MB, alloc=4.8MB, time=73.55
NO POLE
NO POLE
t[1] = 0.654
x2[1] (analytic) = 2.0008957422837760000585011835573
x2[1] (numeric) = 5.6888400538691626251770919918174e+3058
absolute error = 5.6888400538691626251770919918174e+3058
relative error = 2.8431466635918033941237388804436e+3060 %
h = 0.001
x1[1] (analytic) = 3.0009359311760230712811184110572
x1[1] (numeric) = -6.3680460053270078592103767441288e+3060
absolute error = 6.3680460053270078592103767441288e+3060
relative error = 2.1220199802237908507255921573523e+3062 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=793.4MB, alloc=4.8MB, time=74.23
memory used=797.2MB, alloc=4.8MB, time=74.95
NO POLE
NO POLE
t[1] = 0.655
x2[1] (analytic) = 2.0008970673612181541849642587032
x2[1] (numeric) = -4.5486968220322044382297001881150e+3078
absolute error = 4.5486968220322044382297001881150e+3078
relative error = 2.2733287465061973748003465169974e+3080 %
h = 0.001
x1[1] (analytic) = 3.000934995712656686681369962205
x1[1] (numeric) = 5.0917779991520271226756830052400e+3080
absolute error = 5.0917779991520271226756830052400e+3080
relative error = 1.6967305211297456882421420981098e+3082 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=801.1MB, alloc=4.8MB, time=75.64
NO POLE
NO POLE
t[1] = 0.656
x2[1] (analytic) = 2.0008983955594328981548744283602
x2[1] (numeric) = 3.6370582724844770775674038742241e+3098
absolute error = 3.6370582724844770775674038742241e+3098
relative error = 1.8177126237674796257910246689377e+3100 %
h = 0.001
x1[1] (analytic) = 3.0009340611842860926546201799904
x1[1] (numeric) = -4.0712964653460091918199283593304e+3100
absolute error = 4.0712964653460091918199283593304e+3100
relative error = 1.3566764155222111680402777649221e+3102 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=804.9MB, alloc=4.8MB, time=76.32
NO POLE
NO POLE
memory used=808.7MB, alloc=4.8MB, time=77.01
t[1] = 0.657
x2[1] (analytic) = 2.0008997268842002909781292124573
x2[1] (numeric) = -2.9081280628278624103018190277950e+3118
absolute error = 2.9081280628278624103018190277950e+3118
relative error = 1.4534101953006897921412227264590e+3120 %
h = 0.001
x1[1] (analytic) = 3.0009331275899767607523976708514
x1[1] (numeric) = 3.2553373127224607930428545486479e+3120
absolute error = 3.2553373127224607930428545486479e+3120
relative error = 1.0847750264054680272184085468296e+3122 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=812.5MB, alloc=4.8MB, time=77.73
NO POLE
NO POLE
t[1] = 0.658
x2[1] (analytic) = 2.0009010613413124308485646233361
x2[1] (numeric) = 2.3252882401660862934161959836265e+3138
absolute error = 2.3252882401660862934161959836265e+3138
relative error = 1.1621205491326590404824915768846e+3140 %
h = 0.001
x1[1] (analytic) = 3.0009321949287950965875710041946
x1[1] (numeric) = -2.6029106722648018899628740092680e+3140
absolute error = 2.6029106722648018899628740092680e+3140
relative error = 8.6736737226632429791643125592375e+3141 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=816.3MB, alloc=4.8MB, time=78.40
NO POLE
NO POLE
t[1] = 0.659
x2[1] (analytic) = 2.0009023989365734787791530519576
x2[1] (numeric) = -1.8592597310164408322204560907566e+3158
absolute error = 1.8592597310164408322204560907566e+3158
relative error = 9.2921060617678705099686580505817e+3159 %
h = 0.001
x1[1] (analytic) = 3.000931263199808438900754247464
x1[1] (numeric) = 2.0812417629692278537621885187161e+3160
absolute error = 2.0812417629692278537621885187161e+3160
relative error = 6.9353196739003558910579975703823e+3161 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=820.1MB, alloc=4.8MB, time=79.09
memory used=823.9MB, alloc=4.9MB, time=79.79
NO POLE
NO POLE
t[1] = 0.66
x2[1] (analytic) = 2.0009037396757996822849858826715
x2[1] (numeric) = 1.4866315012767702295095679641686e+3178
absolute error = 1.4866315012767702295095679641686e+3178
relative error = 7.4298002037701453252903797290653e+3179 %
h = 0.001
x1[1] (analytic) = 3.0009303324020850586276456290331
x1[1] (numeric) = -1.6641244442546879377712025521471e+3180
absolute error = 1.6641244442546879377712025521471e+3180
relative error = 5.5453618042596972396274737683455e+3181 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=827.8MB, alloc=4.9MB, time=80.49
NO POLE
NO POLE
t[1] = 0.661
x2[1] (analytic) = 2.0009050835648193991141360348409
x2[1] (numeric) = -1.1886844983084726004495507319567e+3198
absolute error = 1.1886844983084726004495507319567e+3198
relative error = 5.9407340611615029625937464543453e+3199 %
h = 0.001
x1[1] (analytic) = 3.0009294025346941579672983962594
x1[1] (numeric) = 1.3306047453204596997828988531637e+3200
absolute error = 1.3306047453204596997828988531637e+3200
relative error = 4.4339755017115115060923124101645e+3201 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=831.6MB, alloc=4.9MB, time=81.17
NO POLE
NO POLE
t[1] = 0.662
x2[1] (analytic) = 2.0009064306094731210264958206685
x2[1] (numeric) = 9.5045129563402718269799193647415e+3217
absolute error = 9.5045129563402718269799193647415e+3217
relative error = 4.7501036584930217476680313075795e+3219 %
h = 0.001
x1[1] (analytic) = 3.0009284735967058694513229369711
x1[1] (numeric) = -1.0639282382888642493741029192637e+3220
absolute error = 1.0639282382888642493741029192637e+3220
relative error = 3.5453302124649217345141650075592e+3221 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=835.4MB, alloc=4.9MB, time=81.86
memory used=839.2MB, alloc=4.9MB, time=82.55
NO POLE
NO POLE
t[1] = 0.663
x2[1] (analytic) = 2.0009077808156134976206857000054
x2[1] (numeric) = -7.5996420131489996573912874744049e+3237
absolute error = 7.5996420131489996573912874744049e+3237
relative error = 3.7980970867389102800995795947740e+3239 %
h = 0.001
x1[1] (analytic) = 3.0009275455871912550140192335882
x1[1] (numeric) = 8.5069837621526876604611974904204e+3239
absolute error = 8.5069837621526876604611974904204e+3239
relative error = 2.8347847900100256575573395097860e+3241 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=843.0MB, alloc=4.9MB, time=83.23
NO POLE
NO POLE
t[1] = 0.664
x2[1] (analytic) = 2.0009091341891053602091297047469
x2[1] (numeric) = 6.0765405858584748626672687581947e+3257
absolute error = 6.0765405858584748626672687581947e+3257
relative error = 3.0368898227460351624450327079411e+3259 %
h = 0.001
x1[1] (analytic) = 3.0009266185052223050634387200113
x1[1] (numeric) = -6.8020351490925319123672777073124e+3259
absolute error = 6.8020351490925319123672777073124e+3259
relative error = 2.2666449446473510298518577617075e+3261 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=846.8MB, alloc=4.9MB, time=83.91
NO POLE
NO POLE
t[1] = 0.665
x2[1] (analytic) = 2.0009104907358257457413934976137
x2[1] (numeric) = -4.8586953737686950397247257823456e+3277
absolute error = 4.8586953737686950397247257823456e+3277
relative error = 2.4282422408520292589445262542066e+3279 %
h = 0.001
x1[1] (analytic) = 3.0009256923498719375533746123389
x1[1] (numeric) = 5.4387881137535227622582346999972e+3279
absolute error = 5.4387881137535227622582346999972e+3279
relative error = 1.8123701388602811529434263438089e+3281 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=850.6MB, alloc=4.9MB, time=84.59
memory used=854.5MB, alloc=4.9MB, time=85.29
NO POLE
NO POLE
t[1] = 0.666
x2[1] (analytic) = 2.0009118504616639207758812227102
x2[1] (numeric) = 3.8849276823757454483467843064925e+3297
absolute error = 3.8849276823757454483467843064925e+3297
relative error = 1.9415786265044053025824752142446e+3299 %
h = 0.001
x1[1] (analytic) = 3.0009247671202139970562797854037
x1[1] (numeric) = -4.3487596723537899796802752730508e+3299
absolute error = 4.3487596723537899796802752730508e+3299
relative error = 1.4491398518220777128196490700187e+3301 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=858.3MB, alloc=4.9MB, time=85.97
NO POLE
NO POLE
t[1] = 0.667
x2[1] (analytic) = 2.0009132133725214054999874982209
x2[1] (numeric) = -3.1063200995831536893371407387776e+3317
absolute error = 3.1063200995831536893371407387776e+3317
relative error = 1.5524511901980390340870015649487e+3319 %
h = 0.001
x1[1] (analytic) = 3.0009238428153232538371112680455
x1[1] (numeric) = 3.4771920310826235403195653948861e+3319
absolute error = 3.4771920310826235403195653948861e+3319
relative error = 1.1587071892569217104877660166334e+3321 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=862.1MB, alloc=4.9MB, time=86.67
NO POLE
NO POLE
t[1] = 0.668
x2[1] (analytic) = 2.0009145794743119977988010949601
x2[1] (numeric) = 2.4837591198540700838850288825887e+3337
absolute error = 2.4837591198540700838850288825887e+3337
relative error = 1.2413119207250780628524023049532e+3339 %
h = 0.001
x1[1] (analytic) = 3.0009229194342754029281004309665
x1[1] (numeric) = -2.7803018175249620621997061879348e+3339
absolute error = 2.7803018175249620621997061879348e+3339
relative error = 9.2648224968373924765661979273292e+3340 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=865.9MB, alloc=4.9MB, time=87.37
memory used=869.7MB, alloc=4.9MB, time=88.06
NO POLE
NO POLE
t[1] = 0.669
x2[1] (analytic) = 2.000915948772961797372457038241
x2[1] (numeric) = -1.9859702695437309438598858471998e+3357
absolute error = 1.9859702695437309438598858471998e+3357
relative error = 9.9253058118788242167470137795341e+3358 %
h = 0.001
x1[1] (analytic) = 3.0009219969761470632044479419367
x1[1] (numeric) = 2.2230806143098884403503707888221e+3359
absolute error = 2.2230806143098884403503707888221e+3359
relative error = 7.4079919989588409046664162486868e+3360 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=873.5MB, alloc=4.9MB, time=88.75
NO POLE
NO POLE
t[1] = 0.67
x2[1] (analytic) = 2.000917321274409229902234064653
x2[1] (numeric) = 1.5879470275456213787359848268900e+3377
absolute error = 1.5879470275456213787359848268900e+3377
relative error = 7.9360951632636079445372731082760e+3378 %
h = 0.001
x1[1] (analytic) = 3.0009210754400157764609425640462
x1[1] (numeric) = -1.7775363043570214811024358662249e+3379
absolute error = 1.7775363043570214811024358662249e+3379
relative error = 5.9233024117316608538641017763463e+3380 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=877.3MB, alloc=4.9MB, time=89.44
NO POLE
NO POLE
t[1] = 0.671
x2[1] (analytic) = 2.0009186969846050712654945598636
x2[1] (numeric) = -1.2696946177700317671909128537348e+3397
absolute error = 1.2696946177700317671909128537348e+3397
relative error = 6.3455582662277492273332266411181e+3398 %
h = 0.001
x1[1] (analytic) = 3.0009201548249600064895028736225
x1[1] (numeric) = 1.4212868813522824994188997988877e+3399
absolute error = 1.4212868813522824994188997988877e+3399
relative error = 4.7361702678663385521301653311592e+3400 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=881.2MB, alloc=4.9MB, time=90.12
memory used=885.0MB, alloc=4.9MB, time=90.81
NO POLE
NO POLE
t[1] = 0.672
x2[1] (analytic) = 2.0009200759095124717995642984636
x2[1] (numeric) = 1.0152255676223249071276681403167e+3417
absolute error = 1.0152255676223249071276681403167e+3417
relative error = 5.0737937004348214265345650512495e+3418 %
h = 0.001
x1[1] (analytic) = 3.0009192351300591381576409753546
x1[1] (numeric) = -1.1364360852448530674013599612365e+3419
absolute error = 1.1364360852448530674013599612365e+3419
relative error = 3.7869599152860913070171172063918e+3420 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=888.8MB, alloc=4.9MB, time=91.50
NO POLE
NO POLE
t[1] = 0.673
x2[1] (analytic) = 2.0009214580551069806146495021779
x2[1] (numeric) = -8.1175657416289845816492796757202e+3436
absolute error = 8.1175657416289845816492796757202e+3436
relative error = 4.0569137328954669620097121420601e+3438 %
h = 0.001
x1[1] (analytic) = 3.0009183163543934764878472930869
x1[1] (numeric) = 9.0867438009268226399584196683628e+3438
absolute error = 9.0867438009268226399584196683628e+3438
relative error = 3.0279877167618725501666339191078e+3440 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=892.6MB, alloc=4.9MB, time=92.20
NO POLE
NO POLE
t[1] = 0.674
x2[1] (analytic) = 2.0009228434273765699558889284481
x2[1] (numeric) = 6.4906633236193422189434234266442e+3456
absolute error = 6.4906633236193422189434234266442e+3456
relative error = 3.2438348859576706785987659393182e+3458 %
h = 0.001
x1[1] (analytic) = 3.0009173984970442457378955156682
x1[1] (numeric) = -7.2656011170124004426866003188801e+3458
absolute error = 7.2656011170124004426866003188801e+3458
relative error = 2.4211266596845506936168532207500e+3460 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=896.4MB, alloc=4.9MB, time=92.87
memory used=900.2MB, alloc=4.9MB, time=93.57
NO POLE
NO POLE
t[1] = 0.675
x2[1] (analytic) = 2.0009242320323216596146388974756
x2[1] (numeric) = -5.1898206582461441384444801429668e+3476
absolute error = 5.1898206582461441384444801429668e+3476
relative error = 2.5937117333897683891207735720122e+3478 %
h = 0.001
x1[1] (analytic) = 3.0009164815570935884820667781614
x1[1] (numeric) = 5.8094473386767561016013748331719e+3478
absolute error = 5.8094473386767561016013748331719e+3478
relative error = 1.9358910434129751488129295870248e+3480 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=904.0MB, alloc=4.9MB, time=94.25
NO POLE
NO POLE
t[1] = 0.676
x2[1] (analytic) = 2.0009256238759551413890893622884
x2[1] (numeric) = 4.1496896575648132462388961058169e+3496
absolute error = 4.1496896575648132462388961058169e+3496
relative error = 2.0738850100417665594774821209354e+3498 %
h = 0.001
x1[1] (analytic) = 3.000915565533624564693292159636
x1[1] (numeric) = -4.6451322935735617831780005636159e+3498
absolute error = 4.6451322935735617831780005636159e+3498
relative error = 1.5479050283600903766956832993493e+3500 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=907.9MB, alloc=4.9MB, time=94.94
NO POLE
NO POLE
t[1] = 0.677
x2[1] (analytic) = 2.0009270189643024035943093232542
x2[1] (numeric) = -3.3180191355436363635451484404863e+3516
absolute error = 3.3180191355436363635451484404863e+3516
relative error = 1.6582409573643883010530373047280e+3518 %
h = 0.001
x1[1] (analytic) = 3.0009146504257211508262125796873
x1[1] (numeric) = 3.7141663856986999694507329307862e+3518
absolute error = 3.7141663856986999694507329307862e+3518
relative error = 1.2376781142948514774589514210573e+3520 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=911.7MB, alloc=4.9MB, time=95.63
memory used=915.5MB, alloc=4.9MB, time=96.32
NO POLE
NO POLE
t[1] = 0.678
x2[1] (analytic) = 2.0009284173034013556218200857267
x2[1] (numeric) = 2.6530299594245713674084373696962e+3536
absolute error = 2.6530299594245713674084373696962e+3536
relative error = 1.3258994856997383860078702097683e+3538 %
h = 0.001
x1[1] (analytic) = 3.0009137362324682389011551767429
x1[1] (numeric) = -2.9697823589953007264073514882363e+3538
absolute error = 2.9697823589953007264073514882363e+3538
relative error = 9.8962603394383080164810653100327e+3539 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=919.3MB, alloc=4.9MB, time=97.02
NO POLE
NO POLE
t[1] = 0.679
x2[1] (analytic) = 2.0009298188993024525487950571612
x2[1] (numeric) = -2.1213162667463393441019055151396e+3556
absolute error = 2.1213162667463393441019055151396e+3556
relative error = 1.0601652525290770255268862680442e+3558 %
h = 0.001
x1[1] (analytic) = 3.0009128229529516355890252521297
x1[1] (numeric) = 2.3745859350187862198082792282973e+3558
absolute error = 2.3745859350187862198082792282973e+3558
relative error = 7.9128787642759691729053308897635e+3559 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=923.1MB, alloc=4.9MB, time=97.71
NO POLE
NO POLE
t[1] = 0.68
x2[1] (analytic) = 2.0009312237580687197969849780872
x2[1] (numeric) = 1.6961673152528777234832939614487e+3576
absolute error = 1.6961673152528777234832939614487e+3576
relative error = 8.4768896357527189033211191457735e+3577 %
h = 0.001
x1[1] (analytic) = 3.0009119105862580612971128647975
x1[1] (numeric) = -1.8986773039815089075263211239316e+3578
absolute error = 1.8986773039815089075263211239316e+3578
relative error = 6.3270011268360868549519130884895e+3579 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=926.9MB, alloc=4.9MB, time=98.41
memory used=930.8MB, alloc=4.9MB, time=99.11
NO POLE
NO POLE
t[1] = 0.681
x2[1] (analytic) = 2.0009326318857757778414676797685
x2[1] (numeric) = -1.3562256634862151721469975356416e+3596
absolute error = 1.3562256634862151721469975356416e+3596
relative error = 6.7779676430587393225710861877461e+3597 %
h = 0.001
x1[1] (analytic) = 3.0009109991314751492558131625016
x1[1] (numeric) = 1.5181491019089906712760257802157e+3598
absolute error = 1.5181491019089906712760257802157e+3598
relative error = 5.0589607700740674616839798813480e+3599 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=934.6MB, alloc=4.9MB, time=99.79
NO POLE
NO POLE
t[1] = 0.682
x2[1] (analytic) = 2.000934043288511866969321660221
x2[1] (numeric) = 1.0844142755011172611508192150739e+3616
absolute error = 1.0844142755011172611508192150739e+3616
relative error = 5.4195403348672852338392090570981e+3617 %
h = 0.001
x1[1] (analytic) = 3.0009100885876914446062595361678
x1[1] (numeric) = -1.2138854194938651935351441366117e+3618
absolute error = 1.2138854194938651935351441366117e+3618
relative error = 4.0450576113899904968422740203832e+3619 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=938.4MB, alloc=4.9MB, time=100.47
NO POLE
NO POLE
memory used=942.2MB, alloc=4.9MB, time=101.17
t[1] = 0.683
x2[1] (analytic) = 2.0009354579723778720883229695017
x2[1] (numeric) = -8.6707865259516642238635736934568e+3635
absolute error = 8.6707865259516642238635736934568e+3635
relative error = 4.3333664218925351391605233430746e+3637 %
h = 0.001
x1[1] (analytic) = 3.0009091789539964034888686850712
x1[1] (numeric) = 9.7060151062035201068925406733037e+3637
absolute error = 9.7060151062035201068925406733037e+3637
relative error = 3.2343581652766547170804634561412e+3639 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=946.0MB, alloc=4.9MB, time=101.86
NO POLE
NO POLE
t[1] = 0.684
x2[1] (analytic) = 2.0009368759434873475857650948153
x2[1] (numeric) = 6.9330089687248377123855934260447e+3655
absolute error = 6.9330089687248377123855934260447e+3655
relative error = 3.4648814023459715331534117411492e+3657 %
h = 0.001
x1[1] (analytic) = 3.000908270229480392132796681374
x1[1] (numeric) = -7.7607596012752863682888850957272e+3657
absolute error = 7.7607596012752863682888850957272e+3657
relative error = 2.5861368967075486979558168613063e+3659 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=949.8MB, alloc=4.9MB, time=102.54
NO POLE
NO POLE
t[1] = 0.685
x2[1] (analytic) = 2.0009382972079665422375017360243
x2[1] (numeric) = -5.5435124848888463712631262973319e+3675
absolute error = 5.5435124848888463712631262973319e+3675
relative error = 2.7704564866513143235194898528923e+3677 %
h = 0.001
x1[1] (analytic) = 3.0009073624132346859463051234791
x1[1] (numeric) = 6.2053673860749938975830693513696e+3677
absolute error = 6.2053673860749938975830693513696e+3677
relative error = 2.0678303715063146502499153008911e+3679 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=953.6MB, alloc=4.9MB, time=103.22
memory used=957.5MB, alloc=4.9MB, time=103.93
NO POLE
NO POLE
t[1] = 0.686
x2[1] (analytic) = 2.0009397217719544241673125625832
x2[1] (numeric) = 4.4324954444376931476074711311306e+3695
absolute error = 4.4324954444376931476074711311306e+3695
relative error = 2.2152068831501068460791793912093e+3697 %
h = 0.001
x1[1] (analytic) = 3.0009064555043514686080364685643
x1[1] (numeric) = -4.9617030258011870559842700781368e+3697
absolute error = 4.9617030258011870559842700781368e+3697
relative error = 1.6534014303245889137192167411937e+3699 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=961.3MB, alloc=4.9MB, time=104.61
NO POLE
NO POLE
t[1] = 0.687
x2[1] (analytic) = 2.0009411496416027058566922437566
x2[1] (numeric) = -3.5441456871463774750333779483421e+3715
absolute error = 3.5441456871463774750333779483421e+3715
relative error = 1.7712393429367899514796293814064e+3717 %
h = 0.001
x1[1] (analytic) = 3.0009055495019238311591976355737
x1[1] (numeric) = 3.9672907959469416182838068741267e+3717
absolute error = 3.9672907959469416182838068741267e+3717
relative error = 1.3220312104142744041560779310135e+3719 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=965.1MB, alloc=4.9MB, time=105.30
NO POLE
NO POLE
t[1] = 0.688
x2[1] (analytic) = 2.0009425808230758692051632452178
x2[1] (numeric) = 2.8338367876905407642057583016056e+3735
absolute error = 2.8338367876905407642057583016056e+3735
relative error = 1.4162509283624014839702473205175e+3737 %
h = 0.001
x1[1] (analytic) = 3.0009046444050457710966509708487
x1[1] (numeric) = -3.1721762019531209336798256924942e+3737
absolute error = 3.1721762019531209336798256924942e+3737
relative error = 1.0570733088328540239341020736154e+3739 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=968.9MB, alloc=4.9MB, time=105.98
memory used=972.7MB, alloc=4.9MB, time=106.68
NO POLE
NO POLE
t[1] = 0.689
x2[1] (analytic) = 2.000944015322551190641213086769
x2[1] (numeric) = -2.2658862383657334976395774618592e+3755
absolute error = 2.2658862383657334976395774618592e+3755
relative error = 1.1324086136415334693995101033562e+3757 %
h = 0.001
x1[1] (analytic) = 3.00090374021281219146691166949
x1[1] (numeric) = 2.5364165053184333407827567710547e+3757
absolute error = 2.5364165053184333407827567710547e+3757
relative error = 8.4521754941015227027125154360910e+3758 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=976.5MB, alloc=4.9MB, time=107.38
NO POLE
NO POLE
t[1] = 0.69
x2[1] (analytic) = 2.0009454531462187662839569579643
x2[1] (numeric) = 1.8117629312729073141103065680486e+3775
absolute error = 1.8117629312729073141103065680486e+3775
relative error = 9.0545343373761275145645874891439e+3776 %
h = 0.001
x1[1] (analytic) = 3.0009028369243188999610507464485
x1[1] (numeric) = -2.0280741922503233041622460366420e+3777
absolute error = 2.0280741922503233041622460366420e+3777
relative error = 6.7582134526185934189960115546865e+3778 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=980.3MB, alloc=4.9MB, time=108.07
NO POLE
NO POLE
t[1] = 0.691
x2[1] (analytic) = 2.0009468943002815371556267908721
x2[1] (numeric) = -1.4486538924840657497804821430995e+3795
absolute error = 1.4486538924840657497804821430995e+3795
relative error = 7.2398417799621356064606591236435e+3796 %
h = 0.001
x1[1] (analytic) = 3.0009019345386626080105026522465
x1[1] (numeric) = 1.6216125863584954933844329729313e+3797
absolute error = 1.6216125863584954933844329729313e+3797
relative error = 5.4037506780700273628323792700184e+3798 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=984.2MB, alloc=4.9MB, time=108.75
memory used=988.0MB, alloc=4.9MB, time=109.45
NO POLE
NO POLE
t[1] = 0.692
x2[1] (analytic) = 2.0009483387909553144449880920591
x2[1] (numeric) = 1.1583182677961091376871579769291e+3815
absolute error = 1.1583182677961091376871579769291e+3815
relative error = 5.7888464451611306501234646871089e+3816 %
h = 0.001
x1[1] (analytic) = 3.0009010330549409298837766291383
x1[1] (numeric) = -1.2966130086781936386720684049973e+3817
absolute error = 1.2966130086781936386720684049973e+3817
relative error = 4.3207456507095516078218557329271e+3818 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=991.8MB, alloc=4.9MB, time=110.15
NO POLE
NO POLE
t[1] = 0.693
x2[1] (analytic) = 2.0009497866244688048217860391447
x2[1] (numeric) = -9.2617098982111535889098808279227e+3834
absolute error = 9.2617098982111535889098808279227e+3834
relative error = 4.6286568309319391335128771832985e+3836 %
h = 0.001
x1[1] (analytic) = 3.0009001324722523817840709044204
x1[1] (numeric) = 1.0367490413039058597143722969169e+3837
absolute error = 1.0367490413039058597143722969169e+3837
relative error = 3.4547935470608070591974029019942e+3838 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=995.6MB, alloc=4.9MB, time=110.84
NO POLE
NO POLE
t[1] = 0.694
x2[1] (analytic) = 2.0009512378070636358023225509344
x2[1] (numeric) = 7.4055009424854893770071858962290e+3854
absolute error = 7.4055009424854893770071858962290e+3854
relative error = 3.7009902103369222494370396015529e+3856 %
h = 0.001
x1[1] (analytic) = 3.0008992327896963809477888185067
x1[1] (numeric) = -8.2896636656476315548528756257759e+3856
absolute error = 8.2896636656476315548528756257759e+3856
relative error = 2.7623932103649455810427340015484e+3858 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=999.4MB, alloc=4.9MB, time=111.52
memory used=1003.2MB, alloc=4.9MB, time=112.21
NO POLE
NO POLE
t[1] = 0.695
x2[1] (analytic) = 2.0009526923449943811662662442189
x2[1] (numeric) = -5.9213087876727582900794500895609e+3874
absolute error = 5.9213087876727582900794500895609e+3874
relative error = 2.9592447689172230926024022935957e+3876 %
h = 0.001
x1[1] (analytic) = 3.0008983340063732447439559862824
x1[1] (numeric) = 6.6282698080079369389402123215105e+3876
absolute error = 6.6282698080079369389402123215105e+3876
relative error = 2.2087618673701659494401068910360e+3878 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1007.0MB, alloc=4.9MB, time=112.89
NO POLE
NO POLE
t[1] = 0.696
x2[1] (analytic) = 2.0009541502445285864247973948022
x2[1] (numeric) = 4.7345747480524788479293312230502e+3894
absolute error = 4.7345747480524788479293312230502e+3894
relative error = 2.3661585386521152647179672500498e+3896 %
h = 0.001
x1[1] (analytic) = 3.0008974361213841897745375911567
x1[1] (numeric) = -5.2998483918969979290422750100868e+3896
absolute error = 5.2998483918969979290422750100868e+3896
relative error = 1.7660878136331690313436384444212e+3898 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1010.9MB, alloc=4.9MB, time=113.57
NO POLE
NO POLE
t[1] = 0.697
x2[1] (analytic) = 2.0009556115119467943401902252155
x2[1] (numeric) = -3.7856830050078156708012175928313e+3914
absolute error = 3.7856830050078156708012175928313e+3914
relative error = 1.8919375238650630517992942235826e+3916 %
h = 0.001
x1[1] (analytic) = 3.0008965391338313309756549121294
x1[1] (numeric) = 4.2376659053857816115313158564277e+3916
absolute error = 4.2376659053857816115313158564277e+3916
relative error = 1.4121332908761083861206501341712e+3918 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1014.7MB, alloc=4.9MB, time=114.26
memory used=1018.5MB, alloc=4.9MB, time=114.95
NO POLE
NO POLE
t[1] = 0.698
x2[1] (analytic) = 2.0009570761535425704969350468707
x2[1] (numeric) = 3.0269657946154689480523620177269e+3934
absolute error = 3.0269657946154689480523620177269e+3934
relative error = 1.5127589845326577335459466615290e+3936 %
h = 0.001
x1[1] (analytic) = 3.0008956430428176807197001850876
x1[1] (numeric) = -3.3883634017012659928566959966980e+3936
absolute error = 3.3883634017012659928566959966980e+3936
relative error = 1.1291173718608780711050170742030e+3938 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1022.3MB, alloc=4.9MB, time=115.65
NO POLE
NO POLE
t[1] = 0.699
x2[1] (analytic) = 2.0009585441756225289245029901196
x2[1] (numeric) = -2.4203088081203832874920205554678e+3954
absolute error = 2.4203088081203832874920205554678e+3954
relative error = 1.2095746886737872974863899261758e+3956 %
h = 0.001
x1[1] (analytic) = 3.0008947478474471479183489004502
x1[1] (numeric) = 2.7092760020078520060861609187813e+3956
absolute error = 2.7092760020078520060861609187813e+3956
relative error = 9.0282273443652952440990062330488e+3957 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1026.1MB, alloc=4.9MB, time=116.34
NO POLE
NO POLE
t[1] = 0.7
x2[1] (analytic) = 2.000960015584506357771856261807
x2[1] (numeric) = 1.9352365121156807977381455314529e+3974
absolute error = 1.9352365121156807977381455314529e+3974
relative error = 9.6715401459452608165339594605923e+3975 %
h = 0.001
x1[1] (analytic) = 3.0008938535468245371264686401681
x1[1] (numeric) = -2.1662896168014964544743635591221e+3976
absolute error = 2.1662896168014964544743635591221e+3976
relative error = 7.2188145350129915534980878705961e+3977 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1029.9MB, alloc=4.9MB, time=117.04
memory used=1033.8MB, alloc=4.9MB, time=117.74
NO POLE
NO POLE
t[1] = 0.701
x2[1] (analytic) = 2.0009614903865268450338070764361
x2[1] (numeric) = -1.5473812041093008800468884776539e+3994
absolute error = 1.5473812041093008800468884776539e+3994
relative error = 7.7331883274294918660405102732512e+3995 %
h = 0.001
x1[1] (analytic) = 3.0008929601400555476469235579926
x1[1] (numeric) = 1.7321272178929423360989698221539e+3996
absolute error = 1.7321272178929423360989698221539e+3996
relative error = 5.7720393259615022163778145922467e+3997 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1037.6MB, alloc=4.9MB, time=118.42
NO POLE
NO POLE
t[1] = 0.702
x2[1] (analytic) = 2.0009629685880299043293286140165
x2[1] (numeric) = 1.2372588961816894319857991624262e+4014
absolute error = 1.2372588961816894319857991624262e+4014
relative error = 6.1833173107384158411804248183822e+4015 %
h = 0.001
x1[1] (analytic) = 3.0008920676262467726362736078145
x1[1] (numeric) = -1.3849785715150144182486205742628e+4016
absolute error = 1.3849785715150144182486205742628e+4016
relative error = 4.6152228747452234683054013064579e+4017 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1041.4MB, alloc=4.9MB, time=119.11
NO POLE
NO POLE
t[1] = 0.703
x2[1] (analytic) = 2.0009644501953746007319215650229
x2[1] (numeric) = -9.8929053300856963376967123409285e+4033
absolute error = 9.8929053300856963376967123409285e+4033
relative error = 4.9440685111220996086886832079800e+4035 %
h = 0.001
x1[1] (analytic) = 3.0008911760045056982113676257735
x1[1] (numeric) = 1.1074045969262784579522558245738e+4036
absolute error = 1.1074045969262784579522558245738e+4036
relative error = 3.6902524349473969114456554134268e+4037 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1045.2MB, alloc=4.9MB, time=119.79
memory used=1049.0MB, alloc=4.9MB, time=120.49
NO POLE
NO POLE
t[1] = 0.704
x2[1] (analytic) = 2.0009659352149331766521400306684
x2[1] (numeric) = 7.9101937494305956737783096931257e+4053
absolute error = 7.9101937494305956737783096931257e+4053
relative error = 3.9531876131519073072984018560174e+4055 %
h = 0.001
x1[1] (analytic) = 3.0008902852739407025568293727305
x1[1] (numeric) = -8.8546131074935448805943556650070e+4055
absolute error = 8.8546131074935448805943556650070e+4055
relative error = 2.9506620588380619330734633543522e+4057 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1052.8MB, alloc=4.9MB, time=121.17
NO POLE
NO POLE
t[1] = 0.705
x2[1] (analytic) = 2.0009674236530910777723807548876
x2[1] (numeric) = -6.3248523124186056206477225992015e+4073
absolute error = 6.3248523124186056206477225992015e+4073
relative error = 3.1608971928546244334526594956905e+4075 %
h = 0.001
x1[1] (analytic) = 3.0008893954336610550334356445901
x1[1] (numeric) = 7.0799934821487806916129778501030e+4075
absolute error = 7.0799934821487806916129778501030e+4075
relative error = 2.3592983776483521039679372773576e+4077 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1056.6MB, alloc=4.9MB, time=121.87
NO POLE
NO POLE
t[1] = 0.706
x2[1] (analytic) = 2.0009689155162469790340398730335
x2[1] (numeric) = 5.0572410791817327797498317428180e+4093
absolute error = 5.0572410791817327797498317428180e+4093
relative error = 2.5273961229312611118020408258367e+4095 %
h = 0.001
x1[1] (analytic) = 3.0008885064827769152873855588495
x1[1] (numeric) = -5.6610387262259905192243399962762e+4095
absolute error = 5.6610387262259905192243399962762e+4095
relative error = 1.8864541998133315452831843804979e+4097 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1060.5MB, alloc=4.9MB, time=122.55
memory used=1064.3MB, alloc=4.9MB, time=123.25
NO POLE
NO POLE
t[1] = 0.707
x2[1] (analytic) = 2.0009704108108128106771415713127
x2[1] (numeric) = -4.0436813493251586707406054683172e+4113
absolute error = 4.0436813493251586707406054683172e+4113
relative error = 2.0208601423979175077844061789279e+4115 %
h = 0.001
x1[1] (analytic) = 3.0008876184203993323604601266444
x1[1] (numeric) = 4.5264673676089316903428064492055e+4115
absolute error = 4.5264673676089316903428064492055e+4115
relative error = 1.5083761683789957095980285608211e+4117 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1068.1MB, alloc=4.9MB, time=123.93
NO POLE
NO POLE
t[1] = 0.708
x2[1] (analytic) = 2.0009719095432137843325432604322
x2[1] (numeric) = 3.2332567498494265807947104575357e+4133
absolute error = 3.2332567498494265807947104575357e+4133
relative error = 1.6158431482366593829845034759676e+4135 %
h = 0.001
x1[1] (analytic) = 3.0008867312456402438010712204505
x1[1] (numeric) = -3.6192839902523937744443974516598e+4135
absolute error = 3.6192839902523937744443974516598e+4135
relative error = 1.2060715096534358579799396785470e+4137 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1071.9MB, alloc=4.9MB, time=124.61
NO POLE
NO POLE
memory used=1075.7MB, alloc=4.9MB, time=125.29
t[1] = 0.709
x2[1] (analytic) = 2.0009734117198884191668220767854
x2[1] (numeric) = -2.5852554411072758416887682413007e+4153
absolute error = 2.5852554411072758416887682413007e+4153
relative error = 1.2919988971193684682480913191871e+4155 %
h = 0.001
x1[1] (analytic) = 3.0008858449576124747761990484906
x1[1] (numeric) = 2.8939160582122655557125270156786e+4155
absolute error = 2.8939160582122655557125270156786e+4155
relative error = 9.6435393004865939252252234340902e+4156 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1079.5MB, alloc=4.9MB, time=125.99
NO POLE
NO POLE
t[1] = 0.71
x2[1] (analytic) = 2.0009749173472885680799477347923
x2[1] (numeric) = 2.0671249495067255204557394692653e+4173
absolute error = 2.0671249495067255204557394692653e+4173
relative error = 1.0330589012315719967142310135600e+4175 %
h = 0.001
x1[1] (analytic) = 3.0008849595554297371842172477831
x1[1] (numeric) = -2.3139245703111561047847324534041e+4175
absolute error = 2.3139245703111561047847324534041e+4175
relative error = 7.7108073168321509676309799341604e+4176 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1083.3MB, alloc=4.9MB, time=126.68
NO POLE
NO POLE
t[1] = 0.711
x2[1] (analytic) = 2.0009764264318794439558469647067
x2[1] (numeric) = -1.6528368875777459641079087704767e+4193
absolute error = 1.6528368875777459641079087704767e+4193
relative error = 8.2601517226520638220198516953437e+4194 %
h = 0.001
x1[1] (analytic) = 3.0008840750382066287686047086586
x1[1] (numeric) = 1.8501735397250213874227886288684e+4195
absolute error = 1.8501735397250213874227886288684e+4195
relative error = 6.1654282320168111280898930179907e+4196 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1087.2MB, alloc=4.9MB, time=127.36
memory used=1091.0MB, alloc=4.9MB, time=128.06
NO POLE
NO POLE
t[1] = 0.712
x2[1] (analytic) = 2.0009779389801396459659649813274
x2[1] (numeric) = 1.3215794127924351394148900475239e+4213
absolute error = 1.3215794127924351394148900475239e+4213
relative error = 6.6046675830220247273924753953203e+4214 %
h = 0.001
x1[1] (analytic) = 3.0008831914050586322325432444553
x1[1] (numeric) = -1.4793663419366783531134821891010e+4215
absolute error = 1.4793663419366783531134821891010e+4215
relative error = 4.9297698296747658068725886564331e+4216 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1094.8MB, alloc=4.9MB, time=128.74
NO POLE
NO POLE
t[1] = 0.713
x2[1] (analytic) = 2.000979454998561185925929640596
x2[1] (numeric) = -1.0567117405495601892941891187788e+4233
absolute error = 1.0567117405495601892941891187788e+4233
relative error = 5.2809724653085956999242429693559e+4234 %
h = 0.001
x1[1] (analytic) = 3.0008823086551021143544002209907
x1[1] (numeric) = 1.1828754042068802774342338602408e+4235
absolute error = 1.1828754042068802774342338602408e+4235
relative error = 3.9417587314079190789517935509595e+4236 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1098.6MB, alloc=4.9MB, time=129.42
NO POLE
NO POLE
t[1] = 0.714
x2[1] (analytic) = 2.0009809744936495147054241530315
x2[1] (numeric) = 8.4492819107697345026281931799326e+4252
absolute error = 8.4492819107697345026281931799326e+4252
relative error = 4.2225698387301432436954779553188e+4254 %
h = 0.001
x1[1] (analytic) = 3.0008814267874543251040952612934
x1[1] (numeric) = -9.4580644578263659139335950766998e+4254
absolute error = 9.4580644578263659139335950766998e+4254
relative error = 3.1517621367504499285238097680265e+4256 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1102.4MB, alloc=4.9MB, time=130.10
memory used=1106.2MB, alloc=4.9MB, time=130.79
NO POLE
NO POLE
t[1] = 0.715
x2[1] (analytic) = 2.0009824974719235486913744353461
x2[1] (numeric) = -6.7558977598311656119445531554100e+4272
absolute error = 6.7558977598311656119445531554100e+4272
relative error = 3.3762902815825153721211848557416e+4274 %
h = 0.001
x1[1] (analytic) = 3.0008805458012333967603501419595
x1[1] (numeric) = 7.5625026076502155954971786454481e+4274
absolute error = 7.5625026076502155954971786454481e+4274
relative error = 2.5200945163350484869156682973548e+4276 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1110.0MB, alloc=4.9MB, time=131.47
NO POLE
NO POLE
t[1] = 0.716
x2[1] (analytic) = 2.0009840239399156963045573943993
x2[1] (numeric) = 5.4018974657615294330761096369531e+4292
absolute error = 5.4018974657615294330761096369531e+4292
relative error = 2.6996204872866762330015889449257e+4294 %
h = 0.001
x1[1] (analytic) = 3.000879665695558343028820998386
x1[1] (numeric) = -6.0468445680121679132348032172412e+4294
absolute error = 6.0468445680121679132348032172412e+4294
relative error = 2.0150240068392083138976610084583e+4296 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1113.9MB, alloc=4.9MB, time=132.14
NO POLE
NO POLE
t[1] = 0.717
x2[1] (analytic) = 2.0009855539041718845697366508957
x2[1] (numeric) = -4.3192625566509570897201297828460e+4312
absolute error = 4.3192625566509570897201297828460e+4312
relative error = 2.1585675859695929386566919914316e+4314 %
h = 0.001
x1[1] (analytic) = 3.0008787864695490581611119570114
x1[1] (numeric) = 4.8349509582594846790207966642135e+4314
absolute error = 4.8349509582594846790207966642135e+4314
relative error = 1.6111783588392355005632232034436e+4316 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1117.7MB, alloc=4.9MB, time=132.82
memory used=1121.5MB, alloc=4.9MB, time=133.53
NO POLE
NO POLE
t[1] = 0.718
x2[1] (analytic) = 2.0009870873712515857394324238966
x2[1] (numeric) = 3.4536066542419903531680123451956e+4332
absolute error = 3.4536066542419903531680123451956e+4332
relative error = 1.7259514946591097735886959823435e+4334 %
h = 0.001
x1[1] (analytic) = 3.0008779081223263160746693135771
x1[1] (numeric) = -3.8659420638058756716003640111199e+4334
absolute error = 3.8659420638058756716003640111199e+4334
relative error = 1.2882703602642824695422587938005e+4336 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1125.3MB, alloc=4.9MB, time=134.20
NO POLE
NO POLE
t[1] = 0.719
x2[1] (analytic) = 2.0009886243477278439714325113141
x2[1] (numeric) = -2.7614433634876660571651010714807e+4352
absolute error = 2.7614433634876660571651010714807e+4352
relative error = 1.3800395114129283991701965561196e+4354 %
h = 0.001
x1[1] (analytic) = 3.0008770306530117694735553773055
x1[1] (numeric) = 3.0911395316580023795238476202491e+4354
absolute error = 3.0911395316580023795238476202491e+4354
relative error = 1.0300787070189773355545839220979e+4356 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1129.1MB, alloc=4.9MB, time=134.88
NO POLE
NO POLE
t[1] = 0.72
x2[1] (analytic) = 2.0009901648401873020601515160803
x2[1] (numeric) = 2.2080017249166902508138211862667e+4372
absolute error = 2.2080017249166902508138211862667e+4372
relative error = 1.1034545615035725582098198811651e+4374 %
h = 0.001
x1[1] (analytic) = 3.0008761540607279489701011017664
x1[1] (numeric) = -2.4716210037488694405122909438076e+4374
absolute error = 2.4716210037488694405122909438076e+4374
relative error = 8.2363312474735733134242117506716e+4375 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1132.9MB, alloc=4.9MB, time=135.55
memory used=1136.7MB, alloc=4.9MB, time=136.25
NO POLE
NO POLE
t[1] = 0.721
x2[1] (analytic) = 2.0009917088552302282219456826375
x2[1] (numeric) = -1.7654794886242666219618153969175e+4392
absolute error = 1.7654794886242666219618153969175e+4392
relative error = 8.8230225083456221229870103512644e+4393 %
h = 0.001
x1[1] (analytic) = 3.0008752783445982622074366240855
x1[1] (numeric) = 1.9762648446011484541407450192760e+4394
absolute error = 1.9762648446011484541407450192760e+4394
relative error = 6.5856280627941807301676361761149e+4395 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1140.6MB, alloc=4.9MB, time=136.94
NO POLE
NO POLE
t[1] = 0.722
x2[1] (analytic) = 2.000993256399470542934490923781
x2[1] (numeric) = 1.4116464627628884163916639895865e+4412
absolute error = 1.4116464627628884163916639895865e+4412
relative error = 7.0547287365823724921432340673063e+4413 %
h = 0.001
x1[1] (analytic) = 3.0008744035037469929828988350251
x1[1] (numeric) = -1.5801867398288360832833637937658e+4414
absolute error = 1.5801867398288360832833637937658e+4414
relative error = 5.2657543347493950152224899109736e+4415 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1144.4MB, alloc=4.9MB, time=137.62
NO POLE
NO POLE
t[1] = 0.723
x2[1] (analytic) = 2.0009948074795358458303318336966
x2[1] (numeric) = -1.1287277754689766392095611818224e+4432
absolute error = 1.1287277754689766392095611818224e+4432
relative error = 5.6408331058626204208275301058494e+4433 %
h = 0.001
x1[1] (analytic) = 3.000873529537299300372315103345
x1[1] (numeric) = 1.2634896276945261798087632611530e+4434
absolute error = 1.2634896276945261798087632611530e+4434
relative error = 4.2104061209448635630990779719852e+4435 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1148.2MB, alloc=4.9MB, time=138.29
memory used=1152.0MB, alloc=4.9MB, time=138.98
NO POLE
NO POLE
t[1] = 0.724
x2[1] (analytic) = 2.0009963621020674426447096992844
x2[1] (numeric) = 9.0251095066792254128337409595663e+4451
absolute error = 9.0251095066792254128337409595663e+4451
relative error = 4.5103078034576006039706861410146e+4453 %
h = 0.001
x1[1] (analytic) = 3.000872656444381217855162278726
x1[1] (numeric) = -1.0102641662874434377542055204368e+4454
absolute error = 1.0102641662874434377542055204368e+4454
relative error = 3.3665679352234381579487205943746e+4455 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1155.8MB, alloc=4.9MB, time=139.67
NO POLE
NO POLE
t[1] = 0.725
x2[1] (analytic) = 2.0009979202737203722177777385379
x2[1] (numeric) = -7.2163194153443135771083218610854e+4471
absolute error = 7.2163194153443135771083218610854e+4471
relative error = 3.6063602776544511848154930664303e+4473 %
h = 0.001
x1[1] (analytic) = 3.0008717842241196524406000984165
x1[1] (numeric) = 8.0778952459372441947784823201128e+4473
absolute error = 8.0778952459372441947784823201128e+4473
relative error = 2.6918495113331865757167882148664e+4475 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1159.6MB, alloc=4.9MB, time=140.35
NO POLE
NO POLE
t[1] = 0.726
x2[1] (analytic) = 2.0009994820011634335513120118572
x2[1] (numeric) = 5.7700425535818574689617097946120e+4491
absolute error = 5.7700425535818574689617097946120e+4491
relative error = 2.8835802335197719031544120939128e+4493 %
h = 0.001
x1[1] (analytic) = 3.0008709128756423837943781236344
x1[1] (numeric) = -6.4589434904068171871852287427211e+4493
absolute error = 6.4589434904068171871852287427211e+4493
relative error = 2.1523563251900796070700423812930e+4495 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1163.5MB, alloc=4.9MB, time=141.03
memory used=1167.3MB, alloc=4.9MB, time=141.72
NO POLE
NO POLE
t[1] = 0.727
x2[1] (analytic) = 2.0010010472910792129200266697248
x2[1] (numeric) = -4.6136249178982481087695602001651e+4511
absolute error = 4.6136249178982481087695602001651e+4511
relative error = 2.3056584223901802235877571453718e+4513 %
h = 0.001
x1[1] (analytic) = 3.0008700423980780633666153326315
x1[1] (numeric) = 5.1644580354332436298954377326112e+4513
absolute error = 5.1644580354332436298954377326112e+4513
relative error = 1.7209869012875288309974690547566e+4515 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1171.1MB, alloc=4.9MB, time=142.40
NO POLE
NO POLE
t[1] = 0.728
x2[1] (analytic) = 2.0010026161501641110376024181493
x2[1] (numeric) = 3.6889736402096790111805470190512e+4531
absolute error = 3.6889736402096790111805470190512e+4531
relative error = 1.8435626272728681270819338146895e+4533 %
h = 0.001
x1[1] (analytic) = 3.0008691727905562135204514982004
x1[1] (numeric) = -4.1294101487906164193386810054217e+4533
absolute error = 4.1294101487906164193386810054217e+4533
relative error = 1.3760713683331326011087207665122e+4535 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1174.9MB, alloc=4.9MB, time=143.08
NO POLE
NO POLE
t[1] = 0.729
x2[1] (analytic) = 2.0010041885851283702775373017035
x2[1] (numeric) = -2.9496386811525326525276717694284e+4551
absolute error = 2.9496386811525326525276717694284e+4551
relative error = 1.4740792138162217002253433159317e+4553 %
h = 0.001
x1[1] (analytic) = 3.0008683040522072266615694782741
x1[1] (numeric) = 3.3018039956838288621541481209265e+4553
absolute error = 3.3018039956838288621541481209265e+4553
relative error = 1.1002828718692035426525768668450e+4555 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1178.7MB, alloc=4.9MB, time=143.75
memory used=1182.5MB, alloc=4.9MB, time=144.44
NO POLE
NO POLE
t[1] = 0.73
x2[1] (analytic) = 2.0010057646026961019489291228349
x2[1] (numeric) = 2.3584794031915957404061775551044e+4571
absolute error = 2.3584794031915957404061775551044e+4571
relative error = 1.1786469808895711903857159710758e+4573 %
h = 0.001
x1[1] (analytic) = 3.0008674361821623643685875491419
x1[1] (numeric) = -2.6400646177291322258090244040947e+4573
absolute error = 2.6400646177291322258090244040947e+4573
relative error = 8.7976715862128864798702699589668e+4574 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1186.3MB, alloc=4.9MB, time=145.13
NO POLE
NO POLE
t[1] = 0.731
x2[1] (analytic) = 2.0010073442096053136272990354173
x2[1] (numeric) = -1.8857988033658213781496107627036e+4591
absolute error = 1.8857988033658213781496107627036e+4591
relative error = 9.4242472863622041125986671892873e+4592 %
h = 0.001
x1[1] (analytic) = 3.0008665691795537565243209116727
x1[1] (numeric) = 2.1109494067172030723819370272964e+4593
absolute error = 2.1109494067172030723819370272964e+4593
relative error = 7.0344660718931705075315089138315e+4594 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1190.2MB, alloc=4.9MB, time=145.81
NO POLE
NO POLE
t[1] = 0.732
x2[1] (analytic) = 2.0010089274126079365405660702459
x2[1] (numeric) = 1.5078516784855152217856312000738e+4611
absolute error = 1.5078516784855152217856312000738e+4611
relative error = 7.5354570278466143208297708649765e+4612 %
h = 0.001
x1[1] (analytic) = 3.0008657030435144004479115018074
x1[1] (numeric) = -1.6878781556311525988898388391406e+4613
absolute error = 1.6878781556311525988898388391406e+4613
relative error = 5.6246374301898485403119672522063e+4614 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1194.0MB, alloc=4.9MB, time=146.51
memory used=1197.8MB, alloc=4.9MB, time=147.20
NO POLE
NO POLE
t[1] = 0.733
x2[1] (analytic) = 2.0010105142184698530102825703439
x2[1] (numeric) = -1.2056517801652949570650128373589e+4631
absolute error = 1.2056517801652949570650128373589e+4631
relative error = 6.0252146183059095203901714823714e+4632 %
h = 0.001
x1[1] (analytic) = 3.000864837773178160027825237451
x1[1] (numeric) = 1.3495977967028953546593985346436e+4633
absolute error = 1.3495977967028953546593985346436e+4633
relative error = 4.4973628259258018797156285796481e+4634 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1201.6MB, alloc=4.9MB, time=147.88
NO POLE
NO POLE
t[1] = 0.734
x2[1] (analytic) = 2.0010121046339709239482407345618
x2[1] (numeric) = 9.6401803689056165076069583357446e+4650
absolute error = 9.6401803689056165076069583357446e+4650
relative error = 4.8176522003943685744250078085729e+4652 %
h = 0.001
x1[1] (analytic) = 3.0008639733676797648557158347604
x1[1] (numeric) = -1.0791147493606987175378337751774e+4653
absolute error = 1.0791147493606987175378337751774e+4653
relative error = 3.5960135445582243860332420982972e+4654 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1205.4MB, alloc=4.9MB, time=148.56
NO POLE
NO POLE
memory used=1209.2MB, alloc=4.9MB, time=149.24
t[1] = 0.735
x2[1] (analytic) = 2.0010136986659050164085606889993
x2[1] (numeric) = -7.7081192989481669321006140786145e+4670
absolute error = 7.7081192989481669321006140786145e+4670
relative error = 3.8521072115034713851403430049913e+4672 %
h = 0.001
x1[1] (analytic) = 3.0008631098261548093611543276921
x1[1] (numeric) = 8.6284124435641602866426624680432e+4672
absolute error = 8.6284124435641602866426624680432e+4672
relative error = 2.8753102450128153777506836746019e+4674 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1213.0MB, alloc=4.9MB, time=149.92
NO POLE
NO POLE
t[1] = 0.736
x2[1] (analytic) = 2.0010152963210800311953707272764
x2[1] (numeric) = 6.1632771227455953919227219454374e+4690
absolute error = 6.1632771227455953919227219454374e+4690
relative error = 3.0800749669814841962308650622732e+4692 %
h = 0.001
x1[1] (analytic) = 3.0008622471477397519472234255395
x1[1] (numeric) = -6.8991273949650909171852886090073e+4692
absolute error = 6.8991273949650909171852886090073e+4692
relative error = 2.2990483490278752820023187056137e+4694 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1216.9MB, alloc=4.9MB, time=150.60
NO POLE
NO POLE
t[1] = 0.737
x2[1] (analytic) = 2.0010168976063179305261905826109
x2[1] (numeric) = -4.9280483887869650879303597758109e+4710
absolute error = 4.9280483887869650879303597758109e+4710
relative error = 2.4627720009171628024370551279577e+4712 %
h = 0.001
x1[1] (analytic) = 3.0008613853315719141269758440541
x1[1] (numeric) = 5.5164213722143759306208270413670e+4712
absolute error = 5.5164213722143759306208270413670e+4712
relative error = 1.8382793017961588198530782712803e+4714 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1220.7MB, alloc=4.9MB, time=151.28
memory used=1224.5MB, alloc=4.9MB, time=151.96
NO POLE
NO POLE
t[1] = 0.738
x2[1] (analytic) = 2.0010185025284547657511288170474
x2[1] (numeric) = 3.9403811379176002905266921867238e+4730
absolute error = 3.9403811379176002905266921867238e+4730
relative error = 1.9691877576037393558104229220239e+4732 %
h = 0.001
x1[1] (analytic) = 3.0008605243767894796607557466077
x1[1] (numeric) = -4.4108338654583601118406968527865e+4732
absolute error = 4.4108338654583601118406968527865e+4732
relative error = 1.4698563394159713723956101507055e+4734 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1228.3MB, alloc=4.9MB, time=152.64
NO POLE
NO POLE
t[1] = 0.739
x2[1] (analytic) = 2.0010201110943407051280056360003
x2[1] (numeric) = -3.1506597109284194239504208705933e+4750
absolute error = 3.1506597109284194239504208705933e+4750
relative error = 1.5745267593564318051123382480506e+4752 %
h = 0.001
x1[1] (analytic) = 3.0008596642825314936943824327193
x1[1] (numeric) = 3.5268254681684371410412477804235e+4752
absolute error = 3.5268254681684371410412477804235e+4752
relative error = 1.1752717096857835166686331166290e+4754 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1232.1MB, alloc=4.9MB, time=153.32
NO POLE
NO POLE
t[1] = 0.74
x2[1] (analytic) = 2.00102172331084006165351265955
x2[1] (numeric) = 2.5192122961266529664847826379124e+4770
absolute error = 2.5192122961266529664847826379124e+4770
relative error = 1.2589629921450467094139215122547e+4772 %
h = 0.001
x1[1] (analytic) = 3.0008588050479378618981954121275
x1[1] (numeric) = -2.8199878440964463480153496425717e+4772
absolute error = 2.8199878440964463480153496425717e+4772
relative error = 9.3972693395396117213633783438616e+4773 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1235.9MB, alloc=4.9MB, time=153.99
memory used=1239.7MB, alloc=4.9MB, time=154.68
NO POLE
NO POLE
t[1] = 0.741
x2[1] (analytic) = 2.0010233391848313209505214056437
x2[1] (numeric) = -2.0143180080484131598957904069289e+4790
absolute error = 2.0143180080484131598957904069289e+4790
relative error = 1.0066439349323120671884479448763e+4792 %
h = 0.001
x1[1] (analytic) = 3.0008579466721493496069600034559
x1[1] (numeric) = 2.2548128657417104603157823041453e+4792
absolute error = 2.2548128657417104603157823041453e+4792
relative error = 7.5138940456752449045589036881081e+4793 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1243.6MB, alloc=4.9MB, time=155.36
NO POLE
NO POLE
t[1] = 0.742
x2[1] (analytic) = 2.0010249587232071692116524645227
x2[1] (numeric) = 1.6106133825190483671927760560417e+4810
absolute error = 1.6106133825190483671927760560417e+4810
relative error = 8.0489419959395784387290536395446e+4811 %
h = 0.001
x1[1] (analytic) = 3.0008570891543075809606325973753
x1[1] (numeric) = -1.8029088565604685019984586770684e+4812
absolute error = 1.8029088565604685019984586770684e+4812
relative error = 6.0079797304461399498918055345082e+4813 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1247.4MB, alloc=4.9MB, time=156.06
NO POLE
NO POLE
t[1] = 0.743
x2[1] (analytic) = 2.0010265819328745211992175683031
x2[1] (numeric) = -1.2878182380262486667929352793103e+4830
absolute error = 1.2878182380262486667929352793103e+4830
relative error = 6.4357877584129424636863898734712e+4831 %
h = 0.001
x1[1] (analytic) = 3.000856232493555038045984725029
x1[1] (numeric) = 1.4415743294931684844411606678446e+4832
absolute error = 1.4415743294931684844411606678446e+4832
relative error = 4.8038766865392128201157110475061e+4833 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1251.2MB, alloc=4.9MB, time=156.73
memory used=1255.0MB, alloc=4.9MB, time=157.42
NO POLE
NO POLE
t[1] = 0.744
x2[1] (analytic) = 2.0010282088207545483016469847083
x2[1] (numeric) = 1.0297168968005996573073174044055e+4850
absolute error = 1.0297168968005996573073174044055e+4850
relative error = 5.1459389341014446047363686781085e+4851 %
h = 0.001
x1[1] (analytic) = 3.0008553766890350600390850733442
x1[1] (numeric) = -1.1526575732831443986830462760097e+4852
absolute error = 1.1526575732831443986830462760097e+4852
relative error = 3.8410967160800599943508594164972e+4853 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1258.8MB, alloc=4.9MB, time=158.10
NO POLE
NO POLE
t[1] = 0.745
x2[1] (analytic) = 2.0010298393937827066465148894562
x2[1] (numeric) = -8.2334358704356626240826877259313e+4869
absolute error = 8.2334358704356626240826877259313e+4869
relative error = 4.1145992470207260091862898615202e+4871 %
h = 0.001
x1[1] (analytic) = 3.0008545217398918423486385897126
x1[1] (numeric) = 9.2164479768039850535111568440644e+4871
absolute error = 9.2164479768039850535111568440644e+4871
relative error = 3.0712745019909527643091876911917e+4873 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1262.6MB, alloc=4.9MB, time=158.78
NO POLE
NO POLE
t[1] = 0.746
x2[1] (analytic) = 2.0010314736589087652702755977723
x2[1] (numeric) = 6.5833110482311335951175880377463e+4889
absolute error = 6.5833110482311335951175880377463e+4889
relative error = 3.2899587712098673839247410929931e+4891 %
h = 0.001
x1[1] (analytic) = 3.000853667645270435760181819378
x1[1] (numeric) = -7.3693103032489667310552287898144e+4891
absolute error = 7.3693103032489667310552287898144e+4891
relative error = 2.4557379730653662756766853868032e+4893 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1266.5MB, alloc=4.9MB, time=159.46
memory used=1270.3MB, alloc=4.9MB, time=160.15
NO POLE
NO POLE
t[1] = 0.747
x2[1] (analytic) = 2.0010331116230968343448237619125
x2[1] (numeric) = -5.2639001553878408298152009177925e+4909
absolute error = 5.2639001553878408298152009177925e+4909
relative error = 2.6305912305059942417073084222470e+4911 %
h = 0.001
x1[1] (analytic) = 3.0008528144043167455811336197272
x1[1] (numeric) = 5.8923713867046081915575634259349e+4911
absolute error = 5.8923713867046081915575634259349e+4911
relative error = 1.9635656098895577936972365012671e+4913 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1274.1MB, alloc=4.9MB, time=160.83
NO POLE
NO POLE
t[1] = 0.748
x2[1] (analytic) = 2.0010347532933253934609918684512
x2[1] (numeric) = 4.2089223253908314321032956922633e+4929
absolute error = 4.2089223253908314321032956922633e+4929
relative error = 2.1033729266639372258790541410664e+4931 %
h = 0.001
x1[1] (analytic) = 3.0008519620161775307867003965345
x1[1] (numeric) = -4.7114369093058661833314345872691e+4931
absolute error = 4.7114369093058661833314345872691e+4931
relative error = 1.5700331002467714948599166423896e+4933 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1277.9MB, alloc=4.9MB, time=161.50
NO POLE
NO POLE
t[1] = 0.749
x2[1] (analytic) = 2.0010363986765873199690985964066
x2[1] (numeric) = -3.3653805388085161968882162812995e+4949
absolute error = 3.3653805388085161968882162812995e+4949
relative error = 1.6818187520398211940829572488083e+4951 %
h = 0.001
x1[1] (analytic) = 3.0008511104800004031666350080642
x1[1] (numeric) = 3.7671823945883280001218416083994e+4951
absolute error = 3.7671823945883280001218416083994e+4951
relative error = 1.2553713116362341830456965932232e+4953 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1281.7MB, alloc=4.9MB, time=162.18
memory used=1285.5MB, alloc=4.9MB, time=162.87
NO POLE
NO POLE
t[1] = 0.75
x2[1] (analytic) = 2.0010380477798899173766618250573
x2[1] (numeric) = 2.6908993075654848921363431692497e+4969
absolute error = 2.6908993075654848921363431692497e+4969
relative error = 1.3447516955267200891057737793172e+4971 %
h = 0.001
x1[1] (analytic) = 3.0008502597949338264728484837917
x1[1] (numeric) = -3.0121730307086082081337854664838e+4971
absolute error = 3.0121730307086082081337854664838e+4971
relative error = 1.0037731875746603013770079830712e+4973 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1289.3MB, alloc=4.9MB, time=163.55
NO POLE
NO POLE
t[1] = 0.751
x2[1] (analytic) = 2.0010397006102549438033903085354
x2[1] (numeric) = -2.1515959339385725942855974820000e+4989
absolute error = 2.1515959339385725942855974820000e+4989
relative error = 1.0752390036451564037139838723528e+4991 %
h = 0.001
x1[1] (analytic) = 3.0008494099601271155678737053527
x1[1] (numeric) = 2.4084807733127522390309721621691e+4991
absolute error = 2.4084807733127522390309721621691e+4991
relative error = 8.0259967905045731810947910990116e+4992 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1293.2MB, alloc=4.9MB, time=164.23
NO POLE
NO POLE
t[1] = 0.752
x2[1] (analytic) = 2.0010413571747186404935682629654
x2[1] (numeric) = 1.7203784065518548389141006642639e+5009
absolute error = 1.7203784065518548389141006642639e+5009
relative error = 8.5974155425796227727757160017177e+5010 %
h = 0.001
x1[1] (analytic) = 3.0008485609747304355741801981858
x1[1] (numeric) = -1.9257790227451077786744421725558e+5011
absolute error = 1.9257790227451077786744421725558e+5011
relative error = 6.4174482104474461374686096528718e+5012 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1297.0MB, alloc=4.9MB, time=164.91
memory used=1300.8MB, alloc=4.9MB, time=165.59
NO POLE
NO POLE
t[1] = 0.753
x2[1] (analytic) = 2.0010430174803317603859473410724
x2[1] (numeric) = -1.3755844278400638190073583588860e+5029
absolute error = 1.3755844278400638190073583588860e+5029
relative error = 6.8743371123134009784406538298658e+5030 %
h = 0.001
x1[1] (analytic) = 3.0008477128378948010243391831827
x1[1] (numeric) = 1.5398191613313412374691746343842e+5031
absolute error = 1.5398191613313412374691746343842e+5031
relative error = 5.1312805869616681995355601020903e+5032 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1304.6MB, alloc=4.9MB, time=166.29
NO POLE
NO POLE
t[1] = 0.754
x2[1] (analytic) = 2.0010446815341595967412606987796
x2[1] (numeric) = 1.0998932042565374753217747760273e+5049
absolute error = 1.0998932042565374753217747760273e+5049
relative error = 5.4965949256728844748221091648551e+5050 %
h = 0.001
x1[1] (analytic) = 3.0008468655487720750120380385101
x1[1] (numeric) = -1.2312124192854402912218446480320e+5051
absolute error = 1.2312124192854402912218446480320e+5051
relative error = 4.1028832008070012544873915321879e+5052 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1308.4MB, alloc=4.9MB, time=166.97
NO POLE
NO POLE
t[1] = 0.755
x2[1] (analytic) = 2.0010463493432820118274740883854
x2[1] (numeric) = -8.7945533279209961709574411288240e+5068
absolute error = 8.7945533279209961709574411288240e+5068
relative error = 4.3949773231425932920921688305270e+5070 %
h = 0.001
x1[1] (analytic) = 3.0008460191065149683439433226194
x1[1] (numeric) = 9.8445587603420918578446273646794e+5070
absolute error = 9.8445587603420918578446273646794e+5070
relative error = 3.2805944382555336455950699919387e+5072 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1312.2MB, alloc=4.9MB, time=167.65
memory used=1316.0MB, alloc=4.9MB, time=168.34
NO POLE
NO POLE
t[1] = 0.756
x2[1] (analytic) = 2.0010480209147934656628891434283
x2[1] (numeric) = 7.0319707348247810994074235654430e+5088
absolute error = 7.0319707348247810994074235654430e+5088
relative error = 3.5141439192499064588558117573336e+5090 %
h = 0.001
x1[1] (analytic) = 3.0008451735102770386924115103059
x1[1] (numeric) = -7.8715366794362790756123614059195e+5090
absolute error = 7.8715366794362790756123614059195e+5090
relative error = 2.6231065664172364899034911050240e+5092 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1319.9MB, alloc=4.9MB, time=169.04
NO POLE
NO POLE
t[1] = 0.757
x2[1] (analytic) = 2.00104969625580304481721425134
x2[1] (numeric) = -5.6226405789640783445741351071980e+5108
absolute error = 5.6226405789640783445741351071980e+5108
relative error = 2.8098455473068427472512671195041e+5110 %
h = 0.001
x1[1] (analytic) = 3.000844328759212689749046594528
x1[1] (numeric) = 6.2939427966355717042464279447755e+5110
absolute error = 6.2939427966355717042464279447755e+5110
relative error = 2.0973906364672996518330638982409e+5112 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1323.7MB, alloc=4.9MB, time=169.72
NO POLE
NO POLE
t[1] = 0.758
x2[1] (analytic) = 2.0010513753734344912707186414253
x2[1] (numeric) = 4.4957648819056481903869677188705e+5128
absolute error = 4.4957648819056481903869677188705e+5128
relative error = 2.2467013777028350430869306494634e+5130 %
h = 0.001
x1[1] (analytic) = 3.0008434848524771703791037075452
x1[1] (numeric) = -5.0325263719863326525706733466612e+5130
absolute error = 5.0325263719863326525706733466612e+5130
relative error = 1.6770372721500781425586286488410e+5132 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1327.5MB, alloc=4.9MB, time=170.40
memory used=1331.3MB, alloc=4.9MB, time=171.07
NO POLE
NO POLE
t[1] = 0.759
x2[1] (analytic) = 2.0010530582748262313315855476253
x2[1] (numeric) = -3.5947348206809922866958204718897e+5148
absolute error = 3.5947348206809922866958204718897e+5148
relative error = 1.7964215420555273074672388264442e+5150 %
h = 0.001
x1[1] (analytic) = 3.0008426417892265737767379157772
x1[1] (numeric) = 4.0239199025253470354315381337478e+5150
absolute error = 4.0239199025253470354315381337478e+5150
relative error = 1.3409299929589508427056772359926e+5152 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1335.1MB, alloc=4.9MB, time=171.76
NO POLE
NO POLE
t[1] = 0.76
x2[1] (analytic) = 2.0010547449671314046115805378902
x2[1] (numeric) = 2.8742869723959020746517421674009e+5168
absolute error = 2.8742869723959020746517421674009e+5168
relative error = 1.4363859757585563028214654069293e+5170 %
h = 0.001
x1[1] (analytic) = 3.0008417995686178366210973436332
x1[1] (numeric) = -3.2174558432663832792297902419264e+5170
absolute error = 3.2174558432663832792297902419264e+5170
relative error = 1.0721844262929503703211581402141e+5172 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1338.9MB, alloc=4.9MB, time=172.44
NO POLE
NO POLE
memory used=1342.7MB, alloc=4.9MB, time=173.11
t[1] = 0.761
x2[1] (analytic) = 2.001056435457517893060151334826
x2[1] (numeric) = -2.2982294972511281302776194088317e+5188
absolute error = 2.2982294972511281302776194088317e+5188
relative error = 1.1485080862927612186381983876828e+5190 %
h = 0.001
x1[1] (analytic) = 3.0008409581898087382332597824052
x1[1] (numeric) = 2.5726213130813642486431512315139e+5190
absolute error = 2.5726213130813642486431512315139e+5190
relative error = 8.5730011984148651259805161493782e+5191 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1346.6MB, alloc=4.9MB, time=173.80
NO POLE
NO POLE
t[1] = 0.762
x2[1] (analytic) = 2.0010581297531683500570756855867
x2[1] (numeric) = 1.8376240343296013779180290319102e+5208
absolute error = 1.8376240343296013779180290319102e+5208
relative error = 9.1832616304668437589496566403770e+5209 %
h = 0.001
x1[1] (analytic) = 3.0008401176519578997340119411602
x1[1] (numeric) = -2.0570229221239156126350637347880e+5210
absolute error = 2.0570229221239156126350637347880e+5210
relative error = 6.8548234543513668389165551620632e+5211 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1350.4MB, alloc=4.9MB, time=174.47
NO POLE
NO POLE
t[1] = 0.763
x2[1] (analytic) = 2.0010598278612802295637740727514
x2[1] (numeric) = -1.4693319773263746389418659491431e+5228
absolute error = 1.4693319773263746389418659491431e+5228
relative error = 7.3427688511281900557015391781328e+5229 %
h = 0.001
x1[1] (analytic) = 3.0008392779542247832024704974122
x1[1] (numeric) = 1.6447594834993843400572527337942e+5230
absolute error = 1.6447594834993843400572527337942e+5230
relative error = 5.4809982513314521084438113832462e+5231 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1354.2MB, alloc=4.9MB, time=175.17
NO POLE
NO POLE
memory used=1358.0MB, alloc=4.9MB, time=175.88
t[1] = 0.764
x2[1] (analytic) = 2.0010615297890658153334042921666
x2[1] (numeric) = 1.1748521020957658221203310798816e+5248
absolute error = 1.1748521020957658221203310798816e+5248
relative error = 5.8711443131866531160414929933614e+5249 %
h = 0.001
x1[1] (analytic) = 3.0008384390957696908355441061944
x1[1] (numeric) = -1.3151208620310151020686510109165e+5250
absolute error = 1.3151208620310151020686510109165e+5250
relative error = 4.3825113838094364867524371913320e+5251 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1361.8MB, alloc=4.9MB, time=176.55
NO POLE
NO POLE
t[1] = 0.765
x2[1] (analytic) = 2.0010632355437522501798551584403
x2[1] (numeric) = -9.3939115400620339873735137532806e+5267
absolute error = 9.3939115400620339873735137532806e+5267
relative error = 4.6944601116063234944736773257283e+5269 %
h = 0.001
x1[1] (analytic) = 3.0008376010757537641082355269924
x1[1] (numeric) = 1.0515475965333430194926882032542e+5270
absolute error = 1.0515475965333430194926882032542e+5270
relative error = 3.5041802867185465355991039262680e+5271 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1365.6MB, alloc=4.9MB, time=177.23
NO POLE
NO POLE
t[1] = 0.766
x2[1] (analytic) = 2.0010649451325815653057568339487
x2[1] (numeric) = 7.5112070587517649935438776819422e+5287
absolute error = 7.5112070587517649935438776819422e+5287
relative error = 3.7536048377750709078622120042682e+5289 %
h = 0.001
x1[1] (analytic) = 3.0008367638933389829347830288427
x1[1] (numeric) = -8.4079903201244547550124761889966e+5289
absolute error = 8.4079903201244547550124761889966e+5289
relative error = 2.8018819354958110383738014104664e+5291 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1369.4MB, alloc=4.9MB, time=177.91
memory used=1373.3MB, alloc=4.9MB, time=178.59
NO POLE
NO POLE
t[1] = 0.767
x2[1] (analytic) = 2.0010666585628107096896255128694
x2[1] (numeric) = -6.0058295459603375040161138397933e+5307
absolute error = 6.0058295459603375040161138397933e+5307
relative error = 3.0013140842963192254797110740455e+5309 %
h = 0.001
x1[1] (analytic) = 3.0008359275476881648306402347354
x1[1] (numeric) = 6.7228817275000941325427204984268e+5309
absolute error = 6.7228817275000941325427204984268e+5309
relative error = 2.2403363228839030236187288146729e+5311 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1377.1MB, alloc=4.9MB, time=179.28
NO POLE
NO POLE
t[1] = 0.768
x2[1] (analytic) = 2.0010683758417115795322604278644
x2[1] (numeric) = 4.8021560653294482661639105761158e+5327
absolute error = 4.8021560653294482661639105761158e+5327
relative error = 2.3997960905806190196804015856297e+5329 %
h = 0.001
x1[1] (analytic) = 3.0008350920379649640752935673032
x1[1] (numeric) = -5.3754984248466218025591874788890e+5329
absolute error = 5.3754984248466218025591874788890e+5329
relative error = 1.7913341653159439476876531003825e+5331 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1380.9MB, alloc=4.9MB, time=179.95
NO POLE
NO POLE
t[1] = 0.769
x2[1] (analytic) = 2.0010700969765710477625113836365
x2[1] (numeric) = -3.8397198420810294966119969046820e+5347
absolute error = 3.8397198420810294966119969046820e+5347
relative error = 1.9188332522096479807772179683219e+5349 %
h = 0.001
x1[1] (analytic) = 3.0008342573633338708759164586116
x1[1] (numeric) = 4.2981543461234581880097585924898e+5349
absolute error = 4.2981543461234581880097585924898e+5349
relative error = 1.4323198075924417467702045286337e+5351 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1384.7MB, alloc=4.9MB, time=180.65
memory used=1388.5MB, alloc=4.9MB, time=181.33
NO POLE
NO POLE
t[1] = 0.77
x2[1] (analytic) = 2.0010718219746909936025352586378
x2[1] (numeric) = 3.0701727026564895745739014209162e+5367
absolute error = 3.0701727026564895745739014209162e+5367
relative error = 1.5342641223275994313917690363905e+5369 %
h = 0.001
x1[1] (analytic) = 3.0008334235229602105318594877074
x1[1] (numeric) = -3.4367288989815101088641156435274e+5369
absolute error = 3.4367288989815101088641156435274e+5369
relative error = 1.1452581379698214831293860927162e+5371 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1392.3MB, alloc=4.9MB, time=182.01
NO POLE
NO POLE
t[1] = 0.771
x2[1] (analytic) = 2.0010735508433883321926601537526
x2[1] (numeric) = -2.4548562946791516922934675432192e+5387
absolute error = 2.4548562946791516922934675432192e+5387
relative error = 1.2267696475446934398119304603521e+5389 %
h = 0.001
x1[1] (analytic) = 3.0008325905160101425999756104122
x1[1] (numeric) = 2.7479482061288001052894013978981e+5389
absolute error = 2.7479482061288001052894013978981e+5389
relative error = 9.1572859306232570054847200813470e+5390 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1396.2MB, alloc=4.9MB, time=182.69
NO POLE
NO POLE
t[1] = 0.772
x2[1] (analytic) = 2.0010752835899950442759761047885
x2[1] (numeric) = 1.9628600769955177825631987369630e+5407
absolute error = 1.9628600769955177825631987369630e+5407
relative error = 9.8090266422864515075377917140220e+5408 %
h = 0.001
x1[1] (analytic) = 3.0008317583416506600607796466893
x1[1] (numeric) = -2.1972112335669909554460404559045e+5409
absolute error = 2.1972112335669909554460404559045e+5409
relative error = 7.3220073983129116476968737763411e+5410 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1400.0MB, alloc=4.9MB, time=183.36
memory used=1403.8MB, alloc=4.9MB, time=184.05
NO POLE
NO POLE
t[1] = 0.773
x2[1] (analytic) = 2.0010770202218582059427715140979
x2[1] (numeric) = -1.5694685225419320592572649306424e+5427
absolute error = 1.5694685225419320592572649306424e+5427
relative error = 7.8431190138194982016089595859262e+5428 %
h = 0.001
x1[1] (analytic) = 3.000830926999049588485441191741
x1[1] (numeric) = 1.7568516008218735003292319227260e+5429
absolute error = 1.7568516008218735003292319227260e+5429
relative error = 5.8545504347317396317403568099266e+5430 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1407.6MB, alloc=4.9MB, time=184.73
NO POLE
NO POLE
t[1] = 0.774
x2[1] (analytic) = 2.0010787607463400184349346956192
x2[1] (numeric) = 1.2549195289662921411703038657764e+5447
absolute error = 1.2549195289662921411703038657764e+5447
relative error = 6.2712150745043451649989155482558e+5448 %
h = 0.001
x1[1] (analytic) = 3.0008300964873755852036101178301
x1[1] (numeric) = -1.4047477548618104471012966023408e+5449
absolute error = 1.4047477548618104471012966023408e+5449
relative error = 4.6811972344123688199099281887781e+5450 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1411.4MB, alloc=4.9MB, time=185.41
NO POLE
NO POLE
t[1] = 0.775
x2[1] (analytic) = 2.0010805051708178380104401670711
x2[1] (numeric) = -1.0034116655174302311825479184033e+5467
absolute error = 1.0034116655174302311825479184033e+5467
relative error = 5.0143493124069798497442168951697e+5468 %
h = 0.001
x1[1] (analytic) = 3.0008292668057981384720738346518
x1[1] (numeric) = 1.1232116895167236514156696854160e+5469
absolute error = 1.1232116895167236514156696854160e+5469
relative error = 3.7430043153115298244980948647548e+5470 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1415.2MB, alloc=4.9MB, time=186.10
memory used=1419.0MB, alloc=4.9MB, time=186.80
NO POLE
NO POLE
t[1] = 0.776
x2[1] (analytic) = 2.001082253502684205868039562957
x2[1] (numeric) = 8.0231038505378734133091724850146e+5486
absolute error = 8.0231038505378734133091724850146e+5486
relative error = 4.0093823412277397450327419960028e+5488 %
h = 0.001
x1[1] (analytic) = 3.0008284379534875666442454769111
x1[1] (numeric) = -8.9810038499838777278114753296507e+5488
absolute error = 8.9810038499838777278114753296507e+5488
relative error = 2.9928414888352514566863292661216e+5490 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1422.9MB, alloc=4.9MB, time=187.48
NO POLE
NO POLE
t[1] = 0.777
x2[1] (analytic) = 2.0010840057493468781322772824375
x2[1] (numeric) = -6.4151332507502603327349857282753e+5506
absolute error = 6.4151332507502603327349857282753e+5506
relative error = 3.2058290568106271666432110970449e+5508 %
h = 0.001
x1[1] (analytic) = 3.0008276099296150173404821885963
x1[1] (numeric) = 7.1810533051102385095047945377303e+5508
absolute error = 7.1810533051102385095047945377303e+5508
relative error = 2.3930242714871153432759905839995e+5510 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1426.7MB, alloc=4.9MB, time=188.16
NO POLE
NO POLE
t[1] = 0.778
x2[1] (analytic) = 2.0010857619182288558989512270172
x2[1] (numeric) = 5.1294281354868190437760607467898e+5526
absolute error = 5.1294281354868190437760607467898e+5526
relative error = 2.5633224887721852954660671290258e+5528 %
h = 0.001
x1[1] (analytic) = 3.0008267827333524666192326742651
x1[1] (numeric) = -5.7418443898036244388386580378291e+5528
absolute error = 5.7418443898036244388386580378291e+5528
relative error = 1.9134208021742497811003677981818e+5530 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1430.5MB, alloc=4.9MB, time=188.84
memory used=1434.3MB, alloc=4.9MB, time=189.52
NO POLE
NO POLE
t[1] = 0.779
x2[1] (analytic) = 2.0010875220167684153411392243529
x2[1] (numeric) = -4.1014008546192967160843010809781e+5546
absolute error = 4.1014008546192967160843010809781e+5546
relative error = 2.0495859423908438162381041327764e+5548 %
h = 0.001
x1[1] (analytic) = 3.0008259563638727181490131884908
x1[1] (numeric) = 4.5910781602551051747494749822934e+5548
absolute error = 4.5910781602551051747494749822934e+5548
relative error = 1.5299381660301802640353318295794e+5550 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1438.1MB, alloc=4.9MB, time=190.20
NO POLE
NO POLE
t[1] = 0.78
x2[1] (analytic) = 2.0010892860524191378759119763419
x2[1] (numeric) = 3.2794082548688283915399979093727e+5566
absolute error = 3.2794082548688283915399979093727e+5566
relative error = 1.6388115601469085584899876861459e+5568 %
h = 0.001
x1[1] (analytic) = 3.0008251308203494023812111354461
x1[1] (numeric) = -3.6709456478830637909801483602594e+5568
absolute error = 3.6709456478830637909801483602594e+5568
relative error = 1.2233120851262400795147713347579e+5570 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1441.9MB, alloc=4.9MB, time=190.88
NO POLE
NO POLE
t[1] = 0.781
x2[1] (analytic) = 2.0010910540326499403918536119819
x2[1] (numeric) = -2.6221573758120451841866858125783e+5586
absolute error = 2.6221573758120451841866858125783e+5586
relative error = 1.3103638490251637907848916649387e+5588 %
h = 0.001
x1[1] (analytic) = 3.0008243061019569757237154514262
x1[1] (numeric) = 2.9352238143910876448081488767250e+5588
absolute error = 2.9352238143910876448081488767250e+5588
relative error = 9.7813917609988844597692268810454e+5589 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1445.7MB, alloc=4.9MB, time=191.56
memory used=1449.6MB, alloc=4.9MB, time=192.26
NO POLE
NO POLE
t[1] = 0.782
x2[1] (analytic) = 2.0010928259649451055375111683079
x2[1] (numeric) = 2.0966310898673180400228223003769e+5606
absolute error = 2.0966310898673180400228223003769e+5606
relative error = 1.0477430445318315092858627789313e+5608 %
h = 0.001
x1[1] (analytic) = 3.0008234822078707197153729439423
x1[1] (numeric) = -2.3469535283195808246149523029929e+5608
absolute error = 2.3469535283195808246149523029929e+5608
relative error = 7.8210316009417460224823336696646e+5609 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1453.4MB, alloc=4.9MB, time=192.95
NO POLE
NO POLE
t[1] = 0.783
x2[1] (analytic) = 2.0010946018568043120708945660189
x2[1] (numeric) = -1.6764294803765854706217384278765e+5626
absolute error = 1.6764294803765854706217384278765e+5626
relative error = 8.3775623542287110275759669538665e+5627 %
h = 0.001
x1[1] (analytic) = 3.0008226591372667402012697618419
x1[1] (numeric) = 1.8765829157850451668838132768566e+5628
absolute error = 1.8765829157850451668838132768566e+5628
relative error = 6.2535615361041052649986261974528e+5629 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1457.2MB, alloc=4.9MB, time=193.63
NO POLE
NO POLE
t[1] = 0.784
x2[1] (analytic) = 2.0010963817157426652701488901915
x2[1] (numeric) = 1.3404436365834683193897307648281e+5646
absolute error = 1.3404436365834683193897307648281e+5646
relative error = 6.6985461011836430651168932933641e+5647 %
h = 0.001
x1[1] (analytic) = 3.0008218368893219665088371717373
x1[1] (numeric) = -1.5004828162651102928991193776753e+5648
absolute error = 1.5004828162651102928991193776753e+5648
relative error = 5.0002395937658326278748174197183e+5649 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1461.0MB, alloc=4.9MB, time=194.30
memory used=1464.8MB, alloc=4.9MB, time=194.99
NO POLE
NO POLE
t[1] = 0.785
x2[1] (analytic) = 2.0010981655492907274055210307597
x2[1] (numeric) = -1.0717952433367437390122052708368e+5666
absolute error = 1.0717952433367437390122052708368e+5666
relative error = 5.3560353099546302660806340566597e+5667 %
h = 0.001
x1[1] (analytic) = 3.0008210154632141506247808168473
x1[1] (numeric) = 1.1997597670577807254520560049439e+5668
absolute error = 1.1997597670577807254520560049439e+5668
relative error = 3.9981050548347444232479960751528e+5669 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1468.6MB, alloc=4.9MB, time=195.68
NO POLE
NO POLE
t[1] = 0.786
x2[1] (analytic) = 2.0010999533649945482727429822022
x2[1] (numeric) = 8.5698869559871890825482237767974e+5685
absolute error = 8.5698869559871890825482237767974e+5685
relative error = 4.2825881543679531302784917078853e+5687 %
h = 0.001
x1[1] (analytic) = 3.0008201948581218663728326351826
x1[1] (numeric) = -9.5930688645501831509545645834956e+5687
absolute error = 9.5930688645501831509545645834956e+5687
relative error = 3.1968156176060863201204550900232e+5689 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1472.4MB, alloc=4.9MB, time=196.36
NO POLE
NO POLE
memory used=1476.3MB, alloc=4.9MB, time=197.03
t[1] = 0.787
x2[1] (analytic) = 2.0011017451704156957879543471364
x2[1] (numeric) = -6.8523314406354920353538607410335e+5705
absolute error = 6.8523314406354920353538607410335e+5705
relative error = 3.4242793786839364744360330859454e+5707 %
h = 0.001
x1[1] (analytic) = 3.0008193750732245085923246148252
x1[1] (numeric) = 7.6704497655962903018521479048485e+5707
absolute error = 7.6704497655962903018521479048485e+5707
relative error = 2.5561184486184276867874756314596e+5709 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1480.1MB, alloc=4.9MB, time=197.72
NO POLE
NO POLE
t[1] = 0.788
x2[1] (analytic) = 2.0011035409731312866442868342615
x2[1] (numeric) = 5.4790041471338013268538642560960e+5725
absolute error = 5.4790041471338013268538642560960e+5725
relative error = 2.7379913307581157446417370086939e+5727 %
h = 0.001
x1[1] (analytic) = 3.0008185561077022923175835648766
x1[1] (numeric) = -6.1331572239573391506101187784146e+5727
absolute error = 6.1331572239573391506101187784146e+5727
relative error = 2.0438280786668176619455228417546e+5729 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1483.9MB, alloc=4.9MB, time=198.42
NO POLE
NO POLE
t[1] = 0.789
x2[1] (analytic) = 2.0011053407807340170302337873344
x2[1] (numeric) = -4.3809157079426614277251846688982e+5745
absolute error = 4.3809157079426614277251846688982e+5745
relative error = 2.1892479214679628528313318267995e+5747 %
h = 0.001
x1[1] (analytic) = 3.0008177379607362519581460814697
x1[1] (numeric) = 4.9039650455042003636028879023888e+5747
absolute error = 4.9039650455042003636028879023888e+5747
relative error = 1.6342095634361268082284416546636e+5749 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1487.7MB, alloc=4.9MB, time=199.09
NO POLE
NO POLE
memory used=1491.5MB, alloc=4.9MB, time=199.79
t[1] = 0.79
x2[1] (analytic) = 2.0011071446008321934099280285891
x2[1] (numeric) = 3.5029034336721149469921980138473e+5765
absolute error = 3.5029034336721149469921980138473e+5765
relative error = 1.7504826981020305567233666000974e+5767 %
h = 0.001
x1[1] (analytic) = 3.0008169206315082404797928890576
x1[1] (numeric) = -3.9211245186389978717676766778447e+5767
absolute error = 3.9211245186389978717676766778447e+5767
relative error = 1.3066856867142081739830556507860e+5769 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1495.3MB, alloc=4.9MB, time=200.47
NO POLE
NO POLE
t[1] = 0.791
x2[1] (analytic) = 2.0011089524410497633654515472347
x2[1] (numeric) = -2.8008602044968837654472634317677e+5785
absolute error = 2.8008602044968837654472634317677e+5785
relative error = 1.3996540273733015052149781999817e+5787 %
h = 0.001
x1[1] (analytic) = 3.0008161041192009285864017380157
x1[1] (numeric) = 3.1352624555852869661284152672510e+5787
absolute error = 3.1352624555852869661284152672510e+5787
relative error = 1.0448032624463499770176881024878e+5789 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1499.2MB, alloc=4.9MB, time=201.14
NO POLE
NO POLE
t[1] = 0.792
x2[1] (analytic) = 2.0011107643090263465013008113861
x2[1] (numeric) = 2.2395187402898387367959096281574e+5805
absolute error = 2.2395187402898387367959096281574e+5805
relative error = 1.1191378209707114766936028483574e+5807 %
h = 0.001
x1[1] (analytic) = 3.0008152884229978039026180404089
x1[1] (numeric) = -2.5069009205590290751841576548454e+5807
absolute error = 2.5069009205590290751841576548454e+5807
relative error = 8.3540660774108063486510225957890e+5808 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1503.0MB, alloc=4.9MB, time=201.82
memory used=1506.8MB, alloc=4.9MB, time=202.50
NO POLE
NO POLE
t[1] = 0.793
x2[1] (analytic) = 2.0011125802124172654111317299951
x2[1] (numeric) = -1.7906799418467607222045544304735e+5825
absolute error = 1.7906799418467607222045544304735e+5825
relative error = 8.9484217907254413120096739203814e+5826 %
h = 0.001
x1[1] (analytic) = 3.0008144735420831701573424265938
x1[1] (numeric) = 2.0044740478756872913594841823646e+5827
absolute error = 2.0044740478756872913594841823646e+5827
relative error = 6.6797666618478362109755920312452e+5828 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1510.6MB, alloc=4.9MB, time=203.19
NO POLE
NO POLE
t[1] = 0.794
x2[1] (analytic) = 2.0011144001588935767069085400585
x2[1] (numeric) = 1.4317963035742796820252192160389e+5845
absolute error = 1.4317963035742796820252192160389e+5845
relative error = 7.1549947542259023834089997668430e+5846 %
h = 0.001
x1[1] (analytic) = 3.0008136594756421463680344061453
x1[1] (numeric) = -1.6027423244597810223792955034392e+5847
absolute error = 1.6027423244597810223792955034392e+5847
relative error = 5.3410258227758197623029305129036e+5848 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1514.4MB, alloc=4.9MB, time=203.86
NO POLE
NO POLE
t[1] = 0.795
x2[1] (analytic) = 2.0011162241561421021105811435889
x2[1] (numeric) = -1.1448392350978850681354961171583e+5865
absolute error = 1.1448392350978850681354961171583e+5865
relative error = 5.7210032144967314068720726036399e+5866 %
h = 0.001
x1[1] (analytic) = 3.0008128462228606660258313174086
x1[1] (numeric) = 1.2815246779259133559970189733431e+5867
absolute error = 1.2815246779259133559970189733431e+5867
relative error = 4.2705918149443254628640154772125e+5868 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1518.2MB, alloc=4.9MB, time=204.56
memory used=1522.0MB, alloc=4.9MB, time=205.26
NO POLE
NO POLE
t[1] = 0.796
x2[1] (analytic) = 2.0011180522118654596084156685398
x2[1] (numeric) = 9.1539339146751430903363552990490e+5884
absolute error = 9.1539339146751430903363552990490e+5884
relative error = 4.5744097428720730303649017335958e+5886 %
h = 0.001
x1[1] (analytic) = 3.0008120337829254762814817507983
x1[1] (numeric) = -1.0246846764258690598239691676042e+5887
absolute error = 1.0246846764258690598239691676042e+5887
relative error = 3.4146913065198448505183020090912e+5888 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1525.9MB, alloc=4.9MB, time=205.94
NO POLE
NO POLE
t[1] = 0.797
x2[1] (analytic) = 2.0011198843337820946681032780826
x2[1] (numeric) = -7.3193251545991314181928267655765e+5904
absolute error = 7.3193251545991314181928267655765e+5904
relative error = 3.6576145246969547281011367168521e+5906 %
h = 0.001
x1[1] (analytic) = 3.0008112221550241371320926317755
x1[1] (numeric) = 8.1931991181108463834089585947783e+5906
absolute error = 8.1931991181108463834089585947783e+5906
relative error = 2.7303280718294979869900194733354e+5908 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1529.7MB, alloc=4.9MB, time=206.61
NO POLE
NO POLE
t[1] = 0.798
x2[1] (analytic) = 2.0011217205296263115187725033377
x2[1] (numeric) = 5.8524041377295428025935672639429e+5924
absolute error = 5.8524041377295428025935672639429e+5924
relative error = 2.9245617983600807273829448082428e+5926 %
h = 0.001
x1[1] (analytic) = 3.0008104113383450206086891502517
x1[1] (numeric) = -6.5511384461372660556153830861230e+5926
absolute error = 6.5511384461372660556153830861230e+5926
relative error = 2.1831230728153512909657684699319e+5928 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1533.5MB, alloc=4.9MB, time=207.29
memory used=1537.3MB, alloc=4.9MB, time=207.97
NO POLE
NO POLE
t[1] = 0.799
x2[1] (analytic) = 2.0011235608071483044940306258725
x2[1] (numeric) = -4.6794797973679760414377691907613e+5944
absolute error = 4.6794797973679760414377691907613e+5944
relative error = 2.3384262166602642394935604067791e+5946 %
h = 0.001
x1[1] (analytic) = 3.0008096013320773099645867239781
x1[1] (numeric) = 5.2381755065112479515850698431012e+5946
absolute error = 5.2381755065112479515850698431012e+5946
relative error = 1.7455874255354256896105076610328e+5948 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1541.1MB, alloc=4.9MB, time=208.65
NO POLE
NO POLE
t[1] = 0.8
x2[1] (analytic) = 2.0011254051741141894381598879868
x2[1] (numeric) = 3.7416300478644396872970482170039e+5964
absolute error = 3.7416300478644396872970482170039e+5964
relative error = 1.8697629035092318139407150054862e+5966 %
h = 0.001
x1[1] (analytic) = 3.000808792135410998864574184293
x1[1] (numeric) = -4.1883533469198569105888456070627e+5966
absolute error = 4.1883533469198569105888456070627e+5966
relative error = 1.3957414940587984523345833273077e+5968 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1544.9MB, alloc=4.9MB, time=209.33
NO POLE
NO POLE
t[1] = 0.801
x2[1] (analytic) = 2.0011272536383060351755945610209
x2[1] (numeric) = -2.9917418220197008605006842123194e+5984
absolute error = 2.9917418220197008605006842123194e+5984
relative error = 1.4950282729798069923639819334621e+5986 %
h = 0.001
x1[1] (analytic) = 3.0008079837475368905749073734102
x1[1] (numeric) = 3.3489339440515171689568276838335e+5986
absolute error = 3.3489339440515171689568276838335e+5986
relative error = 1.1160107418366788479568107992521e+5988 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1548.7MB, alloc=4.9MB, time=210.03
memory used=1552.6MB, alloc=4.9MB, time=210.71
NO POLE
NO POLE
t[1] = 0.802
x2[1] (analytic) = 2.0011291062075218950438051546411
x2[1] (numeric) = 2.3921443368593664059954140864403e+6004
absolute error = 2.3921443368593664059954140864403e+6004
relative error = 1.1953973031719500122601869473422e+6006 %
h = 0.001
x1[1] (analytic) = 3.0008071761676465971541123432417
x1[1] (numeric) = -2.6777488985900151172320801804323e+6006
absolute error = 2.6777488985900151172320801804323e+6006
relative error = 8.9234287356303525148078858243529e+6007 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1556.4MB, alloc=4.9MB, time=211.39
NO POLE
NO POLE
t[1] = 0.803
x2[1] (analytic) = 2.0011309628895758384897163032782
x2[1] (numeric) = -1.9127166944189128941707344563913e+6024
absolute error = 1.9127166944189128941707344563913e+6024
relative error = 9.5581784995071223572292705174587e+6025 %
h = 0.001
x1[1] (analytic) = 3.0008063693949325386445973465579
x1[1] (numeric) = 2.1410810973552414229548879002952e+6026
absolute error = 2.1410810973552414229548879002952e+6026
relative error = 7.1350191708202692751412778980031e+6027 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1560.2MB, alloc=4.9MB, time=212.06
NO POLE
NO POLE
t[1] = 0.804
x2[1] (analytic) = 2.0011328236922979827297851196289
x2[1] (numeric) = 1.5293747524917408343753772931861e+6044
absolute error = 1.5293747524917408343753772931861e+6044
relative error = 7.6425449344730926452333309666538e+6045 %
h = 0.001
x1[1] (analytic) = 3.0008055634285879422650728120981
x1[1] (numeric) = -1.7119709274703755560193809230255e+6046
absolute error = 1.7119709274703755560193809230255e+6046
relative error = 5.7050378349550684080646748576878e+6047 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1564.0MB, alloc=4.9MB, time=212.73
memory used=1567.8MB, alloc=4.9MB, time=213.42
NO POLE
NO POLE
t[1] = 0.805
x2[1] (analytic) = 2.001134688623534524473867059364
x2[1] (numeric) = -1.2228612529937490004587048292759e+6064
absolute error = 1.2228612529937490004587048292759e+6064
relative error = 6.1108393150432314719564520691600e+6065 %
h = 0.001
x1[1] (analytic) = 3.0008047582678068416037784960493
x1[1] (numeric) = 1.3688619548900260146898072998315e+6066
absolute error = 1.3688619548900260146898072998315e+6066
relative error = 4.5616495079146429424849712581176e+6067 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1571.6MB, alloc=4.9MB, time=214.10
NO POLE
NO POLE
t[1] = 0.806
x2[1] (analytic) = 2.0011365576911477717129965959371
x2[1] (numeric) = 9.7777842980412182051686744374329e+6083
absolute error = 9.7777842980412182051686744374329e+6083
relative error = 4.8861154729602945251175941639240e+6085 %
h = 0.001
x1[1] (analytic) = 3.000803953911784075812517003122
x1[1] (numeric) = -1.0945180326829867291045954376195e+6086
absolute error = 1.0945180326829867291045954376195e+6086
relative error = 3.6474159908253798120571322267017e+6087 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1575.4MB, alloc=4.9MB, time=214.77
NO POLE
NO POLE
t[1] = 0.807
x2[1] (analytic) = 2.0011384309030161755712102596424
x2[1] (numeric) = -7.8181449894635029743648986641431e+6103
absolute error = 7.8181449894635029743648986641431e+6103
relative error = 3.9068486561099900731949528417774e+6105 %
h = 0.001
x1[1] (analytic) = 3.0008031503597152888014928712567
x1[1] (numeric) = 8.7515743979054495464990840257364e+6105
absolute error = 8.7515743979054495464990840257364e+6105
relative error = 2.9164106938691969953077940528847e+6107 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1579.3MB, alloc=4.9MB, time=215.47
memory used=1583.1MB, alloc=4.9MB, time=216.18
NO POLE
NO POLE
t[1] = 0.808
x2[1] (analytic) = 2.0011403082670343622215398508344
x2[1] (numeric) = 6.2512517369112054487865173400279e+6123
absolute error = 6.2512517369112054487865173400279e+6123
relative error = 3.1238447954330204547351429888617e+6125 %
h = 0.001
x1[1] (analytic) = 3.0008023476107969284349564147984
x1[1] (numeric) = -6.9976055355003429112163979773147e+6125
absolute error = 6.9976055355003429112163979773147e+6125
relative error = 2.3319115106237347004931883266347e+6127 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1586.9MB, alloc=4.9MB, time=216.85
NO POLE
NO POLE
t[1] = 0.809
x2[1] (analytic) = 2.0011421897911131648663038935078
x2[1] (numeric) = -4.9983913487023966123104740496682e+6143
absolute error = 4.9983913487023966123104740496682e+6143
relative error = 2.4977692111044581583243083727055e+6145 %
h = 0.001
x1[1] (analytic) = 3.0008015456642262457276515217838
x1[1] (numeric) = 5.5951627677626087013247256890406e+6145
absolute error = 5.5951627677626087013247256890406e+6145
relative error = 1.8645560803069106711466322232608e+6147 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1590.7MB, alloc=4.9MB, time=217.54
NO POLE
NO POLE
t[1] = 0.81
x2[1] (analytic) = 2.0011440754831796557818256522167
x2[1] (numeric) = 3.9966261360525084911144710700687e+6163
absolute error = 3.9966261360525084911144710700687e+6163
relative error = 1.9971706110603337157144772924681e+6165 %
h = 0.001
x1[1] (analytic) = 3.0008007445192012940420666017904
x1[1] (numeric) = -4.4737941055602107107781508331030e+6165
absolute error = 4.4737941055602107107781508331030e+6165
relative error = 1.4908667673891215070644511432065e+6167 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1594.5MB, alloc=4.9MB, time=218.22
memory used=1598.3MB, alloc=4.9MB, time=218.91
NO POLE
NO POLE
t[1] = 0.811
x2[1] (analytic) = 2.0011459653511771784277062926278
x2[1] (numeric) = -3.1956322258609597093652533813570e+6183
absolute error = 3.1956322258609597093652533813570e+6183
relative error = 1.5969011162562369512762321202198e+6185 %
h = 0.001
x1[1] (analytic) = 3.0007999441749209282864878815951
x1[1] (numeric) = 3.5771673729071529638869992332015e+6185
absolute error = 3.5771673729071529638869992332015e+6185
relative error = 1.1920712608153243661755875746669e+6187 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1602.1MB, alloc=4.9MB, time=219.59
NO POLE
NO POLE
t[1] = 0.812
x2[1] (analytic) = 2.0011478594030653796207820238126
x2[1] (numeric) = 2.5551715310173069456845877766870e+6203
absolute error = 2.5551715310173069456845877766870e+6203
relative error = 1.2768529416809333977485219428766e+6205 %
h = 0.001
x1[1] (analytic) = 3.0007991446305848041138542466989
x1[1] (numeric) = -2.8602403489887751715339422113540e+6205
absolute error = 2.8602403489887751715339422113540e+6205
relative error = 9.5315954555195222563447054998635e+6206 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1606.0MB, alloc=4.9MB, time=220.27
NO POLE
NO POLE
t[1] = 0.813
memory used=1609.8MB, alloc=4.9MB, time=220.94
x2[1] (analytic) = 2.0011497576468202417738943187252
x2[1] (numeric) = -2.0430703821564845774359217433438e+6223
absolute error = 2.0430703821564845774359217433438e+6223
relative error = 1.0209482695382875190257575440678e+6225 %
h = 0.001
x1[1] (analytic) = 3.0007983458853933771214128275702
x1[1] (numeric) = 2.2869980633125302124901223556436e+6225
absolute error = 2.2869980633125302124901223556436e+6225
relative error = 7.6212987335466737939550507949549e+6226 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1613.6MB, alloc=4.9MB, time=221.63
NO POLE
NO POLE
t[1] = 0.814
x2[1] (analytic) = 2.0011516600904341151996025681617
x2[1] (numeric) = 1.6336032770305514380110669383855e+6243
absolute error = 1.6336032770305514380110669383855e+6243
relative error = 8.1633157027025488650079337265370e+6244 %
h = 0.001
x1[1] (analytic) = 3.0007975479385479020511745302633
x1[1] (numeric) = -1.8286435765597229398283315053461e+6245
absolute error = 1.8286435765597229398283315053461e+6245
relative error = 6.0938585404268364825376455627917e+6246 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1617.4MB, alloc=4.9MB, time=222.31
NO POLE
NO POLE
t[1] = 0.815
x2[1] (analytic) = 2.0011535667419157504789687828648
x2[1] (numeric) = -1.3062005548277564652376366418540e+6263
absolute error = 1.3062005548277564652376366418540e+6263
relative error = 6.5272379718183526920591816242530e+6264 %
h = 0.001
x1[1] (analytic) = 3.000796750789250431991168711867
x1[1] (numeric) = 1.4621513606573477965329405852086e+6265
absolute error = 1.4621513606573477965329405852086e+6265
relative error = 4.8725438011514177577587546132910e+6266 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1621.2MB, alloc=4.9MB, time=222.80
NO POLE
NO POLE
memory used=1625.0MB, alloc=4.9MB, time=223.08
t[1] = 0.816
x2[1] (analytic) = 2.001155477609290330895544218333
x2[1] (numeric) = 1.0444150752033723064074427469020e+6283
absolute error = 1.0444150752033723064074427469020e+6283
relative error = 5.2190601224603400443816826700591e+6284 %
h = 0.001
x1[1] (analytic) = 3.0007959544367038175774962020388
x1[1] (numeric) = -1.1691106068325233456968687329472e+6285
absolute error = 1.1691106068325233456968687329472e+6285
relative error = 3.8960016761685605270905909921698e+6286 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1628.9MB, alloc=4.9MB, time=223.37
NO POLE
NO POLE
t[1] = 0.817
x2[1] (analytic) = 2.0011573927005995049346880572926
x2[1] (numeric) = -8.3509599293954190367807432184281e+6302
absolute error = 8.3509599293954190367807432184281e+6302
relative error = 4.1730650271969071309641043611197e+6304 %
h = 0.001
x1[1] (analytic) = 3.0007951588801117061971798726762
x1[1] (numeric) = 9.3480035500142887363475325790079e+6304
absolute error = 9.3480035500142887363475325790079e+6304
relative error = 3.1151754968516202580162272899228e+6306 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1632.7MB, alloc=4.9MB, time=223.65
NO POLE
NO POLE
t[1] = 0.818
x2[1] (analytic) = 2.0011593120239014188483485457303
x2[1] (numeric) = 6.6772812264116545108592312197137e+6322
absolute error = 6.6772812264116545108592312197137e+6322
relative error = 3.3367064712396583505572179477207e+6324 %
h = 0.001
x1[1] (analytic) = 3.000794364118678541191811958577
x1[1] (numeric) = -7.4744998343512409057005714312786e+6324
absolute error = 7.4744998343512409057005714312786e+6324
relative error = 2.4908404000373654396408042506522e+6326 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1636.5MB, alloc=4.9MB, time=223.93
memory used=1640.3MB, alloc=4.9MB, time=224.22
NO POLE
NO POLE
t[1] = 0.819
x2[1] (analytic) = 2.0011612355872707492854372398268
x2[1] (numeric) = -5.3390370632298566328335135045102e+6342
absolute error = 5.3390370632298566328335135045102e+6342
relative error = 2.6679694610729535785548713539213e+6344 %
h = 0.001
x1[1] (analytic) = 3.0007935701516095610619973327352
x1[1] (numeric) = 5.9764790925471280340698292883040e+6344
absolute error = 5.9764790925471280340698292883040e+6344
relative error = 1.9916328640510841436368433082034e+6346 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1644.1MB, alloc=4.9MB, time=224.50
NO POLE
NO POLE
t[1] = 0.82
x2[1] (analytic) = 2.0011631633987987359879272831134
x2[1] (numeric) = 4.2690004802839105144847107801747e+6362
absolute error = 4.2690004802839105144847107801747e+6362
relative error = 2.1332595754128266912716167444304e+6364 %
h = 0.001
x1[1] (analytic) = 3.0007927769781107986725919407158
x1[1] (numeric) = -4.7786879570856476241809452435722e+6364
absolute error = 4.7786879570856476241809452435722e+6364
relative error = 1.5924751598135780348697503470562e+6366 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1647.9MB, alloc=4.9MB, time=224.80
NO POLE
NO POLE
t[1] = 0.821
x2[1] (analytic) = 2.0011650954665932145528068956668
x2[1] (numeric) = -3.4134179787168227571946213298217e+6382
absolute error = 3.4134179787168227571946213298217e+6382
relative error = 1.7057153287599929674150639634033e+6384 %
h = 0.001
x1[1] (analytic) = 3.0007919845973890804587355993465
x1[1] (numeric) = 3.8209551539588735346639317233754e+6384
absolute error = 3.8209551539588735346639317233754e+6384
relative error = 1.2733155692134802495652425245512e+6386 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1651.7MB, alloc=4.9MB, time=225.08
memory used=1655.6MB, alloc=4.9MB, time=225.37
NO POLE
NO POLE
t[1] = 0.822
x2[1] (analytic) = 2.0011670317987786492600195201863
x2[1] (numeric) = 2.7293092027603520619575067566460e+6402
absolute error = 2.7293092027603520619575067566460e+6402
relative error = 1.3638587681044655374344849384552e+6404 %
h = 0.001
x1[1] (analytic) = 3.0007911930086520256326783657601
x1[1] (numeric) = -3.0551687868459855179770314441935e+6404
absolute error = 3.0551687868459855179770314441935e+6404
relative error = 1.0181210855203868589359522072376e+6406 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1659.4MB, alloc=4.9MB, time=225.66
NO POLE
NO POLE
t[1] = 0.823
x2[1] (analytic) = 2.0011689724034961659665223333419
x2[1] (numeric) = -2.1823078130831889172985055705921e+6422
absolute error = 2.1823078130831889172985055705921e+6422
relative error = 1.0905165146859820914210821829207e+6424 %
h = 0.001
x1[1] (analytic) = 3.0007904022111080453913996836126
x1[1] (numeric) = 2.4428594265093635972320687265420e+6424
absolute error = 2.4428594265093635972320687265420e+6424
relative error = 8.1407199406841692829314978315799e+6425 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1663.2MB, alloc=4.9MB, time=225.94
NO POLE
NO POLE
t[1] = 0.824
x2[1] (analytic) = 2.0011709172889035850665950948637
x2[1] (numeric) = 1.7449350869543456095416269669799e+6442
absolute error = 1.7449350869543456095416269669799e+6442
relative error = 8.7195704868542924769694664600311e+6443 %
h = 0.001
x1[1] (analytic) = 3.0007896122039663421250195140969
x1[1] (numeric) = -1.9532675914270160754049978214025e+6444
absolute error = 1.9532675914270160754049978214025e+6444
relative error = 6.5091787291026210665371142622407e+6445 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1667.0MB, alloc=4.9MB, time=226.23
memory used=1670.8MB, alloc=4.9MB, time=226.51
NO POLE
NO POLE
t[1] = 0.825
x2[1] (analytic) = 2.0011728664631754545185315714457
x2[1] (numeric) = -1.3952195191853546611641475673285e+6462
absolute error = 1.3952195191853546611641475673285e+6462
relative error = 6.9720089781710458112266942302378e+6463 %
h = 0.001
x1[1] (analytic) = 3.0007888229864369086260006601633
x1[1] (numeric) = 1.5617985391696350852438679368769e+6464
absolute error = 1.5617985391696350852438679368769e+6464
relative error = 5.2046266208606648355491298710934e+6465 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1674.6MB, alloc=4.9MB, time=226.80
NO POLE
NO POLE
t[1] = 0.826
x2[1] (analytic) = 2.0011748199345030829378460376734
x2[1] (numeric) = 1.1155930792322614150368016497164e+6482
absolute error = 1.1155930792322614150368016497164e+6482
relative error = 5.5746907672402849887932873760928e+6483 %
h = 0.001
x1[1] (analytic) = 3.0007880345577305272991414931476
x1[1] (numeric) = -1.2487867446622443667521784863460e+6484
absolute error = 1.2487867446622443667521784863460e+6484
relative error = 4.1615293392300403030673264177260e+6485 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1678.4MB, alloc=4.9MB, time=227.09
NO POLE
NO POLE
t[1] = 0.827
x2[1] (analytic) = 2.0011767777110945727571276218477
x2[1] (numeric) = -8.9200867771516657595454429463601e+6501
absolute error = 8.9200867771516657595454429463601e+6501
relative error = 4.4574206919162234996436278397705e+6503 %
h = 0.001
x1[1] (analytic) = 3.0007872469170587693723582918024
x1[1] (numeric) = 9.9850799865215107615625425822819e+6503
absolute error = 9.9850799865215107615625425822819e+6503
relative error = 3.3274868109293509712647315516124e+6505 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1682.3MB, alloc=4.9MB, time=227.37
memory used=1686.1MB, alloc=4.9MB, time=227.67
NO POLE
NO POLE
t[1] = 0.828
x2[1] (analytic) = 2.0011787398011748534526755307781
x2[1] (numeric) = 7.1323450811180862113254784101091e+6521
absolute error = 7.1323450811180862113254784101091e+6521
relative error = 3.5640719838082595989458538159774e+6523 %
h = 0.001
x1[1] (analytic) = 3.0007864600636339941082564045099
x1[1] (numeric) = -7.9838949895483130397564794368114e+6523
absolute error = 7.9838949895483130397564794368114e+6523
relative error = 2.6606008444129704521856188528266e+6525 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1689.9MB, alloc=4.9MB, time=227.95
NO POLE
NO POLE
t[1] = 0.829
x2[1] (analytic) = 2.0011807062129857148380484543421
x2[1] (numeric) = -5.7028981474094044453979421676497e+6541
absolute error = 5.7028981474094044453979421676497e+6541
relative error = 2.8497667050775797588542830149055e+6543 %
h = 0.001
x1[1] (analytic) = 3.0007856739966693480164894462513
x1[1] (numeric) = 6.3837825325564143449944841203154e+6543
absolute error = 6.3837825325564143449944841203154e+6543
relative error = 2.1273703709915471541738267774196e+6545 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1693.7MB, alloc=4.9MB, time=228.24
NO POLE
NO POLE
t[1] = 0.83
x2[1] (analytic) = 2.001182676954785840424661717876
x2[1] (numeric) = 4.5599374272882509147014822335062e+6561
absolute error = 4.5599374272882509147014822335062e+6561
relative error = 2.2786212772075064593120618731954e+6563 %
h = 0.001
x1[1] (analytic) = 3.0007848887153787640669057426889
x1[1] (numeric) = -5.1043606505748844428143492199461e+6563
absolute error = 5.1043606505748844428143492199461e+6563
relative error = 1.7010085160619547457967159185410e+6565 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1697.5MB, alloc=4.9MB, time=228.52
memory used=1701.3MB, alloc=4.9MB, time=228.81
NO POLE
NO POLE
t[1] = 0.831
x2[1] (analytic) = 2.0011846520348508408495660182553
x2[1] (numeric) = -3.6460460634790791979398878550073e+6581
absolute error = 3.6460460634790791979398878550073e+6581
relative error = 1.8219438469966753087467516034660e+6583 %
h = 0.001
x1[1] (analytic) = 3.0007841042189769609034812345092
x1[1] (numeric) = 4.0813573329390368696902004839640e+6583
absolute error = 4.0813573329390368696902004839640e+6583
relative error = 1.3600969583919146791133063266628e+6585 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1705.1MB, alloc=4.9MB, time=229.10
NO POLE
NO POLE
t[1] = 0.832
x2[1] (analytic) = 2.0011866314614732873705418478589
x2[1] (numeric) = 2.9153145430148788602205518866778e+6601
absolute error = 2.9153145430148788602205518866778e+6601
relative error = 1.4567929333436606574313448714077e+6603 %
h = 0.001
x1[1] (analytic) = 3.000783320506679442059038055958
x1[1] (numeric) = -3.2633818061541519053551266323377e+6603
absolute error = 3.2633818061541519053551266323377e+6603
relative error = 1.0875099790954359730023475982896e+6605 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1709.0MB, alloc=4.9MB, time=229.38
NO POLE
NO POLE
t[1] = 0.833
x2[1] (analytic) = 2.0011886152429627454286439794798
x2[1] (numeric) = -2.3310344237955673523937183845839e+6621
absolute error = 2.3310344237955673523937183845839e+6621
relative error = 1.1648249475537608358781715415209e+6623 %
h = 0.001
x1[1] (analytic) = 3.0007825375777024951707480022887
x1[1] (numeric) = 2.6093429082498345396297739846006e+6623
absolute error = 2.6093429082498345396297739846006e+6623
relative error = 8.6955414981725179827460092711509e+6624 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1712.8MB, alloc=4.9MB, time=229.67
memory used=1716.6MB, alloc=4.9MB, time=229.95
NO POLE
NO POLE
t[1] = 0.834
x2[1] (analytic) = 2.0011906033876458082783306546539
x2[1] (numeric) = 1.8638542787567059006151593983355e+6641
absolute error = 1.8638542787567059006151593983355e+6641
relative error = 9.3137269163744078442337121618761e+6642 %
h = 0.001
x1[1] (analytic) = 3.0007817554312631911964201016243
x1[1] (numeric) = -2.0863848661513571697451193440235e+6643
absolute error = 2.0863848661513571697451193440235e+6643
relative error = 6.9528044229644694951295956859117e+6644 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1720.4MB, alloc=4.9MB, time=230.24
NO POLE
NO POLE
t[1] = 0.835
x2[1] (analytic) = 2.0011925959038661306853123878248
x2[1] (numeric) = -1.4903052211400321159609528583148e+6661
absolute error = 1.4903052211400321159609528583148e+6661
relative error = 7.4470854239140100718858511229369e+6662 %
h = 0.001
x1[1] (analytic) = 3.0007809740665793836315715075221
x1[1] (numeric) = 1.6682367794369759410986681473985e+6663
absolute error = 1.6682367794369759410986681473985e+6663
relative error = 5.5593420308054851873966071240379e+6664 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1724.2MB, alloc=4.9MB, time=230.52
NO POLE
NO POLE
t[1] = 0.836
x2[1] (analytic) = 2.0011945927999844626922555692482
x2[1] (numeric) = 1.1916219403368682637499551929566e+6681
absolute error = 1.1916219403368682637499551929566e+6681
relative error = 5.9545530685729200193464858593904e+6682 %
h = 0.001
x1[1] (analytic) = 3.0007801934828697077272809293125
x1[1] (numeric) = -1.3338928964721311684378746135156e+6683
absolute error = 1.3338928964721311684378746135156e+6683
relative error = 4.4451536282767251826798169850376e+6684 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1728.0MB, alloc=4.9MB, time=230.81
memory used=1731.9MB, alloc=4.9MB, time=231.10
NO POLE
NO POLE
t[1] = 0.837
x2[1] (analytic) = 2.0011965940843786834524763205715
x2[1] (numeric) = -9.5280002280739525422384807615199e+6700
absolute error = 9.5280002280739525422384807615199e+6700
relative error = 4.7611515311584689036911219950977e+6702 %
h = 0.001
x1[1] (analytic) = 3.0007794136793535797088238180636
x1[1] (numeric) = 1.0665573863317586775934356384873e+6703
absolute error = 1.0665573863317586775934356384873e+6703
relative error = 3.5542678727724869836416399647586e+6704 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1735.7MB, alloc=4.9MB, time=231.39
NO POLE
NO POLE
t[1] = 0.838
x2[1] (analytic) = 2.0011985997654438351317603285888
x2[1] (numeric) = 7.6184220240618635861154859344053e+6720
absolute error = 7.6184220240618635861154859344053e+6720
relative error = 3.8069295196162951414019448693706e+6722 %
h = 0.001
x1[1] (analytic) = 3.0007786346552511959950885268082
x1[1] (numeric) = -8.5280059692003831599642327379830e+6722
absolute error = 8.5280059692003831599642327379830e+6722
relative error = 2.8419310477329279871171119028957e+6724 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1739.5MB, alloc=4.9MB, time=231.67
NO POLE
NO POLE
t[1] = 0.839
x2[1] (analytic) = 2.0012006098515921568784446547896
x2[1] (numeric) = -6.0915567535039291018984117457211e+6740
absolute error = 6.0915567535039291018984117457211e+6740
relative error = 3.0439510779260032885663288556908e+6742 %
h = 0.001
x1[1] (analytic) = 3.0007778564097835324187726644484
x1[1] (numeric) = 6.8188441374775927332906863930091e+6742
absolute error = 6.8188441374775927332906863930091e+6742
relative error = 2.2723588561919918054331477138417e+6744 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1743.3MB, alloc=4.9MB, time=231.95
memory used=1747.1MB, alloc=4.9MB, time=232.24
NO POLE
NO POLE
t[1] = 0.84
x2[1] (analytic) = 2.0012026243512531188618977909758
x2[1] (numeric) = 4.8707020382910214796037460161787e+6760
absolute error = 4.8707020382910214796037460161787e+6760
relative error = 2.4338874929618875548415819505280e+6762 %
h = 0.001
x1[1] (analytic) = 3.0007770789421723434473588635347
x1[1] (numeric) = -5.4522282863237992246900316024044e+6762
absolute error = 5.4522282863237992246900316024044e+6762
relative error = 1.8169387938159696057968961645675e+6764 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1750.9MB, alloc=4.9MB, time=232.53
NO POLE
NO POLE
t[1] = 0.841
x2[1] (analytic) = 2.0012046432728734563795345044232
x2[1] (numeric) = -3.8945280009360761961319679873299e+6780
absolute error = 3.8945280009360761961319679873299e+6780
relative error = 1.9460918272539903320608114631538e+6782 %
h = 0.001
x1[1] (analytic) = 3.0007763022516401614048691828943
x1[1] (numeric) = 4.3595061988300267110926695633874e+6782
absolute error = 4.3595061988300267110926695633874e+6782
relative error = 1.4527927975033860744748996823827e+6784 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1754.7MB, alloc=4.9MB, time=232.81
NO POLE
NO POLE
memory used=1758.6MB, alloc=4.9MB, time=233.10
t[1] = 0.842
x2[1] (analytic) = 2.0012066666249172040325022898174
x2[1] (numeric) = 3.1139963460784603405663527516711e+6800
absolute error = 3.1139963460784603405663527516711e+6800
relative error = 1.5560593505968523901982327960132e+6802 %
h = 0.001
x1[1] (analytic) = 3.0007755263374102956943973668652
x1[1] (numeric) = -3.4857847653425885886067953689911e+6802
absolute error = 3.4857847653425885886067953689911e+6802
relative error = 1.1616279640873888391467735182587e+6804 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1762.4MB, alloc=4.9MB, time=233.39
NO POLE
NO POLE
t[1] = 0.843
x2[1] (analytic) = 2.0012086944158657299701765194893
x2[1] (numeric) = -2.4898969120415282451379641039080e+6820
absolute error = 2.4898969120415282451379641039080e+6820
relative error = 1.2441965293221485211302248494746e+6822 %
h = 0.001
x1[1] (analytic) = 3.0007747511987068320214181836646
x1[1] (numeric) = 2.7871724172695069617193814507850e+6822
absolute error = 2.7871724172695069617193814507850e+6822
relative error = 9.2881760490557545281174398530089e+6823 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1766.2MB, alloc=4.9MB, time=233.68
NO POLE
NO POLE
t[1] = 0.844
x2[1] (analytic) = 2.0012107266542177702036016583191
x2[1] (numeric) = 1.9908779406248323457133089742934e+6840
absolute error = 1.9908779406248323457133089742934e+6840
relative error = 9.9483673263801629092918889876876e+6841 %
h = 0.001
x1[1] (analytic) = 3.0007739768347546316178730662048
x1[1] (numeric) = -2.2285742254727143287488447085438e+6842
absolute error = 2.2285742254727143287488447085438e+6842
relative error = 7.4266647294223603687804155045780e+6843 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1770.0MB, alloc=4.9MB, time=233.97
memory used=1773.8MB, alloc=4.9MB, time=234.25
NO POLE
NO POLE
t[1] = 0.845
x2[1] (analytic) = 2.0012127633484894629880161850813
x2[1] (numeric) = -1.5918711153453833646276150933873e+6860
absolute error = 1.5918711153453833646276150933873e+6860
relative error = 7.9545320942377794681465797812765e+6861 %
h = 0.001
x1[1] (analytic) = 3.0007732032447793304670312794398
x1[1] (numeric) = 1.7819288995787540901075628277559e+6862
absolute error = 1.7819288995787540901075628277559e+6862
relative error = 5.9382325117137432404286838493932e+6863 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1777.6MB, alloc=4.9MB, time=234.54
NO POLE
NO POLE
t[1] = 0.846
x2[1] (analytic) = 2.0012148045072143832745991379414
x2[1] (numeric) = 1.2728322496132776821055658298661e+6880
absolute error = 1.2728322496132776821055658298661e+6880
relative error = 6.3602979887344178367656415058005e+6881 %
h = 0.001
x1[1] (analytic) = 3.0007724304280073385291258391038
x1[1] (numeric) = -1.4247991235205219683505237158637e+6882
absolute error = 1.4247991235205219683505237158637e+6882
relative error = 4.7481078840667016742074936326668e+6883 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1781.4MB, alloc=4.9MB, time=234.83
NO POLE
NO POLE
t[1] = 0.847
x2[1] (analytic) = 2.0012168501389435772315764783227
x2[1] (numeric) = -1.0177343630637388037007515114712e+6900
absolute error = 1.0177343630637388037007515114712e+6900
relative error = 5.0855776224004808323807271687268e+6901 %
h = 0.001
x1[1] (analytic) = 3.0007716583836658389677634074786
x1[1] (numeric) = 1.1392444125378681867926674048158e+6902
absolute error = 1.1392444125378681867926674048158e+6902
relative error = 3.7965048401967053813287617143089e+6903 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1785.3MB, alloc=4.9MB, time=235.12
memory used=1789.1MB, alloc=4.9MB, time=235.41
NO POLE
NO POLE
t[1] = 0.848
x2[1] (analytic) = 2.0012189002522455968348257444061
x2[1] (numeric) = 8.1376256303645217597430280628267e+6919
absolute error = 8.1376256303645217597430280628267e+6919
relative error = 4.0663345870553225161431183520839e+6921 %
h = 0.001
x1[1] (analytic) = 3.0007708871109827873771073925989
x1[1] (numeric) = -9.1091986938610615165228546396279e+6921
absolute error = 9.1091986938610615165228546396279e+6921
relative error = 3.0356195246318916983890471828622e+6923 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1792.9MB, alloc=4.9MB, time=235.70
NO POLE
NO POLE
t[1] = 0.849
x2[1] (analytic) = 2.0012209548557065345281177431384
x2[1] (numeric) = -6.5067028591446199961813253044484e+6939
absolute error = 6.5067028591446199961813253044484e+6939
relative error = 3.2513665436877113563351435306620e+6941 %
h = 0.001
x1[1] (analytic) = 3.0007701166091869110098334780787
x1[1] (numeric) = 7.2835556559275131551818846781587e+6941
absolute error = 7.2835556559275131551818846781587e+6941
relative error = 2.4272288022375377250766719785457e+6943 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1796.7MB, alloc=4.9MB, time=235.98
NO POLE
NO POLE
t[1] = 0.85
x2[1] (analytic) = 2.001223013957930057953134307785
x2[1] (numeric) = 5.2026455897927925495576698046231e+6959
absolute error = 5.2026455897927925495576698046231e+6959
relative error = 2.5997330399989909210027450350029e+6961 %
h = 0.001
x1[1] (analytic) = 3.0007693468775077080058568115141
x1[1] (numeric) = -5.8238034733774813433160685216468e+6961
absolute error = 5.8238034733774813433160685216468e+6961
relative error = 1.9407701159829298679704744095709e+6963 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1800.5MB, alloc=4.9MB, time=236.26
memory used=1804.3MB, alloc=4.9MB, time=236.55
NO POLE
NO POLE
t[1] = 0.851
x2[1] (analytic) = 2.0012250775675374447494014267787
x2[1] (numeric) = -4.1599442480993710799865514861447e+6979
absolute error = 4.1599442480993710799865514861447e+6979
relative error = 2.0786988403901714907942709728027e+6981 %
h = 0.001
x1[1] (analytic) = 3.00076857791517544662183008019
x1[1] (numeric) = 4.6566112073189818842923893798486e+6981
absolute error = 4.6566112073189818842923893798486e+6981
relative error = 1.5518061744548876537756160349596e+6983 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1808.1MB, alloc=4.9MB, time=236.84
NO POLE
NO POLE
t[1] = 0.852
x2[1] (analytic) = 2.0012271456931676174242773288971
x2[1] (numeric) = 3.3262185264447850021057745185708e+6999
absolute error = 3.3262185264447850021057745185708e+6999
relative error = 1.6620894502671151894244825451363e+7001 %
h = 0.001
x1[1] (analytic) = 3.0007678097214211644614117035885
x1[1] (numeric) = -3.7233447239855466385712504664247e+7001
absolute error = 3.7233447239855466385712504664247e+7001
relative error = 1.2407973425745347879498344776125e+7003 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1812.0MB, alloc=4.9MB, time=237.12
NO POLE
NO POLE
t[1] = 0.853
x2[1] (analytic) = 2.001229218343477178293135389631
x2[1] (numeric) = -2.6595860487119275850454899547050e+7019
absolute error = 2.6595860487119275850454899547050e+7019
relative error = 1.3289762233800519005915503994732e+7021 %
h = 0.001
x1[1] (analytic) = 3.0007670422954766677063033729673
x1[1] (numeric) = 2.9771211974582525529339433883314e+7021
absolute error = 2.9771211974582525529339433883314e+7021
relative error = 9.9212006646836006596253337074266e+7022 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1815.8MB, alloc=4.9MB, time=237.41
memory used=1819.6MB, alloc=4.9MB, time=237.69
NO POLE
NO POLE
t[1] = 0.854
x2[1] (analytic) = 2.001231295527140444489882004006
x2[1] (numeric) = 2.1265584008587361125320942035629e+7039
absolute error = 2.1265584008587361125320942035629e+7039
relative error = 1.0626249977260042292636386542267e+7041 %
h = 0.001
x1[1] (analytic) = 3.0007662756365745303480561690449
x1[1] (numeric) = -2.3804539416559445996199558526139e+7041
absolute error = 2.3804539416559445996199558526139e+7041
relative error = 7.9328202298959837130327531844139e+7042 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1823.4MB, alloc=4.9MB, time=237.98
NO POLE
NO POLE
t[1] = 0.855
x2[1] (analytic) = 2.0012333772528494830479498520702
x2[1] (numeric) = -1.7003588338316973414329635843587e+7059
absolute error = 1.7003588338316973414329635843587e+7059
relative error = 8.4965544406711261923537161174811e+7060 %
h = 0.001
x1[1] (analytic) = 3.0007655097439480934206444895996
x1[1] (numeric) = 1.9033692592640189628405376182713e+7061
absolute error = 1.9033692592640189628405376182713e+7061
relative error = 6.3429456686418369825206313767338e+7062 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1827.2MB, alloc=4.9MB, time=238.26
NO POLE
NO POLE
t[1] = 0.856
x2[1] (analytic) = 2.0012354635293141460519072647833
x2[1] (numeric) = 1.3595771282942296593543344047540e+7079
absolute error = 1.3595771282942296593543344047540e+7079
relative error = 6.7936889639988859826745970255473e+7080 %
h = 0.001
x1[1] (analytic) = 3.0007647446168314642338070195559
x1[1] (numeric) = -1.5219007071361678937830076326901e+7081
absolute error = 1.5219007071361678937830076326901e+7081
relative error = 5.0717095029403907642560737524171e+7082 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1831.0MB, alloc=4.9MB, time=238.55
memory used=1834.8MB, alloc=4.9MB, time=238.84
NO POLE
NO POLE
t[1] = 0.857
x2[1] (analytic) = 2.0012375543652621058598246801185
x2[1] (numeric) = -1.0870940480341839615236735666740e+7099
absolute error = 1.0870940480341839615236735666740e+7099
relative error = 5.4321089750835727379807384804225e+7100 %
h = 0.001
x1[1] (analytic) = 3.0007639802544595156071539768985
x1[1] (numeric) = 1.2168851372944692098823642673470e+7101
absolute error = 1.2168851372944692098823642673470e+7101
relative error = 4.0552510803974642728283868851928e+7102 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1838.7MB, alloc=4.9MB, time=239.13
NO POLE
NO POLE
t[1] = 0.858
x2[1] (analytic) = 2.001239649769438890396539461839
x2[1] (numeric) = 8.6922135175518925322022497156044e+7118
absolute error = 8.6922135175518925322022497156044e+7118
relative error = 4.3434146023207740374228547114704e+7120 %
h = 0.001
x1[1] (analytic) = 3.0007632166560678851050398685222
x1[1] (numeric) = -9.7300003240992502781104211088781e+7120
absolute error = 9.7300003240992502781104211088781e+7120
relative error = 3.2425085291941090512644395730180e+7122 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1842.5MB, alloc=4.9MB, time=239.41
NO POLE
NO POLE
t[1] = 0.859
x2[1] (analytic) = 2.0012417497506079185179606366181
x2[1] (numeric) = -6.9501416157450998214109402987261e+7138
absolute error = 6.9501416157450998214109402987261e+7138
relative error = 3.4729145624766309282505590964047e+7140 %
h = 0.001
x1[1] (analytic) = 3.0007624538208929742722009908891
x1[1] (numeric) = 7.7799377612138584446829904065820e+7140
absolute error = 7.7799377612138584446829904065820e+7140
relative error = 2.5926536608412992795392278268632e+7142 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1846.3MB, alloc=4.9MB, time=239.70
memory used=1850.1MB, alloc=4.9MB, time=240.00
NO POLE
NO POLE
t[1] = 0.86
x2[1] (analytic) = 2.00124385431755053544655538895
x2[1] (numeric) = 5.5572114492323881186465182349017e+7158
absolute error = 5.5572114492323881186465182349017e+7158
relative error = 2.7768787083308583132547699351250e+7160 %
h = 0.001
x1[1] (analytic) = 3.0007616917481719478701569111322
x1[1] (numeric) = -6.2207019067046741760580359805017e+7160
absolute error = 6.2207019067046741760580359805017e+7160
relative error = 2.0730409628365530479834383232770e+7162 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1853.9MB, alloc=4.9MB, time=240.28
NO POLE
NO POLE
t[1] = 0.861
x2[1] (analytic) = 2.0012459634790660482781594376444
x2[1] (numeric) = -4.4434488962810474256925423894795e+7178
absolute error = 4.4434488962810474256925423894795e+7178
relative error = 2.2203412161073562817539926789102e+7180 %
h = 0.001
x1[1] (analytic) = 3.000760930437142733114375165005
x1[1] (numeric) = 4.9739642397912294250412074224955e+7180
absolute error = 4.9739642397912294250412074224955e+7180
relative error = 1.6575676487052354993052486495793e+7182 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1857.7MB, alloc=4.9MB, time=240.57
NO POLE
NO POLE
t[1] = 0.862
x2[1] (analytic) = 2.0012480772439717615602537026122
x2[1] (numeric) = 3.5529038753039547902938751059768e+7198
absolute error = 3.5529038753039547902938751059768e+7198
relative error = 1.7753440543947220862052435539277e+7200 %
h = 0.001
x1[1] (analytic) = 3.0007601698870440189121984088431
x1[1] (numeric) = -3.9770946478012101931413292596234e+7200
absolute error = 3.9770946478012101931413292596234e+7200
relative error = 1.3253623824095605085771540471639e+7202 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1861.6MB, alloc=4.9MB, time=240.85
memory used=1865.4MB, alloc=4.9MB, time=241.15
NO POLE
NO POLE
t[1] = 0.863
x2[1] (analytic) = 2.0012501956211030129418499561319
x2[1] (numeric) = -2.8408396814723824046268936397714e+7218
absolute error = 2.8408396814723824046268936397714e+7218
relative error = 1.4195324940821337411955238212726e+7220 %
h = 0.001
x1[1] (analytic) = 3.0007594100971152551015332634642
x1[1] (numeric) = 3.1800151901037643466825624307778e+7220
absolute error = 3.1800151901037643466825624307778e+7220
relative error = 1.0597368050912311348931648221057e+7222 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1869.2MB, alloc=4.9MB, time=241.43
NO POLE
NO POLE
t[1] = 0.864
x2[1] (analytic) = 2.0012523186193132088951284388431
x2[1] (numeric) = 2.2714856295226051344793575974403e+7238
absolute error = 2.2714856295226051344793575974403e+7238
relative error = 1.1350321038427223248565564393918e+7240 %
h = 0.001
x1[1] (analytic) = 3.0007586510665966516903000886957
x1[1] (numeric) = -2.5426844228817911307098312364289e+7240
absolute error = 2.5426844228817911307098312364289e+7240
relative error = 8.4734719400975931561835232763332e+7241 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1873.0MB, alloc=4.9MB, time=241.72
NO POLE
NO POLE
t[1] = 0.865
x2[1] (analytic) = 2.0012544462474738605089707073401
x2[1] (numeric) = -1.8162401063243054149984545078378e+7258
absolute error = 1.8162401063243054149984545078378e+7258
relative error = 9.0755081630420038596110947662528e+7259 %
h = 0.001
x1[1] (analytic) = 3.0007578927947291780966429279791
x1[1] (numeric) = 2.0330859093018185855510446131100e+7260
absolute error = 2.0330859093018185855510446131100e+7260
relative error = 6.7752413954606717834767705235005e+7261 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1876.8MB, alloc=4.9MB, time=242.00
memory used=1880.6MB, alloc=4.9MB, time=242.29
NO POLE
NO POLE
t[1] = 0.866
x2[1] (analytic) = 2.0012565785144746193545312674411
x2[1] (numeric) = 1.4522337632020208645651318544412e+7278
absolute error = 1.4522337632020208645651318544412e+7278
relative error = 7.2566095661757106295885562077981e+7279 %
h = 0.001
x1[1] (analytic) = 3.0007571352807545623898988632613
x1[1] (numeric) = -1.6256198674929960800091608945601e+7280
absolute error = 1.6256198674929960800091608945601e+7280
relative error = 5.4173656654186413101341955296631e+7281 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1884.4MB, alloc=4.9MB, time=242.58
NO POLE
NO POLE
t[1] = 0.867
x2[1] (analytic) = 2.0012587154292233134229918349809
x2[1] (numeric) = -1.1611806696924277867322327991491e+7298
absolute error = 1.1611806696924277867322327991491e+7298
relative error = 5.8022516566199269173220712260411e+7299 %
h = 0.001
x1[1] (analytic) = 3.0007563785239152905323260211429
x1[1] (numeric) = 1.2998171604541070853646048840224e+7300
absolute error = 1.2998171604541070853646048840224e+7300
relative error = 4.3316317504371768585595946052585e+7301 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1888.3MB, alloc=4.9MB, time=242.86
NO POLE
NO POLE
memory used=1892.1MB, alloc=4.9MB, time=243.15
t[1] = 0.868
x2[1] (analytic) = 2.00126085700064598313564235433
x2[1] (numeric) = 9.2845971621979625339332014744102e+7317
absolute error = 9.2845971621979625339332014744102e+7317
relative error = 4.6393737876396018356273907266679e+7319 %
h = 0.001
x1[1] (analytic) = 3.0007556225234546056215894720095
x1[1] (numeric) = -1.0393110249178578124995334917670e+7320
absolute error = 1.0393110249178578124995334917670e+7320
relative error = 3.4634977174311178523707698947251e+7321 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1895.9MB, alloc=4.9MB, time=243.43
NO POLE
NO POLE
t[1] = 0.869
x2[1] (analytic) = 2.0012630032376869174264331937684
x2[1] (numeric) = -7.4238011977178373678866023433404e+7337
absolute error = 7.4238011977178373678866023433404e+7337
relative error = 3.7095580069723219483285515805483e+7339 %
h = 0.001
x1[1] (analytic) = 3.0007548672786165071340042646342
x1[1] (numeric) = 8.3101488376906665555182123632455e+7339
absolute error = 8.3101488376906665555182123632455e+7339
relative error = 2.7693527812977064336029302811535e+7341 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1899.7MB, alloc=4.9MB, time=243.72
NO POLE
NO POLE
t[1] = 0.87
x2[1] (analytic) = 2.0012651541493086898971432263494
x2[1] (numeric) = 5.9359413510827883821882767710915e+7357
absolute error = 5.9359413510827883821882767710915e+7357
relative error = 2.9660943922276101922141942271529e+7359 %
h = 0.001
x1[1] (analytic) = 3.0007541127886457501685348394924
x1[1] (numeric) = -6.6446493926136881573535989199883e+7359
absolute error = 6.6446493926136881573535989199883e+7359
relative error = 2.2143265135571924404818446371670e+7361 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1903.5MB, alloc=4.9MB, time=244.01
memory used=1907.3MB, alloc=4.9MB, time=244.30
NO POLE
NO POLE
t[1] = 0.871
x2[1] (analytic) = 2.0012673097444921950453087949757
x2[1] (numeric) = -4.7462746893500232604847594387611e+7377
absolute error = 4.7462746893500232604847594387611e+7377
relative error = 2.3716345468891881303528260663676e+7379 %
h = 0.001
x1[1] (analytic) = 3.0007533590527878446915500647891
x1[1] (numeric) = 5.3129452207297429145182271681236e+7379
absolute error = 5.3129452207297429145182271681236e+7379
relative error = 1.7705371235198141040625389924983e+7381 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1911.1MB, alloc=4.9MB, time=244.59
NO POLE
NO POLE
t[1] = 0.872
x2[1] (analytic) = 2.0012694700322366845650588510736
x2[1] (numeric) = 3.7950380730522946742490038257351e+7397
absolute error = 3.7950380730522946742490038257351e+7397
relative error = 1.8963153787536486795794932854358e+7399 %
h = 0.001
x1[1] (analytic) = 3.0007526060702890547823331399536
x1[1] (numeric) = -4.2481379002258701476714259846484e+7399
absolute error = 4.2481379002258701476714259846484e+7399
relative error = 1.4156908142418064364997964924092e+7401 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1915.0MB, alloc=4.9MB, time=244.88
NO POLE
NO POLE
t[1] = 0.873
x2[1] (analytic) = 2.0012716350215598037210018474988
x2[1] (numeric) = -3.0344459430958036625797565869266e+7417
absolute error = 3.0344459430958036625797565869266e+7417
relative error = 1.5162589075835841835344025311394e+7419 %
h = 0.001
x1[1] (analytic) = 3.0007518538403963978793456121116
x1[1] (numeric) = 3.3967366252755605458463178847885e+7419
absolute error = 3.3967366252755605458463178847885e+7419
relative error = 1.1319618518033666554746387780025e+7421 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1918.8MB, alloc=4.9MB, time=245.16
memory used=1922.6MB, alloc=4.9MB, time=245.45
NO POLE
NO POLE
t[1] = 0.874
x2[1] (analytic) = 2.0012738047214976277953102581398
x2[1] (numeric) = 2.4262898037712780765998514183969e+7437
absolute error = 2.4262898037712780765998514183969e+7437
relative error = 1.2123727388261731434391294585880e+7439 %
h = 0.001
x1[1] (analytic) = 3.0007511023623576440272447517979
x1[1] (numeric) = -2.7159710848546011258322996025844e+7439
absolute error = 2.7159710848546011258322996025844e+7439
relative error = 9.0509708809785593386186847409531e+7440 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1926.4MB, alloc=4.9MB, time=245.74
NO POLE
NO POLE
t[1] = 0.875
x2[1] (analytic) = 2.0012759791411046986081488890957
x2[1] (numeric) = -1.9400188114336779823298510417584e+7457
absolute error = 1.9400188114336779823298510417584e+7457
relative error = 9.6939094440452101448332143711601e+7458 %
h = 0.001
x1[1] (analytic) = 3.0007503516354213151246535349282
x1[1] (numeric) = 2.1716428877284119281498223824738e+7459
absolute error = 2.1716428877284119281498223824738e+7459
relative error = 7.2369995276176760244267663620317e+7460 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1930.2MB, alloc=4.9MB, time=246.02
NO POLE
NO POLE
t[1] = 0.876
x2[1] (analytic) = 2.001278158289454061111593439306
x2[1] (numeric) = 1.5512050468441630604004979793442e+7477
absolute error = 1.5512050468441630604004979793442e+7477
relative error = 7.7510716859570359766738783898362e+7478 %
h = 0.001
x1[1] (analytic) = 3.0007496016588366841726824787984
x1[1] (numeric) = -1.7364075995212105303920202914262e+7479
absolute error = 1.7364075995212105303920202914262e+7479
relative error = 5.7865794552178279146400265702167e+7480 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1934.0MB, alloc=4.9MB, time=246.31
memory used=1937.8MB, alloc=4.9MB, time=246.60
NO POLE
NO POLE
t[1] = 0.877
x2[1] (analytic) = 2.0012803421756373000571860620944
x2[1] (numeric) = -1.2403163738276268766243830394327e+7497
absolute error = 1.2403163738276268766243830394327e+7497
relative error = 6.1976143356270155765806200144868e+7498 %
h = 0.001
x1[1] (analytic) = 3.000748852431853774524202580635
x1[1] (numeric) = 1.3884010896602286238648904648702e+7499
absolute error = 1.3884010896602286238648904648702e+7499
relative error = 4.6268486899030109727296590306953e+7500 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1941.7MB, alloc=4.9MB, time=246.88
NO POLE
NO POLE
t[1] = 0.878
x2[1] (analytic) = 2.0012825308087645767372749732617
x2[1] (numeric) = 9.9173523855835059423902723128555e+7516
absolute error = 9.9173523855835059423902723128555e+7516
relative error = 4.9554984031043704628158244598788e+7518 %
h = 0.001
x1[1] (analytic) = 3.0007481039537233591338686079677
x1[1] (numeric) = -1.1101411824627087039374673213839e+7519
absolute error = 1.1101411824627087039374673213839e+7519
relative error = 3.6995480593656286773362999185827e+7520 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1945.5MB, alloc=4.9MB, time=247.17
NO POLE
NO POLE
t[1] = 0.879
x2[1] (analytic) = 2.0012847241979646658002854461236
x2[1] (numeric) = -7.9297411866230509735395158668789e+7536
absolute error = 7.9297411866230509735395158668789e+7536
relative error = 3.9623253456856199741266108851909e+7538 %
h = 0.001
x1[1] (analytic) = 3.0007473562236969598088919908488
x1[1] (numeric) = 8.8764943659133757222269885752203e+7538
absolute error = 8.8764943659133757222269885752203e+7538
relative error = 2.9580945385165771240401429253493e+7540 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1949.3MB, alloc=4.9MB, time=247.45
memory used=1953.1MB, alloc=4.9MB, time=247.74
NO POLE
NO POLE
t[1] = 0.88
x2[1] (analytic) = 2.0012869223523849921400698292401
x2[1] (numeric) = 6.3404821006696782353706461352289e+7556
absolute error = 6.3404821006696782353706461352289e+7556
relative error = 3.1682024350695533327382186783461e+7558 %
h = 0.001
x1[1] (analytic) = 3.0007466092410268464605625666915
x1[1] (numeric) = -7.0974893529579196469818258152561e+7558
absolute error = 7.0974893529579196469818258152561e+7558
relative error = 2.3652411473533495650503575020076e+7560 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1956.9MB, alloc=4.9MB, time=248.03
NO POLE
NO POLE
t[1] = 0.881
x2[1] (analytic) = 2.0012891252811916678594845185259
x2[1] (numeric) = -5.0697383839878920221001647035296e+7576
absolute error = 5.0697383839878920221001647035296e+7576
relative error = 2.5332363624748958070981148566259e+7578 %
h = 0.001
x1[1] (analytic) = 3.0007458630049660363565184292485
x1[1] (numeric) = 5.6750281179463798361888649704207e+7578
absolute error = 5.6750281179463798361888649704207e+7578
relative error = 1.8912058458237348036296681603366e+7580 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1960.7MB, alloc=4.9MB, time=248.31
NO POLE
NO POLE
t[1] = 0.882
x2[1] (analytic) = 2.0012913329935695293083421119616
x2[1] (numeric) = 4.0536739752589957884839628556999e+7596
absolute error = 4.0536739752589957884839628556999e+7596
relative error = 2.0255291713053258370629938880171e+7598 %
h = 0.001
x1[1] (analytic) = 3.0007451175147682933737631340021
x1[1] (numeric) = -4.5376530400936800237513640982238e+7598
absolute error = 4.5376530400936800237513640982238e+7598
relative error = 1.5121754305649879219907399459299e+7600 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1964.6MB, alloc=4.9MB, time=248.59
memory used=1968.4MB, alloc=4.9MB, time=248.88
NO POLE
NO POLE
t[1] = 0.883
x2[1] (analytic) = 2.0012935454987221741958872722594
x2[1] (numeric) = -3.2412466784462214851522228165126e+7616
absolute error = 3.2412466784462214851522228165126e+7616
relative error = 1.6195758417031735842144446281344e+7618 %
h = 0.001
x1[1] (analytic) = 3.0007443727696881272524295129808
x1[1] (numeric) = 3.6282278579656479970276539448590e+7618
absolute error = 3.6282278579656479970276539448590e+7618
relative error = 1.2091092766481779282466577834372e+7620 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1972.2MB, alloc=4.9MB, time=249.17
NO POLE
NO POLE
t[1] = 0.884
x2[1] (analytic) = 2.0012957628058719987779451205506
x2[1] (numeric) = 2.5916440480064602638202171182105e+7636
absolute error = 2.5916440480064602638202171182105e+7636
relative error = 1.2949830285818941849102907441779e+7638 %
h = 0.001
x1[1] (analytic) = 3.0007436287689807928502893527685
x1[1] (numeric) = -2.9010674181131800044022976499846e+7638
absolute error = 2.9010674181131800044022976499846e+7638
relative error = 9.6678283019576325402908194091880e+7639 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1976.0MB, alloc=4.9MB, time=249.45
NO POLE
NO POLE
t[1] = 0.885
x2[1] (analytic) = 2.0012979849242602351188912824855
x2[1] (numeric) = -2.0722331676363192098000567980786e+7656
absolute error = 2.0722331676363192098000567980786e+7656
relative error = 1.0354445880855386657719899525619e+7658 %
h = 0.001
x1[1] (analytic) = 3.0007428855119022893980081902137
x1[1] (numeric) = 2.3196426723752796735927136527516e+7658
absolute error = 2.3196426723752796735927136527516e+7658
relative error = 7.7302280164518911511929785767281e+7659 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1979.8MB, alloc=4.9MB, time=249.74
memory used=1983.6MB, alloc=4.9MB, time=250.03
NO POLE
NO POLE
t[1] = 0.886
x2[1] (analytic) = 2.0013002118631469884285930070474
x2[1] (numeric) = 1.6569213292833141733907608591500e+7676
absolute error = 1.6569213292833141733907608591500e+7676
relative error = 8.2792242736074713958136959065468e+7677 %
h = 0.001
x1[1] (analytic) = 3.0007421429977093597551444810955
x1[1] (numeric) = -1.8547456339376973950511632580874e+7678
absolute error = 1.8547456339376973950511632580874e+7678
relative error = 6.1809563952896876077840255254450e+7679 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1987.4MB, alloc=4.9MB, time=250.31
NO POLE
NO POLE
t[1] = 0.887
x2[1] (analytic) = 2.001302443631811274474471077897
x2[1] (numeric) = -1.3248452608088963885468548972108e+7696
absolute error = 1.3248452608088963885468548972108e+7696
relative error = 6.6199152708006896593344896567648e+7697 %
h = 0.001
x1[1] (analytic) = 3.0007414012256594896668923977435
x1[1] (numeric) = 1.4830221083527312064464069951096e+7698
absolute error = 1.4830221083527312064464069951096e+7698
relative error = 4.9421856470103939401476815364688e+7699 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1991.3MB, alloc=4.9MB, time=250.60
NO POLE
NO POLE
t[1] = 0.888
x2[1] (analytic) = 2.0013046802395510570688325371707
x2[1] (numeric) = 1.0593230553963563934879840503767e+7716
absolute error = 1.0593230553963563934879840503767e+7716
relative error = 5.2931623348302874614445589732001e+7717 %
h = 0.001
x1[1] (analytic) = 3.0007406601950109070215675123559
x1[1] (numeric) = -1.1857984909734842668671484401225e+7718
absolute error = 1.1857984909734842668671484401225e+7718
relative error = 3.9516860177327756121680204474766e+7719 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=1995.1MB, alloc=4.9MB, time=250.88
memory used=1998.9MB, alloc=4.9MB, time=251.17
NO POLE
NO POLE
t[1] = 0.889
x2[1] (analytic) = 2.0013069216956832856316245423744
x2[1] (numeric) = -8.4701615267063237970743776824561e+7735
absolute error = 8.4701615267063237970743776824561e+7735
relative error = 4.2323151111323083835642615165332e+7737 %
h = 0.001
x1[1] (analytic) = 3.0007399199050225811088346235008
x1[1] (numeric) = 9.4814369474022202438875750770191e+7737
absolute error = 9.4814369474022202438875750770191e+7737
relative error = 3.1596996742397856204139564277659e+7739 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2002.7MB, alloc=4.9MB, time=251.47
NO POLE
NO POLE
t[1] = 0.89
x2[1] (analytic) = 2.0013091680095439328287599783212
x2[1] (numeric) = 6.7725927348623973513655208533829e+7755
absolute error = 6.7725927348623973513655208533829e+7755
relative error = 3.3840812020055163749124997152187e+7757 %
h = 0.001
x1[1] (analytic) = 3.0007391803549542218786769840286
x1[1] (numeric) = -7.5811908407609991555676691797226e+7757
absolute error = 7.5811908407609991555676691797226e+7757
relative error = 2.5264411150402709160001879183033e+7759 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2006.5MB, alloc=4.9MB, time=251.75
NO POLE
NO POLE
t[1] = 0.891
x2[1] (analytic) = 2.0013114191904880322861657479845
x2[1] (numeric) = -5.4152464752519300864638657350359e+7775
absolute error = 5.4152464752519300864638657350359e+7775
relative error = 2.7058489864822473375221103146188e+7777 %
h = 0.001
x1[1] (analytic) = 3.000738441544066279201106189364
x1[1] (numeric) = 6.0617873517352930057347592764286e+7777
absolute error = 6.0617873517352930057347592764286e+7777
relative error = 2.0200985423495047991685610438250e+7779 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2010.3MB, alloc=4.9MB, time=252.03
memory used=2014.1MB, alloc=4.9MB, time=252.32
NO POLE
NO POLE
t[1] = 0.892
x2[1] (analytic) = 2.0013136752478897163797049686521
x2[1] (numeric) = 4.3299361907259677173937489777294e+7795
absolute error = 4.3299361907259677173937489777294e+7795
relative error = 2.1635469962946446493991537427852e+7797 %
h = 0.001
x1[1] (analytic) = 3.0007377034716199421266119858887
x1[1] (numeric) = -4.8468989462834167196852438853542e+7797
absolute error = 4.8468989462834167196852438853542e+7797
relative error = 1.6152357937436290839043192981167e+7799 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2018.0MB, alloc=4.9MB, time=252.61
NO POLE
NO POLE
t[1] = 0.893
x2[1] (analytic) = 2.0013159361911422541011246028976
x2[1] (numeric) = -3.4621411050152221145613160509901e+7815
absolute error = 3.4621411050152221145613160509901e+7815
relative error = 1.7299323122386604295533116628467e+7817 %
h = 0.001
x1[1] (analytic) = 3.0007369661368771381473512598636
x1[1] (numeric) = 3.8754954656662733542764806911450e+7817
absolute error = 3.8754954656662733542764806911450e+7817
relative error = 1.2915145543914676252885955130577e+7819 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2021.8MB, alloc=4.9MB, time=252.90
NO POLE
NO POLE
memory used=2025.6MB, alloc=4.9MB, time=253.18
t[1] = 0.894
x2[1] (analytic) = 2.0013182020296580890001803576155
x2[1] (numeric) = 2.7682673607775154083775224755649e+7835
absolute error = 2.7682673607775154083775224755649e+7835
relative error = 1.3832219973665595468724057566328e+7837 %
h = 0.001
x1[1] (analytic) = 3.0007362295391005324590754680795
x1[1] (numeric) = -3.0987782643821597390940268220881e+7837
absolute error = 3.0987782643821597390940268220881e+7837
relative error = 1.0326726600885270140097915473716e+7839 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2029.4MB, alloc=4.9MB, time=253.47
NO POLE
NO POLE
t[1] = 0.895
x2[1] (analytic) = 2.0013204727728688772030909887061
x2[1] (numeric) = -2.2134580735733522744588016331695e+7855
absolute error = 2.2134580735733522744588016331695e+7855
relative error = 1.1059988161249170548895425001000e+7857 %
h = 0.001
x1[1] (analytic) = 3.0007354936775535272237957721639
x1[1] (numeric) = 2.4777288005822671251546982165206e+7857
absolute error = 2.4777288005822671251546982165206e+7857
relative error = 8.2570716606070627843115334812641e+7858 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2033.2MB, alloc=4.9MB, time=253.75
NO POLE
NO POLE
t[1] = 0.896
x2[1] (analytic) = 2.0013227484302255255074744539455
x2[1] (numeric) = 1.7698422893990182075731074737671e+7875
absolute error = 1.7698422893990182075731074737671e+7875
relative error = 8.8433626749469904699493381119837e+7876 %
h = 0.001
x1[1] (analytic) = 3.0007347585515002608331851392094
x1[1] (numeric) = -1.9811485319227490376029446090389e+7877
absolute error = 1.9811485319227490376029446090389e+7877
relative error = 6.6022114293069980997936641255502e+7878 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2037.0MB, alloc=4.9MB, time=254.03
memory used=2040.8MB, alloc=4.9MB, time=254.33
NO POLE
NO POLE
t[1] = 0.897
x2[1] (analytic) = 2.0013250290111982295539186621371
x2[1] (numeric) = -1.4151348818134073207237308878763e+7895
absolute error = 1.4151348818134073207237308878763e+7895
relative error = 7.0709897757716448568708756959080e+7896 %
h = 0.001
x1[1] (analytic) = 3.0007340241602056071727166721245
x1[1] (numeric) = 1.5840916506347665132327132240930e+7897
absolute error = 1.5840916506347665132327132240930e+7897
relative error = 5.2790138608772403186748105792938e+7898 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2044.7MB, alloc=4.9MB, time=254.62
NO POLE
NO POLE
t[1] = 0.898
x2[1] (analytic) = 2.0013273145252765120743398728068
x2[1] (numeric) = 1.1315170542145127818698908901044e+7915
absolute error = 1.1315170542145127818698908901044e+7915
relative error = 5.6538330636980963660345035345015e+7916 %
h = 0.001
x1[1] (analytic) = 3.0007332905029351748865374338462
x1[1] (numeric) = -1.2666119259495411509555758474579e+7917
absolute error = 1.2666119259495411509555758474579e+7917
relative error = 4.2210080114692626038450719092500e+7918 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2048.5MB, alloc=4.9MB, time=254.90
NO POLE
NO POLE
t[1] = 0.899
x2[1] (analytic) = 2.0013296049819692612172821074908
x2[1] (numeric) = -9.0474120907656825342306195318289e+7934
absolute error = 9.0474120907656825342306195318289e+7934
relative error = 4.5207006723148904336364856190871e+7936 %
h = 0.001
x1[1] (analytic) = 3.0007325575789553066430770302881
x1[1] (numeric) = 1.0127607012603969833314655237860e+7937
absolute error = 1.0127607012603969833314655237860e+7937
relative error = 3.3750448659693632597205895266016e+7938 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2052.3MB, alloc=4.9MB, time=255.19
memory used=2056.1MB, alloc=4.9MB, time=255.48
NO POLE
NO POLE
t[1] = 0.9
x2[1] (analytic) = 2.0013319003908047689503112410625
x2[1] (numeric) = 7.2341521707736344793048553113510e+7954
absolute error = 7.2341521707736344793048553113510e+7954
relative error = 3.6146688959292582287822149441175e+7956 %
h = 0.001
x1[1] (analytic) = 3.0007318253875330784013902176314
x1[1] (numeric) = -8.0978571021153634608349880786108e+7956
absolute error = 8.0978571021153634608349880786108e+7956
relative error = 2.6986273926926329312638575072849e+7958 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2059.9MB, alloc=4.9MB, time=255.77
NO POLE
NO POLE
t[1] = 0.901
x2[1] (analytic) = 2.0013342007613307695396577495512
x2[1] (numeric) = -5.7843013123413448394734907384549e+7974
absolute error = 5.7843013123413448394734907384549e+7974
relative error = 2.8902225875822885816514633610366e+7976 %
h = 0.001
x1[1] (analytic) = 3.0007310939279362986782328003031
x1[1] (numeric) = 6.4749046408169994430900210423718e+7976
absolute error = 6.4749046408169994430900210423718e+7976
relative error = 2.1577757013679602797333390340619e+7978 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2063.7MB, alloc=4.9MB, time=256.05
NO POLE
NO POLE
t[1] = 0.902
x2[1] (analytic) = 2.0013365061031144781072623995407
x2[1] (numeric) = 4.6250259715473644219000334083172e+7994
absolute error = 4.6250259715473644219000334083172e+7994
relative error = 2.3109686739052918136137056884787e+7996 %
h = 0.001
x1[1] (analytic) = 3.0007303631994335078158700867156
x1[1] (numeric) = -5.1772202916153971075845240367735e+7996
absolute error = 5.1772202916153971075845240367735e+7996
relative error = 1.7253200604453344799993354059022e+7998 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2067.6MB, alloc=4.9MB, time=256.34
memory used=2071.4MB, alloc=4.9MB, time=256.63
NO POLE
NO POLE
t[1] = 0.903
x2[1] (analytic) = 2.0013388164257426292653794734752
x2[1] (numeric) = -3.6980897229278567589679436224083e+8014
absolute error = 3.6980897229278567589679436224083e+8014
relative error = 1.8478079236640189939582037114446e+8016 %
h = 0.001
x1[1] (analytic) = 3.0007296332012939772506171705773
x1[1] (numeric) = 4.1396146252019789781490907440320e+8016
absolute error = 4.1396146252019789781490907440320e+8016
relative error = 1.3795360233056647010681863036260e+8018 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2075.2MB, alloc=4.9MB, time=256.91
NO POLE
NO POLE
t[1] = 0.904
x2[1] (analytic) = 2.0013411317388215158288924350689
x2[1] (numeric) = 2.9569277411536756382203960924352e+8034
absolute error = 2.9569277411536756382203960924352e+8034
relative error = 1.4774731275245482887875824241978e+8036 %
h = 0.001
x1[1] (analytic) = 3.0007289039327877087821103063132
x1[1] (numeric) = -3.3099633162102159113652466100269e+8036
absolute error = 3.3099633162102159113652466100269e+8036
relative error = 1.1030530988228034335860553078685e+8038 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2079.0MB, alloc=4.9MB, time=257.20
NO POLE
NO POLE
t[1] = 0.905
x2[1] (analytic) = 2.0013434520519770276054972494966
x2[1] (numeric) = -2.3643076078429553587631257461677e+8054
absolute error = 2.3643076078429553587631257461677e+8054
relative error = 1.1813602534931379505446702740369e+8056 %
h = 0.001
x1[1] (analytic) = 3.0007281753931854338433086478683
x1[1] (numeric) = 2.6465886674469787127900181624222e+8056
absolute error = 2.6465886674469787127900181624222e+8056
relative error = 8.8198214325101145862831045191372e+8057 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2082.8MB, alloc=4.9MB, time=257.49
memory used=2086.6MB, alloc=4.9MB, time=257.78
NO POLE
NO POLE
t[1] = 0.906
x2[1] (analytic) = 2.0013457773748546902639088841506
x2[1] (numeric) = 1.8904589336779334239126110911138e+8074
absolute error = 1.8904589336779334239126110911138e+8074
relative error = 9.4459386031614665104350527459644e+8075 %
h = 0.001
x1[1] (analytic) = 3.0007274475817586127712256208943
x1[1] (numeric) = -2.1161659225512464055692941920429e+8076
absolute error = 2.1161659225512464055692941920429e+8076
relative error = 7.0521763789531531246913510299461e+8077 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2090.4MB, alloc=4.9MB, time=258.07
NO POLE
NO POLE
t[1] = 0.907
x2[1] (analytic) = 2.0013481077171197042802468274756
x2[1] (numeric) = -1.5115778370240283399732584778112e+8094
absolute error = 1.5115778370240283399732584778112e+8094
relative error = 7.5527981923556604905725732062348e+8095 %
h = 0.001
x1[1] (analytic) = 3.0007267204977794340783891990514
x1[1] (numeric) = 1.6920491902835076378852417289441e+8096
absolute error = 1.6920491902835076378852417289441e+8096
relative error = 5.6387980242426736845475085593157e+8097 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2094.3MB, alloc=4.9MB, time=258.36
NO POLE
NO POLE
t[1] = 0.908
x2[1] (analytic) = 2.0013504430884569839627557757455
x2[1] (numeric) = 1.2086311512395432325005021975431e+8114
absolute error = 1.2086311512395432325005021975431e+8114
relative error = 6.0390780405974275918543191135325e+8115 %
h = 0.001
x1[1] (analytic) = 3.0007259941405208137250303558853
x1[1] (numeric) = -1.3529328829222467979418007409002e+8116
absolute error = 1.3529328829222467979418007409002e+8116
relative error = 4.5086851833992890283926242377249e+8117 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2098.1MB, alloc=4.9MB, time=258.64
memory used=2101.9MB, alloc=4.9MB, time=258.93
NO POLE
NO POLE
t[1] = 0.909
x2[1] (analytic) = 2.0013527834985711965550179506235
x2[1] (numeric) = -9.6640028979427450547267700865901e+8133
absolute error = 9.6640028979427450547267700865901e+8133
relative error = 4.8287353322331661615341448246648e+8135 %
h = 0.001
x1[1] (analytic) = 3.0007252685092563943919989644679
x1[1] (numeric) = 1.0817814258612710098610228654367e+8136
absolute error = 1.0817814258612710098610228654367e+8136
relative error = 3.6050665391260360164873518474072e+8137 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2105.7MB, alloc=4.9MB, time=259.21
NO POLE
NO POLE
t[1] = 0.91
x2[1] (analytic) = 2.0013551289571868014178138239487
x2[1] (numeric) = 7.7271673757261836433813628609508e+8153
absolute error = 7.7271673757261836433813628609508e+8153
relative error = 3.8609676333417406288751745999960e+8155 %
h = 0.001
x1[1] (analytic) = 3.000724543603260544754406417717
x1[1] (numeric) = -8.6497347215833695100955710250414e+8155
absolute error = 8.6497347215833695100955710250414e+8155
relative error = 2.8825487297800401911423769488804e+8157 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2109.5MB, alloc=4.9MB, time=259.50
NO POLE
NO POLE
t[1] = 0.911
x2[1] (analytic) = 2.0013574794740480892897883404229
x2[1] (numeric) = -6.1785076311595313282582811789380e+8173
absolute error = 6.1785076311595313282582811789380e+8173
relative error = 3.0871584384730848821862416974510e+8175 %
h = 0.001
x1[1] (analytic) = 3.0007238194218083587559942430391
x1[1] (numeric) = 6.9161763148408569932724104758616e+8175
absolute error = 6.9161763148408569932724104758616e+8175
relative error = 2.3048360099242635094118078268720e+8177 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2113.3MB, alloc=4.9MB, time=259.78
memory used=2117.1MB, alloc=4.9MB, time=260.07
NO POLE
NO POLE
t[1] = 0.912
x2[1] (analytic) = 2.0013598350589192216270800437313
x2[1] (numeric) = 4.9402264364318951466148515029691e+8193
absolute error = 4.9402264364318951466148515029691e+8193
relative error = 2.4684348860665812674764098702189e+8195 %
h = 0.001
x1[1] (analytic) = 3.0007230959641756548842279856615
x1[1] (numeric) = -5.5300533898003220046452890670243e+8195
absolute error = 5.5300533898003220046452890670243e+8195
relative error = 1.8429069304121965336239820894906e+8197 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2121.0MB, alloc=4.9MB, time=260.35
NO POLE
NO POLE
t[1] = 0.913
x2[1] (analytic) = 2.0013621957215842700220708271181
x2[1] (numeric) = -3.9501184914196335785421209293736e+8213
absolute error = 3.9501184914196335785421209293736e+8213
relative error = 1.9737149526777345342942843929807e+8215 %
h = 0.001
x1[1] (analytic) = 3.0007223732296389754461156357498
x1[1] (numeric) = 4.4217337878474430072055558836960e+8215
absolute error = 4.4217337878474430072055558836960e+8215
relative error = 1.4735564433734626656470267885750e+8217 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2124.8MB, alloc=4.9MB, time=260.64
NO POLE
NO POLE
t[1] = 0.914
x2[1] (analytic) = 2.0013645614718472557014143455623
x2[1] (numeric) = 3.1584455281618602517844323818527e+8233
absolute error = 3.1584455281618602517844323818527e+8233
relative error = 1.5781460254492916348687607847590e+8235 %
h = 0.001
x1[1] (analytic) = 3.0007216512174755858447498751274
x1[1] (numeric) = -3.5355408551123709558249057316999e+8235
absolute error = 3.5355408551123709558249057316999e+8235
relative error = 1.1782301946193191425705134951525e+8237 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2128.6MB, alloc=4.9MB, time=260.92
memory used=2132.4MB, alloc=4.9MB, time=261.22
NO POLE
NO POLE
t[1] = 0.915
x2[1] (analytic) = 2.0013669323195321891035014434441
x2[1] (numeric) = -2.5254376991563248530822461553596e+8253
absolute error = 2.5254376991563248530822461553596e+8253
relative error = 1.2618564134211052863381213516564e+8255 %
h = 0.001
x1[1] (analytic) = 3.0007209299269634738565734201404
x1[1] (numeric) = 2.8269565147778605300642104224496e+8255
absolute error = 2.8269565147778605300642104224496e+8255
relative error = 9.4209244404699363012186985182226e+8256 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2136.2MB, alloc=4.9MB, time=261.50
NO POLE
NO POLE
t[1] = 0.916
x2[1] (analytic) = 2.0013693082744831095355212689898
x2[1] (numeric) = 2.0192957312237516100263145344030e+8273
absolute error = 2.0192957312237516100263145344030e+8273
relative error = 1.0089570789734574732480125668933e+8275 %
h = 0.001
x1[1] (analytic) = 3.0007202093573813489093667379328
x1[1] (numeric) = -2.2603848927071686661577017630154e+8275
absolute error = 2.2603848927071686661577017630154e+8275
relative error = 7.5328079094426499427842046132017e+8276 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2140.0MB, alloc=4.9MB, time=261.78
NO POLE
NO POLE
t[1] = 0.917
x2[1] (analytic) = 2.001371689346564124910277064794
x2[1] (numeric) = -1.6145934827458456396208631217385e+8293
absolute error = 1.6145934827458456396208631217385e+8293
relative error = 8.0674344068142622011177986113180e+8294 %
h = 0.001
x1[1] (analytic) = 3.0007194895080086413609574141192
x1[1] (numeric) = 1.8073641516839127316018942716363e+8295
absolute error = 1.8073641516839127316018942716363e+8295
relative error = 6.0231026525583175297980054197468e+8296 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2143.8MB, alloc=4.9MB, time=262.07
memory used=2147.7MB, alloc=4.9MB, time=262.36
NO POLE
NO POLE
t[1] = 0.918
x2[1] (analytic) = 2.0013740755456594515629159423831
x2[1] (numeric) = 1.2910006564246511873382325222401e+8313
absolute error = 1.2910006564246511873382325222401e+8313
relative error = 6.4505714958492687423713305216026e+8314 %
h = 0.001
x1[1] (analytic) = 3.0007187703781255017786504505652
x1[1] (numeric) = -1.4451367054041317278947103375876e+8315
absolute error = 1.4451367054041317278947103375876e+8315
relative error = 4.8159684928488905929823092572736e+8316 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2151.5MB, alloc=4.9MB, time=262.64
NO POLE
NO POLE
t[1] = 0.919
x2[1] (analytic) = 2.001376466881673454147732268077
x2[1] (numeric) = -1.0322615027867259272312879385875e+8333
absolute error = 1.0322615027867259272312879385875e+8333
relative error = 5.1577577725548218579518142190889e+8334 %
h = 0.001
x1[1] (analytic) = 3.0007180519670128002193787727045
x1[1] (numeric) = 1.1555059866383523044275439730196e+8335
absolute error = 1.1555059866383523044275439730196e+8335
relative error = 3.8507649390148531677600393255197e+8336 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2155.3MB, alloc=4.9MB, time=262.93
NO POLE
NO POLE
memory used=2159.1MB, alloc=4.9MB, time=263.22
t[1] = 0.92
x2[1] (analytic) = 2.0013788633645306856152046073395
x2[1] (numeric) = 8.2537820940116698330000832325550e+8352
absolute error = 8.2537820940116698330000832325550e+8352
relative error = 4.1240477977948585248749320677284e+8354 %
h = 0.001
x1[1] (analytic) = 3.0007173342739521255105732265448
x1[1] (numeric) = -9.2392233908672721931707827664932e+8354
absolute error = 9.2392233908672721931707827664932e+8354
relative error = 3.0790049050397401593367358711308e+8356 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2162.9MB, alloc=4.9MB, time=263.50
NO POLE
NO POLE
t[1] = 0.921
x2[1] (analytic) = 2.0013812650041759272694264953865
x2[1] (numeric) = -6.5995795320774311010011673489123e+8372
absolute error = 6.5995795320774311010011673489123e+8372
relative error = 3.2975123968014464895383600317223e+8374 %
h = 0.001
x1[1] (analytic) = 3.0007166172982257845317513462307
x1[1] (numeric) = 7.3875211252424030127850712246330e+8374
absolute error = 7.3875211252424030127850712246330e+8374
relative error = 2.4619189571769533411849610748955e+8376 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2166.7MB, alloc=4.9MB, time=263.79
NO POLE
NO POLE
t[1] = 0.922
x2[1] (analytic) = 2.0013836718105742289060916230294
x2[1] (numeric) = 5.2769081500001354174051415564961e+8392
absolute error = 5.2769081500001354174051415564961e+8392
relative error = 2.6366299597249742530203601024079e+8394 %
h = 0.001
x1[1] (analytic) = 3.0007159010391168014968241737537
x1[1] (numeric) = -5.9069324408639352238441510995760e+8394
absolute error = 5.9069324408639352238441510995760e+8394
relative error = 1.9685077280453060450527597342557e+8396 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2170.5MB, alloc=4.9MB, time=264.08
NO POLE
NO POLE
memory used=2174.4MB, alloc=4.9MB, time=264.37
t[1] = 0.923
x2[1] (analytic) = 2.0013860837937109490311943486005
x2[1] (numeric) = -4.2193232899448820253413360659073e+8412
absolute error = 4.2193232899448820253413360659073e+8412
relative error = 2.1082005736479282529732323499633e+8414 %
h = 0.001
x1[1] (analytic) = 3.0007151854959089172371204131149
x1[1] (numeric) = 4.7230796730595987105133541548794e+8414
absolute error = 4.7230796730595987105133541548794e+8414
relative error = 1.5739846606864975363146558649964e+8416 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2178.2MB, alloc=4.9MB, time=264.66
NO POLE
NO POLE
t[1] = 0.924
x2[1] (analytic) = 2.0013885009635917951606067692987
x2[1] (numeric) = 3.3736969678107522364898585636761e+8432
absolute error = 3.3736969678107522364898585636761e+8432
relative error = 1.6856782010021775146220077728600e+8434 %
h = 0.001
x1[1] (analytic) = 3.0007144706678865884851272019661
x1[1] (numeric) = -3.7764917444706920678313945278504e+8434
absolute error = 3.7764917444706920678313945278504e+8434
relative error = 1.2585308536970317570576480908093e+8436 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2182.0MB, alloc=4.9MB, time=264.94
NO POLE
NO POLE
t[1] = 0.925
x2[1] (analytic) = 2.001390923330242864200693908452
x2[1] (numeric) = -2.6975489784676222921902738346340e+8452
absolute error = 2.6975489784676222921902738346340e+8452
relative error = 1.3478371201858941883209836191883e+8454 %
h = 0.001
x1[1] (analytic) = 3.0007137565543349871589467844677
x1[1] (numeric) = 3.0196166237476311349670096785691e+8454
absolute error = 3.0196166237476311349670096785691e+8454
relative error = 1.0062994569715313220327839697159e+8456 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2185.8MB, alloc=4.9MB, time=265.23
memory used=2189.6MB, alloc=4.9MB, time=265.52
NO POLE
NO POLE
t[1] = 0.926
x2[1] (analytic) = 2.0013933509037106829101288989797
x2[1] (numeric) = 2.1569128942703260295668905781684e+8472
absolute error = 2.1569128942703260295668905781684e+8472
relative error = 1.0777056360741839844797100594825e+8474 %
h = 0.001
x1[1] (analytic) = 3.000713043154539999647468369822
x1[1] (numeric) = -2.4144325398733318906373983511337e+8474
absolute error = 2.4144325398733318906373983511337e+8474
relative error = 8.0461960379094668978355865742546e+8475 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2193.4MB, alloc=4.9MB, time=265.80
NO POLE
NO POLE
t[1] = 0.927
x2[1] (analytic) = 2.0013957836940622484430703677842
x2[1] (numeric) = -1.7246297548644988177994417145092e+8492
absolute error = 1.7246297548644988177994417145092e+8492
relative error = 8.6171349460988447191945027693060e+8493 %
h = 0.001
x1[1] (analytic) = 3.0007123304677882260962544616536
x1[1] (numeric) = 1.9305379509946677461267664677714e+8494
absolute error = 1.9305379509946677461267664677714e+8494
relative error = 6.4335988871472780099631218895705e+8495 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2197.3MB, alloc=4.9MB, time=266.08
NO POLE
NO POLE
t[1] = 0.928
x2[1] (analytic) = 2.0013982217113850689738645508947
x2[1] (numeric) = 1.3789837314548531261806794380685e+8512
absolute error = 1.3789837314548531261806794380685e+8512
relative error = 6.8901017123703218180862421897833e+8513 %
h = 0.001
x1[1] (analytic) = 3.0007116184933669796941409441208
x1[1] (numeric) = -1.5436243169694101860735329554920e+8514
absolute error = 1.5436243169694101860735329554920e+8514
relative error = 5.1441941553332321344577539109302e+8515 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2201.1MB, alloc=4.9MB, time=266.37
memory used=2204.9MB, alloc=4.9MB, time=266.66
NO POLE
NO POLE
t[1] = 0.929
x2[1] (analytic) = 2.001400664965787204403434994923
x2[1] (numeric) = -1.1026112278612261378297922737097e+8532
absolute error = 1.1026112278612261378297922737097e+8532
relative error = 5.5091978690837231429089765239796e+8533 %
h = 0.001
x1[1] (analytic) = 3.0007109072305642859605502113621
x1[1] (numeric) = 1.2342549550562342136038083310598e+8534
absolute error = 1.2342549550562342136038083310598e+8534
relative error = 4.1132084803042918255270114923741e+8535 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2208.7MB, alloc=4.9MB, time=266.94
NO POLE
NO POLE
t[1] = 0.93
x2[1] (analytic) = 2.0014031134673973071475230267897
x2[1] (numeric) = 8.8162861683872122082071645877430e+8551
absolute error = 8.8162861683872122082071645877430e+8551
relative error = 4.4050526898167677843238441569946e+8553 %
h = 0.001
x1[1] (analytic) = 3.0007101966786688820335166275864
x1[1] (numeric) = -9.8688863432245054368062854627468e+8553
absolute error = 9.8688863432245054368062854627468e+8553
relative error = 3.2888502042442705605137096481723e+8555 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2212.5MB, alloc=4.9MB, time=267.22
NO POLE
NO POLE
t[1] = 0.931
x2[1] (analytic) = 2.0014055672263646630069425007233
x2[1] (numeric) = -7.0493479332389243436505643488170e+8571
absolute error = 7.0493479332389243436505643488170e+8571
relative error = 3.5221986231447426763747418946641e+8573 %
h = 0.001
x1[1] (analytic) = 3.0007094868369702159584236058361
x1[1] (numeric) = 7.8909885884189717957616251610669e+8573
absolute error = 7.8909885884189717957616251610669e+8573
relative error = 2.6297076151603117387530356648458e+8575 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2216.3MB, alloc=4.9MB, time=267.51
memory used=2220.1MB, alloc=4.9MB, time=267.80
NO POLE
NO POLE
t[1] = 0.932
x2[1] (analytic) = 2.001408026252859232120012659239
x2[1] (numeric) = 5.6365350823169149821214123391908e+8591
absolute error = 5.6365350823169149821214123391908e+8591
relative error = 2.8162848396635696114335703958462e+8593 %
h = 0.001
x1[1] (analytic) = 3.0007087777047584459774515941576
x1[1] (numeric) = -6.3094962022040505387721050585830e+8593
absolute error = 6.3094962022040505387721050585830e+8593
relative error = 2.1026686258538500837696593560357e+8595 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2224.0MB, alloc=4.9MB, time=268.08
NO POLE
NO POLE
t[1] = 0.933
x2[1] (analytic) = 2.0014104905570716899973332731577
x2[1] (numeric) = -4.5068746833144218812885879253999e+8611
absolute error = 4.5068746833144218812885879253999e+8611
relative error = 2.2518492356158183331920484151140e+8613 %
h = 0.001
x1[1] (analytic) = 3.0007080692813244398197362586281
x1[1] (numeric) = 5.0449626025379369059231208722061e+8613
absolute error = 5.0449626025379369059231208722061e+8613
relative error = 1.6812573852764742619877369522803e+8615 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2227.8MB, alloc=4.9MB, time=268.37
NO POLE
NO POLE
t[1] = 0.934
x2[1] (analytic) = 2.0014129601492134686390665547424
x2[1] (numeric) = 3.6036180232113793451985764175379e+8631
absolute error = 3.6036180232113793451985764175379e+8631
relative error = 1.8005369681141242229057013628793e+8633 %
h = 0.001
x1[1] (analytic) = 3.0007073615659597739922361533973
x1[1] (numeric) = -4.0338636945554407498029235471962e+8633
absolute error = 4.0338636945554407498029235471962e+8633
relative error = 1.3443042617958968020874321876386e+8635 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2231.6MB, alloc=4.9MB, time=268.66
memory used=2235.4MB, alloc=4.9MB, time=268.95
NO POLE
NO POLE
t[1] = 0.935
x2[1] (analytic) = 2.0014154350395167977348906677
x2[1] (numeric) = -2.8813898254796265777347415062766e+8651
absolute error = 2.8813898254796265777347415062766e+8651
relative error = 1.4396760287914613745852413163455e+8653 %
h = 0.001
x1[1] (analytic) = 3.0007066545579567330713091686105
x1[1] (numeric) = 3.2254067251294571384109241735938e+8653
absolute error = 3.2254067251294571384109241735938e+8653
relative error = 1.0748823848643084571625497549593e+8655 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2239.2MB, alloc=4.9MB, time=269.24
NO POLE
NO POLE
t[1] = 0.936
x2[1] (analytic) = 2.001417915238234745946789988131
x2[1] (numeric) = 2.3039088141142072899645566162894e+8671
absolute error = 2.3039088141142072899645566162894e+8671
relative error = 1.1511382987895190044817878685452e+8673 %
h = 0.001
x1[1] (analytic) = 3.00070594825660830899499704779
x1[1] (numeric) = -2.5789786988964777877384650706275e+8673
absolute error = 2.5789786988964777877384650706275e+8673
relative error = 8.5945732216608846394170466604492e+8674 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2243.0MB, alloc=4.9MB, time=269.52
NO POLE
NO POLE
t[1] = 0.937
x2[1] (analytic) = 2.0014204007556412622748476014995
x2[1] (numeric) = -1.8421651165751519267173692897990e+8691
absolute error = 1.8421651165751519267173692897990e+8691
relative error = 9.2042886935680174642088429934866e+8692 %
h = 0.001
x1[1] (analytic) = 3.0007052426612082003560172669597
x1[1] (numeric) = 2.0621061764217705212727711664496e+8693
absolute error = 2.0621061764217705212727711664496e+8693
relative error = 6.8720717620134163814845683653393e+8694 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2246.8MB, alloc=4.9MB, time=269.81
memory used=2250.7MB, alloc=4.9MB, time=270.10
NO POLE
NO POLE
t[1] = 0.938
x2[1] (analytic) = 2.0014228916020312175062058523533
x2[1] (numeric) = 1.4729629471169339350078203163733e+8711
absolute error = 1.4729629471169339350078203163733e+8711
relative error = 7.3595787941543250632785035452149e+8712 %
h = 0.001
x1[1] (analytic) = 3.0007045377710508116954615685041
x1[1] (numeric) = -1.6488239645625332379536183562687e+8713
absolute error = 1.6488239645625332379536183562687e+8713
relative error = 5.4947894529705809925022804195248e+8714 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2254.5MB, alloc=4.9MB, time=270.38
NO POLE
NO POLE
t[1] = 0.939
x2[1] (analytic) = 2.0014253877877204457473610958425
x2[1] (numeric) = -1.1777553619151342405689775710168e+8731
absolute error = 1.1777553619151342405689775710168e+8731
relative error = 5.8845829032725945621706992158706e+8732 %
h = 0.001
x1[1] (analytic) = 3.0007038335854312527972004434604
x1[1] (numeric) = 1.3183707498675664431368768033192e+8733
absolute error = 1.3183707498675664431368768033192e+8733
relative error = 4.3935383929319457585343179457229e+8734 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2258.3MB, alloc=4.9MB, time=270.66
NO POLE
NO POLE
t[1] = 0.94
x2[1] (analytic) = 2.0014278893230457860399591330697
x2[1] (numeric) = 9.4171254968420511360371859104022e+8750
absolute error = 9.4171254968420511360371859104022e+8750
relative error = 4.7052034935054584796983176884374e+8752 %
h = 0.001
x1[1] (analytic) = 3.0007031301036453379829928566483
x1[1] (numeric) = -1.0541461498999520834623019248478e+8753
absolute error = 1.0541461498999520834623019248478e+8753
relative error = 3.5129971349866306365448568504479e+8754 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2262.1MB, alloc=4.9MB, time=270.95
memory used=2265.9MB, alloc=4.9MB, time=271.24
NO POLE
NO POLE
t[1] = 0.941
x2[1] (analytic) = 2.0014303962183651240602581459522
x2[1] (numeric) = -7.5297685318169533163931161913833e+8770
absolute error = 7.5297685318169533163931161913833e+8770
relative error = 3.7621935521935689911594928222813e+8772 %
h = 0.001
x1[1] (analytic) = 3.0007024273249895854083005097463
x1[1] (numeric) = 8.4287678975016505729251296976777e+8772
absolute error = 8.4287678975016505729251296976777e+8772
relative error = 2.8089316090618061988376773002639e+8774 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2269.7MB, alloc=4.9MB, time=271.53
NO POLE
NO POLE
t[1] = 0.942
x2[1] (analytic) = 2.0014329084840574339024262815997
x2[1] (numeric) = 6.0206709745722097228350154848978e+8790
absolute error = 6.0206709745722097228350154848978e+8790
relative error = 3.0081802637753359572700712997813e+8792 %
h = 0.001
x1[1] (analytic) = 3.0007017252487612163588059381308
x1[1] (numeric) = -6.7394951142872475078927129172641e+8792
absolute error = 6.7394951142872475078927129172641e+8792
relative error = 2.2459730194371573294804786264265e+8794 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2273.5MB, alloc=4.9MB, time=271.81
NO POLE
NO POLE
t[1] = 0.943
x2[1] (analytic) = 2.0014354261305228199458413711908
x2[1] (numeric) = -4.8140230115824591674223249230775e+8810
absolute error = 4.8140230115824591674223249230775e+8810
relative error = 2.4052852011766651722046346025837e+8812 %
h = 0.001
x1[1] (analytic) = 3.0007010238742581545476337379927
x1[1] (numeric) = 5.3887821978067209875962325648369e+8812
absolute error = 5.3887821978067209875962325648369e+8812
relative error = 1.7958410901093935043112701910392e+8814 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2277.4MB, alloc=4.9MB, time=272.10
memory used=2281.2MB, alloc=4.9MB, time=272.39
NO POLE
NO POLE
t[1] = 0.944
x2[1] (analytic) = 2.0014379491681825588065606039963
x2[1] (numeric) = 3.8492084443614864269337364523178e+8830
absolute error = 3.8492084443614864269337364523178e+8830
relative error = 1.9232214748207685344266710185787e+8832 %
h = 0.001
x1[1] (analytic) = 3.0007003232007790254132742209564
x1[1] (numeric) = -4.3087758182119737175330929415268e+8832
absolute error = 4.3087758182119737175330929415268e+8832
relative error = 1.4359234025795352361133002238533e+8834 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2285.0MB, alloc=4.9MB, time=272.67
NO POLE
NO POLE
t[1] = 0.945
x2[1] (analytic) = 2.0014404776074791413731283135198
x2[1] (numeric) = -3.0777596227720036219441114636218e+8850
absolute error = 3.0777596227720036219441114636218e+8850
relative error = 1.5377722481415764117254042190106e+8852 %
h = 0.001
x1[1] (analytic) = 3.0006996232276231554182087941221
x1[1] (numeric) = 3.4452216419443702699131307087921e+8852
absolute error = 3.4452216419443702699131307087921e+8852
relative error = 1.1481394589701080331699030739576e+8854 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2288.8MB, alloc=4.9MB, time=272.96
NO POLE
NO POLE
memory used=2292.6MB, alloc=4.9MB, time=273.24
t[1] = 0.946
x2[1] (analytic) = 2.0014430114588763149268903697304
x2[1] (numeric) = 2.4609226630585859474128714499731e+8870
absolute error = 2.4609226630585859474128714499731e+8870
relative error = 1.2295741867088133021473789732802e+8872 %
h = 0.001
x1[1] (analytic) = 3.0006989239540905713482363641574
x1[1] (numeric) = -2.7547388545843186005589954970077e+8872
absolute error = 2.7547388545843186005589954970077e+8872
relative error = 9.1803240658157577418752032560606e+8873 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2296.4MB, alloc=4.9MB, time=273.53
NO POLE
NO POLE
t[1] = 0.947
x2[1] (analytic) = 2.0014455507328591253469840090406
x2[1] (numeric) = -1.9677106388512763458158099979301e+8890
absolute error = 1.9677106388512763458158099979301e+8890
relative error = 9.8314472663559084151160205244992e+8891 %
h = 0.001
x1[1] (analytic) = 3.0006982253794819996125000647655
x1[1] (numeric) = 2.2026409170800907038382147565994e+8892
absolute error = 2.2026409170800907038382147565994e+8892
relative error = 7.3404279658996188315041389321836e+8893 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2300.3MB, alloc=4.9MB, time=273.81
NO POLE
NO POLE
t[1] = 0.948
x2[1] (analytic) = 2.0014480954399339594001722720276
x2[1] (numeric) = 1.5733469468058298207138642859359e+8910
absolute error = 1.5733469468058298207138642859359e+8910
relative error = 7.8610429637946511178755284716589e+8911 %
h = 0.001
x1[1] (analytic) = 3.0006975275030988655442136075553
x1[1] (numeric) = -1.7611930806150836450640864439942e+8912
absolute error = 1.7611930806150836450640864439942e+8912
relative error = 5.8692789408887358588865854295357e+8913 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2304.1MB, alloc=4.9MB, time=274.11
NO POLE
NO POLE
memory used=2307.9MB, alloc=4.9MB, time=274.40
t[1] = 0.949
x2[1] (analytic) = 2.0014506455906285871156925579331
x2[1] (numeric) = -1.2580206490464191261845809546574e+8930
absolute error = 1.2580206490464191261845809546574e+8930
relative error = 6.2855441967452408368875502628172e+8931 %
h = 0.001
x1[1] (analytic) = 3.0006968303242432927020865570406
x1[1] (numeric) = 1.4082191260290944908621764541592e+8932
absolute error = 1.4082191260290944908621764541592e+8932
relative error = 4.6929736846388709213753571587410e+8933 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2311.7MB, alloc=4.9MB, time=274.69
NO POLE
NO POLE
t[1] = 0.95
x2[1] (analytic) = 2.0014532011954922042452891446777
x2[1] (numeric) = 1.0058912667928466302322565793393e+8950
absolute error = 1.0058912667928466302322565793393e+8950
relative error = 5.0258045813512682211389532078150e+8951 %
h = 0.001
x1[1] (analytic) = 3.0006961338422181021724478311933
x1[1] (numeric) = -1.1259873370735537510767071127345e+8952
absolute error = 1.1259873370735537510767071127345e+8952
relative error = 3.7524203946362006150668713865576e+8953 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2315.5MB, alloc=4.9MB, time=274.97
NO POLE
NO POLE
t[1] = 0.951
x2[1] (analytic) = 2.0014557622650954748085998635152
x2[1] (numeric) = -8.0429303078377625119537406283212e+8969
absolute error = 8.0429303078377625119537406283212e+8969
relative error = 4.0185401343746840740786101151495e+8971 %
h = 0.001
x1[1] (analytic) = 3.0006954380563268118720667296741
x1[1] (numeric) = 9.0031974414740224813472755350036e+8971
absolute error = 9.0031974414740224813472755350036e+8971
relative error = 3.0003702899304441800800395311479e+8973 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2319.3MB, alloc=4.9MB, time=275.25
memory used=2323.1MB, alloc=4.9MB, time=275.54
NO POLE
NO POLE
t[1] = 0.952
x2[1] (analytic) = 2.0014583288100305737240674585201
x2[1] (numeric) = 6.4309861385899923256824415547507e+8989
absolute error = 6.4309861385899923256824415547507e+8989
relative error = 3.2131501545743112081977038341954e+8991 %
h = 0.001
x1[1] (analytic) = 3.0006947429658736358516707925618
x1[1] (numeric) = -7.1987989119694156765713730199015e+8991
absolute error = 7.1987989119694156765713730199015e+8991
relative error = 2.3990440643269678724259633380519e+8993 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2327.0MB, alloc=4.9MB, time=275.82
NO POLE
NO POLE
t[1] = 0.953
x2[1] (analytic) = 2.0014609008409112295255465028528
x2[1] (numeric) = -5.1421038268147159467422173826874e+9009
absolute error = 5.1421038268147159467422173826874e+9009
relative error = 2.5691752582597379851149765854592e+9011 %
h = 0.001
x1[1] (analytic) = 3.0006940485701634836001597930982
x1[1] (numeric) = 5.7560334660935215726144612602153e+9011
absolute error = 5.7560334660935215726144612602153e+9011
relative error = 1.9182340395003891347381087173860e+9013 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2330.8MB, alloc=4.9MB, time=276.11
NO POLE
NO POLE
t[1] = 0.954
x2[1] (analytic) = 2.0014634783683727671647770861773
x2[1] (numeric) = 4.1115361152900640097086712984822e+9029
absolute error = 4.1115361152900640097086712984822e+9029
relative error = 2.0542648715438257797121176619713e+9031 %
h = 0.001
x1[1] (analytic) = 3.0006933548685019593495151686641
x1[1] (numeric) = -4.6024234970225768918270311393142e+9031
absolute error = 4.6024234970225768918270311393142e+9031
relative error = 1.5337866795203626646348113565693e+9033 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2334.6MB, alloc=4.9MB, time=276.40
memory used=2338.4MB, alloc=4.9MB, time=276.69
NO POLE
NO POLE
t[1] = 0.955
x2[1] (analytic) = 2.0014660614030721508998968307328
x2[1] (numeric) = -3.2875122317018967730124420344371e+9049
absolute error = 3.2875122317018967730124420344371e+9049
relative error = 1.6425520747512839166136396976481e+9051 %
h = 0.001
x1[1] (analytic) = 3.0006926618601953613804041948942
x1[1] (numeric) = 3.6800171803590005134819018475921e+9051
absolute error = 3.6800171803590005134819018475921e+9051
relative error = 1.2263892357698761944703524809615e+9053 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2342.2MB, alloc=4.9MB, time=276.97
NO POLE
NO POLE
t[1] = 0.956
x2[1] (analytic) = 2.001468649955688027270163137359
x2[1] (numeric) = 2.6286371736824967121031145018144e+9069
absolute error = 2.6286371736824967121031145018144e+9069
relative error = 1.3133541580782162267395466180956e+9071 %
h = 0.001
x1[1] (analytic) = 3.000691969544550681328478208536
x1[1] (numeric) = -2.9424772527991846648555764691826e+9071
absolute error = 2.9424772527991846648555764691826e+9071
relative error = 9.8059956925395380404936314655937e+9072 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2346.0MB, alloc=4.9MB, time=277.25
NO POLE
NO POLE
t[1] = 0.957
x2[1] (analytic) = 2.0014712440369207681570579072741
x2[1] (numeric) = -2.1018122226996055755948583776346e+9089
absolute error = 2.1018122226996055755948583776346e+9089
relative error = 1.0501336099440026908766227441024e+9091 %
h = 0.001
x1[1] (analytic) = 3.0006912779208756034913641853505
x1[1] (numeric) = 2.3527532505693349161368987046515e+9091
absolute error = 2.3527532505693349161368987046515e+9091
relative error = 7.8407041333472827004107608775864e+9092 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2349.8MB, alloc=4.9MB, time=277.54
memory used=2353.7MB, alloc=4.9MB, time=277.83
NO POLE
NO POLE
t[1] = 0.958
x2[1] (analytic) = 2.0014738436574925139319473305855
x2[1] (numeric) = 1.6805722234007497870440607676722e+9109
absolute error = 1.6805722234007497870440607676722e+9109
relative error = 8.3966734250679627550481549135212e+9110 %
h = 0.001
x1[1] (analytic) = 3.000690586988478504136348980046
x1[1] (numeric) = -1.8812202720679280399178258583264e+9111
absolute error = 1.8812202720679280399178258583264e+9111
relative error = 6.2692910766115960127099446712700e+9112 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2357.5MB, alloc=4.9MB, time=278.11
NO POLE
NO POLE
t[1] = 0.959
x2[1] (analytic) = 2.0014764488281472166904696783888
x2[1] (numeric) = -1.3437561013126701617407735107891e+9129
absolute error = 1.3437561013126701617407735107891e+9129
relative error = 6.7138241976288630276164340634946e+9130 %
h = 0.001
x1[1] (analytic) = 3.0006898967466684508087555359296
x1[1] (numeric) = 1.5041907650889190663619720511865e+9131
absolute error = 1.5041907650889190663619720511865e+9131
relative error = 5.0128164417114692670323036136868e+9132 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2361.3MB, alloc=4.9MB, time=278.40
NO POLE
NO POLE
t[1] = 0.96
x2[1] (analytic) = 2.0014790595596506835738243818754
x2[1] (numeric) = 1.0744438320901867834075572858643e+9149
absolute error = 1.0744438320901867834075572858643e+9149
relative error = 5.3682491803165668348453021739352e+9150 %
h = 0.001
x1[1] (analytic) = 3.000689207194755201641010372653
x1[1] (numeric) = -1.2027245779632386285352927991967e+9151
absolute error = 1.2027245779632386285352927991967e+9151
relative error = 4.0081611087195062718851592314911e+9152 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2365.1MB, alloc=4.9MB, time=278.68
memory used=2368.9MB, alloc=4.9MB, time=278.97
NO POLE
NO POLE
t[1] = 0.961
x2[1] (analytic) = 2.0014816758627906201771360291279
x2[1] (numeric) = -8.5910646075498527860575544592687e+9168
absolute error = 8.5910646075498527860575544592687e+9168
relative error = 4.2923523663270369067433269954609e+9170 %
h = 0.001
x1[1] (analytic) = 3.0006885183320492046624016611179
x1[1] (numeric) = 9.6167749730290293920045237995540e+9170
absolute error = 9.6167749730290293920045237995540e+9170
relative error = 3.2048561236121140998419662323711e+9172 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2372.7MB, alloc=4.9MB, time=279.25
NO POLE
NO POLE
t[1] = 0.962
x2[1] (analytic) = 2.0014842977483766740450672582412
x2[1] (numeric) = 6.8692647197308809320379345642340e+9188
absolute error = 6.8692647197308809320379345642340e+9188
relative error = 3.4320852416672187330380341835280e+9190 %
h = 0.001
x1[1] (analytic) = 3.0006878301578615971095271953025
x1[1] (numeric) = -7.6894047545359316366495401420781e+9190
absolute error = 7.6894047545359316366495401420781e+9190
relative error = 2.5625473857210277730458803085011e+9192 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2376.5MB, alloc=4.9MB, time=279.54
NO POLE
NO POLE
t[1] = 0.963
x2[1] (analytic) = 2.0014869252272404782548548740524
x2[1] (numeric) = -5.4925437003781209843501353639508e+9208
absolute error = 5.4925437003781209843501353639508e+9208
relative error = 2.7442316165790193604970092306181e+9210 %
h = 0.001
x1[1] (analytic) = 3.0006871426715042047374315714535
x1[1] (numeric) = 6.1483133009668801021919031484767e+9210
absolute error = 6.1483133009668801021919031484767e+9210
relative error = 2.0489684557694516120829081447744e+9212 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2380.4MB, alloc=4.9MB, time=279.83
memory used=2384.2MB, alloc=4.9MB, time=280.12
NO POLE
NO POLE
t[1] = 0.964
x2[1] (analytic) = 2.0014895583102356950869438651145
x2[1] (numeric) = 4.3917416974644243282787636817850e+9228
absolute error = 4.3917416974644243282787636817850e+9228
relative error = 2.1942366270310033778885041522503e+9230 %
h = 0.001
x1[1] (analytic) = 3.0006864558722895411314318857828
x1[1] (numeric) = -4.9160835791024311146704187067576e+9230
absolute error = 4.9160835791024311146704187067576e+9230
relative error = 1.6383196483197182360764189954220e+9232 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2388.0MB, alloc=4.9MB, time=280.40
NO POLE
NO POLE
t[1] = 0.965
x2[1] (analytic) = 2.0014921970082380597833943475958
x2[1] (numeric) = -3.5115597051908587950043577600889e+9248
absolute error = 3.5115597051908587950043577600889e+9248
relative error = 1.7544708445228104775364040442014e+9250 %
h = 0.001
x1[1] (analytic) = 3.0006857697595308070196312624942
x1[1] (numeric) = 3.9308142857521497748536795575134e+9250
absolute error = 3.9308142857521497748536795575134e+9250
relative error = 1.3099719821936429152455636283536e+9252 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2391.8MB, alloc=4.9MB, time=280.69
NO POLE
NO POLE
t[1] = 0.966
x2[1] (analytic) = 2.0014948413321454243942368135349
x2[1] (numeric) = 2.8077816075201904220221518591173e+9268
absolute error = 2.8077816075201904220221518591173e+9268
relative error = 1.4028422904409788454235889379710e+9270 %
h = 0.001
x1[1] (analytic) = 3.0006850843325418895861195246536
x1[1] (numeric) = -3.1430102235760303260403680299945e+9270
absolute error = 3.1430102235760303260403680299945e+9270
relative error = 1.0474308816965198342786683806137e+9272 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2395.6MB, alloc=4.9MB, time=280.97
memory used=2399.4MB, alloc=4.9MB, time=281.27
NO POLE
NO POLE
t[1] = 0.967
x2[1] (analytic) = 2.0014974912928778017119514123283
x2[1] (numeric) = -2.2450529728641411615501859921528e+9288
absolute error = 2.2450529728641411615501859921528e+9288
relative error = 1.1216866284523481561533328205285e+9290 %
h = 0.001
x1[1] (analytic) = 3.000684399590637361784860321102
x1[1] (numeric) = 2.5130959000809735840537175455775e+9290
absolute error = 2.5130959000809735840537175455775e+9290
relative error = 8.3750757008095149642101876272104e+9291 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2403.2MB, alloc=4.9MB, time=281.55
NO POLE
NO POLE
t[1] = 0.968
x2[1] (analytic) = 2.0015001469013774092942473464862
x2[1] (numeric) = 1.7951050172373045658274869791446e+9308
absolute error = 1.7951050172373045658274869791446e+9308
relative error = 8.9687978290503576643963874619771e+9309 %
h = 0.001
x1[1] (analytic) = 3.0006837155331324816542640233009
x1[1] (numeric) = -2.0094274449473553678372728015374e+9310
absolute error = 2.0094274449473553678372728015374e+9310
relative error = 6.6965653012528170436503267057450e+9311 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2407.1MB, alloc=4.9MB, time=281.84
NO POLE
NO POLE
t[1] = 0.969
x2[1] (analytic) = 2.0015028081686087135753188155439
x2[1] (numeric) = -1.4353345163163534861401402304018e+9328
absolute error = 1.4353345163163534861401402304018e+9328
relative error = 7.1712840494572985296252475730818e+9329 %
h = 0.001
x1[1] (analytic) = 3.0006830321593431916324457066804
x1[1] (numeric) = 1.6067029739603476291103764955280e+9330
absolute error = 1.6067029739603476291103764955280e+9330
relative error = 5.3544574909804335325180341493236e+9331 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2410.9MB, alloc=4.9MB, time=282.13
memory used=2414.7MB, alloc=4.9MB, time=282.41
NO POLE
NO POLE
t[1] = 0.97
x2[1] (analytic) = 2.0015054751055584740657542955835
x2[1] (numeric) = 1.1476683280066580514917269577941e+9348
absolute error = 1.1476683280066580514917269577941e+9348
relative error = 5.7340254237682290331631769275675e+9349 %
h = 0.001
x1[1] (analytic) = 3.0006823494685861178731675317499
x1[1] (numeric) = -1.2846915438644551932562384441397e+9350
absolute error = 1.2846915438644551932562384441397e+9350
relative error = 4.2813313581558244078288777465643e+9351 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2418.5MB, alloc=4.9MB, time=282.70
NO POLE
NO POLE
t[1] = 0.971
x2[1] (analytic) = 2.001508147723235787641276296091
x2[1] (numeric) = -9.1765548458342413471436003754956e+9367
absolute error = 9.1765548458342413471436003754956e+9367
relative error = 4.5848201298969458300706102786822e+9369 %
h = 0.001
x1[1] (analytic) = 3.000681667460178569562464840912
x1[1] (numeric) = 1.0272168469376151072609908767618e+9370
absolute error = 1.0272168469376151072609908767618e+9370
relative error = 3.4232783106482157063818931616966e+9371 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2422.3MB, alloc=4.9MB, time=282.98
NO POLE
NO POLE
t[1] = 0.972
memory used=2426.1MB, alloc=4.9MB, time=283.27
x2[1] (analytic) = 2.0015108260326721329204890908537
x2[1] (numeric) = 7.3374124547693685486419464006699e+9387
absolute error = 7.3374124547693685486419464006699e+9387
relative error = 3.6659369309100077632840766829040e+9389 %
h = 0.001
x1[1] (analytic) = 3.0006809861334385382359552876071
x1[1] (numeric) = -8.2134459098127665205437563634176e+9389
absolute error = 8.2134459098127665205437563634176e+9389
relative error = 2.7371939728908987587835929348704e+9391 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2430.0MB, alloc=4.9MB, time=283.56
NO POLE
NO POLE
t[1] = 0.973
x2[1] (analytic) = 2.0015135100449214147318122752937
x2[1] (numeric) = -5.8668664260035017866112749418070e+9407
absolute error = 5.8668664260035017866112749418070e+9407
relative error = 2.9312150013275840750475518241470e+9409 %
h = 0.001
x1[1] (analytic) = 3.0006803054876846970968303150973
x1[1] (numeric) = 6.5673274259993794823786015433172e+9409
absolute error = 6.5673274259993794823786015433172e+9409
relative error = 2.1886128335594306157123043208368e+9411 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2433.8MB, alloc=4.9MB, time=283.85
NO POLE
NO POLE
t[1] = 0.974
x2[1] (analytic) = 2.0015161997710600086697783590357
x2[1] (numeric) = 4.6910435896504341592265574847802e+9427
absolute error = 4.6910435896504341592265574847802e+9427
relative error = 2.3437450020074836864505024253382e+9429 %
h = 0.001
x1[1] (analytic) = 3.00067962552223640033452830288
x1[1] (numeric) = -5.2511199311309302391158039748538e+9429
absolute error = 5.2511199311309302391158039748538e+9429
relative error = 1.7499768673961748312994698544854e+9431 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2437.6MB, alloc=4.9MB, time=284.13
NO POLE
NO POLE
memory used=2441.4MB, alloc=4.9MB, time=284.42
t[1] = 0.975
x2[1] (analytic) = 2.0015188952221868057408729596211
x2[1] (numeric) = -3.7508762535421828501998618436929e+9447
absolute error = 3.7508762535421828501998618436929e+9447
relative error = 1.8740149106240645623770308744732e+9449 %
h = 0.001
x1[1] (analytic) = 3.0006789462364136824440886994064
x1[1] (numeric) = 4.1987034820217460719763346268715e+9449
absolute error = 4.1987034820217460719763346268715e+9449
relative error = 1.3992511552386997531532013500731e+9451 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2445.2MB, alloc=4.9MB, time=284.71
NO POLE
NO POLE
t[1] = 0.976
x2[1] (analytic) = 2.0015215964094232570990965211144
x2[1] (numeric) = 2.9991349260591792297781380811465e+9467
absolute error = 2.9991349260591792297781380811465e+9467
relative error = 1.4984274621065283662898585121338e+9469 %
h = 0.001
x1[1] (analytic) = 3.0006782676295372575461864604568
x1[1] (numeric) = -3.3572097307144849264060427240562e+9469
absolute error = 3.3572097307144849264060427240562e+9469
relative error = 1.1188169577962114680450172758869e+9471 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2449.0MB, alloc=4.9MB, time=284.99
NO POLE
NO POLE
t[1] = 0.977
x2[1] (analytic) = 2.0015243033439134188714268398884
x2[1] (numeric) = -2.3980557333006245070136245147784e+9487
absolute error = 2.3980557333006245070136245147784e+9487
relative error = 1.1981147215121158471080554747560e+9489 %
h = 0.001
x1[1] (analytic) = 3.0006775897009285187078461132086
x1[1] (numeric) = 2.6843660725898457185747322442875e+9489
absolute error = 2.6843660725898457185747322442875e+9489
relative error = 8.9458663663275835946662203816846e+9490 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2452.8MB, alloc=4.9MB, time=285.27
memory used=2456.7MB, alloc=4.9MB, time=285.56
NO POLE
NO POLE
t[1] = 0.978
x2[1] (analytic) = 2.0015270160368239970733620391432
x2[1] (numeric) = 1.9174433434284653833982601440849e+9507
absolute error = 1.9174433434284653833982601440849e+9507
relative error = 9.5799023848558852210864059125393e+9508 %
h = 0.001
x1[1] (analytic) = 3.0006769124499095372638347667101
x1[1] (numeric) = -2.1463720737333506895678818561617e+9509
absolute error = 2.1463720737333506895678818561617e+9509
relative error = 7.1529596033081092172203723234854e+9510 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2460.5MB, alloc=4.9MB, time=285.85
NO POLE
NO POLE
t[1] = 0.979
x2[1] (analytic) = 2.0015297344993443926147239936939
x2[1] (numeric) = -1.5331540982151260737348407199664e+9527
absolute error = 1.5331540982151260737348407199664e+9527
relative error = 7.6599116754996589994518648424284e+9528 %
h = 0.001
x1[1] (analytic) = 3.0006762358758030621387333901535
x1[1] (numeric) = 1.7162014994690001813106159581277e+9529
absolute error = 1.7162014994690001813106159581277e+9529
relative error = 5.7193824476971435579988445797701e+9530 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2464.3MB, alloc=4.9MB, time=286.14
NO POLE
NO POLE
t[1] = 0.98
x2[1] (analytic) = 2.0015324587426867463959025672641
x2[1] (numeric) = 1.2258831516090266832760818494183e+9547
absolute error = 1.2258831516090266832760818494183e+9547
relative error = 6.1247228155325355070091038987800e+9548 %
h = 0.001
x1[1] (analytic) = 3.0006755599779325191696856810185
x1[1] (numeric) = -1.3722446461281869614220996374017e+9549
absolute error = 1.3722446461281869614220996374017e+9549
relative error = 4.5731190150336635628878177168233e+9550 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2468.1MB, alloc=4.9MB, time=286.42
memory used=2471.9MB, alloc=4.9MB, time=286.71
NO POLE
NO POLE
t[1] = 0.981
x2[1] (analytic) = 2.0015351887780859844947213859507
x2[1] (numeric) = -9.8019468698443544579647672368133e+9566
absolute error = 9.8019468698443544579647672368133e+9566
relative error = 4.8972143606569961541297073723698e+9568 %
h = 0.001
x1[1] (analytic) = 3.0006748847556220104298238458346
x1[1] (numeric) = 1.0972227733224205623345917646105e+9569
absolute error = 1.0972227733224205623345917646105e+9569
relative error = 3.6565866528781890738774350987550e+9570 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2475.7MB, alloc=4.9MB, time=287.00
NO POLE
NO POLE
t[1] = 0.982
x2[1] (analytic) = 2.0015379246167998634441062336668
x2[1] (numeric) = 7.8374649584786801057283613969887e+9586
absolute error = 7.8374649584786801057283613969887e+9586
relative error = 3.9157214370440595549137474344753e+9588 %
h = 0.001
x1[1] (analytic) = 3.0006742102081963135523706169887
x1[1] (numeric) = -8.7732010301090502331493441033926e+9588
absolute error = 8.7732010301090502331493441033926e+9588
relative error = 2.9237432708498993172553860202914e+9590 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2479.5MB, alloc=4.9MB, time=287.29
NO POLE
NO POLE
t[1] = 0.983
x2[1] (analytic) = 2.0015406662701090156007375182498
x2[1] (numeric) = -6.2666996455936312106142941643006e+9606
absolute error = 6.2666996455936312106142941643006e+9606
relative error = 3.1309379575443193323532574941867e+9608 %
h = 0.001
x1[1] (analytic) = 3.000673536334980881055416829679
x1[1] (numeric) = 7.0148978116487769219926740642959e+9608
absolute error = 7.0148978116487769219926740642959e+9608
relative error = 2.3377744118797957732221527359352e+9610 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2483.4MB, alloc=4.9MB, time=287.57
memory used=2487.2MB, alloc=4.9MB, time=287.87
NO POLE
NO POLE
t[1] = 0.984
x2[1] (analytic) = 2.0015434137493169946048686205123
x2[1] (numeric) = 5.0107432257925254409650907219707e+9626
absolute error = 5.0107432257925254409650907219707e+9626
relative error = 2.5034396912762119216264331252617e+9628 %
h = 0.001
x1[1] (analytic) = 3.0006728631353018396673738837939
x1[1] (numeric) = -5.6089893687598695937841640235833e+9628
absolute error = 5.6089893687598695937841640235833e+9628
relative error = 1.8692438744886124758408511080564e+9630 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2491.0MB, alloc=4.9MB, time=288.15
NO POLE
NO POLE
t[1] = 0.985
x2[1] (analytic) = 2.0015461670657503209314923028486
x2[1] (numeric) = -4.0065024805329247075622523370181e+9646
absolute error = 4.0065024805329247075622523370181e+9646
relative error = 2.0017037560549619054536976926990e+9648 %
h = 0.001
x1[1] (analytic) = 3.0006721906084859896531004161669
x1[1] (numeric) = 4.4848496134353130125699154090157e+9648
absolute error = 4.4848496134353130125699154090157e+9648
relative error = 1.4946149824269410567761841698564e+9650 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2494.8MB, alloc=4.9MB, time=288.44
NO POLE
NO POLE
t[1] = 0.986
x2[1] (analytic) = 2.0015489262307585275330377190544
x2[1] (numeric) = 3.2035291778451888943023204630054e+9666
absolute error = 3.2035291778451888943023204630054e+9666
relative error = 1.6005250413128567672540677488895e+9668 %
h = 0.001
x1[1] (analytic) = 3.0006715187538608041407025093357
x1[1] (numeric) = -3.5860071632793971726133209624307e+9668
absolute error = 3.5860071632793971726133209624307e+9668
relative error = 1.1950682175197298903914551717237e+9670 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2498.6MB, alloc=4.9MB, time=288.72
memory used=2502.4MB, alloc=4.9MB, time=289.01
NO POLE
NO POLE
t[1] = 0.987
x2[1] (analytic) = 2.0015516912557142055737809328136
x2[1] (numeric) = -2.5614857954463047848154493853521e+9686
absolute error = 2.5614857954463047848154493853521e+9686
relative error = 1.2797500092737072998535837172531e+9688 %
h = 0.001
x1[1] (analytic) = 3.0006708475707544284490067636039
x1[1] (numeric) = 2.8673084904715560630215998994776e+9688
absolute error = 2.8673084904715560630215998994776e+9688
relative error = 9.5555581939046590386468742799647e+9689 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2506.2MB, alloc=4.9MB, time=289.29
NO POLE
NO POLE
t[1] = 0.988
x2[1] (analytic) = 2.0015544621520130502561522188153
x2[1] (numeric) = 2.0481191573496136109298430541817e+9706
absolute error = 2.0481191573496136109298430541817e+9706
relative error = 1.0232642658883913440342980356233e+9708 %
h = 0.001
x1[1] (analytic) = 3.00067017705849567941570555988
x1[1] (numeric) = -2.2926496253877431764409604692036e+9708
absolute error = 2.2926496253877431764409604692036e+9708
relative error = 7.6404585979362362782185092623867e+9709 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2510.1MB, alloc=4.9MB, time=289.58
NO POLE
NO POLE
t[1] = 0.989
x2[1] (analytic) = 2.0015572389310739067391237877214
x2[1] (numeric) = -1.6376401892057358315587864557771e+9726
absolute error = 1.6376401892057358315587864557771e+9726
relative error = 8.1818304136049241016587639787537e+9727 %
h = 0.001
x1[1] (analytic) = 3.000669507216414044726173841438
x1[1] (numeric) = 1.8331624665632403737855816077208e+9728
absolute error = 1.8331624665632403737855816077208e+9728
relative error = 6.1091781755858299455583527432430e+9729 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2513.9MB, alloc=4.9MB, time=289.86
memory used=2517.7MB, alloc=4.9MB, time=290.15
NO POLE
NO POLE
t[1] = 0.99
x2[1] (analytic) = 2.0015600216043388161488619441866
x2[1] (numeric) = 1.3094283990645785763466118604663e+9746
absolute error = 1.3094283990645785763466118604663e+9746
relative error = 6.5420391341300564365870867098576e+9747 %
h = 0.001
x1[1] (analytic) = 3.0006688380438396822429567434158
x1[1] (numeric) = -1.4657645859200501101327279513283e+9748
absolute error = 1.4657645859200501101327279513283e+9748
relative error = 4.8847929079557939983578583946223e+9749 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2521.5MB, alloc=4.9MB, time=290.43
NO POLE
NO POLE
t[1] = 0.991
x2[1] (analytic) = 2.0015628101832730616818280558585
x2[1] (numeric) = -1.0469960028939059283067909253085e+9766
absolute error = 1.0469960028939059283067909253085e+9766
relative error = 5.2308925683827916380658940698175e+9767 %
h = 0.001
x1[1] (analytic) = 3.0006681695401034193359273995408
x1[1] (numeric) = 1.1719996784383531146344654149816e+9768
absolute error = 1.1719996784383531146344654149816e+9768
relative error = 3.9057956835593031354700149285236e+9769 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2525.3MB, alloc=4.9MB, time=290.72
NO POLE
NO POLE
t[1] = 0.992
x2[1] (analytic) = 2.0015656046793652148005130807438
x2[1] (numeric) = 8.3715965749552472639308251749794e+9785
absolute error = 8.3715965749552472639308251749794e+9785
relative error = 4.1825241977498459320637673408229e+9787 %
h = 0.001
x1[1] (analytic) = 3.0006675017045367522131142562379
x1[1] (numeric) = -9.3711040603250389646929826957683e+9787
absolute error = 9.3711040603250389646929826957683e+9787
relative error = 3.1230064827248469340533967156667e+9789 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2529.1MB, alloc=4.9MB, time=291.00
memory used=2533.0MB, alloc=4.9MB, time=291.29
NO POLE
NO POLE
t[1] = 0.993
x2[1] (analytic) = 2.0015684051041271815219907705268
x2[1] (numeric) = -6.6937819265871765431357914806402e+9805
absolute error = 6.6937819265871765431357914806402e+9805
relative error = 3.3442683794956022512384726556773e+9807 %
h = 0.001
x1[1] (analytic) = 3.0006668345364718452521972249501
x1[1] (numeric) = 7.4929705976075158554978375744113e+9807
absolute error = 7.4929705976075158554978375744113e+9807
relative error = 2.4971018146254790235146434489472e+9809 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2536.8MB, alloc=4.9MB, time=291.57
NO POLE
NO POLE
t[1] = 0.994
x2[1] (analytic) = 2.0015712114690942487994750383671
x2[1] (numeric) = 5.3522307339498929341789982834455e+9825
absolute error = 5.3522307339498929341789982834455e+9825
relative error = 2.6740146457349940584547840385665e+9827 %
h = 0.001
x1[1] (analytic) = 3.0006661680352415303326720041648
x1[1] (numeric) = -5.9912479911852930859470672677933e+9827
absolute error = 5.9912479911852930859470672677933e+9827
relative error = 1.9966392979690263437409765503711e+9829 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2540.6MB, alloc=4.9MB, time=291.86
NO POLE
NO POLE
t[1] = 0.995
x2[1] (analytic) = 2.0015740237858251309970673513854
x2[1] (numeric) = -4.2795499082001253530787663551581e+9845
absolute error = 4.2795499082001253530787663551581e+9845
relative error = 2.1380922500711125239172930003649e+9847 %
h = 0.001
x1[1] (analytic) = 3.0006655022001793061686819033125
x1[1] (numeric) = 4.7904969096426185950194467561198e+9847
absolute error = 4.7904969096426185950194467561198e+9847
relative error = 1.5964781499737576236660580183081e+9849 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2544.4MB, alloc=4.9MB, time=292.15
memory used=2548.2MB, alloc=4.9MB, time=292.44
NO POLE
NO POLE
t[1] = 0.996
x2[1] (analytic) = 2.0015768420659020164578803804734
x2[1] (numeric) = 3.4218531164219349509246714110877e+9865
absolute error = 3.4218531164219349509246714110877e+9865
relative error = 1.7095786904139602689972414327128e+9867 %
h = 0.001
x1[1] (analytic) = 3.0006648370306193376425165013682
x1[1] (numeric) = -3.8303973854961953478022798373300e+9867
absolute error = 3.8303973854961953478022798373300e+9867
relative error = 1.2765162367439403783513135485198e+9869 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2552.0MB, alloc=4.9MB, time=292.73
NO POLE
NO POLE
t[1] = 0.997
x2[1] (analytic) = 2.0015796663209306141657245132347
x2[1] (numeric) = -2.7360537910611871238729340924467e+9885
absolute error = 2.7360537910611871238729340924467e+9885
relative error = 1.3669472352755665475089850338104e+9887 %
h = 0.001
x1[1] (analytic) = 3.0006641725258964551387764736548
x1[1] (numeric) = 3.0627186297278391601218037690941e+9887
absolute error = 3.0627186297278391601218037690941e+9887
relative error = 1.0206802406514243673027154066684e+9889 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2555.8MB, alloc=4.9MB, time=293.02
NO POLE
NO POLE
t[1] = 0.998
x2[1] (analytic) = 2.0015824965625402005005442097848
x2[1] (numeric) = 2.1877006677037118128609244471078e+9905
absolute error = 2.1877006677037118128609244471078e+9905
relative error = 1.0929855109448676575506028192073e+9907 %
h = 0.001
x1[1] (analytic) = 3.0006635086853461538792039210128
x1[1] (numeric) = -2.4488961485824640814894810559279e+9907
absolute error = 2.4488961485824640814894810559279e+9907
relative error = 8.1611821568602906516177836126501e+9908 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2559.7MB, alloc=4.9MB, time=293.30
memory used=2563.5MB, alloc=4.9MB, time=293.59
NO POLE
NO POLE
t[1] = 0.999
x2[1] (analytic) = 2.0015853328023836660877915557993
x2[1] (numeric) = -1.7492471190104007330472820458082e+9925
absolute error = 1.7492471190104007330472820458082e+9925
relative error = 8.7393082390412566964992402920860e+9926 %
h = 0.001
x1[1] (analytic) = 3.0006628455083045932581775361673
x1[1] (numeric) = 1.9580944486157197617109374394129e+9927
absolute error = 1.9580944486157197617109374394129e+9927
relative error = 6.5255396871620996195713378333193e+9928 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2567.3MB, alloc=4.9MB, time=293.88
NO POLE
NO POLE
t[1] = 1
x2[1] (analytic) = 2.0015881750521375627419247426231
x2[1] (numeric) = 1.3986673444580196460117788686611e+9945
absolute error = 1.3986673444580196460117788686611e+9945
relative error = 6.9877878071576188417953916120354e+9946 %
h = 0.001
x1[1] (analytic) = 3.0006621829941085961788719427863
x1[1] (numeric) = -1.5656580095971305532686101571818e+9947
absolute error = 1.5656580095971305532686101571818e+9947
relative error = 5.2177083394135757532338169378335e+9948 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2571.1MB, alloc=4.9MB, time=294.17
NO POLE
NO POLE
memory used=2574.9MB, alloc=4.9MB, time=294.46
t[1] = 1.001
x2[1] (analytic) = 2.0015910233235021505042195804158
x2[1] (numeric) = -1.1183498999043467460023595298441e+9965
absolute error = 1.1183498999043467460023595298441e+9965
relative error = 5.5873047334485184505299383614518e+9966 %
h = 0.001
x1[1] (analytic) = 3.0006615211420956483900805433908
x1[1] (numeric) = 1.2518727095869104783879597784962e+9967
absolute error = 1.2518727095869104783879597784962e+9967
relative error = 4.1719890789629262189042566953916e+9968 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2578.7MB, alloc=4.9MB, time=294.75
NO POLE
NO POLE
t[1] = 1.002
x2[1] (analytic) = 2.00159387762820144477508252723
x2[1] (numeric) = 8.9421298321704097203192587047988e+9984
absolute error = 8.9421298321704097203192587047988e+9984
relative error = 4.4675045882766341433130627616407e+9986 %
h = 0.001
x1[1] (analytic) = 3.0006608599516038978237012129387
x1[1] (numeric) = -1.0009754821308234108304643483445e+9987
absolute error = 1.0009754821308234108304643483445e+9987
relative error = 3.3358500971914820958650884293671e+9988 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2582.5MB, alloc=4.9MB, time=295.03
NO POLE
NO POLE
t[1] = 1.003
x2[1] (analytic) = 2.0015967379779832635410540945977
x2[1] (numeric) = -7.1499703216525685909226192873626e+10004
absolute error = 7.1499703216525685909226192873626e+10004
relative error = 3.5721332803906754308235741678009e+10006 %
h = 0.001
x1[1] (analytic) = 3.0006601994219721539328841755681
x1[1] (numeric) = 8.0036245550688274154047732697645e+10006
absolute error = 8.0036245550688274154047732697645e+10006
relative error = 2.6672878710527083600969924085641e+10008 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2586.4MB, alloc=4.9MB, time=295.32
memory used=2590.2MB, alloc=4.9MB, time=295.60
NO POLE
NO POLE
t[1] = 1.004
x2[1] (analytic) = 2.0015996043846192746966918686243
x2[1] (numeric) = 5.7169909808952440987473685964965e+10024
absolute error = 5.7169909808952440987473685964965e+10024
relative error = 2.8562110865588931552638521174464e+10026 %
h = 0.001
x1[1] (analytic) = 3.0006595395525398870308414026484
x1[1] (numeric) = -6.3995579474271843977183546364026e+10026
absolute error = 6.3995579474271843977183546364026e+10026
relative error = 2.1327171120458038493782695856370e+10028 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2594.0MB, alloc=4.9MB, time=295.89
NO POLE
NO POLE
t[1] = 1.005
x2[1] (analytic) = 2.0016024768599050434615227647822
x2[1] (numeric) = -4.5712058099960524215760473567173e+10044
absolute error = 4.5712058099960524215760473567173e+10044
relative error = 2.2837730582584593338892592987145e+10046 %
h = 0.001
x1[1] (analytic) = 3.0006588803426472276303168709484
x1[1] (numeric) = 5.1169743958743513677132827409341e+10046
absolute error = 5.1169743958743513677132827409341e+10046
relative error = 1.7052836060092377670702735317400e+10048 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2597.8MB, alloc=4.9MB, time=296.17
NO POLE
NO POLE
t[1] = 1.006
x2[1] (analytic) = 2.0016053554156600798922545145423
x2[1] (numeric) = 3.6550560648373628080325537169281e+10064
absolute error = 3.6550560648373628080325537169281e+10064
relative error = 1.8260622929230430688310824234987e+10066 %
h = 0.001
x1[1] (analytic) = 3.0006582217916349657837170203908
x1[1] (numeric) = -4.0914430626509463352611783862639e+10066
absolute error = 4.0914430626509463352611783862639e+10066
relative error = 1.3635151890800895165355065869066e+10068 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2601.6MB, alloc=4.9MB, time=296.46
memory used=2605.4MB, alloc=4.9MB, time=296.74
NO POLE
NO POLE
t[1] = 1.007
x2[1] (analytic) = 2.0016082400637278864904367626857
x2[1] (numeric) = -2.9225187822195047891147936058990e+10084
absolute error = 2.9225187822195047891147936058990e+10084
relative error = 1.4600853072659496237820217433020e+10086 %
h = 0.001
x1[1] (analytic) = 3.0006575638988445504239007515246
x1[1] (numeric) = 3.2714461789004441828517462493077e+10086
absolute error = 3.2714461789004441828517462493077e+10086
relative error = 1.0902430914675101570224953978798e+10088 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2609.2MB, alloc=4.9MB, time=297.03
NO POLE
NO POLE
t[1] = 1.008
x2[1] (analytic) = 2.0016111308159760059057625356098
x2[1] (numeric) = 2.3367948072243392544385295990679e+10104
absolute error = 2.3367948072243392544385295990679e+10104
relative error = 1.1674569406854379366440999111746e+10106 %
h = 0.001
x1[1] (analytic) = 3.0006569066636180887056283035048
x1[1] (numeric) = -2.6157910393864788078281460467490e+10106
absolute error = 2.6157910393864788078281460467490e+10106
relative error = 8.7173946264151024928296669034961e+10107 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2613.1MB, alloc=4.9MB, time=297.31
NO POLE
NO POLE
t[1] = 1.009
x2[1] (analytic) = 2.0016140276842960687352012231734
x2[1] (numeric) = -1.8684601804076620988973238195353e+10124
absolute error = 1.8684601804076620988973238195353e+10124
relative error = 9.3347676153594801957420919502934e+10125 %
h = 0.001
x1[1] (analytic) = 3.0006562500852983453476683540281
x1[1] (numeric) = 2.0915406788181857987670286117386e+10126
absolute error = 2.0915406788181857987670286117386e+10126
relative error = 6.9702775143228434943471078571897e+10127 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2616.9MB, alloc=4.9MB, time=297.60
memory used=2620.7MB, alloc=4.9MB, time=297.89
NO POLE
NO POLE
t[1] = 1.01
x2[1] (analytic) = 2.0016169306806038414181545996241
x2[1] (numeric) = 1.4939880193913290561012381845568e+10144
absolute error = 1.4939880193913290561012381845568e+10144
relative error = 7.4639057878239107469161097789257e+10145 %
h = 0.001
x1[1] (analytic) = 3.0006555941632287419755626833321
x1[1] (numeric) = -1.6723592769005223378008899585831e+10146
absolute error = 1.6723592769005223378008899585831e+10146
relative error = 5.5733129791820748728622449596411e+10147 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2624.5MB, alloc=4.9MB, time=298.18
NO POLE
NO POLE
t[1] = 1.011
x2[1] (analytic) = 2.0016198398168392742278277929117
x2[1] (numeric) = -1.1945666412852569646401142227247e+10164
absolute error = 1.1945666412852569646401142227247e+10164
relative error = 5.9679996047329710647812474048844e+10165 %
h = 0.001
x1[1] (analytic) = 3.0006549388967533564650477450223
x1[1] (numeric) = 1.3371891732058240919194583550961e+10166
absolute error = 1.3371891732058240919194583550961e+10166
relative error = 4.4563243706304550377910635855875e+10167 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2628.3MB, alloc=4.9MB, time=298.46
NO POLE
NO POLE
t[1] = 1.012
x2[1] (analytic) = 2.0016227551049665493590074962274
x2[1] (numeric) = 9.5515455408599234499222254971337e+10183
absolute error = 9.5515455408599234499222254971337e+10183
relative error = 4.7719009571106886584986746330131e+10185 %
h = 0.001
x1[1] (analytic) = 3.000654284285216922286132487148
x1[1] (numeric) = -1.0691930314476536053352300580748e+10186
absolute error = 1.0691930314476536053352300580748e+10186
relative error = 3.5631996563121069011120897255661e+10187 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2632.1MB, alloc=4.9MB, time=298.76
memory used=2636.0MB, alloc=4.9MB, time=299.04
NO POLE
NO POLE
t[1] = 1.013
x2[1] (analytic) = 2.0016256765569741291124401009045
x2[1] (numeric) = -7.6372484435830905221337141436843e+10203
absolute error = 7.6372484435830905221337141436843e+10203
relative error = 3.8155228187919902677289611074069e+10205 %
h = 0.001
x1[1] (analytic) = 3.000653630327964827847831767606
x1[1] (numeric) = 8.5490801257053142928139758749428e+10205
absolute error = 8.5490801257053142928139758749428e+10205
relative error = 2.8490726284762559145121294948305e+10207 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2639.8MB, alloc=4.9MB, time=299.33
NO POLE
NO POLE
t[1] = 1.014
x2[1] (analytic) = 2.0016286041848748041760028158929
x2[1] (numeric) = 6.1066100286594164582450453985631e+10223
absolute error = 6.1066100286594164582450453985631e+10223
relative error = 3.0508207246299906364662367049213e+10225 %
h = 0.001
x1[1] (analytic) = 3.0006529770243431158435547086047
x1[1] (numeric) = -6.8356946637383534179352110991208e+10225
absolute error = 6.8356946637383534179352110991208e+10225
relative error = 2.2780690456638892166226654347898e+10227 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2643.6MB, alloc=4.9MB, time=299.62
NO POLE
NO POLE
t[1] = 1.015
x2[1] (analytic) = 2.0016315380007057420028612258606
x2[1] (numeric) = -4.8827383733281387805683406900914e+10243
absolute error = 4.8827383733281387805683406900914e+10243
relative error = 2.4393792167189649907455621831845e+10245 %
h = 0.001
x1[1] (analytic) = 3.0006523243736984825971473355761
x1[1] (numeric) = 5.4657016718516207726975814506117e+10245
absolute error = 5.4657016718516207726975814506117e+10245
relative error = 1.8215044866927166567587379991833e+10247 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2647.4MB, alloc=4.9MB, time=299.90
memory used=2651.2MB, alloc=4.9MB, time=300.19
NO POLE
NO POLE
t[1] = 1.016
x2[1] (analytic) = 2.0016344780165285352868071275968
x2[1] (numeric) = 3.9041520435201199075521527502193e+10263
absolute error = 3.9041520435201199075521527502193e+10263
relative error = 1.9504820117751195614618330586090e+10265 %
h = 0.001
x1[1] (analytic) = 3.0006516723753782774095888465807
x1[1] (numeric) = -4.3702792818051287726828599156496e+10265
absolute error = 4.3702792818051287726828599156496e+10265
relative error = 1.4564433859613984422901323727209e+10267 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2655.0MB, alloc=4.9MB, time=300.47
NO POLE
NO POLE
t[1] = 1.017
x2[1] (analytic) = 2.0016374242444292505349708727845
x2[1] (numeric) = -3.1216915618874139063341795935185e+10283
absolute error = 3.1216915618874139063341795935185e+10283
relative error = 1.5595689429446886872617708348927e+10285 %
h = 0.001
x1[1] (analytic) = 3.0006510210287305019063408588982
x1[1] (numeric) = 3.4943987337136991719128251399095e+10285
absolute error = 3.4943987337136991719128251399095e+10285
relative error = 1.1645468630722989882945482271895e+10287 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2658.8MB, alloc=4.9MB, time=300.76
NO POLE
NO POLE
t[1] = 1.018
x2[1] (analytic) = 2.0016403766965184767381028343808
x2[1] (numeric) = 2.4960498717597808724164867910006e+10303
absolute error = 2.4960498717597808724164867910006e+10303
relative error = 1.2470021592386288015077848877443e+10305 %
h = 0.001
x1[1] (analytic) = 3.0006503703331038093853489801569
x1[1] (numeric) = -2.7940599954372403777577606710100e+10305
absolute error = 2.7940599954372403777577606710100e+10305
relative error = 9.3115146738240959304363157365835e+10306 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2662.7MB, alloc=4.9MB, time=301.04
memory used=2666.5MB, alloc=4.9MB, time=301.33
NO POLE
NO POLE
t[1] = 1.019
x2[1] (analytic) = 2.0016433353849313741386190037981
x2[1] (numeric) = -1.9957977393977777007458292980129e+10323
absolute error = 1.9957977393977777007458292980129e+10323
relative error = 9.9707960160343474956542763681805e+10324 %
h = 0.001
x1[1] (analytic) = 3.0006497202878475041656960519996
x1[1] (numeric) = 2.2340814122852103456965978170256e+10325
absolute error = 2.2340814122852103456965978170256e+10325
relative error = 7.4453255812574434948375156645008e+10326 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2670.3MB, alloc=4.9MB, time=301.62
NO POLE
NO POLE
t[1] = 1.02
x2[1] (analytic) = 2.0016463003218277230966061168027
x2[1] (numeric) = 1.5958049002350313029452446394089e+10343
absolute error = 1.5958049002350313029452446394089e+10343
relative error = 7.9724619678234629898766497567595e+10344 %
h = 0.001
x1[1] (analytic) = 3.0006490708923115409369064149424
x1[1] (numeric) = -1.7863323496520780243232711531311e+10345
absolute error = 1.7863323496520780243232711531311e+10345
relative error = 5.9531531593625218473710179175529e+10346 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2674.1MB, alloc=4.9MB, time=301.90
NO POLE
NO POLE
t[1] = 1.021
x2[1] (analytic) = 2.0016492715193919730539820975697
x2[1] (numeric) = -1.2759776350796751553775346590841e+10363
absolute error = 1.2759776350796751553775346590841e+10363
relative error = 6.3746314263693098108901769564231e+10364 %
h = 0.001
x1[1] (analytic) = 3.000648422145846524108900543728
x1[1] (numeric) = 1.4283200450378852556586718162328e+10365
absolute error = 1.4283200450378852556586718162328e+10365
relative error = 4.7600379787794471453594970045713e+10366 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2677.9MB, alloc=4.9MB, time=302.19
memory used=2681.7MB, alloc=4.9MB, time=302.48
NO POLE
NO POLE
t[1] = 1.022
x2[1] (analytic) = 2.0016522489898332915970080026189
x2[1] (numeric) = 1.0202493581663586329890500426859e+10383
absolute error = 1.0202493581663586329890500426859e+10383
relative error = 5.0970360045369730997005860171065e+10384 %
h = 0.001
x1[1] (analytic) = 3.0006477740478037071625994031305
x1[1] (numeric) = -1.1420596796863552435990454889282e+10385
absolute error = 1.1420596796863552435990454889282e+10385
relative error = 3.8060437801593201700706128554795e+10386 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2685.5MB, alloc=4.9MB, time=302.76
NO POLE
NO POLE
t[1] = 1.023
x2[1] (analytic) = 2.0016552327453856136173480394472
x2[1] (numeric) = -8.1577350905047004209511412939076e+10402
absolute error = 8.1577350905047004209511412939076e+10402
relative error = 4.0754945991952351254543185250450e+10404 %
h = 0.001
x1[1] (analytic) = 3.0006471265975349920011778748138
x1[1] (numeric) = 9.1317090766635892626114304016026e+10404
absolute error = 9.1317090766635892626114304016026e+10404
relative error = 3.0432465702883661727762118468349e+10406 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2689.4MB, alloc=4.9MB, time=303.05
NO POLE
NO POLE
t[1] = 1.024
x2[1] (analytic) = 2.0016582227983076905718746285333
x2[1] (numeric) = 6.5227820310964137600887496502969e+10422
absolute error = 6.5227820310964137600887496502969e+10422
relative error = 3.2586891991868615376408523865082e+10424 %
h = 0.001
x1[1] (analytic) = 3.0006464797943929283019666064981
x1[1] (numeric) = -7.3015545635689655890030985984109e+10424
absolute error = 7.3015545635689655890030985984109e+10424
relative error = 2.4333271555765792376663124886256e+10426 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2693.2MB, alloc=4.9MB, time=303.33
memory used=2697.0MB, alloc=4.9MB, time=303.63
NO POLE
NO POLE
t[1] = 1.025
x2[1] (analytic) = 2.0016612191608831398414158720518
x2[1] (numeric) = -5.2155022139315375441864859094899e+10442
absolute error = 5.2155022139315375441864859094899e+10442
relative error = 2.6055868815392893644080945380885e+10444 %
h = 0.001
x1[1] (analytic) = 3.000645833637730712869001635337
x1[1] (numeric) = 5.8381950845343185551290366357007e+10444
absolute error = 5.8381950845343185551290366357007e+10444
relative error = 1.9456461735960960487837596112088e+10446 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2700.8MB, alloc=4.9MB, time=303.91
NO POLE
NO POLE
t[1] = 1.026
x2[1] (analytic) = 2.0016642218454204941886431880771
x2[1] (numeric) = 4.1702241794752228510739791556279e+10462
absolute error = 4.1702241794752228510739791556279e+10462
relative error = 2.0833784877418218989014441605987e+10464 %
h = 0.001
x1[1] (analytic) = 3.0006451881269021889862211380527
x1[1] (numeric) = -4.6681184874170583110719740255434e+10464
absolute error = 4.6681184874170583110719740255434e+10464
relative error = 1.5557049216908733532985654880549e+10466 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2704.6MB, alloc=4.9MB, time=304.20
NO POLE
NO POLE
memory used=2708.4MB, alloc=4.9MB, time=304.49
t[1] = 1.027
x2[1] (analytic) = 2.001667230864253251315297265295
x2[1] (numeric) = -3.3344381794385869501756467609326e+10482
absolute error = 3.3344381794385869501756467609326e+10482
relative error = 1.6658304277674004718744975671985e+10484 %
h = 0.001
x1[1] (analytic) = 3.0006445432612618457713086610278
x1[1] (numeric) = 3.7325457435109162146477369380444e+10484
absolute error = 3.7325457435109162146477369380444e+10484
relative error = 1.2439146622325964631962256431684e+10486 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2712.2MB, alloc=4.9MB, time=304.78
NO POLE
NO POLE
t[1] = 1.028
x2[1] (analytic) = 2.0016702462297399235189508902709
x2[1] (numeric) = 2.6661583392135185298320960188386e+10502
absolute error = 2.6661583392135185298320960188386e+10502
relative error = 1.3319668133327054390392629807326e+10504 %
h = 0.001
x1[1] (analytic) = 3.0006438990401648175301821841967
x1[1] (numeric) = -2.9844781714420859574197854271141e+10504
absolute error = 2.9844781714420859574197854271141e+10504
relative error = 9.9461258045206567332590522822961e+10505 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2716.1MB, alloc=4.9MB, time=305.06
NO POLE
NO POLE
t[1] = 1.029
x2[1] (analytic) = 2.0016732679542640874495075971478
x2[1] (numeric) = -2.1318134891781425233523187275329e+10522
absolute error = 2.1318134891781425233523187275329e+10522
relative error = 1.0650157162546729824319372792676e+10524 %
h = 0.001
x1[1] (analytic) = 3.0006432554629668831121283732244
x1[1] (numeric) = 2.3863364491378127592784861019394e+10524
absolute error = 2.3863364491378127592784861019394e+10524
relative error = 7.9527496139144564493921163619000e+10525 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2719.9MB, alloc=4.9MB, time=305.35
memory used=2723.7MB, alloc=4.9MB, time=305.63
NO POLE
NO POLE
t[1] = 1.03
x2[1] (analytic) = 2.0016762960502344339656354882677
x2[1] (numeric) = 1.7045607103674464446871193454905e+10542
absolute error = 1.7045607103674464446871193454905e+10542
relative error = 8.5156661630601058870357697623745e+10543 %
h = 0.001
x1[1] (analytic) = 3.0006426125290244652655813751082
x1[1] (numeric) = -1.9080728091678619376165600483191e+10544
absolute error = 1.9080728091678619376165600483191e+10544
relative error = 6.3588805984451626416766583701892e+10545 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2727.5MB, alloc=4.9MB, time=305.92
NO POLE
NO POLE
t[1] = 1.031
x2[1] (analytic) = 2.0016793305300848180913359736284
x2[1] (numeric) = -1.3629368751431033990013392008409e+10562
absolute error = 1.3629368751431033990013392008409e+10562
relative error = 6.8089671225319111885299712443475e+10563 %
h = 0.001
x1[1] (analytic) = 3.0006419702376946299945455129803
x1[1] (numeric) = 1.5256615832193913936164978072979e+10564
absolute error = 1.5256615832193913936164978072979e+10564
relative error = 5.0844505887469698141785365979918e+10565 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2731.3MB, alloc=4.9MB, time=306.21
NO POLE
NO POLE
t[1] = 1.032
x2[1] (analytic) = 2.0016823714062743090728475773076
x2[1] (numeric) = 1.0897804427419962500009189870121e+10582
absolute error = 1.0897804427419962500009189870121e+10582
relative error = 5.4443225274366340147005931433602e+10583 %
h = 0.001
x1[1] (analytic) = 3.0006413285883350859156612365344
x1[1] (numeric) = -1.2198922679091154382864500899219e+10584
absolute error = 1.2198922679091154382864500899219e+10584
relative error = 4.0654384657263223210016958938498e+10585 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2735.1MB, alloc=4.9MB, time=306.49
memory used=2738.9MB, alloc=4.9MB, time=306.78
NO POLE
NO POLE
t[1] = 1.033
x2[1] (analytic) = 2.0016854186912872405360853600019
x2[1] (numeric) = -8.7136934589009887339411787165131e+10601
absolute error = 8.7136934589009887339411787165131e+10601
relative error = 4.3531782654429529062300724053798e+10603 %
h = 0.001
x1[1] (analytic) = 3.0006406875803041836159136851419
x1[1] (numeric) = 9.7540448135571211225418680447036e+10603
absolute error = 9.7540448135571211225418680447036e+10603
relative error = 3.2506540532924370681001299022698e+10605 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2742.8MB, alloc=4.9MB, time=307.06
NO POLE
NO POLE
t[1] = 1.034
x2[1] (analytic) = 2.0016884723976332607448169086518
x2[1] (numeric) = 6.9673166004567229274134182018604e+10621
absolute error = 6.9673166004567229274134182018604e+10621
relative error = 3.4807197506169546363040215350838e+10623 %
h = 0.001
x1[1] (analytic) = 3.0006400472129609150109832213661
x1[1] (numeric) = -7.7991633136549078574317280262786e+10623
absolute error = 7.7991633136549078574317280262786e+10623
relative error = 2.5991665747775667693743655030746e+10625 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2746.6MB, alloc=4.9MB, time=307.35
NO POLE
NO POLE
t[1] = 1.035
x2[1] (analytic) = 2.0016915325378473829597762467485
x2[1] (numeric) = -5.5709442660520624946016647399506e+10641
absolute error = 5.5709442660520624946016647399506e+10641
relative error = 2.7831182654746673620081853395577e+10643 %
h = 0.001
x1[1] (analytic) = 3.0006394074856649127042372932255
x1[1] (numeric) = 6.2360743215488806995403137644787e+10643
absolute error = 6.2360743215488806995403137644787e+10643
relative error = 2.0782484913021567630949728917412e+10645 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2750.4MB, alloc=4.9MB, time=307.63
memory used=2754.2MB, alloc=4.9MB, time=307.92
NO POLE
NO POLE
t[1] = 1.036
x2[1] (analytic) = 2.0016945991244900358989174223494
x2[1] (numeric) = 4.4544294159711234056356125037775e+10661
absolute error = 4.4544294159711234056356125037775e+10661
relative error = 2.2253291875391087545178314756082e+10663 %
h = 0.001
x1[1] (analytic) = 3.0006387683977764493463629841968
x1[1] (numeric) = -4.9862557533311900069289198830516e+10663
absolute error = 4.9862557533311900069289198830516e+10663
relative error = 1.6617314306025764107226167954736e+10665 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2758.0MB, alloc=4.9MB, time=308.20
NO POLE
NO POLE
t[1] = 1.037
x2[1] (analytic) = 2.0016976721701471142990099350679
x2[1] (numeric) = -3.5616837064374632920659596472572e+10681
absolute error = 3.5616837064374632920659596472572e+10681
relative error = 1.7793314924406402433213371392305e+10683 %
h = 0.001
x1[1] (analytic) = 3.0006381299486564369956396105919
x1[1] (numeric) = 3.9869227266446570351364908906756e+10683
absolute error = 3.9869227266446570351364908906756e+10683
relative error = 1.3286916162439343516735477764121e+10685 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2761.8MB, alloc=4.9MB, time=308.49
NO POLE
NO POLE
t[1] = 1.038
x2[1] (analytic) = 2.0017007516874300295787785683501
x2[1] (numeric) = 2.8478598805985306669901279262373e+10701
absolute error = 2.8478598805985306669901279262373e+10701
relative error = 1.4227200934993854888320031155790e+10703 %
h = 0.001
x1[1] (analytic) = 3.0006374921376664264788507265796
x1[1] (numeric) = -3.1878735497304273114999109705972e+10703
absolute error = 3.1878735497304273114999109705972e+10703
relative error = 1.0623987596247000005046977538205e+10705 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2765.7MB, alloc=4.9MB, time=308.78
memory used=2769.5MB, alloc=4.9MB, time=309.07
NO POLE
NO POLE
t[1] = 1.039
x2[1] (analytic) = 2.0017038376889757606037905992103
x2[1] (numeric) = -2.2770988577295443271003041642094e+10721
absolute error = 2.2770988577295443271003041642094e+10721
relative error = 1.1375803027677261093010632381197e+10723 %
h = 0.001
x1[1] (analytic) = 3.000636854964168606752834897765
x1[1] (numeric) = 2.5489678295379294917091416734699e+10723
absolute error = 2.5489678295379294917091416734699e+10723
relative error = 8.4947561225910737086706684939881e+10724 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2773.3MB, alloc=4.9MB, time=309.35
NO POLE
NO POLE
t[1] = 1.04
x2[1] (analytic) = 2.0017069301874469045532937642652
x2[1] (numeric) = 1.8207283452384721278459436586937e+10741
absolute error = 1.8207283452384721278459436586937e+10741
relative error = 9.0958787112155958663988189788788e+10742 %
h = 0.001
x1[1] (analytic) = 3.0006362184275258042666746048776
x1[1] (numeric) = -2.0381100111604872074460719538266e+10743
absolute error = 2.0381100111604872074460719538266e+10743
relative error = 6.7922595836310757458106557787214e+10744 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2777.1MB, alloc=4.9MB, time=309.64
NO POLE
NO POLE
t[1] = 1.041
x2[1] (analytic) = 2.001710029195531727889208768393
x2[1] (numeric) = -1.4558224803907746718199825256772e+10761
absolute error = 1.4558224803907746718199825256772e+10761
relative error = 7.2728939714402885639981453404997e+10762 %
h = 0.001
x1[1] (analytic) = 3.0006355825271014823245226397552
x1[1] (numeric) = 1.6296370513022945879694248454357e+10763
absolute error = 1.6296370513022945879694248454357e+10763
relative error = 5.4309728938488179324943545171359e+10764 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2780.9MB, alloc=4.9MB, time=309.92
memory used=2784.7MB, alloc=4.9MB, time=310.21
NO POLE
NO POLE
t[1] = 1.042
x2[1] (analytic) = 2.0017131347259442174274805306432
x2[1] (numeric) = 1.1640501450717811441763235341711e+10781
absolute error = 1.1640501450717811441763235341711e+10781
relative error = 5.8152695552509923908740766231756e+10782 %
h = 0.001
x1[1] (analytic) = 3.0006349472622597404490653564526
x1[1] (numeric) = -1.3030292302352652545082988242352e+10783
absolute error = 1.3030292302352652545082988242352e+10783
relative error = 4.3425116788169522573048334495757e+10784 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2788.5MB, alloc=4.9MB, time=310.51
NO POLE
NO POLE
t[1] = 1.043
x2[1] (analytic) = 2.0017162467914241315119927711368
x2[1] (numeric) = -9.3075409845156368255219527849272e+10800
absolute error = 9.3075409845156368255219527849272e+10800
relative error = 4.6497804069057290377135230717531e+10802 %
h = 0.001
x1[1] (analytic) = 3.0006343126323653137456221409363
x1[1] (numeric) = 1.0418793396300569391162121522639e+10803
absolute error = 1.0418793396300569391162121522639e+10803
relative error = 3.4721969792981799572788550076965e+10804 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2792.4MB, alloc=4.9MB, time=310.79
NO POLE
NO POLE
t[1] = 1.044
x2[1] (analytic) = 2.0017193654047370512912509526347
x2[1] (numeric) = 7.4421466760004786558196746540269e+10820
absolute error = 7.4421466760004786558196746540269e+10820
relative error = 3.7178771433305867147690372717245e+10822 %
h = 0.001
x1[1] (analytic) = 3.0006336786367835722668804634644
x1[1] (numeric) = -8.3306846320858932066695873540210e+10822
absolute error = 8.3306846320858932066695873540210e+10822
relative error = 2.7763084482443729991628174684928e+10824 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2796.2MB, alloc=4.9MB, time=311.07
memory used=2800.0MB, alloc=4.9MB, time=311.36
NO POLE
NO POLE
t[1] = 1.045
x2[1] (analytic) = 2.0017224905786744320980390012082
x2[1] (numeric) = -5.9506100740513934803998352043841e+10840
absolute error = 5.9506100740513934803998352043841e+10840
relative error = 2.9727447745921774032674699005641e+10842 %
h = 0.001
x1[1] (analytic) = 3.0006330452748805203782658783892
x1[1] (numeric) = 6.6610694539652008152107438641761e+10842
absolute error = 6.6610694539652008152107438641761e+10842
relative error = 2.2198880547737875197375321724541e+10844 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2803.8MB, alloc=4.9MB, time=311.65
NO POLE
NO POLE
t[1] = 1.046
x2[1] (analytic) = 2.0017256223260536549322556420197
x2[1] (numeric) = 4.7580035431969834981961082837231e+10860
absolute error = 4.7580035431969834981961082837231e+10860
relative error = 2.3769509118178085476908353856951e+10862 %
h = 0.001
x1[1] (analytic) = 3.000632412546022796123946336749
x1[1] (numeric) = -5.3260744140591283076635853087555e+10862
absolute error = 5.3260744140591283076635853087555e+10862
relative error = 1.7749839639771066368717340585660e+10864 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2807.6MB, alloc=4.9MB, time=311.94
NO POLE
NO POLE
t[1] = 1.047
x2[1] (analytic) = 2.0017287606597180780471365986285
x2[1] (numeric) = -3.8044162590646545228927032281736e+10880
absolute error = 3.8044162590646545228927032281736e+10880
relative error = 1.9005653182556148236237883295689e+10882 %
h = 0.001
x1[1] (analytic) = 3.0006317804495776705934701776564
x1[1] (numeric) = 4.2586357731503521389950929041398e+10882
absolute error = 4.2586357731503521389950929041398e+10882
relative error = 1.4192463736794424873811272592195e+10884 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2811.4MB, alloc=4.9MB, time=312.22
memory used=2815.2MB, alloc=4.9MB, time=312.50
NO POLE
NO POLE
t[1] = 1.048
x2[1] (analytic) = 2.0017319055925370886390693174571
x2[1] (numeric) = 3.0419445762981617925348538614727e+10900
absolute error = 3.0419445762981617925348538614727e+10900
relative error = 1.5196563374942605266533401104602e+10902 %
h = 0.001
x1[1] (analytic) = 3.0006311489849130472890371651189
x1[1] (numeric) = -3.4051305405126767194529181627408e+10902
absolute error = 3.4051305405126767194529181627408e+10902
relative error = 1.1348047698780312386046763264208e+10904 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2819.1MB, alloc=4.9MB, time=312.79
NO POLE
NO POLE
t[1] = 1.049
x2[1] (analytic) = 2.0017350571374061546412072931139
x2[1] (numeric) = -2.4322855794819966380425359640871e+10920
absolute error = 2.4322855794819966380425359640871e+10920
relative error = 1.2150886656100742791521884604558e+10922 %
h = 0.001
x1[1] (analytic) = 3.0006305181513974614934019375641
x1[1] (numeric) = 2.7226827123923642341887526266264e+10922
absolute error = 2.7226827123923642341887526266264e+10922
relative error = 9.0737019967047828623193419204900e+10923 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2822.9MB, alloc=4.9MB, time=313.07
NO POLE
NO POLE
t[1] = 1.05
x2[1] (analytic) = 2.0017382153072468766210914851442
x2[1] (numeric) = 1.9448129286285205730067082872735e+10940
absolute error = 1.9448129286285205730067082872735e+10940
relative error = 9.7156207228127038622519020920603e+10941 %
h = 0.001
x1[1] (analytic) = 3.0006298879484000796384092379724
x1[1] (numeric) = -2.1770093875003510284271613464584e+10942
absolute error = 2.1770093875003510284271613464584e+10942
relative error = 7.2551746426441902847704643004009e+10943 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2826.7MB, alloc=4.9MB, time=313.36
memory used=2830.5MB, alloc=4.9MB, time=313.66
NO POLE
NO POLE
t[1] = 1.051
x2[1] (analytic) = 2.0017413801150070397824867324982
x2[1] (numeric) = -1.5550383389462672157669837546375e+10960
absolute error = 1.5550383389462672157669837546375e+10960
relative error = 7.7684278018818036685695336882784e+10961 %
h = 0.001
x1[1] (analytic) = 3.0006292583752906986741602931521
x1[1] (numeric) = 1.7406985587021517341142848969721e+10962
absolute error = 1.7406985587021517341142848969721e+10962
relative error = 5.8011117296265509076244680861580e+10963 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2834.3MB, alloc=4.9MB, time=313.95
NO POLE
NO POLE
t[1] = 1.052
x2[1] (analytic) = 2.0017445515736606660716414885484
x2[1] (numeric) = 1.2433814070220305772815201216508e+10980
absolute error = 1.2433814070220305772815201216508e+10980
relative error = 6.2114889037392558442386036036183e+10981 %
h = 0.001
x1[1] (analytic) = 3.0006286294314397454388097113235
x1[1] (numeric) = -1.3918320654312106470014412219960e+10982
absolute error = 1.3918320654312106470014412219960e+10982
relative error = 4.6384682588825912669035286142917e+10983 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2838.1MB, alloc=4.9MB, time=314.23
NO POLE
NO POLE
memory used=2841.9MB, alloc=4.9MB, time=314.51
t[1] = 1.053
x2[1] (analytic) = 2.0017477296962080663881796168653
x2[1] (numeric) = -9.9418598539228996488149952404842e+10999
absolute error = 9.9418598539228996488149952404842e+10999
relative error = 4.9665897987213951116733923627044e+11001 %
h = 0.001
x1[1] (analytic) = 3.0006280011162182760289922678097
x1[1] (numeric) = 1.1128845305685006678280433012500e+11002
absolute error = 1.1128845305685006678280433012500e+11002
relative error = 3.7088387169436308398055452931744e+11003 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2845.8MB, alloc=4.9MB, time=314.80
NO POLE
NO POLE
t[1] = 1.054
x2[1] (analytic) = 2.0017509144956758929008334061753
x2[1] (numeric) = 7.9493369288650280362582996186896e+11019
absolute error = 7.9493369288650280362582996186896e+11019
relative error = 3.9711918557398515404319336309076e+11021 %
h = 0.001
x1[1] (analytic) = 3.0006273734289979751708789492587
x1[1] (numeric) = -8.8984296966528238066216626466334e+11021
absolute error = 8.8984296966528238066216626466334e+11021
relative error = 2.9655230687588013331109492765764e+11023 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2849.6MB, alloc=4.9MB, time=315.08
NO POLE
NO POLE
t[1] = 1.055
x2[1] (analytic) = 2.0017541059851171914682273819759
x2[1] (numeric) = -6.3561505127919033373889808151902e+11039
absolute error = 6.3561505127919033373889808151902e+11039
relative error = 3.1752903584848001185152027524756e+11041 %
h = 0.001
x1[1] (analytic) = 3.0006267463691511555918616274553
x1[1] (numeric) = 7.1150284590463200710309487010260e+11041
absolute error = 7.1150284590463200710309487010260e+11041
relative error = 2.3711807767013071699103135154667e+11043 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2853.4MB, alloc=4.9MB, time=315.37
memory used=2857.2MB, alloc=4.9MB, time=315.66
NO POLE
NO POLE
t[1] = 1.056
x2[1] (analytic) = 2.001757304177611454164922912169
x2[1] (numeric) = 5.0822665717646221120282244453433e+11059
absolute error = 5.0822665717646221120282244453433e+11059
relative error = 2.5389024739203269327260638330382e+11061 %
h = 0.001
x1[1] (analytic) = 3.0006261199360507573928657344053
x1[1] (numeric) = -5.6890520798384586454330423574627e+11061
absolute error = 5.6890520798384586454330423574627e+11061
relative error = 1.8959549948727712639428631013996e+11063 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2861.0MB, alloc=4.9MB, time=315.94
NO POLE
NO POLE
t[1] = 1.057
x2[1] (analytic) = 2.0017605090862646719129340248063
x2[1] (numeric) = -4.0636912946749417915656079889873e+11079
absolute error = 4.0636912946749417915656079889873e+11079
relative error = 2.0300586789624889366127986787809e+11081 %
h = 0.001
x1[1] (analytic) = 3.0006254941290703474212903110062
x1[1] (numeric) = 4.5488663542819412114139412583332e+11081
absolute error = 4.5488663542819412114139412583332e+11081
relative error = 1.5159727074178734840097716774131e+11083 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2864.8MB, alloc=4.9MB, time=316.22
NO POLE
NO POLE
t[1] = 1.058
x2[1] (analytic) = 2.0017637207242093872189252776101
x2[1] (numeric) = 3.2492563515186089492353218815377e+11099
absolute error = 3.2492563515186089492353218815377e+11099
relative error = 1.6231967428918507078996612424971e+11101 %
h = 0.001
x1[1] (analytic) = 3.0006248689475841186445748022435
x1[1] (numeric) = -3.6371938275006679697350006220096e+11101
absolute error = 3.6371938275006679697350006220096e+11101
relative error = 1.2121454651465143351185219436450e+11103 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2868.7MB, alloc=4.9MB, time=316.51
memory used=2872.5MB, alloc=4.9MB, time=316.80
NO POLE
NO POLE
t[1] = 1.059
x2[1] (analytic) = 2.0017669391046047470173029413471
x2[1] (numeric) = -2.5980484422423477955912564564376e+11119
absolute error = 2.5980484422423477955912564564376e+11119
relative error = 1.2978775857915113858667377628364e+11121 %
h = 0.001
x1[1] (analytic) = 3.0006242443909668895243919724792
x1[1] (numeric) = 2.9082364502434900770849010305747e+11121
absolute error = 2.9082364502434900770849010305747e+11121
relative error = 9.6921047534686281507098317204091e+11122 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2876.3MB, alloc=4.9MB, time=317.08
NO POLE
NO POLE
t[1] = 1.06
x2[1] (analytic) = 2.0017701642406365556194111823943
x2[1] (numeric) = 2.0773540090437005995883001192962e+11139
absolute error = 2.0773540090437005995883001192962e+11139
relative error = 1.0377585030256140673777471947394e+11141 %
h = 0.001
x1[1] (analytic) = 3.0006236204585941033914663150266
x1[1] (numeric) = -2.3253749048443590692263043212838e+11141
absolute error = 2.3253749048443590692263043212838e+11141
relative error = 7.7496387383932050976196198642514e+11142 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2880.1MB, alloc=4.9MB, time=317.36
NO POLE
NO POLE
t[1] = 1.061
x2[1] (analytic) = 2.0017733961455173277690453539452
x2[1] (numeric) = -1.6610158643406048467120062572845e+11159
absolute error = 1.6610158643406048467120062572845e+11159
relative error = 8.2977217478209437507211562547567e+11160 %
h = 0.001
x1[1] (analytic) = 3.0006229971498418278210173308279
x1[1] (numeric) = 1.8593290265745702443807138387822e+11161
absolute error = 1.8593290265745702443807138387822e+11161
relative error = 6.1964766261561818790838539346073e+11162 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2883.9MB, alloc=4.9MB, time=317.65
memory used=2887.7MB, alloc=4.9MB, time=317.94
NO POLE
NO POLE
t[1] = 1.062
x2[1] (analytic) = 2.0017766348324863418044949302553
x2[1] (numeric) = 1.3281191792925300095753050329405e+11179
absolute error = 1.3281191792925300095753050329405e+11179
relative error = 6.6347021749690386051088002305225e+11180 %
h = 0.001
x1[1] (analytic) = 3.00062237446408675400882705168
x1[1] (numeric) = -1.4866869087907905655709083571712e+11181
absolute error = 1.4866869087907905655709083571712e+11181
relative error = 4.9545951581338650883974535603624e+11182 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2891.5MB, alloc=4.9MB, time=318.22
NO POLE
NO POLE
t[1] = 1.063
x2[1] (analytic) = 2.0017798803148096929273290441388
x2[1] (numeric) = -1.0619408232472855431236524910136e+11199
absolute error = 1.0619408232472855431236524910136e+11199
relative error = 5.3049829988314176493719704818568e+11200 %
h = 0.001
x1[1] (analytic) = 3.0006217524007061961479311840732
x1[1] (numeric) = 1.1887288011857822889890236107448e+11201
absolute error = 1.1887288011857822889890236107448e+11201
relative error = 3.9616082907974540008122560270654e+11202 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2895.4MB, alloc=4.9MB, time=318.51
NO POLE
NO POLE
t[1] = 1.064
x2[1] (analytic) = 2.0017831326057803465781380145825
x2[1] (numeric) = 8.4910927397332059111595842474579e+11218
absolute error = 8.4910927397332059111595842474579e+11218
relative error = 4.2417645555241037512206048138717e+11220 %
h = 0.001
x1[1] (analytic) = 3.0006211309590780908059332503374
x1[1] (numeric) = -9.5048671943840860531482779534889e+11220
absolute error = 9.5048671943840860531482779534889e+11220
relative error = 3.1676332264400465732775532525885e+11222 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2899.2MB, alloc=4.9MB, time=318.79
memory used=2903.0MB, alloc=4.9MB, time=319.08
NO POLE
NO POLE
t[1] = 1.065
x2[1] (analytic) = 2.0017863917187181919194446788586
x2[1] (numeric) = -6.7893289660228959754694789098445e+11238
absolute error = 6.7893289660228959754694789098445e+11238
relative error = 3.3916350885938589323463709417543e+11240 %
h = 0.001
x1[1] (analytic) = 3.0006205101385809963029411044061
x1[1] (numeric) = 7.5999252556815515726005738030842e+11240
absolute error = 7.5999252556815515726005738030842e+11240
relative error = 2.5327845457306948044664675113491e+11242 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2906.8MB, alloc=4.9MB, time=319.36
NO POLE
NO POLE
t[1] = 1.066
x2[1] (analytic) = 2.0017896576669700954259997718836
x2[1] (numeric) = 5.4286284724203650332374735991092e+11258
absolute error = 5.4286284724203650332374735991092e+11258
relative error = 2.7118875610274057519892775651052e+11260 %
h = 0.001
x1[1] (analytic) = 3.0006198899385940920901252001383
x1[1] (numeric) = -6.0767670616242695044696194485818e+11260
absolute error = 6.0767670616242695044696194485818e+11260
relative error = 2.0251705595901475349327240724986e+11262 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2910.6MB, alloc=4.9MB, time=319.65
NO POLE
NO POLE
t[1] = 1.067
x2[1] (analytic) = 2.0017929304639099545826760247977
x2[1] (numeric) = -4.3406362011702943987712394216401e+11278
absolute error = 4.3406362011702943987712394216401e+11278
relative error = 2.1683742284794481759504932673857e+11280 %
h = 0.001
x1[1] (analytic) = 3.0006192703584971781288979907532
x1[1] (numeric) = 4.8588764598225096034870574157352e+11280
absolute error = 4.8588764598225096034870574157352e+11280
relative error = 1.6192912269213009046852152048341e+11282 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2914.4MB, alloc=4.9MB, time=319.94
memory used=2918.2MB, alloc=4.9MB, time=320.23
NO POLE
NO POLE
t[1] = 1.068
x2[1] (analytic) = 2.0017962101229387516901760848239
x2[1] (numeric) = 3.4706966458711682036799592435024e+11298
absolute error = 3.4706966458711682036799592435024e+11298
relative error = 1.7337911962866680011933178861043e+11300 %
h = 0.001
x1[1] (analytic) = 3.0006186513976706742707138385598
x1[1] (numeric) = -3.8850724756112206539403375061609e+11300
absolute error = 3.8850724756112206539403375061609e+11300
relative error = 1.2947571574287110908612522583485e+11302 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2922.1MB, alloc=4.9MB, time=320.51
NO POLE
NO POLE
t[1] = 1.069
x2[1] (analytic) = 2.001799496657484607778769789409
x2[1] (numeric) = -2.7751082213279434802299826933291e+11318
absolute error = 2.7751082213279434802299826933291e+11318
relative error = 1.3863067834524362915768811209470e+11320 %
h = 0.001
x1[1] (analytic) = 3.0006180330554956196374888147792
x1[1] (numeric) = 3.1064358737170405929382013006136e+11320
absolute error = 3.1064358737170405929382013006136e+11320
relative error = 1.0352653485034854154440054895940e+11322 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2925.9MB, alloc=4.9MB, time=320.80
NO POLE
NO POLE
t[1] = 1.07
x2[1] (analytic) = 2.0018027900810028366302767594595
x2[1] (numeric) = 2.2189279057976796181037598108588e+11338
absolute error = 2.2189279057976796181037598108588e+11338
relative error = 1.1084647882361532855850662303709e+11340 %
h = 0.001
x1[1] (analytic) = 3.0006174153313536720026397698809
x1[1] (numeric) = -2.4838516908228261341146394945811e+11340
absolute error = 2.4838516908228261341146394945811e+11340
relative error = 8.2778020221166320348797856378244e+11341 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2929.7MB, alloc=4.9MB, time=321.09
memory used=2933.5MB, alloc=4.9MB, time=321.38
NO POLE
NO POLE
t[1] = 1.071
x2[1] (analytic) = 2.0018060904069759989085107091531
x2[1] (numeric) = -1.7742158713982036183125292711286e+11358
absolute error = 1.7742158713982036183125292711286e+11358
relative error = 8.8630755990831145577076325017145e+11359 %
h = 0.001
x1[1] (analytic) = 3.000616798224627107172742055471
x1[1] (numeric) = 1.9860442876682353760081985907191e+11360
absolute error = 1.9860442876682353760081985907191e+11360
relative error = 6.6187868069102220718330565970249e+11361 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2937.3MB, alloc=4.9MB, time=321.66
NO POLE
NO POLE
t[1] = 1.072
x2[1] (analytic) = 2.0018093976489139563984023033489
x2[1] (numeric) = 1.4186319213420650685413125094629e+11378
absolute error = 1.4186319213420650685413125094629e+11378
relative error = 7.0867482339138808883035123770288e+11379 %
h = 0.001
x1[1] (analytic) = 3.0006161817346988183698052793905
x1[1] (numeric) = -1.5880062111409620674929041732742e+11380
absolute error = 1.5880062111409620674929041732742e+11380
relative error = 5.2922670377086120018583792260324e+11381 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2941.1MB, alloc=4.9MB, time=321.95
NO POLE
NO POLE
t[1] = 1.073
x2[1] (analytic) = 2.0018127118203539263540178280202
x2[1] (numeric) = -1.1343132257433128670901074183788e+11398
absolute error = 1.1343132257433128670901074183788e+11398
relative error = 5.6664303261008968108569103077329e+11399 %
h = 0.001
x1[1] (analytic) = 3.0006155658609523156141664762995
x1[1] (numeric) = 1.2697419399357972704370813239032e+11400
absolute error = 1.2697419399357972704370813239032e+11400
relative error = 4.2316048559572018033140839759896e+11401 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2944.9MB, alloc=4.9MB, time=322.24
memory used=2948.8MB, alloc=4.9MB, time=322.53
NO POLE
NO POLE
t[1] = 1.074
x2[1] (analytic) = 2.0018160329348605359556913744122
x2[1] (numeric) = 9.0697697883393018197018659092815e+11417
absolute error = 9.0697697883393018197018659092815e+11417
relative error = 4.5307708796008198454201430998835e+11419 %
h = 0.001
x1[1] (analytic) = 3.0006149506027717251080000766397
x1[1] (numeric) = -1.0152634055968488743677034718949e+11420
absolute error = 1.0152634055968488743677034718949e+11420
relative error = 3.3835177865553858853304196130023e+11421 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2952.6MB, alloc=4.9MB, time=322.82
NO POLE
NO POLE
t[1] = 1.075
x2[1] (analytic) = 2.0018193610060258768764886737703
x2[1] (numeric) = -7.2520289939815414823745768596965e+11437
absolute error = 7.2520289939815414823745768596965e+11437
relative error = 3.6227189801666182525457022015477e+11439 %
h = 0.001
x1[1] (analytic) = 3.0006143359595417886194440574866
x1[1] (numeric) = 8.1178682874429633828333788175802e+11439
absolute error = 8.1178682874429633828333788175802e+11439
relative error = 2.7054020872185885311811913294398e+11441 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2956.4MB, alloc=4.9MB, time=323.10
NO POLE
NO POLE
t[1] = 1.076
x2[1] (analytic) = 2.0018226960474695599582211565038
x2[1] (numeric) = 5.7985953069243938660634212918781e+11457
absolute error = 5.7985953069243938660634212918781e+11457
relative error = 2.8966577901097444623124396742351e+11459 %
h = 0.001
x1[1] (analytic) = 3.0006137219306478628673416594154
x1[1] (numeric) = -6.4909052339507161040338758285689e+11459
absolute error = 6.4909052339507161040338758285689e+11459
relative error = 2.1631925450818617998923945858452e+11461 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2960.2MB, alloc=4.9MB, time=323.39
memory used=2964.0MB, alloc=4.9MB, time=323.68
NO POLE
NO POLE
t[1] = 1.077
x2[1] (analytic) = 2.0018260380728387699972292475448
x2[1] (numeric) = -4.6364551991435664125212231741082e+11477
absolute error = 4.6364551991435664125212231741082e+11477
relative error = 2.3161129443630823601461992758901e+11479 %
h = 0.001
x1[1] (analytic) = 3.0006131085154759189065980541243
x1[1] (numeric) = 5.1900140855081373363474979050859e+11479
absolute error = 5.1900140855081373363474979050859e+11479
relative error = 1.7296512072080649562116136653265e+11481 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2967.8MB, alloc=4.9MB, time=323.97
NO POLE
NO POLE
t[1] = 1.078
x2[1] (analytic) = 2.0018293870958083206401543484281
x2[1] (numeric) = 3.7072283330404346292438293106577e+11497
absolute error = 3.7072283330404346292438293106577e+11497
relative error = 1.8519202270373130766372603866621e+11499 %
h = 0.001
x1[1] (analytic) = 3.0006124957134125415141513481704
x1[1] (numeric) = -4.1498443186140941872897762881934e+11499
absolute error = 4.1498443186140941872897762881934e+11499
relative error = 1.3829990792021431275431799019543e+11501 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2971.6MB, alloc=4.9MB, time=324.25
NO POLE
NO POLE
memory used=2975.5MB, alloc=4.9MB, time=324.54
t[1] = 1.079
x2[1] (analytic) = 2.0018327431300807093899193962709
x2[1] (numeric) = -2.9642348136646354203815171112698e+11517
absolute error = 2.9642348136646354203815171112698e+11517
relative error = 1.4807604800337792490099985991749e+11519 %
h = 0.001
x1[1] (analytic) = 3.00061188352384492857555730879
x1[1] (numeric) = 3.3181427998085295038547835472984e+11519
absolute error = 3.3181427998085295038547835472984e+11519
relative error = 1.1058220551708886998187340587063e+11521 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2979.3MB, alloc=4.9MB, time=324.83
NO POLE
NO POLE
t[1] = 1.08
x2[1] (analytic) = 2.0018361061893861727221383303517
x2[1] (numeric) = 2.3701502149815328697053160851183e+11537
absolute error = 2.3701502149815328697053160851183e+11537
relative error = 1.1839881435115357474011293864460e+11539 %
h = 0.001
x1[1] (analytic) = 3.0006112719461608904721871983874
x1[1] (numeric) = -2.6531288392038219360877158839677e+11539
absolute error = 2.6531288392038219360877158839677e+11539
relative error = 8.8419611830726544965979441084450e+11540 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2983.1MB, alloc=4.9MB, time=325.11
NO POLE
NO POLE
t[1] = 1.081
x2[1] (analytic) = 2.0018394762874827413121752384054
x2[1] (numeric) = -1.8951305799664513857221587456841e+11557
absolute error = 1.8951305799664513857221587456841e+11557
relative error = 9.4669457886856709833593460001119e+11558 %
h = 0.001
x1[1] (analytic) = 3.0006106609797488494690381048906
x1[1] (numeric) = 2.1213953292851664643758510710550e+11559
absolute error = 2.1213953292851664643758510710550e+11559
relative error = 7.0698786646065435081219601412552e+11560 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2986.9MB, alloc=4.9MB, time=325.40
memory used=2990.7MB, alloc=4.9MB, time=325.69
NO POLE
NO POLE
t[1] = 1.082
x2[1] (analytic) = 2.0018428534381562953730743970359
x2[1] (numeric) = 1.5153132035354821916630912741432e+11577
absolute error = 1.5153132035354821916630912741432e+11577
relative error = 7.5695911940986697828153612087844e+11578 %
h = 0.001
x1[1] (analytic) = 3.0006100506239978391031551557832
x1[1] (numeric) = -1.6962305322735180072312294348997e+11579
absolute error = 1.6962305322735180072312294348997e+11579
relative error = 5.6529522452301824713062369633250e+11580 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2994.5MB, alloc=4.9MB, time=325.97
NO POLE
NO POLE
t[1] = 1.083
x2[1] (analytic) = 2.0018462376552206201045828638317
x2[1] (numeric) = -1.2116178848476044222528163790481e+11597
absolute error = 1.2116178848476044222528163790481e+11597
relative error = 6.0525022454610833070056481975518e+11598 %
h = 0.001
x1[1] (analytic) = 3.0006094408782975035726650042359
x1[1] (numeric) = 1.3562762107081728764308512067597e+11599
absolute error = 1.3562762107081728764308512067597e+11599
relative error = 4.5200024776006243158688533159273e+11600 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=2998.4MB, alloc=4.9MB, time=326.26
NO POLE
NO POLE
t[1] = 1.084
x2[1] (analytic) = 2.0018496289525174612534877228308
x2[1] (numeric) = 9.6878842965101113704812422322970e+11616
absolute error = 9.6878842965101113704812422322970e+11616
relative error = 4.8394665395419175752473519192955e+11618 %
h = 0.001
x1[1] (analytic) = 3.0006088317420380971264199763704
x1[1] (numeric) = -1.0844546921740601376619778678004e+11619
absolute error = 1.0844546921740601376619778678004e+11619
relative error = 3.6141155111660037568952547689216e+11620 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3002.2MB, alloc=4.9MB, time=326.54
memory used=3006.0MB, alloc=4.9MB, time=326.83
NO POLE
NO POLE
t[1] = 1.085
x2[1] (analytic) = 2.0018530273439165807854905299369
x2[1] (numeric) = -7.7462625235490128980250920178192e+11636
absolute error = 7.7462625235490128980250920178192e+11636
relative error = 3.8695460744322724162279010556856e+11638 %
h = 0.001
x1[1] (analytic) = 3.0006082232146104834542522692988
x1[1] (numeric) = 8.6711096905863375782628898332668e+11638
absolute error = 8.6711096905863375782628898332668e+11638
relative error = 2.8897840189535998725005445876390e+11640 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3009.8MB, alloc=4.9MB, time=327.12
NO POLE
NO POLE
t[1] = 1.086
x2[1] (analytic) = 2.0018564328433158126688419507311
x2[1] (numeric) = 6.1937757767560776153800623173106e+11656
absolute error = 6.1937757767560776153800623173106e+11656
relative error = 3.0940159719440085309722769700652e+11658 %
h = 0.001
x1[1] (analytic) = 3.0006076152954061350778375901955
x1[1] (numeric) = -6.9332673655039371891479268246010e+11658
absolute error = 6.9332673655039371891479268246010e+11658
relative error = 2.3106211322540303327329877169048e+11660 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3013.6MB, alloc=4.9MB, time=327.40
NO POLE
NO POLE
t[1] = 1.087
x2[1] (analytic) = 2.0018598454646411187699600298615
x2[1] (numeric) = -4.9524345781085274166609040467859e+11676
absolute error = 4.9524345781085274166609040467859e+11676
relative error = 2.4739167376420620375344841649745e+11678 %
h = 0.001
x1[1] (analytic) = 3.0006070079838171327421676272613
x1[1] (numeric) = 5.5437190944255503855720502606897e+11678
absolute error = 5.5437190944255503855720502606897e+11678
relative error = 1.8475325424739689068477414052648e+11680 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3017.4MB, alloc=4.9MB, time=327.69
memory used=3021.2MB, alloc=4.9MB, time=327.98
NO POLE
NO POLE
t[1] = 1.088
x2[1] (analytic) = 2.0018632652218466448612559788203
x2[1] (numeric) = 3.9598799075820808964590851745711e+11696
absolute error = 3.9598799075820808964590851745711e+11696
relative error = 1.9780970940306688194004004139567e+11698 %
h = 0.001
x1[1] (analytic) = 3.0006064012792361648076307440557
x1[1] (numeric) = -4.4326606458028410225311208158662e+11698
absolute error = 4.4326606458028410225311208158662e+11698
relative error = 1.4772549455047096718851797624881e+11700 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3025.1MB, alloc=4.9MB, time=328.27
NO POLE
NO POLE
t[1] = 1.089
x2[1] (analytic) = 2.0018666921289147767413918174488
x2[1] (numeric) = -3.1662505854769202657541275897373e+11716
absolute error = 3.1662505854769202657541275897373e+11716
relative error = 1.5816490668066034885721169636611e+11718 %
h = 0.001
x1[1] (analytic) = 3.000605795181056526642700289276
x1[1] (numeric) = 3.5442777792631407921108473747546e+11718
absolute error = 3.5442777792631407921108473747546e+11718
relative error = 1.1811874072079765155714745592078e+11720 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3028.9MB, alloc=4.9MB, time=328.56
NO POLE
NO POLE
t[1] = 1.09
x2[1] (analytic) = 2.0018701261998561964681946539286
x2[1] (numeric) = 2.5316784862181171908222103232964e+11736
absolute error = 2.5316784862181171908222103232964e+11736
relative error = 1.2646567092861286402284327146960e+11738 %
h = 0.001
x1[1] (analytic) = 3.0006051896886721200172299146716
x1[1] (numeric) = -2.8339424062324662226221774376785e+11738
absolute error = 2.8339424062324662226221774376785e+11738
relative error = 9.4445694354294641494984874083024e+11739 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3032.7MB, alloc=4.9MB, time=328.85
memory used=3036.5MB, alloc=4.9MB, time=329.13
NO POLE
NO POLE
t[1] = 1.091
x2[1] (analytic) = 2.0018735674487099387044528383454
x2[1] (numeric) = -2.0242857552016005374310024699449e+11756
absolute error = 2.0242857552016005374310024699449e+11756
relative error = 1.0111956060149462071586581449066e+11758 %
h = 0.001
x1[1] (analytic) = 3.0006045848014774524963552943896
x1[1] (numeric) = 2.2659706891011127168560625923482e+11758
absolute error = 2.2659706891011127168560625923482e+11758
relative error = 7.5517137465516179032114443774118e+11759 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3040.3MB, alloc=4.9MB, time=329.42
NO POLE
NO POLE
t[1] = 1.092
x2[1] (analytic) = 2.0018770158895434471768196761349
x2[1] (numeric) = 1.6185834184787844142285314820239e+11776
absolute error = 1.6185834184787844142285314820239e+11776
relative error = 8.0853289469411250317316726410449e+11777 %
h = 0.001
x1[1] (analytic) = 3.0006039805188676368350016396528
x1[1] (numeric) = -1.8118304566010937641103002198853e+11778
absolute error = 1.8118304566010937641103002198853e+11778
relative error = 6.0382191997485456625428256560928e+11779 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3044.1MB, alloc=4.9MB, time=329.71
NO POLE
NO POLE
t[1] = 1.093
x2[1] (analytic) = 2.0018804715364526312480508398454
x2[1] (numeric) = -1.2941909391214177480087595322520e+11796
absolute error = 1.2941909391214177480087595322520e+11796
relative error = 6.4648761877781851034707056251028e+11797 %
h = 0.001
x1[1] (analytic) = 3.0006033768402383903729964032778
x1[1] (numeric) = 1.4487078845532432761652459199884e+11798
absolute error = 1.4487078845532432761652459199884e+11798
relative error = 4.8280552362731579494478260315961e+11799 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3047.9MB, alloc=4.9MB, time=329.99
memory used=3051.8MB, alloc=4.9MB, time=330.28
NO POLE
NO POLE
t[1] = 1.094
x2[1] (analytic) = 2.001883934403561922602802070687
x2[1] (numeric) = 1.0348123969280186783234313316700e+11816
absolute error = 1.0348123969280186783234313316700e+11816
relative error = 5.1691927745867495476975898469833e+11817 %
h = 0.001
x1[1] (analytic) = 3.0006027737649860344307865691452
x1[1] (numeric) = -1.1583614389085252305161003546323e+11818
absolute error = 1.1583614389085252305161003546323e+11818
relative error = 3.8604291412257779464545101756204e+11819 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3055.6MB, alloc=4.9MB, time=330.57
NO POLE
NO POLE
t[1] = 1.095
x2[1] (analytic) = 2.0018874045050243320472142152763
x2[1] (numeric) = -8.2741785965745203519511696634773e+11835
absolute error = 8.2741785965745203519511696634773e+11835
relative error = 4.1331887987078615135033359617222e+11837 %
h = 0.001
x1[1] (analytic) = 3.0006021712925074937057599223403
x1[1] (numeric) = 9.2620550868611967860142748023725e+11837
absolute error = 9.2620550868611967860142748023725e+11837
relative error = 3.0867321151312679335111193703690e+11839 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3059.4MB, alloc=4.9MB, time=330.85
NO POLE
NO POLE
t[1] = 1.096
x2[1] (analytic) = 2.0018908818550215064225130978292
x2[1] (numeric) = 6.6158882181205742739608057593577e+11855
absolute error = 6.6158882181205742739608057593577e+11855
relative error = 3.3048195973549081986031430296781e+11857 %
h = 0.001
x1[1] (analytic) = 3.0006015694222002956691696962845
x1[1] (numeric) = -7.4057769492813537047903481673030e+11857
absolute error = 7.4057769492813537047903481673030e+11857
relative error = 2.4680974057836741237564054125309e+11859 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3063.2MB, alloc=4.9MB, time=331.14
memory used=3067.0MB, alloc=4.9MB, time=331.43
NO POLE
NO POLE
t[1] = 1.097
x2[1] (analytic) = 2.0018943664677637856328521838189
x2[1] (numeric) = -5.2899482895845682574702454556384e+11875
absolute error = 5.2899482895845682574702454556384e+11875
relative error = 2.6424712403374214334864034647293e+11877 %
h = 0.001
x1[1] (analytic) = 3.0006009681534625699636619937826
x1[1] (numeric) = 5.9215294778702887115772767442456e+11877
absolute error = 5.9215294778702887115772767442456e+11877
relative error = 1.9734478328567406952385752996100e+11879 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3070.8MB, alloc=4.9MB, time=331.72
NO POLE
NO POLE
t[1] = 1.098
x2[1] (analytic) = 2.0018978583574902597876264477776
x2[1] (numeric) = 4.2297499570553808589229236873712e+11895
absolute error = 4.2297499570553808589229236873712e+11895
relative error = 2.1128700145200167393029284306279e+11897 %
h = 0.001
x1[1] (analytic) = 3.0006003674856930478014053795129
x1[1] (numeric) = -4.7347512080672893425968998587333e+11897
absolute error = 4.7347512080672893425968998587333e+11897
relative error = 1.5779346224751353123378430261238e+11899 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3074.6MB, alloc=4.9MB, time=332.00
NO POLE
NO POLE
t[1] = 1.099
x2[1] (analytic) = 2.0019013575384688264584863155133
x2[1] (numeric) = -3.3820339481267406635961395133671e+11915
absolute error = 3.3820339481267406635961395133671e+11915
relative error = 1.6894108870005853969091164667270e+11917 %
h = 0.001
x1[1] (analytic) = 3.00059976741829106136282204209
x1[1] (numeric) = 3.7858240993435648954417942404592e+11917
absolute error = 3.7858240993435648954417942404592e+11917
relative error = 1.2616891264378384561922746482487e+11919 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3078.5MB, alloc=4.9MB, time=332.29
memory used=3082.3MB, alloc=4.9MB, time=332.58
NO POLE
NO POLE
t[1] = 1.1
x2[1] (analytic) = 2.0019048640249962480512810095053
x2[1] (numeric) = 2.7042150818401172463963255313071e+11935
absolute error = 2.7042150818401172463963255313071e+11935
relative error = 1.3508209757795722055915170041883e+11937 %
h = 0.001
x1[1] (analytic) = 3.0005991679506565431959199244316
x1[1] (numeric) = -3.0270786111739504503339734600274e+11937
absolute error = 3.0270786111739504503339734600274e+11937
relative error = 1.0088247185782494189034006786526e+11939 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3086.1MB, alloc=4.9MB, time=332.87
NO POLE
NO POLE
t[1] = 1.101
x2[1] (analytic) = 2.0019083778313982092931610856632
x2[1] (numeric) = -2.1622429937174326391037808304681e+11955
absolute error = 2.1622429937174326391037808304681e+11955
relative error = 1.0800908861072451621597633206459e+11957 %
h = 0.001
x1[1] (analytic) = 3.0005985690821900256162252217605
x1[1] (numeric) = 2.4203990142636705113136627768366e+11957
absolute error = 2.4203990142636705113136627768366e+11957
relative error = 8.0663872842011371817120075768988e+11958 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3089.9MB, alloc=4.9MB, time=333.15
NO POLE
NO POLE
t[1] = 1.102
x2[1] (analytic) = 2.0019118989720293748350704099714
x2[1] (numeric) = 1.7288916089835436375044156360367e+11975
absolute error = 1.7288916089835436375044156360367e+11975
relative error = 8.6362022717948769990487199966035e+11976 %
h = 0.001
x1[1] (analytic) = 3.0005979708122926401073146471753
x1[1] (numeric) = -1.9353086393671789840165807230483e+11977
absolute error = 1.9353086393671789840165807230483e+11977
relative error = 6.4497432118281113476243935206550e+11978 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3093.7MB, alloc=4.9MB, time=333.44
memory used=3097.5MB, alloc=4.9MB, time=333.73
NO POLE
NO POLE
t[1] = 1.103
x2[1] (analytic) = 2.0019154274612734469698582847953
x2[1] (numeric) = -1.3823914353283482284415173345034e+11995
absolute error = 1.3823914353283482284415173345034e+11995
relative error = 6.9053438340371161601407728974669e+11996 %
h = 0.001
x1[1] (analytic) = 3.0005973731403661167219468653215
x1[1] (numeric) = 1.5474388757957193752104985601248e+11997
absolute error = 1.5474388757957193752104985601248e+11997
relative error = 5.1571026811111292921941366051311e+11998 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3101.3MB, alloc=4.9MB, time=334.01
NO POLE
NO POLE
t[1] = 1.104
x2[1] (analytic) = 2.0019189633135432234662428968112
x2[1] (numeric) = 1.1053359681655789630645994699079e+12015
absolute error = 1.1053359681655789630645994699079e+12015
relative error = 5.5213821759100833619617843559399e+12016 %
h = 0.001
x1[1] (analytic) = 3.0005967760658127834837924952942
x1[1] (numeric) = -1.2373050094515737956807561220397e+12017
absolute error = 1.2373050094515737956807561220397e+12017
relative error = 4.1235297568833877150472614244718e+12018 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3105.2MB, alloc=4.9MB, time=334.30
NO POLE
NO POLE
memory used=3109.0MB, alloc=4.9MB, time=334.59
t[1] = 1.105
x2[1] (analytic) = 2.0019225065432806555188577216251
x2[1] (numeric) = -8.8380727144069815435815581383987e+12034
absolute error = 8.8380727144069815435815581383987e+12034
relative error = 4.4147926233506813440998312254754e+12036 %
h = 0.001
x1[1] (analytic) = 3.0005961795880355657897620845026
x1[1] (numeric) = 9.8932740437113041752746644960029e+12036
absolute error = 9.8932740437113041752746644960029e+12036
relative error = 3.2971027927755321150323639654686e+12038 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3112.8MB, alloc=4.9MB, time=334.88
NO POLE
NO POLE
t[1] = 1.106
x2[1] (analytic) = 2.0019260571649569058146129841797
x2[1] (numeric) = 7.0667680736726111357716982716630e+12054
absolute error = 7.0667680736726111357716982716630e+12054
relative error = 3.5299845608085392961381320761802e+12056 %
h = 0.001
x1[1] (analytic) = 3.0005955837064379858129314558247
x1[1] (numeric) = -7.9104885663846954200146680511135e+12056
absolute error = 7.9104885663846954200146680511135e+12056
relative error = 2.6363061418004855535424790281689e+12058 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3116.6MB, alloc=4.9MB, time=335.16
NO POLE
NO POLE
t[1] = 1.107
x2[1] (analytic) = 2.0019296151930724067156047390088
x2[1] (numeric) = -5.6504639213561094265985016787466e+12074
absolute error = 5.6504639213561094265985016787466e+12074
relative error = 2.8225087827631546691188178550375e+12076 %
h = 0.001
x1[1] (analytic) = 3.0005949884204241619060638309764
x1[1] (numeric) = 6.3250880428890523421133488352111e+12076
absolute error = 6.3250880428890523421133488352111e+12076
relative error = 2.1079446134177244365485823855301e+12078 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3120.4MB, alloc=4.9MB, time=335.45
memory used=3124.2MB, alloc=4.9MB, time=335.74
NO POLE
NO POLE
t[1] = 1.108
x2[1] (analytic) = 2.0019331806421569185588046002957
x2[1] (numeric) = 4.5180119389363460765856675750274e+12094
absolute error = 4.5180119389363460765856675750274e+12094
relative error = 2.2568245447068870606504537924405e+12096 %
h = 0.001
x1[1] (analytic) = 3.0005943937293988080057281336176
x1[1] (numeric) = -5.0574295651352177745708396900838e+12096
absolute error = 5.0574295651352177745708396900838e+12096
relative error = 1.6854759096078313758218494097795e+12098 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3128.1MB, alloc=4.9MB, time=336.02
NO POLE
NO POLE
t[1] = 1.109
x2[1] (analytic) = 2.0019367535267695880727636185079
x2[1] (numeric) = -3.6125231776495237959306654261530e+12114
absolute error = 3.6125231776495237959306654261530e+12114
relative error = 1.8045141392631001995094320205196e+12116 %
h = 0.001
x1[1] (analytic) = 3.0005937996327672330370128763147
x1[1] (numeric) = 4.0438320593907425649649221267442e+12116
absolute error = 4.0438320593907425649649221267442e+12116
relative error = 1.3476772697076338082458146647751e+12118 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3131.9MB, alloc=4.9MB, time=336.31
NO POLE
NO POLE
t[1] = 1.11
x2[1] (analytic) = 2.0019403338614990069115642681509
x2[1] (numeric) = 2.8885102309241325517594511687142e+12134
absolute error = 2.8885102309241325517594511687142e+12134
relative error = 1.4428553049593382358913186789584e+12136 %
h = 0.001
x1[1] (analytic) = 3.0005932061299353403188350360709
x1[1] (numeric) = -3.2333772549769883006623356732458e+12136
absolute error = 3.2333772549769883006623356732458e+12136
relative error = 1.0775793427684554525513278870374e+12138 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3135.7MB, alloc=4.9MB, time=336.59
memory used=3139.5MB, alloc=4.9MB, time=336.88
NO POLE
NO POLE
t[1] = 1.111
x2[1] (analytic) = 2.0019439216609632703062549798668
x2[1] (numeric) = -2.3096021655373988468312166004403e+12154
absolute error = 2.3096021655373988468312166004403e+12154
relative error = 1.1536797512395747600793062098068e+12156 %
h = 0.001
x1[1] (analytic) = 3.0005926132203096269698433237353
x1[1] (numeric) = 2.5853517948956734908885898458013e+12156
absolute error = 2.5853517948956734908885898458013e+12156
relative error = 8.6161373040274550970890690155624e+12157 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3143.3MB, alloc=4.9MB, time=337.16
NO POLE
NO POLE
t[1] = 1.112
x2[1] (analytic) = 2.0019475169398100358340021197467
x2[1] (numeric) = 1.8467174206090419915952640983963e+12174
absolute error = 1.8467174206090419915952640983963e+12174
relative error = 9.2246045662173313278915306234433e+12175 %
h = 0.001
x1[1] (analytic) = 3.0005920209032971833149152531931
x1[1] (numeric) = -2.0672019923075293608241669208824e+12176
absolute error = 2.0672019923075293608241669208824e+12176
relative error = 6.8893137684383350077157963305620e+12177 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3147.1MB, alloc=4.9MB, time=337.45
NO POLE
NO POLE
t[1] = 1.113
x2[1] (analytic) = 2.0019511197127165823051947892928
x2[1] (numeric) = -1.4766028896528111026536056638068e+12194
absolute error = 1.4766028896528111026536056638068e+12194
relative error = 7.3758188954418934499841968744547e+12195 %
h = 0.001
x1[1] (analytic) = 3.000591429178305692292247416834
x1[1] (numeric) = 1.6528984896512545241541572242894e+12196
absolute error = 1.6528984896512545241541572242894e+12196
relative error = 5.5085756547131478345243664798978e+12197 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3150.9MB, alloc=4.9MB, time=337.73
memory used=3154.8MB, alloc=4.9MB, time=338.02
NO POLE
NO POLE
t[1] = 1.114
x2[1] (analytic) = 2.0019547299943898687687382909841
x2[1] (numeric) = 1.1806657961844302057911860593306e+12214
absolute error = 1.1806657961844302057911860593306e+12214
relative error = 5.8975649074129604174352789245470e+12215 %
h = 0.001
x1[1] (analytic) = 3.0005908380447434288610383743889
x1[1] (numeric) = -1.3216286687309648933136501820584e+12216
absolute error = 1.3216286687309648933136501820584e+12216
relative error = 4.4045614349478240164871958310972e+12217 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3158.6MB, alloc=4.9MB, time=338.31
NO POLE
NO POLE
t[1] = 1.115
x2[1] (analytic) = 2.0019583477995665936357725768552
x2[1] (numeric) = -9.4403968192665164274949950529079e+12233
absolute error = 9.4403968192665164274949950529079e+12233
relative error = 4.7155810357607282234420741010633e+12235 %
h = 0.001
x1[1] (analytic) = 3.0005902475020192594097635628181
x1[1] (numeric) = 1.0567511247349011220830478908602e+12236
absolute error = 1.0567511247349011220830478908602e+12236
relative error = 3.5218108357668718214951638028142e+12237 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3162.4MB, alloc=4.9MB, time=338.59
NO POLE
NO POLE
t[1] = 1.116
x2[1] (analytic) = 2.0019619731430132539220524709055
x2[1] (numeric) = 7.5483758734462292555862186661041e+12253
absolute error = 7.5483758734462292555862186661041e+12253
relative error = 3.7704891375112045323315380257837e+12255 %
h = 0.001
x1[1] (analytic) = 3.0005896575495426411650416355255
x1[1] (numeric) = -8.4495968198144646051701719077793e+12255
absolute error = 8.4495968198144646051701719077793e+12255
relative error = 2.8159787855547367788223018139639e+12257 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3166.2MB, alloc=4.9MB, time=338.88
memory used=3170.0MB, alloc=4.9MB, time=339.17
NO POLE
NO POLE
t[1] = 1.117
x2[1] (analytic) = 2.0019656060395262046092269305036
x2[1] (numeric) = -6.0355490788841756042831157694238e+12273
absolute error = 6.0355490788841756042831157694238e+12273
relative error = 3.0148115735236120460951395984614e+12275 %
h = 0.001
x1[1] (analytic) = 3.0005890681867236216010916397656
x1[1] (numeric) = 6.7561495555852084376043449016612e+12275
absolute error = 6.7561495555852084376043449016612e+12275
relative error = 2.2516077350331731885433636003690e+12277 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3173.8MB, alloc=4.9MB, time=339.45
NO POLE
NO POLE
t[1] = 1.118
x2[1] (analytic) = 2.0019692465039317181252550872573
x2[1] (numeric) = 4.8259192830825999093718877848420e+12293
absolute error = 4.8259192830825999093718877848420e+12293
relative error = 2.4105861223943242847521841998746e+12295 %
h = 0.001
x1[1] (analytic) = 3.0005884794129728378497804416998
x1[1] (numeric) = -5.4020987972342673279413050503618e+12295
absolute error = 5.4020987972342673279413050503618e+12295
relative error = 1.8003464434720217253983214111888e+12297 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3177.6MB, alloc=4.9MB, time=339.74
NO POLE
NO POLE
t[1] = 1.119
x2[1] (analytic) = 2.0019728945510860439441972840656
x2[1] (numeric) = -3.8587204945956846636980873636190e+12313
absolute error = 3.8587204945956846636980873636190e+12313
relative error = 1.9274589107066546315245791036805e+12315 %
h = 0.001
x1[1] (analytic) = 3.0005878912277015161112598091492
x1[1] (numeric) = 4.3194235377686447040265551894320e+12315
absolute error = 4.3194235377686447040265551894320e+12315
relative error = 1.4395257510691802321970054465417e+12317 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3181.5MB, alloc=4.9MB, time=340.03
memory used=3185.3MB, alloc=4.9MB, time=340.32
NO POLE
NO POLE
t[1] = 1.12
x2[1] (analytic) = 2.0019765501958754683056198022813
x2[1] (numeric) = 3.0853652914604527964807350371933e+12333
absolute error = 3.0853652914604527964807350371933e+12333
relative error = 1.5411595561189652529607559967517e+12335 %
h = 0.001
x1[1] (analytic) = 3.0005873036303214710651925626827
x1[1] (numeric) = -3.4537353719228354691861598942393e+12335
absolute error = 3.4537353719228354691861598942393e+12335
relative error = 1.1510197912736162041692886664349e+12337 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3189.1MB, alloc=4.9MB, time=340.60
NO POLE
NO POLE
t[1] = 1.121
x2[1] (analytic) = 2.0019802134532163740538524510674
x2[1] (numeric) = -2.4670040224684095433622736875448e+12353
absolute error = 2.4670040224684095433622736875448e+12353
relative error = 1.2322819206155256837639822802855e+12355 %
h = 0.001
x1[1] (analytic) = 3.0005867166202451052825672062637
x1[1] (numeric) = 2.7615462838897612644320756322150e+12355
absolute error = 2.7615462838897612644320756322150e+12355
relative error = 9.2033543593109998793906315969763e+12356 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3192.9MB, alloc=4.9MB, time=340.89
NO POLE
NO POLE
t[1] = 1.122
x2[1] (analytic) = 2.0019838843380553005973386701511
x2[1] (numeric) = 1.9725731872722477251439364681674e+12373
absolute error = 1.9725731872722477251439364681674e+12373
relative error = 9.8530922386743784561259700208700e+12374 %
h = 0.001
x1[1] (analytic) = 3.0005861301968854086381004492724
x1[1] (numeric) = -2.2080840182667404670395587035282e+12375
absolute error = 2.2080840182667404670395587035282e+12375
relative error = 7.3588423143242870332925603943680e+12376 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3196.7MB, alloc=4.9MB, time=341.17
memory used=3200.5MB, alloc=4.9MB, time=341.46
NO POLE
NO POLE
t[1] = 1.123
x2[1] (analytic) = 2.0019875628653690039883182772556
x2[1] (numeric) = -1.5772349553172322268554078257313e+12393
absolute error = 1.5772349553172322268554078257313e+12393
relative error = 7.8783454231843256260036307502518e+12394 %
h = 0.001
x1[1] (analytic) = 3.0005855443596559577232270323051
x1[1] (numeric) = 1.7655452889449476736563571856577e+12395
absolute error = 1.7655452889449476736563571856577e+12395
relative error = 5.8840025149882079738465911228950e+12396 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3204.3MB, alloc=4.9MB, time=341.75
NO POLE
NO POLE
t[1] = 1.124
x2[1] (analytic) = 2.0019912490501645171230834725233
x2[1] (numeric) = 1.2611294325229069029629313630454e+12413
absolute error = 1.2611294325229069029629313630454e+12413
relative error = 6.2993753500233526280605321538736e+12414 %
h = 0.001
x1[1] (analytic) = 3.0005849591079709152596762697401
x1[1] (numeric) = -1.4116990755462917803807415139291e+12415
absolute error = 1.4116990755462917803807415139291e+12415
relative error = 4.7047462237695440130887198030518e+12416 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3208.2MB, alloc=4.9MB, time=342.04
NO POLE
NO POLE
t[1] = 1.125
x2[1] (analytic) = 2.0019949429074792100630491942501
x2[1] (numeric) = -1.0083769955857081011110695267459e+12433
absolute error = 1.0083769955857081011110695267459e+12433
relative error = 5.0368608530112033135309451471203e+12434 %
h = 0.001
x1[1] (analytic) = 3.0005843744412450295136347226475
x1[1] (numeric) = 1.1287698437286568145290094066266e+12435
absolute error = 1.1287698437286568145290094066266e+12435
relative error = 3.7618333726704523149465499036477e+12436 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3212.0MB, alloc=4.9MB, time=342.32
memory used=3215.8MB, alloc=4.9MB, time=342.61
NO POLE
NO POLE
t[1] = 1.126
x2[1] (analytic) = 2.0019986444523808504768794032085
x2[1] (numeric) = 8.0628057596934229375342149743749e+12452
absolute error = 8.0628057596934229375342149743749e+12452
relative error = 4.0273782312669309420779060480147e+12454 %
h = 0.001
x1[1] (analytic) = 3.0005837903588936337104944162043
x1[1] (numeric) = -9.0254458771120441239275070714561e+12454
absolute error = 9.0254458771120441239275070714561e+12454
relative error = 3.0078966320192408863998308216764e+12456 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3219.6MB, alloc=4.9MB, time=342.89
NO POLE
NO POLE
t[1] = 1.127
x2[1] (analytic) = 2.0020023536999676642039113567721
x2[1] (numeric) = -6.4468782016179918001984722712218e+12472
absolute error = 6.4468782016179918001984722712218e+12472
relative error = 3.2202150960029093238608904198781e+12474 %
h = 0.001
x1[1] (analytic) = 3.000583206860332645450186016365
x1[1] (numeric) = 7.2165883712482060470933084486472e+12474
absolute error = 7.2165883712482060470933084486472e+12474
relative error = 2.4050619075480664320231517523460e+12476 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3223.4MB, alloc=4.9MB, time=343.19
NO POLE
NO POLE
t[1] = 1.128
x2[1] (analytic) = 2.0020060706653683959391204189545
x2[1] (numeric) = 5.1548108419366881656172007957095e+12492
absolute error = 5.1548108419366881656172007957095e+12492
relative error = 2.5748227827418537551370916736866e+12494 %
h = 0.001
x1[1] (analytic) = 3.0005826239449785661230963811179
x1[1] (numeric) = -5.7702576060097193499453200675277e+12494
absolute error = 5.7702576060097193499453200675277e+12494
relative error = 1.9230457311731496861075355261813e+12496 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3227.2MB, alloc=4.9MB, time=343.47
memory used=3231.1MB, alloc=4.9MB, time=343.76
NO POLE
NO POLE
t[1] = 1.129
x2[1] (analytic) = 2.0020097953637423700398684383412
x2[1] (numeric) = -4.1216964219176898502327964025184e+12512
absolute error = 4.1216964219176898502327964025184e+12512
relative error = 2.0587793483641894822346112345634e+12514 %
h = 0.001
x1[1] (analytic) = 3.0005820416122484803265699022475
x1[1] (numeric) = 4.6137968700512217781706035731266e+12514
absolute error = 4.6137968700512217781706035731266e+12514
relative error = 1.5376339676992047017814739439508e+12516 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3234.9MB, alloc=4.9MB, time=344.04
NO POLE
NO POLE
t[1] = 1.13
x2[1] (analytic) = 2.0020135278102795514546792127409
x2[1] (numeric) = 3.2956362348431911597026133170480e+12532
absolute error = 3.2956362348431911597026133170480e+12532
relative error = 1.6461608221238260929741727651087e+12534 %
h = 0.001
x1[1] (analytic) = 3.0005814598615600552819930541028
x1[1] (numeric) = -3.6891111301380943749741433145101e+12534
absolute error = 3.6891111301380943749741433145101e+12534
relative error = 1.2294654151160093814201948426926e+12536 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3238.7MB, alloc=4.9MB, time=344.32
NO POLE
NO POLE
memory used=3242.5MB, alloc=4.9MB, time=344.61
t[1] = 1.131
x2[1] (analytic) = 2.0020172680202006067742850471958
x2[1] (numeric) = -2.6351329842380865243425083611715e+12552
absolute error = 2.6351329842380865243425083611715e+12552
relative error = 1.3162388888103724888194261707378e+12554 %
h = 0.001
x1[1] (analytic) = 3.0005808786923315402524615664553
x1[1] (numeric) = 2.9497486156900697108891487593257e+12554
absolute error = 2.9497486156900697108891487593257e+12554
relative error = 9.8305919251727859140690029147974e+12555 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3246.3MB, alloc=4.9MB, time=344.90
NO POLE
NO POLE
t[1] = 1.132
x2[1] (analytic) = 2.0020210160087569654051889007868
x2[1] (numeric) = 2.1070061589943408165706626621400e+12572
absolute error = 2.1070061589943408165706626621400e+12572
relative error = 1.0524395808765698988895504348170e+12574 %
h = 0.001
x1[1] (analytic) = 3.0005802981039817659610296391163
x1[1] (numeric) = -2.3585673049214371852132452809600e+12574
absolute error = 2.3585673049214371852132452809600e+12574
relative error = 7.8603705636932221967857290652965e+12575 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3250.1MB, alloc=4.9MB, time=345.18
NO POLE
NO POLE
t[1] = 1.133
x2[1] (analytic) = 2.0020247717912308808659871074358
x2[1] (numeric) = -1.6847252038491333475951508010501e+12592
absolute error = 1.6847252038491333475951508010501e+12592
relative error = 8.4151066839287580432466592246059e+12593 %
h = 0.001
x1[1] (analytic) = 3.0005797180959301440095406165601
x1[1] (numeric) = 1.8858690880487083527122859119919e+12594
absolute error = 1.8858690880487083527122859119919e+12594
relative error = 6.2850157810352036306558533636399e+12595 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3253.9MB, alloc=4.9MB, time=345.47
memory used=3257.8MB, alloc=4.9MB, time=345.76
NO POLE
NO POLE
t[1] = 1.134
x2[1] (analytic) = 2.0020285353829354922066981466669
x2[1] (numeric) = 1.3470767517068882317182408490353e+12612
absolute error = 1.3470767517068882317182408490353e+12612
relative error = 6.7285591983294474814906747694817e+12613 %
h = 0.001
x1[1] (analytic) = 3.0005791386675966662980385413845
x1[1] (numeric) = -1.5079078768863593590197274483072e+12614
absolute error = 1.5079078768863593590197274483072e+12614
relative error = 5.0253894571697379913402063586086e+12615 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3261.6MB, alloc=4.9MB, time=346.05
NO POLE
NO POLE
t[1] = 1.135
x2[1] (analytic) = 2.0020323067992148855513434320148
x2[1] (numeric) = -1.0770989659579401186478457200813e+12632
absolute error = 1.0770989659579401186478457200813e+12632
relative error = 5.3800278961530418017098016350686e+12633 %
h = 0.001
x1[1] (analytic) = 3.0005785598184019044447600060215
x1[1] (numeric) = 1.2056967154218503170942998840904e+12634
absolute error = 1.2056967154218503170942998840904e+12634
relative error = 4.0182141256612202160426821934132e+12635 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3265.4MB, alloc=4.9MB, time=346.33
NO POLE
NO POLE
t[1] = 1.136
x2[1] (analytic) = 2.0020360860554441557640265774901
x2[1] (numeric) = 8.6122945926996469780643615707976e+12651
absolute error = 8.6122945926996469780643615707976e+12651
relative error = 4.3017679115206213560315020915370e+12653 %
h = 0.001
x1[1] (analytic) = 3.0005779815477670092067057226879
x1[1] (numeric) = -9.6405396633430678665814399729248e+12653
absolute error = 9.6405396633430678665814399729248e+12653
relative error = 3.2128942232556996181633859455237e+12655 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3269.2MB, alloc=4.9MB, time=346.62
memory used=3273.0MB, alloc=4.9MB, time=346.91
NO POLE
NO POLE
t[1] = 1.137
x2[1] (analytic) = 2.0020398731670294682387580962168
x2[1] (numeric) = -6.8862398438455025444172031627185e+12671
absolute error = 6.8862398438455025444172031627185e+12671
relative error = 3.4396117360800366163296504392053e+12673 %
h = 0.001
x1[1] (analytic) = 3.0005774038551137099007912321484
x1[1] (numeric) = 7.7084065844844683597989568257544e+12673
absolute error = 7.7084065844844683597989568257544e+12673
relative error = 2.5689744162509455237933721433061e+12675 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3276.8MB, alloc=4.9MB, time=347.20
NO POLE
NO POLE
t[1] = 1.138
x2[1] (analytic) = 2.0020436681494081208132729800458
x2[1] (numeric) = 5.5061167121665725468747524683453e+12691
absolute error = 5.5061167121665725468747524683453e+12691
relative error = 2.7502480589028106816617807294267e+12693 %
h = 0.001
x1[1] (analytic) = 3.0005768267398643138255761724423
x1[1] (numeric) = -6.1635068312263429464626721211512e+12693
absolute error = 6.1635068312263429464626721211512e+12693
relative error = 2.0541073223987440879649164341825e+12695 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3280.6MB, alloc=4.9MB, time=347.48
NO POLE
NO POLE
t[1] = 1.139
x2[1] (analytic) = 2.0020474710180486058070891046346
x2[1] (numeric) = -4.4025944398517839877844910575427e+12711
absolute error = 4.4025944398517839877844910575427e+12711
relative error = 2.1990459784717533672144329626364e+12713 %
h = 0.001
x1[1] (analytic) = 3.0005762502014417056835715293017
x1[1] (numeric) = 4.9282320596630094222518701575922e+12713
absolute error = 4.9282320596630094222518701575922e+12713
relative error = 1.6424285366293077259309407883764e+12715 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3284.5MB, alloc=4.9MB, time=347.76
memory used=3288.3MB, alloc=4.9MB, time=348.05
NO POLE
NO POLE
t[1] = 1.14
x2[1] (analytic) = 2.0020512817884506721840549011547
x2[1] (numeric) = 3.5202373678321457116001193009432e+12731
absolute error = 3.5202373678321457116001193009432e+12731
relative error = 1.7583152838560087033716455246798e+12733 %
h = 0.001
x1[1] (analytic) = 3.0005756742392693470041242905698
x1[1] (numeric) = -3.9405279979316368091310953609070e+12733
absolute error = 3.9405279979316368091310953609070e+12733
relative error = 1.3132573298391055960324074449785e+12735 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3292.1MB, alloc=4.9MB, time=348.34
NO POLE
NO POLE
t[1] = 1.141
x2[1] (analytic) = 2.0020551004761453878396352334586
x2[1] (numeric) = -2.8147201145102477661092595999414e+12751
absolute error = 2.8147201145102477661092595999414e+12751
relative error = 1.4059154085423661060273193640958e+12753 %
h = 0.001
x1[1] (analytic) = 3.0005750988527712755668789275029
x1[1] (numeric) = 3.1507771376222279753329054043857e+12753
absolute error = 3.1507771376222279753329054043857e+12753
relative error = 1.0500577502049138475759535547778e+12755 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3295.9MB, alloc=4.9MB, time=348.62
NO POLE
NO POLE
t[1] = 1.142
x2[1] (analytic) = 2.0020589270966952020131849182029
x2[1] (numeric) = 2.2506008814705461380337056256073e+12771
absolute error = 2.2506008814705461380337056256073e+12771
relative error = 1.1241431763121360345995751407082e+12773 %
h = 0.001
x1[1] (analytic) = 3.0005745240413721048258151264181
x1[1] (numeric) = -2.5193061884533647047994034552291e+12773
absolute error = 2.5193061884533647047994034552291e+12773
relative error = 8.3960793783591703826072657319582e+12774 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3299.7MB, alloc=4.9MB, time=348.91
memory used=3303.5MB, alloc=4.9MB, time=349.20
NO POLE
NO POLE
t[1] = 1.143
x2[1] (analytic) = 2.0020627616656940078254598250843
x2[1] (numeric) = -1.7995410277434737077424942266102e+12791
absolute error = 1.7995410277434737077424942266102e+12791
relative error = 8.9884346395128768883636525702680e+12792 %
h = 0.001
x1[1] (analytic) = 3.000573949804497023333861194724
x1[1] (numeric) = 2.0143930827075849215391999259112e+12793
absolute error = 2.0143930827075849215391999259112e+12793
relative error = 6.7133592319523839526327267189358e+12794 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3307.3MB, alloc=4.9MB, time=349.49
NO POLE
NO POLE
t[1] = 1.144
x2[1] (analytic) = 2.0020666041987672049416159950124
x2[1] (numeric) = 1.4388814725852662139326500536544e+12811
absolute error = 1.4388814725852662139326500536544e+12811
relative error = 7.1869810403291288335040286477541e+12812 %
h = 0.001
x1[1] (analytic) = 3.000573376141571794168082565948
x1[1] (numeric) = -1.6106734109009954889974860742239e+12813
absolute error = 1.6106734109009954889974860742239e+12813
relative error = 5.3678854305244671072782329506646e+12814 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3311.2MB, alloc=4.9MB, time=349.77
NO POLE
NO POLE
t[1] = 1.145
x2[1] (analytic) = 2.0020704547115717623599477157023
x2[1] (numeric) = -1.1505044120862793900309385675876e+12831
absolute error = 1.1505044120862793900309385675876e+12831
relative error = 5.7465730508071794295688355651509e+12832 %
h = 0.001
x1[1] (analytic) = 3.000572803052022754355444828949
x1[1] (numeric) = 1.2878662356685815528479121262592e+12833
absolute error = 1.2878662356685815528479121262592e+12833
relative error = 4.2920679490217089499795372901172e+12834 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3315.0MB, alloc=4.9MB, time=350.06
memory used=3318.8MB, alloc=4.9MB, time=350.35
NO POLE
NO POLE
t[1] = 1.146
x2[1] (analytic) = 2.0020743132197962813266159968435
x2[1] (numeric) = 9.1992316771703863618815849222274e+12850
absolute error = 9.1992316771703863618815849222274e+12850
relative error = 4.5948502592673019134040478441420e+12852 %
h = 0.001
x1[1] (analytic) = 3.0005722305352768142991507070773
x1[1] (numeric) = -1.0297552748743505876385165725072e+12853
absolute error = 1.0297552748743505876385165725072e+12853
relative error = 3.4318629773183327750703771784169e+12854 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3322.6MB, alloc=4.9MB, time=350.63
NO POLE
NO POLE
t[1] = 1.147
x2[1] (analytic) = 2.0020781797391610583766193906748
x2[1] (numeric) = -7.3555444517416384038787609715707e+12870
absolute error = 7.3555444517416384038787609715707e+12870
relative error = 3.6739546568056342575654229180701e+12872 %
h = 0.001
x1[1] (analytic) = 3.0005716585907614572055504136201
x1[1] (numeric) = 8.2337427347884191118536984330539e+12872
absolute error = 8.2337427347884191118536984330539e+12872
relative error = 2.7440580234819159233840031516021e+12874 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3326.4MB, alloc=4.9MB, time=350.92
NO POLE
NO POLE
t[1] = 1.148
x2[1] (analytic) = 2.0020820542854181485012596084747
x2[1] (numeric) = 5.8813644530571480249167092265582e+12890
absolute error = 5.8813644530571480249167092265582e+12890
relative error = 2.9376240801260869795371561619931e+12892 %
h = 0.001
x1[1] (analytic) = 3.000571087217904738511624810442
x1[1] (numeric) = -6.5835564115904407450028361540699e+12892
absolute error = 6.5835564115904407450028361540699e+12892
relative error = 2.1941011294935322130938360834820e+12894 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3330.2MB, alloc=4.9MB, time=351.20
memory used=3334.0MB, alloc=4.9MB, time=351.49
NO POLE
NO POLE
t[1] = 1.149
x2[1] (analytic) = 2.002085936874351428442354889177
x2[1] (numeric) = -4.7026359580348827270885581615735e+12910
absolute error = 4.7026359580348827270885581615735e+12910
relative error = 2.3488681836388198251152174749528e+12912 %
h = 0.001
x1[1] (analytic) = 3.0005705164161352853130407973036
x1[1] (numeric) = 5.2640963436304623628952536781199e+12912
absolute error = 5.2640963436304623628952536781199e+12912
relative error = 1.7543651498375281378404233901755e+12914 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3337.9MB, alloc=4.9MB, time=351.78
NO POLE
NO POLE
t[1] = 1.15
x2[1] (analytic) = 2.0020898275217766601134545830171
x2[1] (numeric) = 3.7601453081703410668876226810594e+12930
absolute error = 3.7601453081703410668876226810594e+12930
relative error = 1.8781101909022321824891892714096e+12932 %
h = 0.001
x1[1] (analytic) = 3.0005699461848822957927783599144
x1[1] (numeric) = -4.2090791940718423703813927203787e+12932
absolute error = 4.2090791940718423703813927203787e+12932
relative error = 1.4027598988064039283835509393830e+12934 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3341.7MB, alloc=4.9MB, time=352.07
NO POLE
NO POLE
t[1] = 1.151
x2[1] (analytic) = 2.0020937262435415541483089208426
x2[1] (numeric) = -3.0065462997190293369528179761197e+12950
absolute error = 3.0065462997190293369528179761197e+12950
relative error = 1.5017010743848176483576644634377e+12952 %
h = 0.001
x1[1] (analytic) = 3.0005693765235755386503287053453
x1[1] (numeric) = 3.3655059682570565072501110849847e+12952
absolute error = 3.3655059682570565072501110849847e+12952
relative error = 1.1216224475890279932295708653882e+12954 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3345.5MB, alloc=4.9MB, time=352.35
memory used=3349.3MB, alloc=4.9MB, time=352.64
NO POLE
NO POLE
t[1] = 1.152
x2[1] (analytic) = 2.0020976330555258335768484484501
x2[1] (numeric) = 2.4039817378101949062485249608640e+12970
absolute error = 2.4039817378101949062485249608640e+12970
relative error = 1.2007315218395861754641933242412e+12972 %
h = 0.001
x1[1] (analytic) = 3.0005688074316453525314629140014
x1[1] (numeric) = -2.6909995987546485809178946130792e+12972
absolute error = 2.6909995987546485809178946130792e+12972
relative error = 8.9682982509507110093209817935828e+12973 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3353.1MB, alloc=4.9MB, time=352.93
NO POLE
NO POLE
t[1] = 1.153
x2[1] (analytic) = 2.0021015479736412976289281150681
x2[1] (numeric) = -1.9221816727934644960638388863123e+12990
absolute error = 1.9221816727934644960638388863123e+12990
relative error = 9.6008200719835366309971085717818e+12991 %
h = 0.001
x1[1] (analytic) = 3.0005682389085226454585705379204
x1[1] (numeric) = 2.1516761250160342342028701168206e+12992
absolute error = 2.1516761250160342342028701168206e+12992
relative error = 7.1708954894447634293899413441607e+12993 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3356.9MB, alloc=4.9MB, time=353.22
NO POLE
NO POLE
t[1] = 1.154
x2[1] (analytic) = 2.0021054710138318856660915158783
x2[1] (numeric) = 1.5369427833460525968215532707010e+13010
absolute error = 1.5369427833460525968215532707010e+13010
relative error = 7.6766324531732642499844767085474e+13011 %
h = 0.001
x1[1] (analytic) = 3.0005676709536388942615675757385
x1[1] (numeric) = -1.7204425259322120017978030483009e+13012
absolute error = 1.7204425259322120017978030483009e+13012
relative error = 5.7337234636851960462760284339510e+13013 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3360.8MB, alloc=4.9MB, time=353.50
memory used=3364.6MB, alloc=4.9MB, time=353.79
NO POLE
NO POLE
t[1] = 1.155
x2[1] (analytic) = 2.0021094021920737412416113002628
x2[1] (numeric) = -1.2289125178509207634788113945925e+13030
absolute error = 1.2289125178509207634788113945925e+13030
relative error = 6.1380887403326034459926189468559e+13031 %
h = 0.001
x1[1] (analytic) = 3.0005671035664261440093732552291
x1[1] (numeric) = 1.3756356965730391702649823125338e+13032
absolute error = 1.3756356965730391702649823125338e+13032
relative error = 4.5845856769474695249886120544032e+13033 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3368.4MB, alloc=4.9MB, time=354.08
NO POLE
NO POLE
t[1] = 1.156
x2[1] (analytic) = 2.0021133415243752762890622702866
x2[1] (numeric) = 9.8261691514813698109208340812885e+13049
absolute error = 9.8261691514813698109208340812885e+13049
relative error = 4.9078985428466755102237353753295e+13051 %
h = 0.001
x1[1] (analytic) = 3.0005665367463170074419550548927
x1[1] (numeric) = -1.0999341978370470885461880757731e+13052
absolute error = 1.0999341978370470885461880757731e+13052
relative error = 3.6657550644744828067122367390188e+13053 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3372.2MB, alloc=4.9MB, time=354.36
NO POLE
NO POLE
memory used=3376.0MB, alloc=4.9MB, time=354.65
t[1] = 1.157
x2[1] (analytic) = 2.0021172890267772354396842077708
x2[1] (numeric) = -7.8568326704307368226875836404307e+13069
absolute error = 7.8568326704307368226875836404307e+13069
relative error = 3.9242619368468257290383176088205e+13071 %
h = 0.001
x1[1] (analytic) = 3.0005659704927446644029413966419
x1[1] (numeric) = 8.7948811054074821489725211659237e+13071
absolute error = 8.7948811054074821489725211659237e+13071
relative error = 2.9310740679909833947094120445054e+13073 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3379.8MB, alloc=4.9MB, time=354.94
NO POLE
NO POLE
t[1] = 1.158
x2[1] (analytic) = 2.0021212447153527604687919831877
x2[1] (numeric) = 6.2821857286917906248775925823443e+13089
absolute error = 6.2821857286917906248775925823443e+13089
relative error = 3.1377648807602292519921599051125e+13091 %
h = 0.001
x1[1] (analytic) = 3.0005654048051428612728014421948
x1[1] (numeric) = -7.0322328199593593553081582610561e+13091
absolute error = 7.0322328199593593553081582610561e+13091
relative error = 2.3436359056522660742007340120287e+13093 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3383.6MB, alloc=4.9MB, time=355.22
NO POLE
NO POLE
t[1] = 1.159
x2[1] (analytic) = 2.0021252086062074548714910155136
x2[1] (numeric) = -5.0231256264765479844322452222134e+13109
absolute error = 5.0231256264765479844322452222134e+13109
relative error = 2.5088968486508542133477330915086e+13111 %
h = 0.001
x1[1] (analytic) = 3.0005648396829459104025914263565
x1[1] (numeric) = 5.6228501376451924635435643763276e+13111
absolute error = 5.6228501376451924635435643763276e+13111
relative error = 1.8739305557680699244184223867433e+13113 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3387.5MB, alloc=4.9MB, time=355.51
memory used=3391.3MB, alloc=4.9MB, time=355.79
NO POLE
NO POLE
t[1] = 1.16
x2[1] (analytic) = 2.0021291807154794485679566691147
x2[1] (numeric) = 4.0164032311441560997468842087612e+13129
absolute error = 4.0164032311441560997468842087612e+13129
relative error = 2.0060659770758933350532780511825e+13131 %
h = 0.001
x1[1] (analytic) = 3.0005642751255886895482669609347
x1[1] (numeric) = -4.4959324413549887880956852233708e+13131
absolute error = 4.4959324413549887880956852233708e+13131
relative error = 1.4983623175900177736272790548538e+13133 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3395.1MB, alloc=4.9MB, time=356.08
NO POLE
NO POLE
t[1] = 1.161
x2[1] (analytic) = 2.0021331610593394627385366917142
x2[1] (numeric) = -3.2114456445439514200959656294888e+13149
absolute error = 3.2114456445439514200959656294888e+13149
relative error = 1.6040120142881796107176844327425e+13151 %
h = 0.001
x1[1] (analytic) = 3.0005637111325066413055607436015
x1[1] (numeric) = 3.5948687982805556039717770276355e+13151
absolute error = 3.5948687982805556039717770276355e+13151
relative error = 1.1980644786654903671986437829304e+13153 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3398.9MB, alloc=4.9MB, time=356.36
NO POLE
NO POLE
t[1] = 1.162
x2[1] (analytic) = 2.0021371496539908747889363164975
x2[1] (numeric) = 2.5678156634990888649164376200360e+13169
absolute error = 2.5678156634990888649164376200360e+13169
relative error = 1.2825373446283929597839130922643e+13171 %
h = 0.001
x1[1] (analytic) = 3.0005631477031357725454251065801
x1[1] (numeric) = -2.8743940985368352647303720683485e+13171
absolute error = 2.8743940985368352647303720683485e+13171
relative error = 9.5795154344181021369164089249764e+13172 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3402.7MB, alloc=4.9MB, time=356.65
memory used=3406.5MB, alloc=4.9MB, time=356.94
NO POLE
NO POLE
t[1] = 1.163
x2[1] (analytic) = 2.0021411465156697834457461714614
x2[1] (numeric) = -2.0531804089269012018883561005710e+13189
absolute error = 2.0531804089269012018883561005710e+13189
relative error = 1.0254923397883586520649936456632e+13191 %
h = 0.001
x1[1] (analytic) = 3.0005625848369126538500388405975
x1[1] (numeric) = 2.2983151534362564075354868803234e+13191
absolute error = 2.2983151534362564075354868803234e+13191
relative error = 7.6596141172012081908506472324304e+13192 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3410.3MB, alloc=4.9MB, time=357.22
NO POLE
NO POLE
t[1] = 1.164
x2[1] (analytic) = 2.0021451516606450739825736602035
x2[1] (numeric) = 1.6416870772790708305020573692114e+13209
absolute error = 1.6416870772790708305020573692114e+13209
relative error = 8.1996406500168159392154360085569e+13210 %
h = 0.001
x1[1] (analytic) = 3.0005620225332744189493777301105
x1[1] (numeric) = -1.8376925235142841852929553189971e+13211
absolute error = 1.8376925235142841852929553189971e+13211
relative error = 6.1244943770993331837295297168913e+13212 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3414.2MB, alloc=4.9MB, time=357.51
NO POLE
NO POLE
t[1] = 1.165
x2[1] (analytic) = 2.0021491651052184835770390004766
x2[1] (numeric) = -1.3126642198547551297423234983944e+13229
absolute error = 1.3126642198547551297423234983944e+13229
relative error = 6.5562758396463981222212596031782e+13230 %
h = 0.001
x1[1] (analytic) = 3.0005614607916587641583482363765
x1[1] (numeric) = 1.4693867400783170804677118631288e+13231
absolute error = 1.4693867400783170804677118631288e+13231
relative error = 4.8970393017400105922265499136292e+13232 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3418.0MB, alloc=4.9MB, time=357.80
memory used=3421.8MB, alloc=4.9MB, time=358.10
NO POLE
NO POLE
t[1] = 1.166
x2[1] (analytic) = 2.0021531868657246667988976300168
x2[1] (numeric) = 1.0495833084967293226650821016110e+13249
absolute error = 1.0495833084967293226650821016110e+13249
relative error = 5.2422727460719523587386175033835e+13250 %
h = 0.001
x1[1] (analytic) = 3.0005608996115039478144837655011
x1[1] (numeric) = -1.1748958894326161351067194189146e+13251
absolute error = 1.1748958894326161351067194189146e+13251
relative error = 3.9155875475973014429720499734818e+13252 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3425.6MB, alloc=4.9MB, time=358.38
NO POLE
NO POLE
t[1] = 1.167
x2[1] (analytic) = 2.0021572169585312612295512133691
x2[1] (numeric) = -8.3922842171841485768738200463995e+13268
absolute error = 8.3922842171841485768738200463995e+13268
relative error = 4.1916209906496917283593128884275e+13270 %
h = 0.001
x1[1] (analytic) = 3.0005603389922487897162029591597
x1[1] (numeric) = 9.3942616559346727457660709342692e+13270
absolute error = 9.3942616559346727457660709342692e+13270
relative error = 3.1308357755237730989105733454147e+13272 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3429.4MB, alloc=4.9MB, time=358.67
NO POLE
NO POLE
t[1] = 1.168
x2[1] (analytic) = 2.0021612554000389532132100087179
x2[1] (numeric) = 6.7103234028056792888900547786442e+13288
absolute error = 6.7103234028056792888900547786442e+13288
relative error = 3.3515399345118846392997700991004e+13290 %
h = 0.001
x1[1] (analytic) = 3.0005597789333326705616294462509
x1[1] (numeric) = -7.5114870052684774459777850080884e+13290
absolute error = 7.5114870052684774459777850080884e+13290
relative error = 2.5033618920062748391374841333187e+13292 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3433.2MB, alloc=4.9MB, time=358.96
memory used=3437.0MB, alloc=4.9MB, time=359.25
NO POLE
NO POLE
t[1] = 1.169
x2[1] (analytic) = 2.0021653022066815437399698800462
x2[1] (numeric) = -5.3654570084793816159850492283334e+13308
absolute error = 5.3654570084793816159850492283334e+13308
relative error = 2.6798271863795943438778935966081e+13310 %
h = 0.001
x1[1] (analytic) = 3.0005592194341955313879724943023
x1[1] (numeric) = 6.0060533862896227056906042079632e+13310
absolute error = 6.0060533862896227056906042079632e+13310
relative error = 2.0016446758955026416328330630269e+13312 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3440.9MB, alloc=4.9MB, time=359.53
NO POLE
NO POLE
t[1] = 1.17
x2[1] (analytic) = 2.0021693573949260144610677673311
x2[1] (numeric) = 4.2901254055510646430425144980329e+13328
absolute error = 4.2901254055510646430425144980329e+13328
relative error = 2.1427385199487105422355952547829e+13330 %
h = 0.001
x1[1] (analytic) = 3.0005586604942778730114680000078
x1[1] (numeric) = -4.8023350441344104026784682034389e+13330
absolute error = 4.8023350441344104026784682034389e+13330
relative error = 1.6004803063384631184196711978335e+13332 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3444.7MB, alloc=4.9MB, time=359.82
NO POLE
NO POLE
t[1] = 1.171
x2[1] (analytic) = 2.0021734209812725938365799559143
x2[1] (numeric) = -3.4303090987902404148804773723686e+13348
absolute error = 3.4303090987902404148804773723686e+13348
relative error = 1.7132926962485763330288188388811e+13350 %
h = 0.001
x1[1] (analytic) = 3.0005581021130207554678792588388
x1[1] (numeric) = 3.8398629503972474368153789255745e+13350
absolute error = 3.8398629503972474368153789255745e+13350
relative error = 1.2797162460187591261333356897831e+13352 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3448.5MB, alloc=4.9MB, time=360.10
memory used=3452.3MB, alloc=4.9MB, time=360.38
NO POLE
NO POLE
t[1] = 1.172
x2[1] (analytic) = 2.0021774929822548234158280156791
x2[1] (numeric) = 2.7428150463894523334330901092540e+13368
absolute error = 2.7428150463894523334330901092540e+13368
relative error = 1.3699160319218320847067034753449e+13370 %
h = 0.001
x1[1] (analytic) = 3.000557544289865797453556954229
x1[1] (numeric) = -3.0702871295584630600286399517339e+13370
absolute error = 3.0702871295584630600286399517339e+13370
relative error = 1.0232388761886251321286917126834e+13372 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3456.1MB, alloc=4.9MB, time=360.67
NO POLE
NO POLE
t[1] = 1.173
x2[1] (analytic) = 2.0021815734144396242507578112157
x2[1] (numeric) = -2.1931068489873130055788632100379e+13388
absolute error = 2.1931068489873130055788632100379e+13388
relative error = 1.0953586218692828764294744146387e+13390 %
h = 0.001
x1[1] (analytic) = 3.0005569870242551757670578073935
x1[1] (numeric) = 2.4549477884248771991459462332477e+13390
absolute error = 2.4549477884248771991459462332477e+13390
relative error = 8.1816402722599998626831470147264e+13391 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3459.9MB, alloc=4.9MB, time=360.96
NO POLE
NO POLE
t[1] = 1.174
x2[1] (analytic) = 2.0021856622944273634425575157709
x2[1] (numeric) = 1.7535698068327313234283974746239e+13408
absolute error = 1.7535698068327313234283974746239e+13408
relative error = 8.7582777154802323313298325048657e+13409 %
h = 0.001
x1[1] (analytic) = 3.0005564303156316247513213294
x1[1] (numeric) = -1.9629332337913630762041456889196e+13410
absolute error = 1.9629332337913630762041456889196e+13410
relative error = 6.5418974092911163992974603290383e+13411 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3463.8MB, alloc=4.9MB, time=361.24
memory used=3467.6MB, alloc=4.9MB, time=361.53
NO POLE
NO POLE
t[1] = 1.175
x2[1] (analytic) = 2.0021897596388519208217810944527
x2[1] (numeric) = -1.4021236898946784433090771866389e+13428
absolute error = 1.4021236898946784433090771866389e+13428
relative error = 7.0029510596817190578748626349063e+13429 %
h = 0.001
x1[1] (analytic) = 3.0005558741634384357364041176696
x1[1] (numeric) = 1.5695270174339698868477433376426e+13430
absolute error = 1.5695270174339698868477433376426e+13430
relative error = 5.2307875049037620890529813269236e+13431 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3471.4MB, alloc=4.9MB, time=361.84
NO POLE
NO POLE
t[1] = 1.176
x2[1] (analytic) = 2.00219386546438075576224425591
x2[1] (numeric) = 1.1211135331502634486108079209399e+13448
absolute error = 1.1211135331502634486108079209399e+13448
relative error = 5.5994254726688861636661443295196e+13449 %
h = 0.001
x1[1] (analytic) = 3.0005553185671194564827711396413
x1[1] (numeric) = -1.2549663004569647637475718102914e+13450
absolute error = 1.2549663004569647637475718102914e+13450
relative error = 4.1824468047343297400946907607641e+13451 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3475.2MB, alloc=4.9MB, time=362.13
NO POLE
NO POLE
t[1] = 1.177
x2[1] (analytic) = 2.0021979797877149741289604065084
x2[1] (numeric) = -8.9642273593357480361086606708538e+13467
absolute error = 8.9642273593357480361086606708538e+13467
relative error = 4.4771932894898780835837544396758e+13469 %
h = 0.001
x1[1] (analytic) = 3.0005547635261190906251434468904
x1[1] (numeric) = 1.0034490631817993620326867736902e+13470
absolute error = 1.0034490631817993620326867736902e+13470
relative error = 3.3442117950301645442315558083563e+13471 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3479.0MB, alloc=4.9MB, time=362.41
memory used=3482.8MB, alloc=4.9MB, time=362.71
NO POLE
NO POLE
t[1] = 1.178
x2[1] (analytic) = 2.0022021026255893953603846769178
x2[1] (numeric) = 7.1676391171609572053681522217609e+13487
absolute error = 7.1676391171609572053681522217609e+13487
relative error = 3.5798779292867926157644407951097e+13489 %
h = 0.001
x1[1] (analytic) = 3.0005542090398822971169017635503
x1[1] (numeric) = -8.0234028757090093020780723305627e+13489
absolute error = 8.0234028757090093020780723305627e+13489
relative error = 2.6739736451141600057260837067943e+13491 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3486.6MB, alloc=4.9MB, time=362.99
NO POLE
NO POLE
t[1] = 1.179
x2[1] (analytic) = 2.0022062339947726196852346279713
x2[1] (numeric) = -5.7311186401750092183935816309114e+13507
absolute error = 5.7311186401750092183935816309114e+13507
relative error = 2.8624017560570496560476417359828e+13509 %
h = 0.001
x1[1] (analytic) = 3.0005536551078545896750453934397
x1[1] (numeric) = 6.4153723460373089384981920144667e+13509
absolute error = 6.4153723460373089384981920144667e+13509
relative error = 2.1380628655369633926563633054509e+13511 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3490.5MB, alloc=4.9MB, time=363.28
NO POLE
NO POLE
t[1] = 1.18
x2[1] (analytic) = 2.0022103739120670954741567806905
x2[1] (numeric) = 4.5825020387984274216754412757201e+13527
absolute error = 4.5825020387984274216754412757201e+13527
relative error = 2.2887215541915284050897662818409e+13529 %
h = 0.001
x1[1] (analytic) = 3.0005531017294820362257058908545
x1[1] (numeric) = -5.1296193118886975212936464358054e+13529
absolute error = 5.1296193118886975212936464358054e+13529
relative error = 1.7095579174826293902680846643102e+13531 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3494.3MB, alloc=4.9MB, time=363.56
memory used=3498.1MB, alloc=4.9MB, time=363.86
NO POLE
NO POLE
t[1] = 1.181
x2[1] (analytic) = 2.0022145223943091867265086544755
x2[1] (numeric) = -3.6640883314449227286755064959971e+13547
absolute error = 3.6640883314449227286755064959971e+13547
relative error = 1.8300178579582442342354581016045e+13549 %
h = 0.001
x1[1] (analytic) = 3.0005525489042112583502149405385
x1[1] (numeric) = 4.1015537159202715496113041775136e+13549
absolute error = 4.1015537159202715496113041775136e+13549
relative error = 1.3669328062320192090193847713916e+13551 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3501.9MB, alloc=4.9MB, time=364.15
NO POLE
NO POLE
t[1] = 1.182
x2[1] (analytic) = 2.0022186794583692406925265376451
x2[1] (numeric) = 2.9297408243273000602921353207108e+13567
absolute error = 2.9297408243273000602921353207108e+13567
relative error = 1.4632471739399812902393669018418e+13569 %
h = 0.001
x1[1] (analytic) = 3.0005519966314894307317258929005
x1[1] (numeric) = -3.2795304800865127988093610810913e+13569
absolute error = 3.2795304800865127988093610810913e+13569
relative error = 1.0929757203901858940945893137972e+13571 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3505.7MB, alloc=4.9MB, time=364.43
NO POLE
NO POLE
memory used=3509.5MB, alloc=4.9MB, time=364.72
t[1] = 1.183
x2[1] (analytic) = 2.0022228451211516556311497557764
x2[1] (numeric) = -2.3425694255425266634637774654988e+13587
absolute error = 2.3425694255425266634637774654988e+13587
relative error = 1.1699843657516459515226462680738e+13589 %
h = 0.001
x1[1] (analytic) = 3.0005514449107642806023884010983
x1[1] (numeric) = 2.6222551049543639470063099319683e+13589
absolute error = 2.6222551049543639470063099319683e+13589
relative error = 8.7392439459819000672304807264260e+13590 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3513.3MB, alloc=4.9MB, time=365.01
NO POLE
NO POLE
t[1] = 1.184
x2[1] (analytic) = 2.0022270193995949487037727456448
x2[1] (numeric) = 1.8730774640267582271781036754602e+13607
absolute error = 1.8730774640267582271781036754602e+13607
relative error = 9.3549704697743784301545454177756e+13608 %
h = 0.001
x1[1] (analytic) = 3.000550893741484087191075607166
x1[1] (numeric) = -2.0967092323770169976130885783256e+13609
absolute error = 2.0967092323770169976130885783256e+13609
relative error = 6.9877476057823580201929706144293e+13610 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3517.2MB, alloc=4.9MB, time=365.29
NO POLE
NO POLE
t[1] = 1.185
x2[1] (analytic) = 2.0022312023106718240041967859993
x2[1] (numeric) = -1.4976799184649054623032336300787e+13627
absolute error = 1.4976799184649054623032336300787e+13627
relative error = 7.4800548345091729041709146337204e+13628 %
h = 0.001
x1[1] (analytic) = 3.0005503431230976811716633249103
x1[1] (numeric) = 1.6764919617580564646035830585893e+13629
absolute error = 1.6764919617580564646035830585893e+13629
relative error = 5.5872815651981158048867840288891e+13630 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3521.0MB, alloc=4.9MB, time=365.58
memory used=3524.8MB, alloc=4.9MB, time=365.87
NO POLE
NO POLE
t[1] = 1.186
x2[1] (analytic) = 2.0022353938713892407250537809324
x2[1] (numeric) = 1.1975186190916674219708573244374e+13647
absolute error = 1.1975186190916674219708573244374e+13647
relative error = 5.9809082526316999924302247343611e+13648 %
h = 0.001
x1[1] (analytic) = 3.0005497930550544441118606678556
x1[1] (numeric) = -1.3404935956012367997364136574108e+13649
absolute error = 1.3404935956012367997364136574108e+13649
relative error = 4.4674932530827735008169472540769e+13650 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3528.6MB, alloc=4.9MB, time=366.15
NO POLE
NO POLE
t[1] = 1.187
x2[1] (analytic) = 2.0022395940987884814609750372135
x2[1] (numeric) = -9.5751490381275189210406562921943e+13666
absolute error = 9.5751490381275189210406562921943e+13666
relative error = 4.7822194038857323326498834233971e+13668 %
h = 0.001
x1[1] (analytic) = 3.0005492435368043079225915710682
x1[1] (numeric) = 1.0718351896919239620951784517725e+13669
absolute error = 1.0718351896919239620951784517725e+13669
relative error = 3.5721299758724555821075812526112e+13670 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3532.4MB, alloc=4.9MB, time=366.44
NO POLE
NO POLE
t[1] = 1.188
x2[1] (analytic) = 2.0022438030099452206487785236628
x2[1] (numeric) = 7.6561213863962629289529086537272e+13686
absolute error = 7.6561213863962629289529086537272e+13686
relative error = 3.8237707989840809034815905577581e+13688 %
h = 0.001
x1[1] (analytic) = 3.0005486945677977543079266562412
x1[1] (numeric) = -8.5702063600434456260961818102304e+13688
absolute error = 8.5702063600434456260961818102304e+13688
relative error = 2.8562130571515045262653483757444e+13690 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3536.2MB, alloc=4.9MB, time=366.72
memory used=3540.0MB, alloc=4.9MB, time=367.01
NO POLE
NO POLE
t[1] = 1.189
x2[1] (analytic) = 2.0022480206219695931449486484403
x2[1] (numeric) = -6.1217005030239198792456535991599e+13706
absolute error = 6.1217005030239198792456535991599e+13706
relative error = 3.0574136870028227233630679671766e+13708 %
h = 0.001
x1[1] (analytic) = 3.000548146147485814215564889972
x1[1] (numeric) = 6.8525868305219857134592649844990e+13708
absolute error = 6.8525868305219857134592649844990e+13708
relative error = 2.2837783287431245261400725554970e+13710 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3543.9MB, alloc=4.9MB, time=367.29
NO POLE
NO POLE
t[1] = 1.19
x2[1] (analytic) = 2.0022522469520062629406831390182
x2[1] (numeric) = 4.8948044522009468742949370453103e+13726
absolute error = 4.8948044522009468742949370453103e+13726
relative error = 2.4446492491903667358265853348430e+13728 %
h = 0.001
x1[1] (analytic) = 3.0005475982753200672878644857138
x1[1] (numeric) = -5.4792083524118672579884917348433e+13728
absolute error = 5.4792083524118672579884917348433e+13728
relative error = 1.8260694666404401059465316144178e+13730 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3547.7MB, alloc=4.9MB, time=367.58
NO POLE
NO POLE
t[1] = 1.191
x2[1] (analytic) = 2.0022564820172344920147821596021
x2[1] (numeric) = -3.9137998687539833723252001242162e+13746
absolute error = 3.9137998687539833723252001242162e+13746
relative error = 1.9546945678062712868795221995431e+13748 %
h = 0.001
x1[1] (analytic) = 3.000547050950752641313422500432
x1[1] (numeric) = 4.3810789869047319030090333910578e+13748
absolute error = 4.3810789869047319030090333910578e+13748
relative error = 1.4600934138048407650430774103308e+13750 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3551.5MB, alloc=4.9MB, time=367.86
memory used=3555.3MB, alloc=4.9MB, time=368.15
NO POLE
NO POLE
t[1] = 1.192
x2[1] (analytic) = 2.0022607258348682093246553518592
x2[1] (numeric) = 3.1294057938864220756101564889723e+13766
absolute error = 3.1294057938864220756101564889723e+13766
relative error = 1.5629362118070693911104550118464e+13768 %
h = 0.001
x1[1] (analytic) = 3.0005465041732362116792025775455
x1[1] (numeric) = -3.5030339886690636745726467403940e+13768
absolute error = 3.5030339886690636745726467403940e+13768
relative error = 1.1674653213329488877130510056529e+13770 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3559.1MB, alloc=4.9MB, time=368.43
NO POLE
NO POLE
t[1] = 1.193
x2[1] (analytic) = 2.0022649784221560799357230370091
x2[1] (numeric) = -2.5022180364903821426708680544123e+13786
absolute error = 2.5022180364903821426708680544123e+13786
relative error = 1.2496937535521416519283175406849e+13788 %
h = 0.001
x1[1] (analytic) = 3.0005459579422240008232102882797
x1[1] (numeric) = 2.8009645939847402927875935281079e+13788
absolute error = 2.8009645939847402927875935281079e+13788
relative error = 9.3348498348135393579755920897182e+13789 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3562.9MB, alloc=4.9MB, time=368.72
NO POLE
NO POLE
t[1] = 1.194
x2[1] (analytic) = 2.0022692397963815742894883706372
x2[1] (numeric) = 2.0007296958321609428850430966095e+13806
absolute error = 2.0007296958321609428850430966095e+13806
relative error = 9.9923110042664532292115657860800e+13807 %
h = 0.001
x1[1] (analytic) = 3.0005454122571697776877155241075
x1[1] (numeric) = -2.2396022082951210445702849576049e+13808
absolute error = 2.2396022082951210445702849576049e+13808
relative error = 7.4639837115825325872223259267095e+13809 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3566.7MB, alloc=4.9MB, time=369.00
memory used=3570.6MB, alloc=4.9MB, time=369.29
NO POLE
NO POLE
t[1] = 1.195
x2[1] (analytic) = 2.0022735099748630376105577960015
x2[1] (numeric) = -1.5997484061777273487110941572611e+13826
absolute error = 1.5997484061777273487110941572611e+13826
relative error = 7.9896597453252574188196811066065e+13827 %
h = 0.001
x1[1] (analytic) = 3.0005448671175278571730213934997
x1[1] (numeric) = 1.7907466814011819744661221542261e+13828
absolute error = 1.7907466814011819744661221542261e+13828
relative error = 5.9680716693347165569676834340380e+13829 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3574.4MB, alloc=4.9MB, time=369.58
NO POLE
NO POLE
t[1] = 1.196
x2[1] (analytic) = 2.0022777889749537594528876971209
x2[1] (numeric) = 1.2791307933297487417896139976970e+13846
absolute error = 1.2791307933297487417896139976970e+13846
relative error = 6.3883782778441899187191016638371e+13847 %
h = 0.001
x1[1] (analytic) = 3.0005443225227530995917790767545
x1[1] (numeric) = -1.4318496673525236005521589296471e+13848
absolute error = 1.4318496673525236005521589296471e+13848
relative error = 4.7719663949128880028032025152271e+13849 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3578.2MB, alloc=4.9MB, time=369.88
NO POLE
NO POLE
t[1] = 1.197
x2[1] (analytic) = 2.002282076814042043385535709568
x2[1] (numeric) = -1.0227705682506040808182043463185e+13866
absolute error = 1.0227705682506040808182043463185e+13866
relative error = 5.1080243892408964443535432692328e+13867 %
h = 0.001
x1[1] (analytic) = 3.0005437784723009101238480932203
x1[1] (numeric) = 1.1448819038398801346329321139490e+13868
absolute error = 1.1448819038398801346329321139490e+13868
relative error = 3.8155814024576110608231768041266e+13869 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3582.0MB, alloc=4.9MB, time=370.16
memory used=3585.8MB, alloc=4.9MB, time=370.45
NO POLE
NO POLE
t[1] = 1.198
x2[1] (analytic) = 2.0022863735095512768181957046359
x2[1] (numeric) = 8.1778942445489117895315571462491e+13885
absolute error = 8.1778942445489117895315571462491e+13885
relative error = 4.0842780297280496472734695952642e+13887 %
h = 0.001
x1[1] (analytic) = 3.0005432349656272382717014357726
x1[1] (numeric) = -9.1542750864593296858582626742849e+13887
absolute error = 9.1542750864593296858582626742849e+13887
relative error = 3.0508725819323835212727483102852e+13889 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3589.6MB, alloc=4.9MB, time=370.74
NO POLE
NO POLE
t[1] = 1.199
x2[1] (analytic) = 2.0022906790789400009667960214068
x2[1] (numeric) = -6.5389009374230901875743986890392e+13905
absolute error = 6.5389009374230901875743986890392e+13905
relative error = 3.2657101217846177804653534066819e+13907 %
h = 0.001
x1[1] (analytic) = 3.0005426920021885773163750279489
x1[1] (numeric) = 7.3195979495794439928114412806088e+13907
absolute error = 7.3195979495794439928114412806088e+13907
relative error = 2.4394246977686745485749281754380e+13909 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3593.5MB, alloc=4.9MB, time=371.02
NO POLE
NO POLE
t[1] = 1.2
x2[1] (analytic) = 2.002294993539701980959441081236
x2[1] (numeric) = 5.2283906089801767766129100978337e+13925
absolute error = 5.2283906089801767766129100978337e+13925
relative error = 2.6111989621156224526801641538417e+13927 %
h = 0.001
x1[1] (analytic) = 3.0005421495814419637739609596927
x1[1] (numeric) = -5.8526222598156384023670528624102e+13927
absolute error = 5.8526222598156384023670528624102e+13927
relative error = 1.9505215951164175083611012748228e+13929 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3597.3MB, alloc=4.9MB, time=371.30
memory used=3601.1MB, alloc=4.9MB, time=371.60
NO POLE
NO POLE
t[1] = 1.201
x2[1] (analytic) = 2.0022993169093662760829770802648
x2[1] (numeric) = -4.1805295143139072080171922136094e+13945
absolute error = 4.1805295143139072080171922136094e+13945
relative error = 2.0878644261671783489873715718189e+13947 %
h = 0.001
x1[1] (analytic) = 3.000541607702844976852643958199
x1[1] (numeric) = 4.6796542039658840423995603619111e+13947
absolute error = 4.6796542039658840423995603619111e+13947
relative error = 1.5596031702918241814190224164381e+13949 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3604.9MB, alloc=4.9MB, time=371.88
NO POLE
NO POLE
t[1] = 1.202
x2[1] (analytic) = 2.0023036492054973101704630177982
x2[1] (numeric) = 3.3426781445961271994198911052393e+13965
absolute error = 3.3426781445961271994198911052393e+13965
relative error = 1.6694161976493839278060171291759e+13967 %
h = 0.001
x1[1] (analytic) = 3.0005410663658557379102805508965
x1[1] (numeric) = -3.7417695003240155209057294435651e+13967
absolute error = 3.7417695003240155209057294435651e+13967
relative error = 1.2470315911576268551311087383484e+13969 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3608.7MB, alloc=4.9MB, time=372.17
NO POLE
NO POLE
t[1] = 1.203
x2[1] (analytic) = 2.0023079904456949421298288817407
x2[1] (numeric) = -2.6727468709653063699058388152325e+13985
absolute error = 2.6727468709653063699058388152325e+13985
relative error = 1.3348330445259712684724654930612e+13987 %
h = 0.001
x1[1] (analytic) = 3.0005405255699329099125203781481
x1[1] (numeric) = 2.9918533257627645704175590980437e+13987
absolute error = 2.9918533257627645704175590980437e+13987
relative error = 9.9710478837624822177350066750386e+13988 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3612.5MB, alloc=4.9MB, time=372.45
memory used=3616.3MB, alloc=4.9MB, time=372.74
NO POLE
NO POLE
t[1] = 1.204
x2[1] (analytic) = 2.0023123406475945366140033767501
x2[1] (numeric) = 2.1370815637166123795780370701072e+14005
absolute error = 2.1370815637166123795780370701072e+14005
relative error = 1.0673067934173698051873054138946e+14007 %
h = 0.001
x1[1] (analytic) = 3.0005399853145356968914691137893
x1[1] (numeric) = -2.3922334932984499116031923846582e+14007
absolute error = 2.3922334932984499116031923846582e+14007
relative error = 7.9726766015673701229039350560619e+14008 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3620.2MB, alloc=4.9MB, time=373.03
NO POLE
NO POLE
t[1] = 1.205
x2[1] (analytic) = 2.0023166998288670348327941463888
x2[1] (numeric) = -1.7087729704564023097468290805985e+14025
absolute error = 1.7087729704564023097468290805985e+14025
relative error = 8.5339795178377468045050346608705e+14026 %
h = 0.001
x1[1] (analytic) = 3.0005394455991238434048924521669
x1[1] (numeric) = 1.9127879823453236613715561165108e+14027
absolute error = 1.9127879823453236613715561165108e+14027
relative error = 6.3748136527610066986082915298304e+14028 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3624.0MB, alloc=4.9MB, time=373.31
NO POLE
NO POLE
t[1] = 1.206
x2[1] (analytic) = 2.0023210680072190255068040072825
x2[1] (numeric) = 1.3663049244991711800733268888832e+14045
absolute error = 1.3663049244991711800733268888832e+14045
relative error = 6.8236055961742754923088669361390e+14046 %
h = 0.001
x1[1] (analytic) = 3.0005389064231576339959606208839
x1[1] (numeric) = -1.5294317530685268485856499052611e+14047
absolute error = 1.5294317530685268485856499052611e+14047
relative error = 5.0971902073808182568101158778142e+14048 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3627.8MB, alloc=4.9MB, time=373.60
memory used=3631.6MB, alloc=4.9MB, time=373.89
NO POLE
NO POLE
t[1] = 1.207
x2[1] (analytic) = 2.0023254452003928159636672811755
x2[1] (numeric) = -1.0924734759890767940791833899694e+14065
absolute error = 1.0924734759890767940791833899694e+14065
relative error = 5.4560235380704658727611795424834e+14066 %
h = 0.001
x1[1] (analytic) = 3.0005383677860978926535328789933
x1[1] (numeric) = 1.2229068296561310271717250310446e+14067
absolute error = 1.2229068296561310271717250310446e+14067
relative error = 4.0756247038375131301175267331428e+14068 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3635.4MB, alloc=4.9MB, time=374.18
NO POLE
NO POLE
t[1] = 1.208
x2[1] (analytic) = 2.0023298314261665033768908797797
x2[1] (numeric) = 8.7352264808468085375366409141808e+14084
absolute error = 8.7352264808468085375366409141808e+14084
relative error = 4.3625312592107328220324647018644e+14086 %
h = 0.001
x1[1] (analytic) = 3.0005378296874059822729814609261
x1[1] (numeric) = -9.7781487210472666147082725432652e+14086
absolute error = 9.7781487210472666147082725432652e+14086
relative error = 3.2587986807904860134024966976075e+14088 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3639.2MB, alloc=4.9MB, time=374.46
NO POLE
NO POLE
memory used=3643.0MB, alloc=4.9MB, time=374.75
t[1] = 1.209
x2[1] (analytic) = 2.0023342267023540461475853674643
x2[1] (numeric) = -6.9845340274833596194612671069817e+14104
absolute error = 6.9845340274833596194612671069817e+14104
relative error = 3.4881958937425719854502346791474e+14106 %
h = 0.001
x1[1] (analytic) = 3.0005372921265438041175544269769
x1[1] (numeric) = 7.8184363757133871493473838532363e+14106
absolute error = 7.8184363757133871493473838532363e+14106
relative error = 2.6056787883387035214900386555001e+14108 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3646.9MB, alloc=4.9MB, time=375.04
NO POLE
NO POLE
t[1] = 1.21
x2[1] (analytic) = 2.0023386310468053354293717981262
x2[1] (numeric) = 5.5847110190031087983281268477841e+14124
absolute error = 5.5847110190031087983281268477841e+14124
relative error = 2.7890941783825396862978587447034e+14126 %
h = 0.001
x1[1] (analytic) = 3.0005367551029737972802768817107
x1[1] (numeric) = -6.2514847242506773262978886833437e+14126
absolute error = 6.2514847242506773262978886833437e+14126
relative error = 2.0834554729645816335892044298157e+14128 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3650.7MB, alloc=4.9MB, time=375.32
NO POLE
NO POLE
t[1] = 1.211
x2[1] (analytic) = 2.0023430444774062667967506950117
x2[1] (numeric) = -4.4654370703971845477104823177647e+14144
absolute error = 4.4654370703971845477104823177647e+14144
relative error = 2.2301059165227224708964620549008e+14146 %
h = 0.001
x1[1] (analytic) = 3.0005362186161589381463900221908
x1[1] (numeric) = 4.9985776412964217635851317046906e+14146
absolute error = 4.9985776412964217635851317046906e+14146
relative error = 1.6658947858332319591026245299588e+14148 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3654.5MB, alloc=4.9MB, time=375.62
memory used=3658.3MB, alloc=4.9MB, time=375.91
NO POLE
NO POLE
t[1] = 1.212
x2[1] (analytic) = 2.0023474670120788120572201158413
x2[1] (numeric) = 3.5704852340303859485315193607720e+14164
absolute error = 3.5704852340303859485315193607720e+14164
relative error = 1.7831496744959538127671971674684e+14166 %
h = 0.001
x1[1] (analytic) = 3.0005356826655627398563274784687
x1[1] (numeric) = -3.9967750923463023384409940588177e+14166
absolute error = 3.9967750923463023384409940588177e+14166
relative error = 1.3320205173483283087215750969711e+14168 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3662.1MB, alloc=4.9MB, time=376.20
NO POLE
NO POLE
t[1] = 1.213
x2[1] (analytic) = 2.0023518986687810912074303203192
x2[1] (numeric) = -2.8548974278334413463076361961175e+14184
absolute error = 2.8548974278334413463076361961175e+14184
relative error = 1.4257720781903800707673552732357e+14186 %
h = 0.001
x1[1] (analytic) = 3.0005351472506492517692284093098
x1[1] (numeric) = 3.1957513287033292958409395736023e+14186
absolute error = 3.1957513287033292958409395736023e+14186
relative error = 1.0650604548430482656651031869279e+14188 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3665.9MB, alloc=4.9MB, time=376.48
NO POLE
NO POLE
t[1] = 1.214
x2[1] (analytic) = 2.0023563394655074445336631329846
x2[1] (numeric) = 2.2827259571802605714140743216698e+14204
absolute error = 2.2827259571802605714140743216698e+14204
relative error = 1.1400198417178795907506616203161e+14206 %
h = 0.001
x1[1] (analytic) = 3.0005346123708830589269868166705
x1[1] (numeric) = -2.5552667635630370845351076668535e+14206
absolute error = 2.5552667635630370845351076668535e+14206
relative error = 8.5160382854040266995330694955062e+14207 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3669.7MB, alloc=4.9MB, time=376.76
memory used=3673.6MB, alloc=4.9MB, time=377.05
NO POLE
NO POLE
t[1] = 1.215
x2[1] (analytic) = 2.002360789420288504856924671393
x2[1] (numeric) = -1.8252276753560983922337148821102e+14224
absolute error = 1.8252276753560983922337148821102e+14224
relative error = 9.1153786320622437367669354252373e+14225 %
h = 0.001
x1[1] (analytic) = 3.000534078025729281518836542974
x1[1] (numeric) = 2.0431465284312989127148784598415e+14226
absolute error = 2.0431465284312989127148784598415e+14226
relative error = 6.8092761998411775221516272553716e+14227 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3677.4MB, alloc=4.9MB, time=377.33
NO POLE
NO POLE
t[1] = 1.216
x2[1] (analytic) = 2.0023652485511912699229406878048
x2[1] (numeric) = 1.4594200659114645583225399824777e+14244
absolute error = 1.4594200659114645583225399824777e+14244
relative error = 7.2884807952366633352048360796920e+14245 %
h = 0.001
x1[1] (analytic) = 3.0005335442146535743464714157709
x1[1] (numeric) = -1.6336641622575885354816768249360e+14246
absolute error = 1.6336641622575885354816768249360e+14246
relative error = 5.4445788996675809311304748509468e+14247 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3681.2MB, alloc=4.9MB, time=377.62
NO POLE
NO POLE
t[1] = 1.217
x2[1] (analytic) = 2.002369716876319174937344351896
x2[1] (numeric) = -1.1669267114139515937080224678211e+14264
absolute error = 1.1669267114139515937080224678211e+14264
relative error = 5.8277285237530858089476282940546e+14265 %
h = 0.001
x1[1] (analytic) = 3.0005330109371221262897000049043
x1[1] (numeric) = 1.3062492375884088750372747773816e+14266
absolute error = 1.3062492375884088750372747773816e+14266
relative error = 4.3533906570167778428471516163621e+14267 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3685.0MB, alloc=4.9MB, time=377.90
memory used=3688.8MB, alloc=4.9MB, time=378.19
NO POLE
NO POLE
t[1] = 1.218
x2[1] (analytic) = 2.0023741944138121652463468825153
x2[1] (numeric) = 9.3305415049294534368287765603758e+14283
absolute error = 9.3305415049294534368287765603758e+14283
relative error = 4.6597391890884490062044961003227e+14285 %
h = 0.001
x1[1] (analytic) = 3.0005324781926016597726344578343
x1[1] (numeric) = -1.0444540010857262601513273139011e+14286
absolute error = 1.0444540010857262601513273139011e+14286
relative error = 3.4808955033036760717515170775033e+14287 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3692.6MB, alloc=4.9MB, time=378.48
NO POLE
NO POLE
t[1] = 1.219
x2[1] (analytic) = 2.0023786811818467691631820181679
x2[1] (numeric) = -7.4605374890872796139410070117321e+14303
absolute error = 7.4605374890872796139410070117321e+14303
relative error = 3.7258374548234356228417076834605e+14305 %
h = 0.001
x1[1] (analytic) = 3.0005319459805594302304128793098
x1[1] (numeric) = 8.3512711739297732823147780994082e+14305
absolute error = 8.3512711739297732823147780994082e+14305
relative error = 2.7832635426918002596742311984812e+14307 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3696.5MB, alloc=4.9MB, time=378.76
NO POLE
NO POLE
t[1] = 1.22
x2[1] (analytic) = 2.0023831771986361709406158987457
x2[1] (numeric) = 5.9653150459350068835470638678116e+14323
absolute error = 5.9653150459350068835470638678116e+14323
relative error = 2.9791076522529375738376234146275e+14325 %
h = 0.001
x1[1] (analytic) = 3.0005314143004632255764547221118
x1[1] (numeric) = -6.6775300920874136927625642606563e+14325
absolute error = 6.6775300920874136927625642606563e+14325
relative error = 2.2254491521943279551806318745420e+14327 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3700.3MB, alloc=4.9MB, time=379.05
memory used=3704.1MB, alloc=4.9MB, time=379.34
NO POLE
NO POLE
t[1] = 1.221
x2[1] (analytic) = 2.0023876824824302838898145150074
x2[1] (numeric) = -4.7697613810411978419253492201290e+14343
absolute error = 4.7697613810411978419253492201290e+14343
relative error = 2.3820369166114512164725094353837e+14345 %
h = 0.001
x1[1] (analytic) = 3.0005308831517813656702486561215
x1[1] (numeric) = 5.3392360518633424290032924541599e+14345
absolute error = 5.3392360518633424290032924541599e+14345
relative error = 1.7794304607373234770192970933006e+14347 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3707.9MB, alloc=4.9MB, time=379.62
NO POLE
NO POLE
t[1] = 1.222
x2[1] (analytic) = 2.0023921970515158236458614674866
x2[1] (numeric) = 3.8138176201733347319527353825701e+14363
absolute error = 3.8138176201733347319527353825701e+14363
relative error = 1.9046306841332622879365074580631e+14365 %
h = 0.001
x1[1] (analytic) = 3.0005303525339827017856723835024
x1[1] (numeric) = -4.2691595881083855158672750296585e+14365
absolute error = 4.2691595881083855158672750296585e+14365
relative error = 1.4228016672129414398617452946585e+14367 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3711.7MB, alloc=4.9MB, time=379.91
NO POLE
NO POLE
t[1] = 1.223
x2[1] (analytic) = 2.0023967209242163815802193628337
x2[1] (numeric) = -3.0494617399014425176903463465809e+14383
absolute error = 3.0494617399014425176903463465809e+14383
relative error = 1.5229058797569084891500300418901e+14385 %
h = 0.001
x1[1] (analytic) = 3.0005298224465366160798438683157
x1[1] (numeric) = 3.4135451985452406193526767211385e+14385
absolute error = 3.4135451985452406193526767211385e+14385
relative error = 1.1376474824575962378967844025630e+14387 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3715.5MB, alloc=4.9MB, time=380.19
memory used=3719.3MB, alloc=4.9MB, time=380.48
NO POLE
NO POLE
t[1] = 1.224
x2[1] (analytic) = 2.0024012541188924983604287631111
x2[1] (numeric) = 2.4382961717765863286523404494638e+14403
absolute error = 2.4382961717765863286523404494638e+14403
relative error = 1.2176860990079127198361838870050e+14405 %
h = 0.001
x1[1] (analytic) = 3.00052929288891302106250344942
x1[1] (numeric) = -2.7294109255058931727652026824018e+14405
absolute error = 2.7294109255058931727652026824018e+14405
relative error = 9.0964315261792136168313943967580e+14406 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3723.2MB, alloc=4.9MB, time=380.76
NO POLE
NO POLE
t[1] = 1.225
x2[1] (analytic) = 2.0024057966539417376573391922448
x2[1] (numeric) = -1.9496188929041968286373571165736e+14423
absolute error = 1.9496188929041968286373571165736e+14423
relative error = 9.7363825861972991110234737333768e+14424 %
h = 0.001
x1[1] (analytic) = 3.0005287638605823590659263060375
x1[1] (numeric) = 2.1823891488080449079636829398086e+14425
absolute error = 2.1823891488080449079636829398086e+14425
relative error = 7.2733485347432857251029638298278e+14426 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3727.0MB, alloc=4.9MB, time=381.05
NO POLE
NO POLE
t[1] = 1.226
x2[1] (analytic) = 2.0024103485477987600001672936975
x2[1] (numeric) = 1.5588811037666106190320173776094e+14443
absolute error = 1.5588811037666106190320173776094e+14443
relative error = 7.7850232091396883501227938349590e+14444 %
h = 0.001
x1[1] (analytic) = 3.0005282353610156017153647458997
x1[1] (numeric) = -1.7450001215747017401372228892554e+14445
absolute error = 1.7450001215747017401372228892554e+14445
relative error = 5.8156430624781237966953850241321e+14446 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3730.8MB, alloc=4.9MB, time=381.33
memory used=3734.6MB, alloc=4.9MB, time=381.63
NO POLE
NO POLE
t[1] = 1.227
x2[1] (analytic) = 2.002414909818935396779677824473
x2[1] (numeric) = -1.2464540144359487758947570231798e+14463
absolute error = 1.2464540144359487758947570231798e+14463
relative error = 6.2247539624475580664260363385636e+14464 %
h = 0.001
x1[1] (analytic) = 3.000527707389684249400019786414
x1[1] (numeric) = 1.3952715197281955173761216460868e+14465
absolute error = 1.3952715197281955173761216460868e+14465
relative error = 4.6500871039848356484448800404538e+14466 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3738.4MB, alloc=4.9MB, time=381.91
NO POLE
NO POLE
t[1] = 1.228
x2[1] (analytic) = 2.0024194804858607243997837627924
x2[1] (numeric) = 9.9664278843943074882184652573703e+14482
absolute error = 9.9664278843943074882184652573703e+14482
relative error = 4.9771928317317832792536806429230e+14484 %
h = 0.001
x1[1] (analytic) = 3.0005271799460603307445414998228
x1[1] (numeric) = -1.1156346579551160464147683308728e+14485
absolute error = 1.1156346579551160464147683308728e+14485
relative error = 3.7181288188669949334991718295313e+14486 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3742.2MB, alloc=4.9MB, time=382.20
NO POLE
NO POLE
t[1] = 1.229
x2[1] (analytic) = 2.0024240605671211385778624001849
x2[1] (numeric) = -7.9689810955265387119066201107506e+14502
absolute error = 7.9689810955265387119066201107506e+14502
relative error = 3.9796670707550254822543450534610e+14504 %
h = 0.001
x1[1] (analytic) = 3.000526653029616402081057593856
x1[1] (numeric) = 8.9204192333338085266511990292252e+14504
absolute error = 8.9204192333338085266511990292252e+14504
relative error = 2.9729511731971808648148140368195e+14506 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3746.0MB, alloc=4.9MB, time=382.49
memory used=3749.9MB, alloc=4.9MB, time=382.78
NO POLE
NO POLE
t[1] = 1.23
x2[1] (analytic) = 2.0024286500813004287940848833498
x2[1] (numeric) = 6.3718576442314506917706129882584e+14522
absolute error = 6.3718576442314506917706129882584e+14522
relative error = 3.1820647611952353269790127303208e+14524 %
h = 0.001
x1[1] (analytic) = 3.0005261266398255469217296999054
x1[1] (numeric) = -7.1326109072557272652152366190211e+14524
absolute error = 7.1326109072557272652152366190211e+14524
relative error = 2.3771200803517966467809793298603e+14526 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3753.7MB, alloc=4.9MB, time=383.06
NO POLE
NO POLE
t[1] = 1.231
x2[1] (analytic) = 2.0024332490470198528900572669226
x2[1] (numeric) = -5.0948257188290078988834594850268e+14542
absolute error = 5.0948257188290078988834594850268e+14542
relative error = 2.5443173804938026525682330115564e+14544 %
h = 0.001
x1[1] (analytic) = 3.0005256007761613754318368412764
x1[1] (numeric) = 5.7031106973310143115381979812304e+14544
absolute error = 5.7031106973310143115381979812304e+14544
relative error = 1.9007038952961312384325275414020e+14546 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3757.5MB, alloc=4.9MB, time=383.35
NO POLE
NO POLE
t[1] = 1.232
x2[1] (analytic) = 2.0024378574829382118170717352721
x2[1] (numeric) = 4.0737333685948004279911912815577e+14562
absolute error = 4.0737333685948004279911912815577e+14562
relative error = 2.0343869116195585642833691751470e+14564 %
h = 0.001
x1[1] (analytic) = 3.000525075438098023903385554601
x1[1] (numeric) = -4.5601073784810766689575651698788e+14564
absolute error = 4.5601073784810766689575651698788e+14564
relative error = 1.5197697948967377068246132928387e+14566 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3761.3MB, alloc=4.9MB, time=383.63
memory used=3765.1MB, alloc=4.9MB, time=383.93
NO POLE
NO POLE
t[1] = 1.233
x2[1] (analytic) = 2.0024424754077519245342672496255
x2[1] (numeric) = -3.2572858178585539702743510170028e+14582
absolute error = 3.2572858178585539702743510170028e+14582
relative error = 1.6266563748330806371255323980779e+14584 %
h = 0.001
x1[1] (analytic) = 3.0005245506251101542292461380227
x1[1] (numeric) = 3.6461819534748229366436015760163e+14584
absolute error = 3.6461819534748229366436015760163e+14584
relative error = 1.2151815097514201760710016986619e+14586 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3768.9MB, alloc=4.9MB, time=384.21
NO POLE
NO POLE
t[1] = 1.234
x2[1] (analytic) = 2.0024471028401951030569994761955
x2[1] (numeric) = 2.6044686628281386714960522943824e+14602
absolute error = 2.6044686628281386714960522943824e+14602
relative error = 1.3006429279125820586286742624917e+14604 %
h = 0.001
x1[1] (analytic) = 3.0005240263366729533778145002886
x1[1] (numeric) = -2.9154231982742871659893567992954e+14604
absolute error = 2.9154231982742871659893567992954e+14604
relative error = 9.7163801145552397821675658984621e+14605 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3772.7MB, alloc=4.9MB, time=384.50
NO POLE
NO POLE
memory used=3776.6MB, alloc=4.9MB, time=384.79
t[1] = 1.235
x2[1] (analytic) = 2.0024517397990396276557204515618
x2[1] (numeric) = -2.0824875049231409724616393963940e+14622
absolute error = 2.0824875049231409724616393963940e+14622
relative error = 1.0399688859078988375520881831374e+14624 %
h = 0.001
x1[1] (analytic) = 3.0005235025722621328681990854104
x1[1] (numeric) = 2.3311213026370337242362940512912e+14624
absolute error = 2.3311213026370337242362940512912e+14624
relative error = 7.7690486364750376480460447274858e+14625 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3780.4MB, alloc=4.9MB, time=385.07
NO POLE
NO POLE
t[1] = 1.236
x2[1] (analytic) = 2.0024563863030952222056690433278
x2[1] (numeric) = 1.6651205176920106872122744737703e+14642
absolute error = 1.6651205176920106872122744737703e+14642
relative error = 8.3153896837979631223714817331434e+14643 %
h = 0.001
x1[1] (analytic) = 3.0005229793313539282459323480829
x1[1] (numeric) = -1.8639237455559721494458091617652e+14644
absolute error = 1.8639237455559721494458091617652e+14644
relative error = 6.2119962366405033751278971557068e+14645 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3784.2MB, alloc=4.9MB, time=385.36
NO POLE
NO POLE
t[1] = 1.237
x2[1] (analytic) = 2.0024610423712095296876738670628
x2[1] (numeric) = -1.3314011881868361445881483835514e+14662
absolute error = 1.3314011881868361445881483835514e+14662
relative error = 6.6488244216240060361456541826213e+14663 %
h = 0.001
x1[1] (analytic) = 3.0005224566134250985592062555688
x1[1] (numeric) = 1.4903607655754648233146199712669e+14664
absolute error = 1.4903607655754648233146199712669e+14664
relative error = 4.9670042038531449637161430607410e+14665 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3788.0MB, alloc=4.9MB, time=385.64
memory used=3791.8MB, alloc=4.9MB, time=385.93
NO POLE
NO POLE
t[1] = 1.238
x2[1] (analytic) = 2.0024657080222681878403709247237
x2[1] (numeric) = 1.0645650600488208836239737600644e+14682
absolute error = 1.0645650600488208836239737600644e+14682
relative error = 5.3162711140768384696159483780859e+14683 %
h = 0.001
x1[1] (analytic) = 3.0005219344179529258356312922876
x1[1] (numeric) = -1.1916663526941400225646488178331e+14684
absolute error = 1.1916663526941400225646488178331e+14684
relative error = 3.9715302162098734225540089788139e+14685 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3795.6MB, alloc=4.9MB, time=386.22
NO POLE
NO POLE
t[1] = 1.239
x2[1] (analytic) = 2.0024703832751949049641388351459
x2[1] (numeric) = -8.5120756773555866288684265319348e+14701
absolute error = 8.5120756773555866288684265319348e+14701
relative error = 4.2507873017494669339839688552458e+14703 %
h = 0.001
x1[1] (analytic) = 3.000521412744415214559518443866
x1[1] (numeric) = 9.5283553415003594053142822530257e+14703
absolute error = 9.5283553415003594053142822530257e+14703
relative error = 3.1755665202153269529209966109394e+14705 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3799.5MB, alloc=4.9MB, time=386.52
NO POLE
NO POLE
t[1] = 1.24
x2[1] (analytic) = 2.0024750681489515358770551338088
x2[1] (numeric) = 6.8061065552635897666763809056097e+14721
absolute error = 6.8061065552635897666763809056097e+14721
relative error = 3.3988470885457867146969286354345e+14723 %
h = 0.001
x1[1] (analytic) = 3.0005208915922902911496836379329
x1[1] (numeric) = -7.6187059665349973219770774806754e+14723
absolute error = 7.6187059665349973219770774806754e+14723
relative error = 2.5391277854066094508296310780874e+14725 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3803.3MB, alloc=4.9MB, time=386.84
memory used=3807.1MB, alloc=4.9MB, time=387.16
NO POLE
NO POLE
t[1] = 1.241
x2[1] (analytic) = 2.0024797626625381580231777268951
x2[1] (numeric) = -5.4420435387850100509123785269917e+14741
absolute error = 5.4420435387850100509123785269917e+14741
relative error = 2.7176522031609235140337510606333e+14743 %
h = 0.001
x1[1] (analytic) = 3.0005203709610570034377741194621
x1[1] (numeric) = 6.0917837889299479705283185325854e+14743
absolute error = 6.0917837889299479705283185325854e+14743
relative error = 2.0302424365740164124205859454392e+14745 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3810.9MB, alloc=4.9MB, time=387.46
NO POLE
NO POLE
t[1] = 1.242
x2[1] (analytic) = 2.0024844668349931477334561937131
x2[1] (numeric) = 4.3513626531644420497630350224049e+14761
absolute error = 4.3513626531644420497630350224049e+14761
relative error = 2.1729819757563187957624843802661e+14763 %
h = 0.001
x1[1] (analytic) = 3.0005198508501947201471162389906
x1[1] (numeric) = -4.8708835718393444584818142481110e+14763
absolute error = 4.8708835718393444584818142481110e+14763
relative error = 1.6233465579170168749164487822759e+14765 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3814.7MB, alloc=4.9MB, time=387.75
NO POLE
NO POLE
t[1] = 1.243
x2[1] (analytic) = 2.0024891806853932566395782418017
x2[1] (numeric) = -3.4792733289270181990578624626463e+14781
absolute error = 3.4792733289270181990578624626463e+14781
relative error = 1.7374742208275827410550761656612e+14783 %
h = 0.001
x1[1] (analytic) = 3.0005193312591833303720841325588
x1[1] (numeric) = 3.8946731519803189237232976626377e+14783
absolute error = 3.8946731519803189237232976626377e+14783
relative error = 1.2979996867228645233802507239482e+14785 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3818.5MB, alloc=4.9MB, time=388.03
memory used=3822.3MB, alloc=4.9MB, time=388.33
NO POLE
NO POLE
t[1] = 1.244
x2[1] (analytic) = 2.0024939042328536882410572305223
x2[1] (numeric) = 2.7819659868109418148104784509704e+14801
absolute error = 2.7819659868109418148104784509704e+14801
relative error = 1.3892506643493131321539353111720e+14803 %
h = 0.001
x1[1] (analytic) = 3.0005188121875032430579887727423
x1[1] (numeric) = -3.1141124063099679033407908970344e+14803
absolute error = 3.1141124063099679033407908970344e+14803
relative error = 1.0378579843129362674525661694947e+14805 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3826.2MB, alloc=4.9MB, time=388.62
NO POLE
NO POLE
t[1] = 1.245
x2[1] (analytic) = 2.0024986374965281746258672916471
x2[1] (numeric) = -2.2244112549098665041767499025890e+14821
absolute error = 2.2244112549098665041767499025890e+14821
relative error = 1.1108178618741872026944860019780e+14823 %
h = 0.001
x1[1] (analytic) = 3.0005182936346353864814868706631
x1[1] (numeric) = 2.4899897117689285111163905975548e+14823
absolute error = 2.4899897117689285111163905975548e+14823
relative error = 8.2985320137899066090990690925147e+14824 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3830.0MB, alloc=4.9MB, time=388.90
NO POLE
NO POLE
t[1] = 1.246
x2[1] (analytic) = 2.0025033804956090533449331893796
x2[1] (numeric) = 1.7786002612640662876144830763596e+14841
absolute error = 1.7786002612640662876144830763596e+14841
relative error = 8.8818839388119888143762606221132e+14842 %
h = 0.001
x1[1] (analytic) = 3.0005177756000612077315091093909
x1[1] (numeric) = -1.9909521416607401752657021918934e+14843
absolute error = 1.9909521416607401752657021918934e+14843
relative error = 6.6353619293676000501563512286495e+14844 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3833.8MB, alloc=4.9MB, time=389.18
memory used=3837.6MB, alloc=4.9MB, time=389.47
NO POLE
NO POLE
t[1] = 1.247
x2[1] (analytic) = 2.0025081332493273444407826774069
x2[1] (numeric) = -1.4221376026515326595410753592273e+14861
absolute error = 1.4221376026515326595410753592273e+14861
relative error = 7.1017819055942172156418134404802e+14862 %
h = 0.001
x1[1] (analytic) = 3.0005172580832626721907071896607
x1[1] (numeric) = 1.5919304451934770695898005897562e+14863
absolute error = 1.5919304451934770695898005897562e+14863
relative error = 5.3055200429355500543372766893685e+14864 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3841.4MB, alloc=4.9MB, time=389.76
NO POLE
NO POLE
t[1] = 1.248
x2[1] (analytic) = 2.0025128957769528276306697269726
x2[1] (numeric) = 1.1371163070886193414061166913293e+14881
absolute error = 1.1371163070886193414061166913293e+14881
relative error = 5.6784468628724151448732309379361e+14882 %
h = 0.001
x1[1] (analytic) = 3.000516741083722263017419169355
x1[1] (numeric) = -1.2728796887201817230417707444318e+14883
absolute error = 1.2728796887201817230417707444318e+14883
relative error = 4.2422015891184292889771351358444e+14884 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3845.2MB, alloc=4.9MB, time=390.05
NO POLE
NO POLE
t[1] = 1.249
x2[1] (analytic) = 2.0025176680977941196444776175826
x2[1] (numeric) = -9.0921827355949051517258505915229e+14900
absolute error = 9.0921827355949051517258505915229e+14900
relative error = 4.5403757881605282788783816747988e+14902 %
h = 0.001
x1[1] (analytic) = 3.0005162246009229806281525787157
x1[1] (numeric) = 1.0177722945423479964404750988947e+14903
absolute error = 1.0177722945423479964404750988947e+14903
relative error = 3.3919906388032097637717471903236e+14904 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3849.0MB, alloc=4.9MB, time=390.33
memory used=3852.9MB, alloc=4.9MB, time=390.63
NO POLE
NO POLE
t[1] = 1.25
x2[1] (analytic) = 2.0025224502311987517177115008182
x2[1] (numeric) = 7.2699499938670276337179992495455e+14920
absolute error = 7.2699499938670276337179992495455e+14920
relative error = 3.6303962500034316980948428089170e+14922 %
h = 0.001
x1[1] (analytic) = 3.000515708634348342180584793768
x1[1] (numeric) = -8.1379289238207813857920746226556e+14922
absolute error = 8.1379289238207813857920746226556e+14922
relative error = 2.7121767436187394772928115186512e+14924 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3856.7MB, alloc=4.9MB, time=390.91
NO POLE
NO POLE
t[1] = 1.251
x2[1] (analytic) = 2.002527242196553247239890667831
x2[1] (numeric) = -5.8129246244047311620004805897581e+14940
absolute error = 5.8129246244047311620004805897581e+14940
relative error = 2.9027942801060668517868044999159e+14942 %
h = 0.001
x1[1] (analytic) = 3.0005151931834823810570801509575
x1[1] (numeric) = 6.5069453672776607592112018948543e+14942
absolute error = 6.5069453672776607592112018948543e+14942
relative error = 2.1686093715039419725894254188982e+14944 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3860.5MB, alloc=4.9MB, time=391.20
NO POLE
NO POLE
t[1] = 1.252
x2[1] (analytic) = 2.0025320440132831995586513724313
x2[1] (numeric) = 4.6479126703094800953857021998047e+14960
absolute error = 4.6479126703094800953857021998047e+14960
relative error = 2.3210178754466161000752244455545e+14962 %
h = 0.001
x1[1] (analytic) = 3.0005146782478096463487232865179
x1[1] (numeric) = -5.2028394950465233572762107270195e+14962
absolute error = 5.2028394950465233572762107270195e+14962
relative error = 1.7339823506828470192801258227357e+14964 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3864.3MB, alloc=4.9MB, time=391.49
memory used=3868.1MB, alloc=4.9MB, time=391.80
NO POLE
NO POLE
t[1] = 1.253
x2[1] (analytic) = 2.002536855700853349939871684272
x2[1] (numeric) = -3.7163895262164443922808052655988e+14980
absolute error = 3.7163895262164443922808052655988e+14980
relative error = 1.8558407629984778365431654481561e+14982 %
h = 0.001
x1[1] (analytic) = 3.0005141638268152023398681846005
x1[1] (numeric) = 4.1600992913424696068648213868816e+14982
absolute error = 4.1600992913424696068648213868816e+14982
relative error = 1.3864621408874588376040237600973e+14984 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3871.9MB, alloc=4.9MB, time=392.10
NO POLE
NO POLE
t[1] = 1.254
x2[1] (analytic) = 2.0025416772787676656841304704534
x2[1] (numeric) = 2.9715599431973943189964080478819e+15000
absolute error = 2.9715599431973943189964080478819e+15000
relative error = 1.4838941815360443067010093686300e+15002 %
h = 0.001
x1[1] (analytic) = 3.0005136499199846279932024187178
x1[1] (numeric) = -3.3263424963051575355494264187841e+15002
absolute error = 3.3263424963051575355494264187841e+15002
relative error = 1.1085910228716546110856379901262e+15004 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3875.7MB, alloc=4.9MB, time=392.39
NO POLE
NO POLE
t[1] = 1.255
x2[1] (analytic) = 2.0025465087665694183998132289591
x2[1] (numeric) = -2.3760072601983293567600954976713e+15020
absolute error = 2.3760072601983293567600954976713e+15020
relative error = 1.1864929227844930366060153268508e+15022 %
h = 0.001
x1[1] (analytic) = 3.0005131365268040164353260715618
x1[1] (numeric) = 2.6596851728399685538928157713554e+15022
absolute error = 2.6596851728399685538928157713554e+15022
relative error = 8.8641010781197398126924829937115e+15023 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3879.6MB, alloc=4.9MB, time=392.68
memory used=3883.4MB, alloc=4.9MB, time=392.97
NO POLE
NO POLE
t[1] = 1.256
x2[1] (analytic) = 2.0025513501838412624331781236613
x2[1] (numeric) = 1.8998137706893160719996799434459e+15040
absolute error = 1.8998137706893160719996799434459e+15040
relative error = 9.4869665664998127562372473285515e+15041 %
h = 0.001
x1[1] (analytic) = 3.0005126236467599744428448187792
x1[1] (numeric) = -2.1266376587745743345177483499962e+15042
absolute error = 2.1266376587745743345177483499962e+15042
relative error = 7.0875811086903664622441124591562e+15043 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3887.2MB, alloc=4.9MB, time=393.27
NO POLE
NO POLE
t[1] = 1.257
x2[1] (analytic) = 2.0025562015502053134556961982165
x2[1] (numeric) = -1.5190578007743475812867599483818e+15060
absolute error = 1.5190578007743475812867599483818e+15060
relative error = 7.5855938504918103772160507131763e+15061 %
h = 0.001
x1[1] (analytic) = 3.0005121112793396219289766627939
x1[1] (numeric) = 1.7004222070723721280082470879583e+15062
absolute error = 1.7004222070723721280082470879583e+15062
relative error = 5.6671066271662430418427511029895e+15063 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3891.0MB, alloc=4.9MB, time=393.56
NO POLE
NO POLE
t[1] = 1.258
x2[1] (analytic) = 2.0025610628853232272089803750151
x2[1] (numeric) = 1.2146119991835546569642461801263e+15080
absolute error = 1.2146119991835546569642461801263e+15080
relative error = 6.0652931972697078348899651303562e+15081 %
h = 0.001
x1[1] (analytic) = 3.000511599424030591430671803285
x1[1] (numeric) = -1.3596278004269895222384952259852e+15082
absolute error = 1.3596278004269895222384952259852e+15082
relative error = 4.5313199278682331643969079875671e+15083 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3894.8MB, alloc=4.9MB, time=393.84
memory used=3898.6MB, alloc=4.9MB, time=394.14
NO POLE
NO POLE
t[1] = 1.259
x2[1] (analytic) = 2.0025659342088962784076184754457
x2[1] (numeric) = -9.7118247100843600636026863063497e+15099
absolute error = 9.7118247100843600636026863063497e+15099
relative error = 4.8496903618411786063992674893182e+15101 %
h = 0.001
x1[1] (analytic) = 3.0005110880803210275962451314402
x1[1] (numeric) = 1.0871345645836154431029712804781e+15102
absolute error = 1.0871345645836154431029712804781e+15102
relative error = 3.6231646298602640340614422885657e+15103 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3902.4MB, alloc=4.9MB, time=394.42
NO POLE
NO POLE
t[1] = 1.26
x2[1] (analytic) = 2.0025708155406654398002261290955
x2[1] (numeric) = 7.7654048587372305507855079572585e+15119
absolute error = 7.7654048587372305507855079572585e+15119
relative error = 3.8777179805452634909256671471419e+15121 %
h = 0.001
x1[1] (analytic) = 3.0005105772476995866735208356153
x1[1] (numeric) = -8.6925374807814675038825242979094e+15121
absolute error = 8.6925374807814675038825242979094e+15121
relative error = 2.8970194428559339770332547100396e+15123 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3906.3MB, alloc=4.9MB, time=394.71
NO POLE
NO POLE
memory used=3910.1MB, alloc=4.9MB, time=394.99
t[1] = 1.261
x2[1] (analytic) = 2.0025757069004114613890360721311
x2[1] (numeric) = -6.2090816525431284315769221073501e+15139
absolute error = 6.2090816525431284315769221073501e+15139
relative error = 3.1005477751218458445999626590441e+15141 %
h = 0.001
x1[1] (analytic) = 3.0005100669256554359984886065469
x1[1] (numeric) = 6.9504006510666889234567479061403e+15141
absolute error = 6.9504006510666889234567479061403e+15141
relative error = 2.3164063762625933377847624994417e+15143 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3913.9MB, alloc=4.9MB, time=395.28
NO POLE
NO POLE
t[1] = 1.262
x2[1] (analytic) = 2.0025806083079549498083409689945
x2[1] (numeric) = 4.9646728881843443139171063605037e+15159
absolute error = 4.9646728881843443139171063605037e+15159
relative error = 2.4791376025453261644473537613677e+15161 %
h = 0.001
x1[1] (analytic) = 3.0005095571136782534844709307727
x1[1] (numeric) = -5.5574185693364777137102686982058e+15161
absolute error = 5.5574185693364777137102686982058e+15161
relative error = 1.8521582629726406824434945404269e+15163 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3917.7MB, alloc=4.9MB, time=395.57
NO POLE
NO POLE
t[1] = 1.263
x2[1] (analytic) = 2.0025855197831564478621075267095
x2[1] (numeric) = -3.9696654458678780491671165235671e+15179
absolute error = 3.9696654458678780491671165235671e+15179
relative error = 1.9822701236238443110636943814262e+15181 %
h = 0.001
x1[1] (analytic) = 3.000509047811258227111800961427
x1[1] (numeric) = 4.4436145058869301838057530124968e+15181
absolute error = 4.4436145058869301838057530124968e+15181
relative error = 1.4809535432423891764656267366989e+15183 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3921.5MB, alloc=4.9MB, time=395.85
memory used=3925.3MB, alloc=4.9MB, time=396.14
NO POLE
NO POLE
t[1] = 1.264
x2[1] (analytic) = 2.0025904413459165142210803075194
x2[1] (numeric) = 3.1740749304191209716794214158971e+15199
absolute error = 3.1740749304191209716794214158971e+15199
relative error = 1.5849845604405582186825150927806e+15201 %
h = 0.001
x1[1] (analytic) = 3.0005085390178860544180104560896
x1[1] (numeric) = -3.5530362938428561536459491477696e+15201
absolute error = 3.5530362938428561536459491477696e+15201
relative error = 1.1841447033527927170624800040460e+15203 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3929.2MB, alloc=4.9MB, time=396.43
NO POLE
NO POLE
t[1] = 1.265
x2[1] (analytic) = 2.0025953730161758032796942832859
x2[1] (numeric) = -2.5379346953285958397862224433480e+15219
absolute error = 2.5379346953285958397862224433480e+15219
relative error = 1.2673227600172308378385055370118e+15221 %
h = 0.001
x1[1] (analytic) = 3.0005080307330529419885272718756
x1[1] (numeric) = 2.8409455610157295785633120619964e+15221
absolute error = 2.8409455610157295785633120619964e+15221
relative error = 9.4682151552904168733943098045353e+15222 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3933.0MB, alloc=4.9MB, time=396.72
NO POLE
NO POLE
t[1] = 1.266
x2[1] (analytic) = 2.002600314813915145173115814057
x2[1] (numeric) = 2.0292881103793398429067709423381e+15239
absolute error = 2.0292881103793398429067709423381e+15239
relative error = 1.0133265711425320387957960282461e+15241 %
h = 0.001
x1[1] (analytic) = 3.0005075229562506049478819084638
x1[1] (numeric) = -2.2715702889501476525759183929998e+15241
absolute error = 2.2715702889501476525759183929998e+15241
relative error = 7.5706202086508438259486404862592e+15242 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3936.8MB, alloc=4.9MB, time=397.03
memory used=3940.6MB, alloc=4.9MB, time=397.33
NO POLE
NO POLE
t[1] = 1.267
x2[1] (analytic) = 2.0026052667591556259547323734693
x2[1] (numeric) = -1.6225832140230770090910136857356e+15259
absolute error = 1.6225832140230770090910136857356e+15259
relative error = 8.1023616633592816342124783103505e+15260 %
h = 0.001
x1[1] (analytic) = 3.0005070156869712664514225902704
x1[1] (numeric) = 1.8163077985190887444462452870274e+15261
absolute error = 1.8163077985190887444462452870274e+15261
relative error = 6.0533362829123128552105166121506e+15262 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3944.4MB, alloc=4.9MB, time=397.62
NO POLE
NO POLE
t[1] = 1.268
x2[1] (analytic) = 2.0026102288719586679344119851967
x2[1] (numeric) = 1.2973891055505702202497168258715e+15279
absolute error = 1.2973891055505702202497168258715e+15279
relative error = 6.4784903564652753691257852104617e+15280 %
h = 0.001
x1[1] (analytic) = 3.0005065089247076571775383794821
x1[1] (numeric) = -1.4522878886948052671241561254841e+15281
absolute error = 1.4522878886948052671241561254841e+15281
relative error = 4.8401424372022511533011768794947e+15282 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3948.2MB, alloc=4.9MB, time=397.90
NO POLE
NO POLE
t[1] = 1.269
x2[1] (analytic) = 2.002615201172426110177853977475
x2[1] (numeric) = -1.0373695947635812583433352331030e+15299
absolute error = 1.0373695947635812583433352331030e+15299
relative error = 5.1800745053580727743826752421877e+15300 %
h = 0.001
x1[1] (analytic) = 3.0005060026689530148203898121728
x1[1] (numeric) = 1.1612239474880219676766027041808e+15301
absolute error = 1.1612239474880219676766027041808e+15301
relative error = 3.8700937323741800023424264036079e+15302 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3952.0MB, alloc=4.9MB, time=398.18
memory used=3955.9MB, alloc=4.9MB, time=398.48
NO POLE
NO POLE
t[1] = 1.27
x2[1] (analytic) = 2.0026201836807002891673533068502
x2[1] (numeric) = 8.2946255023721616462728812083058e+15318
absolute error = 8.2946255023721616462728812083058e+15318
relative error = 4.1418864994794563639823550652261e+15320 %
h = 0.001
x1[1] (analytic) = 3.0005054969192010835831465502343
x1[1] (numeric) = -9.2849432038680037245811887602816e+15320
absolute error = 9.2849432038680037245811887602816e+15320
relative error = 3.0944596546819899765626605207068e+15322 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3959.7MB, alloc=4.9MB, time=398.76
NO POLE
NO POLE
t[1] = 1.271
x2[1] (analytic) = 2.0026251764169641196243013476962
x2[1] (numeric) = -6.6322372057070447214754671886781e+15338
absolute error = 6.6322372057070447214754671886781e+15338
relative error = 3.3117716104884096331321727209716e+15340 %
h = 0.001
x1[1] (analytic) = 3.0005049916749461136717315423574
x1[1] (numeric) = 7.4240778865735446972582337035199e+15340
absolute error = 7.4240778865735446972582337035199e+15340
relative error = 2.4742761325750254809111224876314e+15342 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3963.5MB, alloc=4.9MB, time=399.05
NO POLE
NO POLE
t[1] = 1.272
x2[1] (analytic) = 2.0026301794014411754937466907389
x2[1] (numeric) = 5.3030206535768452037320894856095e+15358
absolute error = 5.3030206535768452037320894856095e+15358
relative error = 2.6480279325271357342099259198342e+15360 %
h = 0.001
x1[1] (analytic) = 3.0005044869356828607890711878095
x1[1] (numeric) = -5.9361625866434175933965375225256e+15360
absolute error = 5.9361625866434175933965375225256e+15360
relative error = 1.9783881718856639259746465190030e+15362 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3967.3MB, alloc=4.9MB, time=399.34
memory used=3971.1MB, alloc=4.9MB, time=399.63
NO POLE
NO POLE
t[1] = 1.273
x2[1] (analytic) = 2.0026351926543957710913401418168
x2[1] (numeric) = -4.2402023902377263886293755295627e+15378
absolute error = 4.2402023902377263886293755295627e+15378
relative error = 2.1173114333507461605425055148120e+15380 %
h = 0.001
x1[1] (analytic) = 3.0005039827009065856298509972572
x1[1] (numeric) = 4.7464515854276111980149041440598e+15380
absolute error = 4.7464515854276111980149041440598e+15380
relative error = 1.5818847809543942599361412598033e+15382 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3974.9MB, alloc=4.9MB, time=399.92
NO POLE
NO POLE
t[1] = 1.274
x2[1] (analytic) = 2.0026402161961330424129887613835
x2[1] (numeric) = 3.3903915305422811087351039376224e+15398
absolute error = 3.3903915305422811087351039376224e+15398
relative error = 1.6929608739117798390645293541658e+15400 %
h = 0.001
x1[1] (analytic) = 3.0005034789701130533757762453899
x1[1] (numeric) = -3.7951795160561996526854085524142e+15400
absolute error = 3.7951795160561996526854085524142e+15400
relative error = 1.2648475639691141595631967298776e+15402 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3978.7MB, alloc=4.9MB, time=400.20
NO POLE
NO POLE
t[1] = 1.275
x2[1] (analytic) = 2.0026452500469990286075444358516
x2[1] (numeric) = -2.7108976582904052242454093494750e+15418
absolute error = 2.7108976582904052242454093494750e+15418
relative error = 1.3536584466104441573904918617752e+15420 %
h = 0.001
x1[1] (analytic) = 3.0005029757427985331913371106061
x1[1] (numeric) = 3.0345590384432328243127852136998e+15420
absolute error = 3.0345590384432328243127852136998e+15420
relative error = 1.0113501179554749283834896608285e+15422 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3982.6MB, alloc=4.9MB, time=400.49
memory used=3986.4MB, alloc=4.9MB, time=400.78
NO POLE
NO POLE
t[1] = 1.276
x2[1] (analytic) = 2.0026502942273807536128531237544
x2[1] (numeric) = 2.1675862647488862637976849406835e+15438
absolute error = 2.1675862647488862637976849406835e+15438
relative error = 1.0823588476714740358631010577078e+15440 %
h = 0.001
x1[1] (analytic) = 3.0005024730184597977200777975254
x1[1] (numeric) = -2.4263802328293226548237840149990e+15440
absolute error = 2.4263802328293226548237840149990e+15440
relative error = 8.0865796800641230210032774755540e+15441 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3990.2MB, alloc=4.9MB, time=401.07
NO POLE
NO POLE
t[1] = 1.277
x2[1] (analytic) = 2.0026553487577063079554915728988
x2[1] (numeric) = -1.7331639948706278219037958122717e+15458
absolute error = 1.7331639948706278219037958122717e+15458
relative error = 8.6543298423552997229745457700626e+15459 %
h = 0.001
x1[1] (analytic) = 3.0005019707965941225813691385973
x1[1] (numeric) = 1.9400911169239100335927698529576e+15460
absolute error = 1.9400911169239100335927698529576e+15460
relative error = 6.4658884940136905040358605271980e+15461 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3994.0MB, alloc=4.9MB, time=401.35
NO POLE
NO POLE
t[1] = 1.278
x2[1] (analytic) = 2.002660413658444930714518959179
x2[1] (numeric) = 1.3858075602190203659823488468627e+15478
absolute error = 1.3858075602190203659823488468627e+15478
relative error = 6.9198329919920750462525990856103e+15479 %
h = 0.001
x1[1] (analytic) = 3.0005014690766992858676841715786
x1[1] (numeric) = -1.5512628610471498924219876109575e+15480
absolute error = 1.5512628610471498924219876109575e+15480
relative error = 5.1700120031085919443867773517544e+15481 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=3997.8MB, alloc=4.9MB, time=401.64
memory used=4001.6MB, alloc=4.9MB, time=401.95
NO POLE
NO POLE
t[1] = 1.279
x2[1] (analytic) = 2.0026654889501070916495715535289
x2[1] (numeric) = -1.1080674417677058058268505838308e+15498
absolute error = 1.1080674417677058058268505838308e+15498
relative error = 5.5329631827260761686049870499834e+15499 %
h = 0.001
x1[1] (analytic) = 3.0005009678582735676423761901543
x1[1] (numeric) = 1.2403626010512619772371998785005e+15500
absolute error = 1.2403626010512619772371998785005e+15500
relative error = 4.1338516945609250091525503835524e+15501 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4005.4MB, alloc=4.9MB, time=402.27
NO POLE
NO POLE
t[1] = 1.28
x2[1] (analytic) = 2.0026705746532445734936291806118
x2[1] (numeric) = 8.8599130986958821039434709210885e+15517
absolute error = 8.8599130986958821039434709210885e+15517
relative error = 4.4240491725554739134558369346898e+15519 %
h = 0.001
x1[1] (analytic) = 3.0005004671408157494379587654808
x1[1] (numeric) = -9.9177220103633366573153513966140e+15519
absolute error = 9.9177220103633366573153513966140e+15519
relative error = 3.3053559294439831476791755332849e+15521 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4009.3MB, alloc=4.9MB, time=402.58
NO POLE
NO POLE
t[1] = 1.281
x2[1] (analytic) = 2.002675670788450554410782891284
x2[1] (numeric) = -7.0842312622428920227455631938372e+15537
absolute error = 7.0842312622428920227455631938372e+15537
relative error = 3.5373831946806645340312177920461e+15539 %
h = 0.001
x1[1] (analytic) = 3.0004999669238251137548872369318
x1[1] (numeric) = 7.9300367321201012575679548587148e+15539
absolute error = 7.9300367321201012575679548587148e+15539
relative error = 2.6429051223253768676404442278651e+15541 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4013.1MB, alloc=4.9MB, time=402.88
memory used=4016.9MB, alloc=4.9MB, time=403.19
NO POLE
NO POLE
t[1] = 1.282
x2[1] (analytic) = 2.0026807773763596906193339306225
x2[1] (numeric) = 5.6644271809309958156665453828496e+15557
absolute error = 5.6644271809309958156665453828496e+15557
relative error = 2.8284224050683498593117163751534e+15559 %
h = 0.001
x1[1] (analytic) = 3.0004994672068014435608411708265
x1[1] (numeric) = -6.3407184136703020131091685340124e+15559
absolute error = 6.3407184136703020131091685340124e+15559
relative error = 2.1132209763639610953592117934201e+15561 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4020.7MB, alloc=4.9MB, time=403.50
NO POLE
NO POLE
t[1] = 1.283
x2[1] (analytic) = 2.0026858944376481991805547443803
x2[1] (numeric) = -4.5291767166154615453675479215232e+15577
absolute error = 4.5291767166154615453675479215232e+15577
relative error = 2.2615512143941319082528872170156e+15579 %
h = 0.001
x1[1] (analytic) = 3.000498967989245021790507286425
x1[1] (numeric) = 5.0699273357222989662988424127064e+15579
absolute error = 5.0699273357222989662988424127064e+15579
relative error = 1.6896947440444750709381797428298e+15581 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4024.5MB, alloc=4.9MB, time=403.80
NO POLE
NO POLE
t[1] = 1.284
x2[1] (analytic) = 2.002691021993033940953443429134
x2[1] (numeric) = 3.6214503382423318127244665107529e+15597
absolute error = 3.6214503382423318127244665107529e+15597
relative error = 1.8082920922261609270909965002343e+15599 %
h = 0.001
x1[1] (analytic) = 3.0004984692706566308458623489714
x1[1] (numeric) = -4.0538250577548430354933888096149e+15599
absolute error = 4.0538250577548430354933888096149e+15599
relative error = 1.3510505335269252057020417834145e+15601 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4028.3MB, alloc=4.9MB, time=404.11
memory used=4032.2MB, alloc=4.9MB, time=404.43
NO POLE
NO POLE
t[1] = 1.285
x2[1] (analytic) = 2.0026961600632765037158036951094
x2[1] (numeric) = -2.8956482321042956095788051237864e+15617
absolute error = 2.8956482321042956095788051237864e+15617
relative error = 1.4458749608891274337109213458467e+15619 %
h = 0.001
x1[1] (analytic) = 3.0004979710505375520969555300697
x1[1] (numeric) = 3.2413674813624957193113409442825e+15619
absolute error = 3.2413674813624957193113409442825e+15619
relative error = 1.0802765116443737094681728150465e+15621 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4036.0MB, alloc=4.9MB, time=405.08
NO POLE
NO POLE
t[1] = 1.286
x2[1] (analytic) = 2.0027013086691772854519830757256
x2[1] (numeric) = 2.3153095862024932868021981867553e+15637
absolute error = 2.3153095862024932868021981867553e+15637
relative error = 1.1560933106600147601469151989600e+15639 %
h = 0.001
x1[1] (analytic) = 3.0004974733283895653831897361724
x1[1] (numeric) = -2.5917406399014943141517884576134e+15639
absolute error = 2.5917406399014943141517884576134e+15639
relative error = 8.6377031240307302090863693438301e+15640 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4039.8MB, alloc=4.9MB, time=405.92
NO POLE
NO POLE
memory used=4043.6MB, alloc=4.9MB, time=406.66
t[1] = 1.287
x2[1] (analytic) = 2.0027064678315795778076027842803
x2[1] (numeric) = -1.8512809741622235191469430346166e+15657
absolute error = 1.8512809741622235191469430346166e+15657
relative error = 9.2438957176120210198133436882013e+15658 %
h = 0.001
x1[1] (analytic) = 3.0004969761037149485151014064657
x1[1] (numeric) = 2.0723104008230171949637156959630e+15659
absolute error = 2.0723104008230171949637156959630e+15659
relative error = 6.9065572047801519679741149710199e+15660 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4047.4MB, alloc=4.9MB, time=407.35
NO POLE
NO POLE
t[1] = 1.288
x2[1] (analytic) = 2.0027116375713686497116132859188
x2[1] (numeric) = 1.4802518271071893913562120002964e+15677
absolute error = 1.4802518271071893913562120002964e+15677
relative error = 7.3912379562653793391791960688542e+15678 %
h = 0.001
x1[1] (analytic) = 3.0004964793760164767766382819286
x1[1] (numeric) = -1.6569830835860475764153455848799e+15679
absolute error = 1.6569830835860475764153455848799e+15679
relative error = 5.5223630321693759512375598195146e+15680 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4051.2MB, alloc=4.9MB, time=408.03
NO POLE
NO POLE
t[1] = 1.289
x2[1] (analytic) = 2.002716817909471831166010322078
x2[1] (numeric) = -1.1835834226329425053379777724177e+15697
absolute error = 1.1835834226329425053379777724177e+15697
relative error = 5.9098890669346925555310292982021e+15698 %
h = 0.001
x1[1] (analytic) = 3.0004959831447974224279346478457
x1[1] (numeric) = 1.3248946384672468276356799105662e+15699
absolute error = 1.3248946384672468276356799105662e+15699
relative error = 4.4155854429061246590956299458814e+15700 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4055.0MB, alloc=4.9MB, time=408.71
memory used=4058.9MB, alloc=4.9MB, time=409.39
NO POLE
NO POLE
t[1] = 1.29
x2[1] (analytic) = 2.0027220088668585972035467949987
x2[1] (numeric) = 9.4637256490957163193968886367651e+15716
absolute error = 9.4637256490957163193968886367651e+15716
relative error = 4.7254314913382803379239256133405e+15718 %
h = 0.001
x1[1] (analytic) = 3.0004954874095615542085835525468
x1[1] (numeric) = -1.0593625369067330604925443642869e+15719
absolute error = 1.0593625369067330604925443642869e+15719
relative error = 3.5306253295562187951473516643266e+15720 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4062.7MB, alloc=4.9MB, time=410.07
NO POLE
NO POLE
t[1] = 1.291
x2[1] (analytic) = 2.0027272104645406520137765916255
x2[1] (numeric) = -7.5670291969886338096869241127685e+15736
absolute error = 7.5670291969886338096869241127685e+15736
relative error = 3.7783624037511483529022534503403e+15738 %
h = 0.001
x1[1] (analytic) = 3.0004949921698131368414055056484
x1[1] (numeric) = 8.4704772139449854503932302613062e+15738
absolute error = 8.4704772139449854503932302613062e+15738
relative error = 2.8230266126255205714126128709723e+15740 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4066.5MB, alloc=4.9MB, time=410.76
NO POLE
NO POLE
t[1] = 1.292
x2[1] (analytic) = 2.0027324227235720132377670992996
x2[1] (numeric) = 6.0504639495281421255824832323624e+15756
absolute error = 6.0504639495281421255824832323624e+15756
relative error = 3.0211045074608351524042755857758e+15758 %
h = 0.001
x1[1] (analytic) = 3.0004944974250569305367131595618
x1[1] (numeric) = -6.7728451528466716215278945198458e+15758
absolute error = 6.7728451528466716215278945198458e+15758
relative error = 2.2572429840011184154065948936099e+15760 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4070.3MB, alloc=4.9MB, time=411.45
memory used=4074.1MB, alloc=4.9MB, time=412.16
NO POLE
NO POLE
t[1] = 1.293
x2[1] (analytic) = 2.0027376456650490964318178400745
x2[1] (numeric) = -4.8378449522975551761019579558579e+15776
absolute error = 4.8378449522975551761019579558579e+15776
relative error = 2.4156159259147755158145177195411e+15778 %
h = 0.001
x1[1] (analytic) = 3.0004940031747981904970714785365
x1[1] (numeric) = 5.4154483042490577589901793868998e+15778
absolute error = 5.4154483042490577589901793868998e+15778
relative error = 1.8048522338384999779653324872926e+15780 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4077.9MB, alloc=4.9MB, time=412.83
NO POLE
NO POLE
t[1] = 1.294
x2[1] (analytic) = 2.002742879310110799700523326261
x2[1] (numeric) = 3.8682560507275150354676816001173e+15796
absolute error = 3.8682560507275150354676816001173e+15796
relative error = 1.9314791183079984884491637651768e+15798 %
h = 0.001
x1[1] (analytic) = 3.0004935094185426664225528999963
x1[1] (numeric) = -4.3300975696554393219989387400302e+15798
absolute error = 4.3300975696554393219989387400302e+15798
relative error = 1.4431284573898501606299343398187e+15800 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4081.7MB, alloc=4.9MB, time=413.50
NO POLE
NO POLE
t[1] = 1.295
x2[1] (analytic) = 2.0027481236799385884995189169393
x2[1] (numeric) = -3.0929897550527568590235901209810e+15816
absolute error = 3.0929897550527568590235901209810e+15816
relative error = 1.5443728137762824346471821704909e+15818 %
h = 0.001
x1[1] (analytic) = 3.0004930161557966020164869934241
x1[1] (numeric) = 3.4622701407793988884835445448588e+15818
absolute error = 3.4622701407793988884835445448588e+15818
relative error = 1.1539004164106426717113068699083e+15820 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4085.6MB, alloc=4.9MB, time=414.19
memory used=4089.4MB, alloc=4.9MB, time=414.88
NO POLE
NO POLE
t[1] = 1.296
x2[1] (analytic) = 2.0027533787957565806082491336593
x2[1] (numeric) = 2.4731004099540140682961868387519e+15836
absolute error = 2.4731004099540140682961868387519e+15836
relative error = 1.2348501997989758955437100894930e+15838 %
h = 0.001
x1[1] (analytic) = 3.0004925233860667344917041225451
x1[1] (numeric) = -2.7683705355134688631909226968937e+15838
absolute error = 2.7683705355134688631909226968937e+15838
relative error = 9.2263870479148957749841288637939e+15839 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4093.2MB, alloc=4.9MB, time=415.55
NO POLE
NO POLE
t[1] = 1.297
x2[1] (analytic) = 2.0027586446788316312730985733938
x2[1] (numeric) = -1.9774477518792778913125885120133e+15856
absolute error = 1.9774477518792778913125885120133e+15856
relative error = 9.8736198549595442117653607726591e+15857 %
h = 0.001
x1[1] (analytic) = 3.0004920311088602940772726170519
x1[1] (numeric) = 2.2135405702842988756984252434416e+15858
absolute error = 2.2135405702842988756984252434416e+15858
relative error = 7.3772586207011653329902241656158e+15859 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4097.0MB, alloc=4.9MB, time=416.23
NO POLE
NO POLE
t[1] = 1.298
x2[1] (analytic) = 2.0027639213504734185212262380139
x2[1] (numeric) = 1.5811325717604486724390544446809e+15876
absolute error = 1.5811325717604486724390544446809e+15876
relative error = 7.8947526211391071813104178097185e+15877 %
h = 0.001
x1[1] (analytic) = 3.000491539323685003525728960609
x1[1] (numeric) = -1.7699082523235085337070833554085e+15878
absolute error = 1.7699082523235085337070833554085e+15878
relative error = 5.8987276888720983806450098262861e+15879 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4100.8MB, alloc=4.9MB, time=416.91
memory used=4104.6MB, alloc=4.9MB, time=417.60
NO POLE
NO POLE
t[1] = 1.299
x2[1] (analytic) = 2.0027692088320345286454447821229
x2[1] (numeric) = -1.2642458983333142454924840460539e+15896
absolute error = 1.2642458983333142454924840460539e+15896
relative error = 6.3124891912562965098764604414730e+15897 %
h = 0.001
x1[1] (analytic) = 3.0004910480300490776208005023656
x1[1] (numeric) = 1.4151876246119672883729094523460e+15898
absolute error = 1.4151876246119672883729094523460e+15898
relative error = 4.7165200694103006722462719460375e+15899 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4108.4MB, alloc=4.9MB, time=418.28
NO POLE
NO POLE
t[1] = 1.3
x2[1] (analytic) = 2.0027745071449105418604868650168
x2[1] (numeric) = 1.0108688670381547983300879187145e+15916
absolute error = 1.0108688670381547983300879187145e+15916
relative error = 5.0473423914268621466948835096540e+15917 %
h = 0.001
x1[1] (analytic) = 3.0004905572274612226856201997016
x1[1] (numeric) = -1.1315592264320339333753873322478e+15918
absolute error = 1.1315592264320339333753873322478e+15918
relative error = 3.7712474172144267758761330321670e+15919 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4112.3MB, alloc=4.9MB, time=418.96
NO POLE
NO POLE
t[1] = 1.301
x2[1] (analytic) = 2.0027798163105401181310014778455
x2[1] (numeric) = -8.0827303271787540216822139951414e+15935
absolute error = 8.0827303271787540216822139951414e+15935
relative error = 4.0357558336435171705139042726622e+15937 %
h = 0.001
x1[1] (analytic) = 3.0004900669154306360914329004187
x1[1] (numeric) = 9.0477492924271812502945814749586e+15937
absolute error = 9.0477492924271812502945814749586e+15937
relative error = 3.0154238443216928425591062294889e+15939 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4116.1MB, alloc=4.9MB, time=419.63
memory used=4119.9MB, alloc=4.9MB, time=420.33
NO POLE
NO POLE
t[1] = 1.302
x2[1] (analytic) = 2.0027851363504050831716238037209
x2[1] (numeric) = 6.4628095366428270946162481904692e+15955
absolute error = 6.4628095366428270946162481904692e+15955
relative error = 3.2269110746546408616418125893806e+15957 %
h = 0.001
x1[1] (analytic) = 3.0004895770934670057667926730853
x1[1] (numeric) = -7.2344217913134139345545784927040e+15957
absolute error = 7.2344217913134139345545784927040e+15957
relative error = 2.4110804605164797288836852866558e+15959 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4123.7MB, alloc=4.9MB, time=421.01
NO POLE
NO POLE
t[1] = 1.303
x2[1] (analytic) = 2.0027904672860305146194628565668
x2[1] (numeric) = -5.1675492582591705757435675708755e+15975
absolute error = 5.1675492582591705757435675708755e+15975
relative error = 2.5801746826075550136265050290532e+15977 %
h = 0.001
x1[1] (analytic) = 3.0004890877610805097072506947315
x1[1] (numeric) = 5.7845168962004155979567104966149e+15977
absolute error = 5.7845168962004155979567104966149e+15977
relative error = 1.9278580014822631639671042677646e+15979 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4127.5MB, alloc=4.9MB, time=421.71
NO POLE
NO POLE
t[1] = 1.304
x2[1] (analytic) = 2.0027958091389848283793518339332
x2[1] (numeric) = 4.1318818363950031778621693473600e+15995
absolute error = 4.1318818363950031778621693473600e+15995
relative error = 2.0630569614439759196335782230015e+15997 %
h = 0.001
x1[1] (analytic) = 3.0004885989177818154855332055813
x1[1] (numeric) = -4.6251983486234204876357382784765e+15997
absolute error = 4.6251983486234204876357382784765e+15997
relative error = 1.5414817274398709744032820443179e+15999 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4131.3MB, alloc=4.9MB, time=422.39
memory used=4135.1MB, alloc=4.9MB, time=423.10
NO POLE
NO POLE
t[1] = 1.305
x2[1] (analytic) = 2.0028011619308798651422068098018
x2[1] (numeric) = -3.3037803137811330296263731546002e+16015
absolute error = 3.3037803137811330296263731546002e+16015
relative error = 1.6495797868401437481048623612135e+16017 %
h = 0.001
x1[1] (analytic) = 3.0004881105630820797622090410016
x1[1] (numeric) = 3.6982275526173229172456051070875e+16017
absolute error = 3.6982275526173229172456051070875e+16017
relative error = 1.2325419786193722382490563503622e+16019 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4139.0MB, alloc=4.9MB, time=423.78
NO POLE
NO POLE
t[1] = 1.306
x2[1] (analytic) = 2.0028065256833709770768400855997
x2[1] (numeric) = 2.6416448470488892534897621922949e+16035
absolute error = 2.6416448470488892534897621922949e+16035
relative error = 1.3189715597454139360615349063658e+16037 %
h = 0.001
x1[1] (analytic) = 3.0004876226964929477968462513335
x1[1] (numeric) = -2.9570379473581953089807435006519e+16037
absolute error = 2.9570379473581953089807435006519e+16037
relative error = 9.8551912862108390526707045415000e+16038 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4142.8MB, alloc=4.9MB, time=424.45
NO POLE
NO POLE
t[1] = 1.307
x2[1] (analytic) = 2.002811900418157114695575211212
x2[1] (numeric) = -2.1122129303910620562438814766477e+16055
absolute error = 2.1122129303910620562438814766477e+16055
relative error = 1.0546237167604524647341106422053e+16057 %
h = 0.001
x1[1] (analytic) = 3.0004871353175265529596573207649
x1[1] (numeric) = 2.3643957267929557039134650281558e+16057
absolute error = 2.3643957267929557039134650281558e+16057
relative error = 7.8800395407885777342492262341872e+16058 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4146.6MB, alloc=4.9MB, time=425.13
memory used=4150.4MB, alloc=4.9MB, time=425.82
NO POLE
NO POLE
t[1] = 1.308
x2[1] (analytic) = 2.0028172861569809138940113827466
x2[1] (numeric) = 1.6888884470201565547588758324482e+16075
absolute error = 1.6888884470201565547588758324482e+16075
relative error = 8.4325637625227756206206469873812e+16076 %
h = 0.001
x1[1] (analytic) = 3.0004866484256955162436324968867
x1[1] (numeric) = -1.8905293920462531255396941034326e+16077
absolute error = 1.8905293920462531255396941034326e+16077
relative error = 6.3007425580053217418778662143956e+16078 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4154.2MB, alloc=4.9MB, time=426.50
NO POLE
NO POLE
t[1] = 1.309
x2[1] (analytic) = 2.0028226829216287831652856201577
x2[1] (numeric) = -1.3504056079942961811629779201896e+16095
absolute error = 1.3504056079942961811629779201896e+16095
relative error = 6.7425120531608142795128911706883e+16096 %
h = 0.001
x1[1] (analytic) = 3.0004861620205129457771607430686
x1[1] (numeric) = 1.5116341743007010112778357410633e+16097
absolute error = 1.5116341743007010112778357410633e+16097
relative error = 5.0379641587241109986372836610993e+16098 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4158.0MB, alloc=4.9MB, time=427.18
NO POLE
NO POLE
t[1] = 1.31
x2[1] (analytic) = 2.0028280907339309909891818255845
x2[1] (numeric) = 1.0797606611140969402455418410906e+16115
absolute error = 1.0797606611140969402455418410906e+16115
relative error = 5.3911799325643647088789651305764e+16116 %
h = 0.001
x1[1] (analytic) = 3.0004856761014924363371378262734
x1[1] (numeric) = -1.2086761975387775795007009018666e+16117
absolute error = 1.2086761975387775795007009018666e+16117
relative error = 4.0282685138800632652355777803847e+16118 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4161.9MB, alloc=4.9MB, time=427.86
memory used=4165.7MB, alloc=4.9MB, time=428.56
NO POLE
NO POLE
t[1] = 1.311
x2[1] (analytic) = 2.0028335096157617533964365224015
x2[1] (numeric) = -8.6335770407617866778277143780430e+16134
absolute error = 8.6335770407617866778277143780430e+16134
relative error = 4.3106813418645643283112687517507e+16136 %
h = 0.001
x1[1] (analytic) = 3.0004851906681480688625610534194
x1[1] (numeric) = 9.6643630802579996830029983007979e+16136
absolute error = 9.6643630802579996830029983007979e+16136
relative error = 3.2209334378037504083129877282359e+16138 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4169.5MB, alloc=4.9MB, time=429.24
NO POLE
NO POLE
t[1] = 1.312
x2[1] (analytic) = 2.0028389395890393217085917755241
x2[1] (numeric) = 6.9032569163855326475760675375438e+16154
absolute error = 6.9032569163855326475760675375438e+16154
relative error = 3.4467359206636982899001266630189e+16156 %
h = 0.001
x1[1] (analytic) = 3.000484705719994409968610169884
x1[1] (numeric) = -7.7274553711940183609227054381087e+16156
absolute error = 7.7274553711940183609227054381087e+16156
relative error = 2.5754023529807471767654159981978e+16158 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4173.3MB, alloc=4.9MB, time=429.92
NO POLE
NO POLE
memory used=4177.1MB, alloc=4.9MB, time=430.60
t[1] = 1.313
x2[1] (analytic) = 2.0028443806757260704537464954586
x2[1] (numeric) = -5.5197232651809221869044298613952e+16174
absolute error = 5.5197232651809221869044298613952e+16174
relative error = 2.7559421582812441083871068052314e+16176 %
h = 0.001
x1[1] (analytic) = 3.0004842212565465114612139342311
x1[1] (numeric) = 6.1787379072890928338309079108195e+16176
absolute error = 6.1787379072890928338309079108195e+16176
relative error = 2.0592469253851144377959806956295e+16178 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4180.9MB, alloc=4.9MB, time=431.28
NO POLE
NO POLE
t[1] = 1.314
x2[1] (analytic) = 2.0028498328978285854585580319335
x2[1] (numeric) = 4.4134740012156318124721594328658e+16194
absolute error = 4.4134740012156318124721594328658e+16194
relative error = 2.2035970589117933341638292397610e+16196 %
h = 0.001
x1[1] (analytic) = 3.0004837372773199098521018837272
x1[1] (numeric) = -4.9404105611899842561746754933246e+16196
absolute error = 4.9404105611899842561746754933246e+16196
relative error = 1.6465380231232249735183566158253e+16198 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4184.7MB, alloc=4.9MB, time=431.98
NO POLE
NO POLE
t[1] = 1.315
x2[1] (analytic) = 2.0028552962773977521168466677132
x2[1] (numeric) = -3.5289364744570860098925047784149e+16214
absolute error = 3.5289364744570860098925047784149e+16214
relative error = 1.7619527886094094872624512702608e+16216 %
h = 0.001
x1[1] (analytic) = 3.000483253781830625874340805699
x1[1] (numeric) = 3.9502657143497997644630999485351e+16216
absolute error = 3.9502657143497997644630999485351e+16216
relative error = 1.3165431632957312823612063300128e+16218 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4188.6MB, alloc=4.9MB, time=432.66
memory used=4192.4MB, alloc=4.9MB, time=433.34
NO POLE
NO POLE
t[1] = 1.316
x2[1] (analytic) = 2.0028607708365288438351563293586
x2[1] (numeric) = 2.8216757677338733235087364492737e+16234
absolute error = 2.8216757677338733235087364492737e+16234
relative error = 1.4088227243850567199986696277392e+16236 %
h = 0.001
x1[1] (analytic) = 3.0004827707695951639983554302688
x1[1] (numeric) = -3.1585632450370467378816385691425e+16236
absolute error = 3.1585632450370467378816385691425e+16236
relative error = 1.0526850131610338967350116604350e+16238 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4196.2MB, alloc=4.9MB, time=434.02
NO POLE
NO POLE
t[1] = 1.317
x2[1] (analytic) = 2.0028662565973616106556255392876
x2[1] (numeric) = -2.2561624999048603221676086374238e+16254
absolute error = 2.2561624999048603221676086374238e+16254
relative error = 1.1264668783914807007170722742081e+16256 %
h = 0.001
x1[1] (analytic) = 3.0004822882401305119484328604875
x1[1] (numeric) = 2.5255318235069815653506574441846e+16256
absolute error = 2.5255318235069815653506574441846e+16256
relative error = 8.4170862577838407894347223119140e+16257 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4200.0MB, alloc=4.9MB, time=434.71
NO POLE
NO POLE
t[1] = 1.318
x2[1] (analytic) = 2.0028717535820803680565233424832
x2[1] (numeric) = 1.8039880003878029490904046575360e+16274
absolute error = 1.8039880003878029490904046575360e+16274
relative error = 9.0070070495598164803757997860383e+16275 %
h = 0.001
x1[1] (analytic) = 3.0004818061929541402197102563714
x1[1] (numeric) = -2.0193709914052040377578496644219e+16276
absolute error = 2.0193709914052040377578496644219e+16276
relative error = 6.7301557611089307032275313274689e+16277 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4203.8MB, alloc=4.9MB, time=435.39
memory used=4207.6MB, alloc=4.9MB, time=436.08
NO POLE
NO POLE
t[1] = 1.319
x2[1] (analytic) = 2.0028772618129140859308056516203
x2[1] (numeric) = -1.4424371939877631789054411435919e+16294
absolute error = 1.4424371939877631789054411435919e+16294
relative error = 7.2018252016208628963237041603187e+16295 %
h = 0.001
x1[1] (analytic) = 3.0004813246275840015956452898278
x1[1] (numeric) = 1.6146536594681574914989289460956e+16296
absolute error = 1.6146536594681574914989289460956e+16296
relative error = 5.3813154783376840019436633854526e+16297 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4211.4MB, alloc=4.9MB, time=436.76
NO POLE
NO POLE
t[1] = 1.32
x2[1] (analytic) = 2.0028827813121364777430481662166
x2[1] (numeric) = 1.1533475046131240233410034779888e+16314
absolute error = 1.1533475046131240233410034779888e+16314
relative error = 5.7584373652537890967647988960358e+16315 %
h = 0.001
x1[1] (analytic) = 3.0004808435435385306659688879425
x1[1] (numeric) = -1.2910487726773403564565769191291e+16316
absolute error = 1.2910487726773403564565769191291e+16316
relative error = 4.3028062500563222485036236859423e+16317 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4215.3MB, alloc=4.9MB, time=437.43
NO POLE
NO POLE
t[1] = 1.321
x2[1] (analytic) = 2.0028883121020660898651127346853
x2[1] (numeric) = -9.2219645468224448275802873683924e+16333
absolute error = 9.2219645468224448275802873683924e+16333
relative error = 4.6043328981953231210548841399279e+16335 %
h = 0.001
x1[1] (analytic) = 3.0004803629403366433451197825801
x1[1] (numeric) = 1.0322999756992393427076366993170e+16336
absolute error = 1.0322999756992393427076366993170e+16336
relative error = 3.4404490309266063890788670125447e+16337 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4219.1MB, alloc=4.9MB, time=438.11
memory used=4222.9MB, alloc=4.9MB, time=438.80
NO POLE
NO POLE
t[1] = 1.322
x2[1] (analytic) = 2.0028938542050663910909047428545
x2[1] (numeric) = 7.3737212559693581964954162758866e+16353
absolute error = 7.3737212559693581964954162758866e+16353
relative error = 3.6815337170705599276636816637368e+16355 %
h = 0.001
x1[1] (analytic) = 3.0004798828174977363911603847327
x1[1] (numeric) = -8.2540897166785526394443103879594e+16355
absolute error = 8.2540897166785526394443103879594e+16355
relative error = 2.7509231986344240223020226473612e+16357 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4226.7MB, alloc=4.9MB, time=439.48
NO POLE
NO POLE
t[1] = 1.323
x2[1] (analytic) = 2.0028994076435458623305798286455
x2[1] (numeric) = -5.8958983072070984552287867866490e+16373
absolute error = 5.8958983072070984552287867866490e+16373
relative error = 2.9436816870118052241921895989612e+16375 %
h = 0.001
x1[1] (analytic) = 3.0004794031745416869251735025316
x1[1] (numeric) = 6.5998255017714257838693454394244e+16375
absolute error = 6.5998255017714257838693454394244e+16375
relative error = 2.1995903370603826057640547247364e+16377 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4230.5MB, alloc=4.9MB, time=440.16
NO POLE
NO POLE
t[1] = 1.324
x2[1] (analytic) = 2.0029049724399580864845589401583
x2[1] (numeric) = 4.7142569731377410841491848075356e+16393
absolute error = 4.7142569731377410841491848075356e+16393
relative error = 2.3537097555830559114228533704541e+16395 %
h = 0.001
x1[1] (analytic) = 3.00047892401098885195113942232
x1[1] (numeric) = -5.2771048230573483527065741482063e+16395
absolute error = 5.2771048230573483527065741482063e+16395
relative error = 1.7587541711517856552360633248377e+16397 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4234.3MB, alloc=4.9MB, time=440.83
memory used=4238.1MB, alloc=4.9MB, time=441.55
NO POLE
NO POLE
t[1] = 1.325
x2[1] (analytic) = 2.0029105486168018384977114734055
x2[1] (numeric) = -3.7694372682125658356488475764379e+16413
absolute error = 3.7694372682125658356488475764379e+16413
relative error = 1.8819798372002768103890843895984e+16415 %
h = 0.001
x1[1] (analytic) = 3.0004784453263600678762928726634
x1[1] (numeric) = 4.2194805462751448855904328810096e+16415
absolute error = 4.2194805462751448855904328810096e+16415
relative error = 1.4062692411097106750285369364573e+16417 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4242.0MB, alloc=4.9MB, time=442.22
NO POLE
NO POLE
t[1] = 1.326
x2[1] (analytic) = 2.0029161361966211755940669463684
x2[1] (numeric) = 3.0139759881465975124803446615695e+16433
absolute error = 3.0139759881465975124803446615695e+16433
relative error = 1.5047939020901288332446687404125e+16435 %
h = 0.001
x1[1] (analytic) = 3.0004779671201766500319593916534
x1[1] (numeric) = -3.3738227072168416400723899279819e+16435
absolute error = 3.3738227072168416400723899279819e+16435
relative error = 1.1244284224673033898200754972315e+16437 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4245.8MB, alloc=4.9MB, time=442.91
NO POLE
NO POLE
t[1] = 1.327
x2[1] (analytic) = 2.0029217352020055276924163879259
x2[1] (numeric) = -2.4099223864871046165720598178977e+16453
absolute error = 2.4099223864871046165720598178977e+16453
relative error = 1.2032034722734939337178369505657e+16455 %
h = 0.001
x1[1] (analytic) = 3.0004774893919603921948706183434
x1[1] (numeric) = 2.6976495174934108771672269778524e+16455
absolute error = 2.6976495174934108771672269778524e+16455
relative error = 8.9907340649307224719066174067197e+16456 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4249.6MB, alloc=4.9MB, time=443.58
memory used=4253.4MB, alloc=4.9MB, time=444.27
NO POLE
NO POLE
t[1] = 1.328
x2[1] (analytic) = 2.0029273456555897880031653435225
x2[1] (numeric) = 1.9269317113780596715993680909297e+16473
absolute error = 1.9269317113780596715993680909297e+16473
relative error = 9.6205771794849825480948889934647e+16474 %
h = 0.001
x1[1] (analytic) = 3.0004770121412335661089580296296
x1[1] (numeric) = -2.1569932835136101172036678378980e+16475
absolute error = 2.1569932835136101172036678378980e+16475
relative error = 7.1888345579235507341570062675916e+16476 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4257.2MB, alloc=4.9MB, time=444.95
NO POLE
NO POLE
t[1] = 1.329
x2[1] (analytic) = 2.0029329675800544038068011242133
x2[1] (numeric) = -1.5407408309637885114651708983576e+16493
absolute error = 1.5407408309637885114651708983576e+16493
relative error = 7.6924233406838028643530955981991e+16494 %
h = 0.001
x1[1] (analytic) = 3.0004765353675189210076246443713
x1[1] (numeric) = 1.7246940326947751676835389404298e+16495
absolute error = 1.7246940326947751676835389404298e+16495
relative error = 5.7480670565668090699887719013120e+16496 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4261.0MB, alloc=4.9MB, time=445.63
NO POLE
NO POLE
t[1] = 1.33
x2[1] (analytic) = 2.0029386009981254674143376519395
x2[1] (numeric) = 1.2319493701732096041117983183265e+16513
absolute error = 1.2319493701732096041117983183265e+16513
relative error = 6.1507096101662408106473885664119e+16514 %
h = 0.001
x1[1] (analytic) = 3.0004760590703396831364942170239
x1[1] (numeric) = -1.3790351268816073554310984761554e+16515
absolute error = 1.3790351268816073554310984761554e+16515
relative error = 4.5960544251397369814403086964999e+16516 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4264.9MB, alloc=4.9MB, time=446.33
memory used=4268.7MB, alloc=4.9MB, time=447.02
NO POLE
NO POLE
t[1] = 1.331
x2[1] (analytic) = 2.0029442459325748073101019815605
x2[1] (numeric) = -9.8504512905054424156677866237422e+16532
absolute error = 9.8504512905054424156677866237422e+16532
relative error = 4.9179857654595137210574507119432e+16534 %
h = 0.001
x1[1] (analytic) = 3.0004755832492195552766374435306
x1[1] (numeric) = 1.1026523227438612980050741777137e+16535
absolute error = 1.1026523227438612980050741777137e+16535
relative error = 3.6749251648626896240897484184408e+16536 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4272.5MB, alloc=4.9MB, time=447.70
NO POLE
NO POLE
t[1] = 1.332
x2[1] (analytic) = 2.0029499024062200794772273092971
x2[1] (numeric) = 7.8762482433006088139842100665743e+16552
absolute error = 7.8762482433006088139842100665743e+16552
relative error = 3.9323241354357248377934171401485e+16554 %
h = 0.001
x1[1] (analytic) = 3.0004751079036827162682747027022
x1[1] (numeric) = -8.8166147558677429776959254197955e+16554
absolute error = 8.8166147558677429776959254197955e+16554
relative error = 2.9384062319475713792382141192374e+16556 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4276.3MB, alloc=4.9MB, time=448.38
NO POLE
NO POLE
t[1] = 1.333
x2[1] (analytic) = 2.0029555704419248589062180078294
x2[1] (numeric) = -6.2977100805411724987833690516639e+16572
absolute error = 6.2977100805411724987833690516639e+16572
relative error = 3.1442085753063751522802767285964e+16574 %
h = 0.001
x1[1] (analytic) = 3.0004746330332538205349548567858
x1[1] (numeric) = 7.0496106660305473607407011243744e+16574
absolute error = 7.0496106660305473607407011243744e+16574
relative error = 2.3494985054760893087985172110203e+16576 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4280.1MB, alloc=4.9MB, time=449.06
memory used=4283.9MB, alloc=4.9MB, time=449.75
NO POLE
NO POLE
t[1] = 1.334
x2[1] (analytic) = 2.0029612500625987312869529603405
x2[1] (numeric) = 5.0355386261834680605200674398152e+16592
absolute error = 5.0355386261834680605200674398152e+16592
relative error = 2.5140469522443791216199207496088e+16594 %
h = 0.001
x1[1] (analytic) = 3.0004741586374579976082096354011
x1[1] (numeric) = -5.6367451588532532549717957624557e+16594
absolute error = 5.6367451588532532549717957624557e+16594
relative error = 1.8786181319465018709588577364939e+16596 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4287.7MB, alloc=4.9MB, time=450.43
NO POLE
NO POLE
t[1] = 1.335
x2[1] (analytic) = 2.0029669412911973848844941993161
x2[1] (numeric) = -4.0263284481979123846190204535655e+16612
absolute error = 4.0263284481979123846190204535655e+16612
relative error = 2.0101821778458162736540650290541e+16614 %
h = 0.001
x1[1] (analytic) = 3.0004736847158208516526831274998
x1[1] (numeric) = 4.5070426568317253811071802472420e+16614
absolute error = 4.5070426568317253811071802472420e+16614
relative error = 1.5021103767016019767831787617979e+16616 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4291.6MB, alloc=4.9MB, time=451.12
NO POLE
NO POLE
t[1] = 1.336
x2[1] (analytic) = 2.0029726441507227025990685908914
x2[1] (numeric) = 3.2193816741814335396599166937913e+16632
absolute error = 3.2193816741814335396599166937913e+16632
relative error = 1.6073018688412884075792819615443e+16634 %
h = 0.001
x1[1] (analytic) = 3.0004732112678684609917359064769
x1[1] (numeric) = -3.6037523318924301226761594263934e+16634
absolute error = 3.6037523318924301226761594263934e+16634
relative error = 1.2010613253799531003011300780727e+16636 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4295.4MB, alloc=4.9MB, time=451.81
memory used=4299.2MB, alloc=4.9MB, time=452.52
NO POLE
NO POLE
t[1] = 1.337
x2[1] (analytic) = 2.0029783586642228542105910419931
x2[1] (numeric) = -2.5741611737348734856629184537975e+16652
absolute error = 2.5741611737348734856629184537975e+16652
relative error = 1.2851667431152725232862264824456e+16654 %
h = 0.001
x1[1] (analytic) = 3.0004727382931273776335233140374
x1[1] (numeric) = 2.8814972163475156293413536436151e+16654
absolute error = 2.8814972163475156293413536436151e+16654
relative error = 9.6034774106519857818039409057314e+16655 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4303.0MB, alloc=4.9MB, time=453.20
NO POLE
NO POLE
t[1] = 1.338
x2[1] (analytic) = 2.0029840848547923888080984454541
x2[1] (numeric) = 2.0582541677196194346269383466983e+16672
absolute error = 2.0582541677196194346269383466983e+16672
relative error = 1.0275938702073281255228672471620e+16674 %
h = 0.001
x1[1] (analytic) = 3.0004722657911246267975474288979
x1[1] (numeric) = -2.3039946819703706870448437464861e+16674
absolute error = 2.3039946819703706870448437464861e+16674
relative error = 7.6787734658926567608120182354044e+16675 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4306.8MB, alloc=4.9MB, time=453.87
NO POLE
NO POLE
memory used=4310.6MB, alloc=4.9MB, time=454.55
t[1] = 1.339
x2[1] (analytic) = 2.0029898227455723274044643176817
x2[1] (numeric) = -1.6457439659027013398031618380187e+16692
absolute error = 1.6457439659027013398031618380187e+16692
relative error = 8.2164369844217138276522919214801e+16693 %
h = 0.001
x1[1] (analytic) = 3.0004717937613877064416822468742
x1[1] (numeric) = 1.8422337750082853230578961993673e+16694
absolute error = 1.8422337750082853230578961993673e+16694
relative error = 6.1398136747650053908606624754192e+16695 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4314.4MB, alloc=4.9MB, time=455.24
NO POLE
NO POLE
t[1] = 1.34
x2[1] (analytic) = 2.0029955723597502557367648243525
x2[1] (numeric) = 1.3159080369097092140757931047848e+16712
absolute error = 1.3159080369097092140757931047848e+16712
relative error = 6.5697001784153923339073283591867e+16713 %
h = 0.001
x1[1] (analytic) = 3.0004713222034445867896715993799
x1[1] (numeric) = -1.4730178451969717418262795052699e+16714
absolute error = 1.4730178451969717418262795052699e+16714
relative error = 4.9092881984795551761289957287974e+16715 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4318.3MB, alloc=4.9MB, time=455.92
NO POLE
NO POLE
t[1] = 1.341
x2[1] (analytic) = 2.0030013337205604172526676319688
x2[1] (numeric) = -1.0521770077727509896426614743478e+16732
absolute error = 1.0521770077727509896426614743478e+16732
relative error = 5.2530020327961531914996021320477e+16733 %
h = 0.001
x1[1] (analytic) = 3.0004708511168237098590993378345
x1[1] (numeric) = 1.1777992574579582653863208135702e+16734
absolute error = 1.1777992574579582653863208135702e+16734
relative error = 3.9253814347823521089223537880070e+16735 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4322.1MB, alloc=4.9MB, time=456.60
memory used=4325.9MB, alloc=4.9MB, time=457.30
NO POLE
NO POLE
t[1] = 1.342
x2[1] (analytic) = 2.003007106851283806283215766975
x2[1] (numeric) = 8.4130229821035855728222590483020e+16751
absolute error = 8.4130229821035855728222590483020e+16751
relative error = 4.2001962715593214194182037750130e+16753 %
h = 0.001
x1[1] (analytic) = 3.0004703805010539889898313119506
x1[1] (numeric) = -9.4174764779106948570711455016445e+16753
absolute error = 9.4174764779106948570711455016445e+16753
relative error = 3.1386667034313644466662911968249e+16755 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4329.7MB, alloc=4.9MB, time=457.98
NO POLE
NO POLE
t[1] = 1.343
x2[1] (analytic) = 2.0030128917752482614023794094686
x2[1] (numeric) = -6.7269057558317159778997706054842e+16771
absolute error = 6.7269057558317159778997706054842e+16771
relative error = 3.3583936396284167237908362541363e+16773 %
h = 0.001
x1[1] (analytic) = 3.0004699103556648083729286703431
x1[1] (numeric) = 7.5300491701292305838118961405767e+16773
absolute error = 7.5300491701292305838118961405767e+16773
relative error = 2.5096232907187014240146772675769e+16775 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4333.5MB, alloc=4.9MB, time=458.67
NO POLE
NO POLE
t[1] = 1.344
x2[1] (analytic) = 2.0030186885158285589737492953855
x2[1] (numeric) = 5.3787159673878937524196204167257e+16791
absolute error = 5.3787159673878937524196204167257e+16791
relative error = 2.6853049341108977101326461769571e+16793 %
h = 0.001
x1[1] (analytic) = 3.0004694406801860225800320123714
x1[1] (numeric) = -6.0208953680491062780186507547951e+16793
absolute error = 6.0208953680491062780186507547951e+16793
relative error = 2.0066511214605839254962101719012e+16795 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4337.3MB, alloc=4.9MB, time=459.35
memory used=4341.1MB, alloc=4.9MB, time=460.04
NO POLE
NO POLE
t[1] = 1.345
x2[1] (analytic) = 2.003024497096446506884746149361
x2[1] (numeric) = -4.3007270367587456018061298408726e+16811
absolute error = 4.3007270367587456018061298408726e+16811
relative error = 2.1471165445020833967436281896649e+16813 %
h = 0.001
x1[1] (analytic) = 3.0004689714741479560932159206023
x1[1] (numeric) = 4.8142024326745585854871192946756e+16813
absolute error = 4.8142024326745585854871192946756e+16813
relative error = 1.6044833252547560160161143556609e+16815 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4345.0MB, alloc=4.9MB, time=460.72
NO POLE
NO POLE
t[1] = 1.346
x2[1] (analytic) = 2.0030303175405710384687213203071
x2[1] (numeric) = 3.4387859773324552548040622606070e+16831
absolute error = 3.4387859773324552548040622606070e+16831
relative error = 1.7167917765492349965865650610618e+16833 %
h = 0.001
x1[1] (analytic) = 3.0004685027370814028353134037439
x1[1] (numeric) = -3.8493519063227491790401530714680e+16833
absolute error = 3.8493519063227491790401530714680e+16833
relative error = 1.2829169520730849359487524106850e+16835 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4348.8MB, alloc=4.9MB, time=461.43
NO POLE
NO POLE
t[1] = 1.347
x2[1] (analytic) = 2.0030361498717183066153245430666
x2[1] (numeric) = -2.7495930099322136710626438972632e+16851
absolute error = 2.7495930099322136710626438972632e+16851
relative error = 1.3727126243369634497326028924037e+16853 %
h = 0.001
x1[1] (analytic) = 3.0004680344685176257007097803791
x1[1] (numeric) = 3.0778743324423580481255997529315e+16853
absolute error = 3.0778743324423580481255997529315e+16853
relative error = 1.0257980745285798868134549725460e+16855 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4352.6MB, alloc=4.9MB, time=462.13
memory used=4356.4MB, alloc=4.9MB, time=462.82
NO POLE
NO POLE
t[1] = 1.348
x2[1] (analytic) = 2.0030419941134517780695155023491
x2[1] (numeric) = 2.1985263898664487360821465600579e+16871
absolute error = 2.1985263898664487360821465600579e+16871
relative error = 1.0975937580577378412329455105001e+16873 %
h = 0.001
x1[1] (analytic) = 3.0004675666679883560866055342886
x1[1] (numeric) = -2.4610143829009539291176454005159e+16873
absolute error = 2.4610143829009539291176454005159e+16873
relative error = 8.2021029330235493158778333155147e+16874 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4360.2MB, alloc=4.9MB, time=463.50
NO POLE
NO POLE
t[1] = 1.349
x2[1] (analytic) = 2.003047850289382327919596629484
x2[1] (numeric) = -1.7579031767535523181719044025794e+16891
absolute error = 1.7579031767535523181719044025794e+16891
relative error = 8.7761417007566059224205998950311e+16892 %
h = 0.001
x1[1] (analytic) = 3.0004670993350257934247476726296
x1[1] (numeric) = 1.9677839764300350908612614113247e+16893
absolute error = 1.9677839764300350908612614113247e+16893
relative error = 6.5582588019916711807912143128148e+16894 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4364.0MB, alloc=4.9MB, time=464.20
NO POLE
NO POLE
t[1] = 1.35
x2[1] (analytic) = 2.0030537184231683342746453183871
x2[1] (numeric) = 1.4055885765501086999950503812457e+16911
absolute error = 1.4055885765501086999950503812457e+16911
relative error = 7.0172285626798242851002855738321e+16912 %
h = 0.001
x1[1] (analytic) = 3.0004666324691626047136291186993
x1[1] (numeric) = -1.5734055862487174010295907421639e+16913
absolute error = 1.5734055862487174010295907421639e+16913
relative error = 5.2438696342172641345100718363516e+16914 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4367.8MB, alloc=4.9MB, time=464.89
memory used=4371.7MB, alloc=4.9MB, time=465.58
NO POLE
NO POLE
t[1] = 1.351
x2[1] (analytic) = 2.0030595985385157731317245044926
x2[1] (numeric) = -1.1238839958050427883463445375455e+16931
absolute error = 1.1238839958050427883463445375455e+16931
relative error = 5.6108365254087182253012776698815e+16932 %
h = 0.001
x1[1] (analytic) = 3.0004661660699319240511556714831
x1[1] (numeric) = 1.2580675361174182592737626613390e+16933
absolute error = 1.2580675361174182592737626613390e+16933
relative error = 4.1929069234107019569758763326161e+16934 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4375.5MB, alloc=4.9MB, time=466.25
NO POLE
NO POLE
t[1] = 1.352
x2[1] (analytic) = 2.0030654906591783134332513092882
x2[1] (numeric) = 8.9863794932576407180726698028719e+16950
absolute error = 8.9863794932576407180726698028719e+16950
relative error = 4.4863133707627104278054641528488e+16952 %
h = 0.001
x1[1] (analytic) = 3.0004657001368673521677800646554
x1[1] (numeric) = -1.0059287568732195350393628902963e+16953
absolute error = 1.0059287568732195350393628902963e+16953
relative error = 3.3525754246326952609661163626915e+16954 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4379.3MB, alloc=4.9MB, time=466.94
NO POLE
NO POLE
t[1] = 1.353
x2[1] (analytic) = 2.0030713948089574123149042134864
x2[1] (numeric) = -7.1853515752750173211501652130996e+16970
absolute error = 7.1853515752750173211501652130996e+16970
relative error = 3.5871669846098116659234534203996e+16972 %
h = 0.001
x1[1] (analytic) = 3.0004652346695029559601026581653
x1[1] (numeric) = 8.0432300719510706026032790941546e+16972
absolute error = 8.0432300719510706026032790941546e+16972
relative error = 2.6806609785088948487928631563665e+16974 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4383.1MB, alloc=4.9MB, time=467.62
memory used=4386.9MB, alloc=4.9MB, time=468.31
NO POLE
NO POLE
t[1] = 1.354
x2[1] (analytic) = 2.003077311011702410544449983788
x2[1] (numeric) = 5.7452812113091732895084137972404e+16990
absolute error = 5.7452812113091732895084137972404e+16990
relative error = 2.8682273917861815943832508973640e+16992 %
h = 0.001
x1[1] (analytic) = 3.0004647696673732680249382960094
x1[1] (numeric) = -6.4312258247222534056814470150263e+16992
absolute error = 6.4312258247222534056814470150263e+16992
relative error = 2.1434098776087975292419541795288e+16994 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4390.7MB, alloc=4.9MB, time=468.99
NO POLE
NO POLE
t[1] = 1.355
x2[1] (analytic) = 2.0030832392913106281518723416396
x2[1] (numeric) = -4.5938261825078224836707872941782e+17010
absolute error = 4.5938261825078224836707872941782e+17010
relative error = 2.2933775753288788921928139876611e+17012 %
h = 0.001
x1[1] (analytic) = 3.0004643051300132861938488642576
x1[1] (numeric) = 5.1422954756460729902097269460695e+17012
absolute error = 5.1422954756460729902097269460695e+17012
relative error = 1.7138332446928582601748170954899e+17014 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4394.6MB, alloc=4.9MB, time=469.67
NO POLE
NO POLE
t[1] = 1.356
x2[1] (analytic) = 2.0030891796717274602511851273605
x2[1] (numeric) = 3.6731429183229854417574638095075e+17030
absolute error = 3.6731429183229854417574638095075e+17030
relative error = 1.8337390844100868380874731857937e+17032 %
h = 0.001
x1[1] (analytic) = 3.0004638410569584730681410838651
x1[1] (numeric) = -4.1116893543373715645618557728483e+17032
absolute error = 4.1116893543373715645618557728483e+17032
relative error = 1.3703512430561293506987307076047e+17034 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4398.4MB, alloc=4.9MB, time=470.37
memory used=4402.2MB, alloc=4.9MB, time=471.08
NO POLE
NO POLE
t[1] = 1.357
x2[1] (analytic) = 2.0030951321769464730543134795211
x2[1] (numeric) = -2.9369807133322732365810229477832e+17050
absolute error = 2.9369807133322732365810229477832e+17050
relative error = 1.4662212823314027962778297172998e+17052 %
h = 0.001
x1[1] (analytic) = 3.0004633774477447555543290732672
x1[1] (numeric) = 3.2876347589589296086449410312694e+17052
absolute error = 3.2876347589589296086449410312694e+17052
relative error = 1.0957090107046927790208094331631e+17054 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4406.0MB, alloc=4.9MB, time=471.76
NO POLE
NO POLE
t[1] = 1.358
x2[1] (analytic) = 2.0031010968310095000774273174941
x2[1] (numeric) = 2.3483583139269679231825065108000e+17070
absolute error = 2.3483583139269679231825065108000e+17070
relative error = 1.1723613539237584744191204556578e+17072 %
h = 0.001
x1[1] (analytic) = 3.0004629143019085244000612162208
x1[1] (numeric) = -2.6287351443301858694286529189853e+17072
absolute error = 2.6287351443301858694286529189853e+17072
relative error = 8.7610986018195485495968205827401e+17073 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4409.8MB, alloc=4.9MB, time=472.44
NO POLE
NO POLE
t[1] = 1.359
x2[1] (analytic) = 2.0031070736580067385401121846779
x2[1] (numeric) = -1.8777061577407778244605018720465e+17090
absolute error = 1.8777061577407778244605018720465e+17090
relative error = 9.3739679842065258106838369824945e+17091 %
h = 0.001
x1[1] (analytic) = 3.0004624516189866337305108708192
x1[1] (numeric) = 2.1018905583127668233668963023463e+17092
absolute error = 2.1018905583127668233668963023463e+17092
relative error = 7.0052220022904494091055327892483e+17093 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4413.6MB, alloc=4.9MB, time=473.12
memory used=4417.4MB, alloc=4.9MB, time=473.82
NO POLE
NO POLE
t[1] = 1.36
x2[1] (analytic) = 2.0031130626820768459577632810076
x2[1] (numeric) = 1.5013809408504445892111680704724e+17110
absolute error = 1.5013809408504445892111680704724e+17110
relative error = 7.4952381311924755987066480404961e+17111 %
h = 0.001
x1[1] (analytic) = 3.0004619893985164005852304560691
x1[1] (numeric) = -1.6806348591843654933488415032811e+17112
absolute error = 1.6806348591843654933488415032811e+17112
relative error = 5.6012536240169858390697940231203e+17113 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4421.3MB, alloc=4.9MB, time=474.49
NO POLE
NO POLE
t[1] = 1.361
x2[1] (analytic) = 2.0031190639274070369275892860332
x2[1] (numeric) = -1.2004778917384562814233064336897e+17130
absolute error = 1.2004778917384562814233064336897e+17130
relative error = 5.9930431163924140916032458455107e+17131 %
h = 0.001
x1[1] (analytic) = 3.0004615276400356044554684528867
x1[1] (numeric) = 1.3438061837876879789225996394210e+17132
absolute error = 1.3438061837876879789225996394210e+17132
relative error = 4.4786649367393720857019674097032e+17133 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4425.1MB, alloc=4.9MB, time=475.18
NO POLE
NO POLE
t[1] = 1.362
x2[1] (analytic) = 2.0031250774182331801086133480496
x2[1] (numeric) = 9.5988108636605116619948454029063e+17149
absolute error = 9.5988108636605116619948454029063e+17149
relative error = 4.7919178746601915814647882891216e+17151 %
h = 0.001
x1[1] (analytic) = 3.0004610663430824868219488568277
x1[1] (numeric) = -1.0744838771596202457528992040580e+17152
absolute error = 1.0744838771596202457528992040580e+17152
relative error = 3.5810625547265816815596150361454e+17153 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4428.9MB, alloc=4.9MB, time=475.86
memory used=4432.7MB, alloc=4.9MB, time=476.55
NO POLE
NO POLE
t[1] = 1.363
x2[1] (analytic) = 2.0031311031788398953960593905228
x2[1] (numeric) = -7.6750409674683659522674733704265e+17169
absolute error = 7.6750409674683659522674733704265e+17169
relative error = 3.8315220383171979291697561109703e+17171 %
h = 0.001
x1[1] (analytic) = 3.0004606055071957506931126203314
x1[1] (numeric) = 8.5913848009079806193796894490759e+17171
absolute error = 8.5913848009079806193796894490759e+17171
relative error = 2.8633553078947020450851503260772e+17173 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4436.5MB, alloc=4.9MB, time=477.23
NO POLE
NO POLE
t[1] = 1.364
x2[1] (analytic) = 2.0031371412335606512905126643663
x2[1] (numeric) = 6.1368282685230261310756616151571e+17189
absolute error = 6.1368282685230261310756616151571e+17189
relative error = 3.0636086477553299482287817820926e+17191 %
h = 0.001
x1[1] (analytic) = 3.00046014513191456014382062272
x1[1] (numeric) = -6.8695207407293200265016545367368e+17191
absolute error = 6.8695207407293200265016545367368e+17191
relative error = 2.2894890811580178750904936858974e+17193 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4440.3MB, alloc=4.9MB, time=477.91
NO POLE
NO POLE
memory used=4444.1MB, alloc=4.9MB, time=478.59
t[1] = 1.365
x2[1] (analytic) = 2.0031431916067778624622442534882
x2[1] (numeric) = -4.9069003484115341350833701914360e+17209
absolute error = 4.9069003484115341350833701914360e+17209
relative error = 2.4496003925089201698662455179702e+17211 %
h = 0.001
x1[1] (analytic) = 3.0004596852167785398545177066568
x1[1] (numeric) = 5.4927484102822395515526165490096e+17211
absolute error = 5.4927484102822395515526165490096e+17211
relative error = 1.8306356313817284408459006989976e+17213 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4448.0MB, alloc=4.9MB, time=479.28
NO POLE
NO POLE
t[1] = 1.366
x2[1] (analytic) = 2.0031492543229229875110900214548
x2[1] (numeric) = 3.9234715354086484839415789291884e+17229
absolute error = 3.9234715354086484839415789291884e+17229
relative error = 1.9586516216610162044277517304070e+17231 %
h = 0.001
x1[1] (analytic) = 3.0004592257613277746508573202265
x1[1] (numeric) = -4.3919053799166439736326625322704e+17231
absolute error = 4.3919053799166439736326625322704e+17231
relative error = 1.4637443969271919398479485409286e+17233 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4451.8MB, alloc=4.9MB, time=479.96
NO POLE
NO POLE
t[1] = 1.367
x2[1] (analytic) = 2.003155329406476626922275269106
x2[1] (numeric) = -3.1371390890677321317067537196744e+17249
absolute error = 3.1371390890677321317067537196744e+17249
relative error = 1.5660987657892952084503990133461e+17251 %
h = 0.001
x1[1] (analytic) = 3.0004587667651028090437863042617
x1[1] (numeric) = 3.5116905828114604767427227586877e+17251
absolute error = 3.5116905828114604767427227586877e+17251
relative error = 1.1703845497592137115409708184463e+17253 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4455.6MB, alloc=4.9MB, time=480.65
memory used=4459.4MB, alloc=4.9MB, time=481.34
NO POLE
NO POLE
t[1] = 1.368
x2[1] (analytic) = 2.0031614168819686212185771565075
x2[1] (numeric) = 2.5084014438075095426410141997365e+17269
absolute error = 2.5084014438075095426410141997365e+17269
relative error = 1.2522213250852120182286448712087e+17271 %
h = 0.001
x1[1] (analytic) = 3.0004583082276446467700893650029
x1[1] (numeric) = -2.8078862549722665457445988758524e+17271
absolute error = 2.8078862549722665457445988758524e+17271
relative error = 9.3581912045659137104982643957908e+17272 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4463.2MB, alloc=4.9MB, time=482.02
NO POLE
NO POLE
t[1] = 1.369
x2[1] (analytic) = 2.0031675167739781493092177277503
x2[1] (numeric) = -2.0056738399716359815362660285367e+17289
absolute error = 2.0056738399716359815362660285367e+17289
relative error = 1.0012511800319596667328642474049e+17291 %
h = 0.001
x1[1] (analytic) = 3.0004578501484947503333927726324
x1[1] (numeric) = 2.2451366471330931743663420189292e+17291
absolute error = 2.2451366471330931743663420189292e+17291
relative error = 7.4826468467869988469649177419314e+17292 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4467.0MB, alloc=4.9MB, time=482.71
NO POLE
NO POLE
t[1] = 1.37
x2[1] (analytic) = 2.0031736291071338270358811637969
x2[1] (numeric) = 1.6037016571958507155929626599742e+17309
absolute error = 1.6037016571958507155929626599742e+17309
relative error = 8.0058045587923495347915735321704e+17310 %
h = 0.001
x1[1] (analytic) = 3.0004573925271950405456268266899
x1[1] (numeric) = -1.7951719217165417741824057514426e+17311
absolute error = 1.7951719217165417741824057514426e+17311
relative error = 5.9829942134406462736015300555900e+17312 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4470.8MB, alloc=4.9MB, time=483.39
memory used=4474.7MB, alloc=4.9MB, time=484.08
NO POLE
NO POLE
t[1] = 1.371
x2[1] (analytic) = 2.0031797539061138059162496768448
x2[1] (numeric) = -1.2822917435713719185623169087556e+17329
absolute error = 1.2822917435713719185623169087556e+17329
relative error = 6.4012814679808865220343759421834e+17330 %
h = 0.001
x1[1] (analytic) = 3.0004569353632878960689466298291
x1[1] (numeric) = 1.4353880119655902801826626890219e+17331
absolute error = 1.4353880119655902801826626890219e+17331
relative error = 4.7838980624855962279285053152796e+17332 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4478.5MB, alloc=4.9MB, time=484.77
NO POLE
NO POLE
t[1] = 1.372
x2[1] (analytic) = 2.0031858911956458720854532495221
x2[1] (numeric) = 1.0252980086747542017040707142401e+17349
absolute error = 1.0252980086747542017040707142401e+17349
relative error = 5.1183368112820641606497565677284e+17350 %
h = 0.001
x1[1] (analytic) = 3.0004564786563161529581107118378
x1[1] (numeric) = -1.1477111021903882574958508517869e+17351
absolute error = 1.1477111021903882574958508517869e+17351
relative error = 3.8251216451716829242415794105530e+17352 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4482.3MB, alloc=4.9MB, time=485.44
NO POLE
NO POLE
t[1] = 1.373
x2[1] (analytic) = 2.0031920410005075454358292136571
x2[1] (numeric) = -8.1981032152992639677254562562461e+17368
absolute error = 8.1981032152992639677254562562461e+17368
relative error = 4.0925198620521010885687875540261e+17370 %
h = 0.001
x1[1] (analytic) = 3.0004560224058231042033170462996
x1[1] (numeric) = 9.1768968607120656560845209559695e+17370
absolute error = 9.1768968607120656560845209559695e+17370
relative error = 3.0585007052874096101838315317061e+17372 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4486.1MB, alloc=4.9MB, time=486.13
memory used=4489.9MB, alloc=4.9MB, time=486.82
NO POLE
NO POLE
t[1] = 1.374
x2[1] (analytic) = 2.0031982033455261789553884563728
x2[1] (numeric) = 6.5550596763150630667012718652876e+17388
absolute error = 6.5550596763150630667012718652876e+17388
relative error = 3.2722971023873261494267572023145e+17390 %
h = 0.001
x1[1] (analytic) = 3.0004555666113524992734960027328
x1[1] (numeric) = -7.3376859238725803835954762038395e+17390
absolute error = 7.3376859238725803835954762038395e+17390
relative error = 2.4455239416058405345042108507126e+17392 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4493.7MB, alloc=4.9MB, time=487.53
NO POLE
NO POLE
t[1] = 1.375
x2[1] (analytic) = 2.0032043782555790582653858358591
x2[1] (numeric) = -5.2413108534500445298277594457221e+17408
absolute error = 5.2413108534500445298277594457221e+17408
relative error = 2.6164633575802475052855092720690e+17410 %
h = 0.001
x1[1] (analytic) = 3.0004551112724485436600597774997
x1[1] (numeric) = 5.8670850871064550389526946880323e+17410
absolute error = 5.8670850871064550389526946880323e+17410
relative error = 1.9553983877526870275961433099692e+17412 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4497.6MB, alloc=4.9MB, time=488.20
NO POLE
NO POLE
t[1] = 1.376
x2[1] (analytic) = 2.0032105657555935013573931853633
x2[1] (numeric) = 4.1908603153917112963225452874366e+17428
absolute error = 4.1908603153917112963225452874366e+17428
relative error = 2.0920717906711696315950115231437e+17430 %
h = 0.001
x1[1] (analytic) = 3.0004546563886558984211078472363
x1[1] (numeric) = -4.6912184272367763944144516857386e+17430
absolute error = 4.6912184272367763944144516857386e+17430
relative error = 1.5635025236085793780506609612942e+17432 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4501.4MB, alloc=4.9MB, time=488.88
memory used=4505.2MB, alloc=4.9MB, time=489.57
NO POLE
NO POLE
t[1] = 1.377
x2[1] (analytic) = 2.0032167658705469585302740817163
x2[1] (numeric) = -3.3509384721122249280528719356739e+17448
absolute error = 3.3509384721122249280528719356739e+17448
relative error = 1.6727787672324080514295604963043e+17450 %
h = 0.001
x1[1] (analytic) = 3.0004542019595196797260879890068
x1[1] (numeric) = 3.7510160506125585252463053976151e+17450
absolute error = 3.7510160506125585252463053976151e+17450
relative error = 1.2501494101002662042156397308708e+17452 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4509.0MB, alloc=4.9MB, time=490.25
NO POLE
NO POLE
t[1] = 1.378
x2[1] (analytic) = 2.003222978625467112527460354104
x2[1] (numeric) = 2.6793516841021889607858553452638e+17468
absolute error = 2.6793516841021889607858553452638e+17468
relative error = 1.3375204421530022564896741892945e+17470 %
h = 0.001
x1[1] (analytic) = 3.0004537479845854584009124118441
x1[1] (numeric) = -2.9992467053469999083140507616739e+17470
absolute error = 2.9992467053469999083140507616739e+17470
relative error = 9.9959771329973130745558897993336e+17471 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4512.8MB, alloc=4.9MB, time=490.95
NO POLE
NO POLE
t[1] = 1.379
x2[1] (analytic) = 2.003229204045431978874931109758
x2[1] (numeric) = -2.1423626565653067262136899104238e+17488
absolute error = 2.1423626565653067262136899104238e+17488
relative error = 1.0694545847469181005968250176535e+17490 %
h = 0.001
x1[1] (analytic) = 3.000453294463399259473528544793
x1[1] (numeric) = 2.3981451100604673383009299632947e+17490
absolute error = 2.3981451100604673383009299632947e+17490
relative error = 7.9926093650104670224545944909434e+17491 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4516.6MB, alloc=4.9MB, time=491.62
memory used=4520.4MB, alloc=4.9MB, time=492.31
NO POLE
NO POLE
t[1] = 1.38
x2[1] (analytic) = 2.0032354421555700064202958558358
x2[1] (numeric) = 1.7129956397580949776183400109249e+17508
absolute error = 1.7129956397580949776183400109249e+17508
relative error = 8.5511448315572723976581657931981e+17509 %
h = 0.001
x1[1] (analytic) = 3.0004528413955075617199440270268
x1[1] (numeric) = -1.9175148075194946462150864520482e+17510
absolute error = 1.9175148075194946462150864520482e+17510
relative error = 6.3907513594769930178035087827357e+17511 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4524.3MB, alloc=4.9MB, time=492.99
NO POLE
NO POLE
t[1] = 1.381
x2[1] (analytic) = 2.0032416929810601780733841009407
x2[1] (numeric) = -1.3696812968793435936813506833942e+17528
absolute error = 1.3696812968793435936813506833942e+17528
relative error = 6.8373242314116181088344484641740e+17529 %
h = 0.001
x1[1] (analytic) = 3.0004523887804572972107054460608
x1[1] (numeric) = 1.5332112396500541199962983967875e+17530
absolute error = 1.5332112396500541199962983967875e+17530
relative error = 5.1099335732943669207869530581764e+17531 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4528.1MB, alloc=4.9MB, time=493.69
NO POLE
NO POLE
t[1] = 1.382
x2[1] (analytic) = 2.0032479565471321117487446255385
x2[1] (numeric) = 1.0951731641803877863995234005302e+17548
absolute error = 1.0951731641803877863995234005302e+17548
relative error = 5.4669875518958040658159958343978e+17549 %
h = 0.001
x1[1] (analytic) = 3.0004519366177958508578303705439
x1[1] (numeric) = -1.2259288408991108340411237566684e+17550
absolute error = 1.2259288408991108340411237566684e+17550
relative error = 4.0858139600163584918482527076926e+17551 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4531.9MB, alloc=4.9MB, time=494.37
memory used=4535.7MB, alloc=4.9MB, time=495.06
NO POLE
NO POLE
t[1] = 1.383
x2[1] (analytic) = 2.0032542328790661615104584179323
x2[1] (numeric) = -8.7568127145605550083175112316935e+17567
absolute error = 8.7568127145605550083175112316935e+17567
relative error = 4.3712937533521699245428448651606e+17569 %
h = 0.001
x1[1] (analytic) = 3.0004514849070710599621922245578
x1[1] (numeric) = 9.8023121934017733987029394338052e+17569
absolute error = 9.8023121934017733987029394338052e+17569
relative error = 3.2669457389028128889676783257416e+17571 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4539.5MB, alloc=4.9MB, time=495.74
NO POLE
NO POLE
t[1] = 1.384
x2[1] (analytic) = 2.0032605220021935189196700814953
x2[1] (numeric) = 7.0017940017072053671908913451372e+17587
absolute error = 7.0017940017072053671908913451372e+17587
relative error = 3.4951989143724255862134965491458e+17589 %
h = 0.001
x1[1] (analytic) = 3.0004510336478312137613575508104
x1[1] (numeric) = -7.8377570647936598753673005383949e+17589
absolute error = 7.8377570647936598753673005383949e+17589
relative error = 2.6121929592914638777144939462903e+17591 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4543.3MB, alloc=4.9MB, time=496.42
NO POLE
NO POLE
t[1] = 1.385
x2[1] (analytic) = 2.003266823941896314585243329497
x2[1] (numeric) = -5.5985117919474926859037193795808e+17607
absolute error = 5.5985117919474926859037193795808e+17607
relative error = 2.7946910142160246414709129818055e+17609 %
h = 0.001
x1[1] (analytic) = 3.0004505828396250529778752105596
x1[1] (numeric) = 6.2669332086845358885703500059089e+17609
absolute error = 6.2669332086845358885703500059089e+17609
relative error = 2.0886640308381660394981544350150e+17611 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4547.1MB, alloc=4.9MB, time=497.10
memory used=4551.0MB, alloc=4.9MB, time=497.78
NO POLE
NO POLE
t[1] = 1.386
x2[1] (analytic) = 2.0032731387236077199179469961431
x2[1] (numeric) = 4.4764719266137890847031198940371e+17627
absolute error = 4.4764719266137890847031198940371e+17627
relative error = 2.2345789199100370143785701366904e+17629 %
h = 0.001
x1[1] (analytic) = 3.0004501324820017693680170685574
x1[1] (numeric) = -5.0109299787473074179937812415645e+17629
absolute error = 5.0109299787473074179937812415645e+17629
relative error = 1.6700594102532932306378311098834e+17631 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4554.8MB, alloc=4.9MB, time=498.46
NO POLE
NO POLE
t[1] = 1.387
x2[1] (analytic) = 2.0032794663728120490885788063318
x2[1] (numeric) = -3.5793085116983725315274782411371e+17647
absolute error = 3.5793085116983725315274782411371e+17647
relative error = 1.7867245043843823375420957139869e+17649 %
h = 0.001
x1[1] (analytic) = 3.0004496825745110052709697117545
x1[1] (numeric) = 4.0066518049231128518989409262020e+17649
absolute error = 4.0066518049231128518989409262020e+17649
relative error = 1.3353504403664048274531289395666e+17651 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4558.6MB, alloc=4.9MB, time=499.15
NO POLE
NO POLE
t[1] = 1.388
x2[1] (analytic) = 2.0032858069150448611904349621665
x2[1] (numeric) = 2.8619523660472484978469387121456e+17667
absolute error = 2.8619523660472484978469387121456e+17667
relative error = 1.4286290833630499933609464674630e+17669 %
h = 0.001
x1[1] (analytic) = 3.0004492331167028531584767509566
x1[1] (numeric) = -3.2036485750109852400763629924060e+17669
absolute error = 3.2036485750109852400763629924060e+17669
relative error = 1.0677229728307084217092529510315e+17671 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4562.4MB, alloc=4.9MB, time=499.84
memory used=4566.2MB, alloc=4.9MB, time=500.55
NO POLE
NO POLE
t[1] = 1.389
x2[1] (analytic) = 2.0032921603758930626065344214163
x2[1] (numeric) = -2.2883669621529618484416829223687e+17687
absolute error = 2.2883669621529618484416829223687e+17687
relative error = 1.1423031584786804216195875751128e+17689 %
h = 0.001
x1[1] (analytic) = 3.0004487841081278551849312550764
x1[1] (numeric) = 2.5615812633278895570012868901987e+17689
absolute error = 2.5615812633278895570012868901987e+17689
relative error = 8.5373270721876693445619458531817e+17690 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4570.0MB, alloc=4.9MB, time=501.23
NO POLE
NO POLE
t[1] = 1.39
x2[1] (analytic) = 2.0032985267809950095820075619118
x2[1] (numeric) = 1.8297381240854386557766634635479e+17707
absolute error = 1.8297381240854386557766634635479e+17707
relative error = 9.1336268640179040183572171249937e+17708 %
h = 0.001
x1[1] (analytic) = 3.0004483355483370027379178680713
x1[1] (numeric) = -2.0481954917948535416380851503114e+17709
absolute error = 2.0481954917948535416380851503114e+17709
relative error = 6.8262981486083224125162502231672e+17710 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4573.8MB, alloc=4.9MB, time=501.91
NO POLE
NO POLE
memory used=4577.7MB, alloc=4.9MB, time=502.60
t[1] = 1.391
x2[1] (analytic) = 2.0033049061560406110020597462978
x2[1] (numeric) = -1.4630265416792505079648788785730e+17727
absolute error = 1.4630265416792505079648788785730e+17727
relative error = 7.3030647365932874104203764672234e+17728 %
h = 0.001
x1[1] (analytic) = 3.0004478874368817359892041591108
x1[1] (numeric) = 1.6377012248905479413943460713437e+17729
absolute error = 1.6377012248905479413943460713437e+17729
relative error = 5.4581891981784972230333279409141e+17730 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4581.5MB, alloc=4.9MB, time=503.28
NO POLE
NO POLE
t[1] = 1.392
x2[1] (analytic) = 2.0033112985267714313759211236367
x2[1] (numeric) = 1.1698103862419170410355355092858e+17747
absolute error = 1.1698103862419170410355355092858e+17747
relative error = 5.8393839594584814065566244701793e+17748 %
h = 0.001
x1[1] (analytic) = 3.0004474397733139434461807569642
x1[1] (numeric) = -1.3094772021286314277367012845317e+17749
absolute error = 1.3094772021286314277367012845317e+17749
relative error = 4.3642730906413191940494189838278e+17750 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4585.3MB, alloc=4.9MB, time=503.96
NO POLE
NO POLE
t[1] = 1.393
x2[1] (analytic) = 2.0033177039189807940271948280813
x2[1] (numeric) = -9.3535988635500731659619907224661e+17766
absolute error = 9.3535988635500731659619907224661e+17766
relative error = 4.6690541621292217296861274137484e+17768 %
h = 0.001
x1[1] (analytic) = 3.0004469925571859615037498200487
x1[1] (numeric) = 1.0470350249687508092908947197227e+17769
absolute error = 1.0470350249687508092908947197227e+17769
relative error = 3.4895968086288237082218978933631e+17770 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4589.1MB, alloc=4.9MB, time=504.64
NO POLE
NO POLE
memory used=4592.9MB, alloc=4.9MB, time=505.35
t[1] = 1.394
x2[1] (analytic) = 2.003324122358513884491016560202
x2[1] (numeric) = 7.4789737490082694696895168595493e+17786
absolute error = 7.4789737490082694696895168595493e+17786
relative error = 3.7332819315345098522778903573181e+17788 %
h = 0.001
x1[1] (analytic) = 3.0004465457880505739966613940258
x1[1] (numeric) = -8.3719085886279032384915471366412e+17788
absolute error = 8.3719085886279032384915471366412e+17788
relative error = 2.7902208757493688579543715137500e+17790 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4596.7MB, alloc=4.9MB, time=506.03
NO POLE
NO POLE
t[1] = 1.395
x2[1] (analytic) = 2.0033305538712678541184393635765
x2[1] (numeric) = -5.9800563563108768695873368706046e+17806
absolute error = 5.9800563563108768695873368706046e+17806
relative error = 2.9850572311967791674476543337420e+17808 %
h = 0.001
x1[1] (analytic) = 3.0004460994654610117522972092837
x1[1] (numeric) = 6.6940314072524442450714362691216e+17808
absolute error = 6.6940314072524442450714362691216e+17808
relative error = 2.2310120513229706641802527232003e+17810 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4600.5MB, alloc=4.9MB, time=506.71
NO POLE
NO POLE
t[1] = 1.396
x2[1] (analytic) = 2.0033369984831919238884582379273
x2[1] (numeric) = 4.7815482745070643605209852327506e+17826
absolute error = 4.7815482745070643605209852327506e+17826
relative error = 2.3867917769837872528918557484378e+17828 %
h = 0.001
x1[1] (analytic) = 3.0004456535889709521439014710884
x1[1] (numeric) = -5.3524302143182133361514571428574e+17828
absolute error = 5.3524302143182133361514571428574e+17828
relative error = 1.7838784075012075454434249226462e+17830 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4604.4MB, alloc=4.9MB, time=507.39
memory used=4608.2MB, alloc=4.9MB, time=508.07
NO POLE
NO POLE
t[1] = 1.397
x2[1] (analytic) = 2.0033434562202874884280900604304
x2[1] (numeric) = -3.8232422136479489292819870338118e+17846
absolute error = 3.8232422136479489292819870338118e+17846
relative error = 1.9084307295271617754172357514143e+17848 %
h = 0.001
x1[1] (analytic) = 3.0004452081581345186442581956339
x1[1] (numeric) = 4.2797094092071574792057786529693e+17848
absolute error = 4.2797094092071574792057786529693e+17848
relative error = 1.4263581276441029491635539454641e+17850 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4612.0MB, alloc=4.9MB, time=508.76
NO POLE
NO POLE
t[1] = 1.398
x2[1] (analytic) = 2.0033499271086082202409251188118
x2[1] (numeric) = 3.0569974796974253644983462738867e+17866
absolute error = 3.0569974796974253644983462738867e+17866
relative error = 1.5259428412037451449817667804969e+17868 %
h = 0.001
x1[1] (analytic) = 3.0004447631725062803798146456701
x1[1] (numeric) = -3.4219806506322357868228867386473e+17868
absolute error = 3.4219806506322357868228867386473e+17868
relative error = 1.1404911340590787951393453196187e+17870 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4615.8MB, alloc=4.9MB, time=509.44
NO POLE
NO POLE
t[1] = 1.399
x2[1] (analytic) = 2.0033564111742601741445673935177
x2[1] (numeric) = -2.4443216172693516524740547864016e+17886
absolute error = 2.4443216172693516524740547864016e+17886
relative error = 1.2201132078323603459899282611604e+17888 %
h = 0.001
x1[1] (analytic) = 3.000444318631641251685250419831
x1[1] (numeric) = 2.7361557651809729745278039964892e+17888
absolute error = 2.7361557651809729745278039964892e+17888
relative error = 9.1191686117634817141155515151779e+17889 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4619.6MB, alloc=4.9MB, time=510.13
memory used=4623.4MB, alloc=4.9MB, time=510.82
NO POLE
NO POLE
t[1] = 1.4
x2[1] (analytic) = 2.0033629084434018919173815615742
x2[1] (numeric) = 1.9544367335368630414335561272418e+17906
absolute error = 1.9544367335368630414335561272418e+17906
relative error = 9.7557797706030500225877448469287e+17907 %
h = 0.001
x1[1] (analytic) = 3.0004438745350948916584917502317
x1[1] (numeric) = -2.1877822044230090888296398000518e+17908
absolute error = 2.1877822044230090888296398000518e+17908
relative error = 7.2915285068013344321350014446537e+17909 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4627.3MB, alloc=4.9MB, time=511.50
NO POLE
NO POLE
t[1] = 1.401
x2[1] (analytic) = 2.0033694189422445071549655317555
x2[1] (numeric) = -1.5627333647138948379483569242953e+17926
absolute error = 1.5627333647138948379483569242953e+17926
relative error = 7.8005252048770898988856727867036e+17927 %
h = 0.001
x1[1] (analytic) = 3.00044343088242310371617056335
x1[1] (numeric) = 1.7493123143423901075375216261319e+17928
absolute error = 1.7493123143423901075375216261319e+17928
relative error = 5.8301792872926173360518027223852e+17929 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4631.1MB, alloc=4.9MB, time=512.19
NO POLE
NO POLE
t[1] = 1.402
x2[1] (analytic) = 2.0033759426970518503367681593631
x2[1] (numeric) = 1.2495342147865690574301027239521e+17946
absolute error = 1.2495342147865690574301027239521e+17946
relative error = 6.2371429553275919974459744854548e+17947 %
h = 0.001
x1[1] (analytic) = 3.0004429876731822351495278596499
x1[1] (numeric) = -1.3987194735030663082936234508317e+17948
absolute error = 1.3987194735030663082936234508317e+17948
relative error = 4.6617098850052179988080451294386e+17949 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4634.9MB, alloc=4.9MB, time=512.86
memory used=4638.7MB, alloc=4.9MB, time=513.55
NO POLE
NO POLE
t[1] = 1.403
x2[1] (analytic) = 2.0033824797341405541032726292729
x2[1] (numeric) = -9.9910566266570815937475430460831e+17965
absolute error = 9.9910566266570815937475430460831e+17965
relative error = 4.9870939412343007140598636394076e+17967 %
h = 0.001
x1[1] (analytic) = 3.000442544906929076680760967852
x1[1] (numeric) = 1.1183915813753134071163626012535e+17968
absolute error = 1.1183915813753134071163626012535e+17968
relative error = 3.7274220873641320422068375378187e+17969 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4642.5MB, alloc=4.9MB, time=514.23
NO POLE
NO POLE
t[1] = 1.404
x2[1] (analytic) = 2.0033890300798801587441668379533
x2[1] (numeric) = 7.9886738062725784985457057096933e+17985
absolute error = 7.9886738062725784985457057096933e+17985
relative error = 3.9875798890413460954231319705011e+17987 %
h = 0.001
x1[1] (analytic) = 3.0004421025832208620198142301962
x1[1] (numeric) = -8.9424631099084518163152433617493e+17987
absolute error = 8.9424631099084518163152433617493e+17987
relative error = 2.9803818251348583959817745585817e+17989 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4646.3MB, alloc=4.9MB, time=514.90
NO POLE
NO POLE
t[1] = 1.405
x2[1] (analytic) = 2.0033955937606932178979229488792
x2[1] (numeric) = -6.3876035906703538196232089857516e+18005
absolute error = 6.3876035906703538196232089857516e+18005
relative error = 3.1883885591860580011903042885652e+18007 %
h = 0.001
x1[1] (analytic) = 3.0004416607016152674216126754892
x1[1] (numeric) = 7.1502368046919106967646382367602e+18007
absolute error = 7.1502368046919106967646382367602e+18007
relative error = 2.3830614333690855405298084245763e+18009 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4650.1MB, alloc=4.9MB, time=515.58
memory used=4654.0MB, alloc=4.9MB, time=516.27
NO POLE
NO POLE
t[1] = 1.406
x2[1] (analytic) = 2.0034021708030554044632091411852
x2[1] (numeric) = 5.1074159016867267583249710805948e+18025
absolute error = 5.1074159016867267583249710805948e+18025
relative error = 2.5493712526224529326148074466912e+18027 %
h = 0.001
x1[1] (analytic) = 3.0004412192616704112437382371692
x1[1] (numeric) = -5.7172040560639432955672677161218e+18027
absolute error = 5.7172040560639432955672677161218e+18027
relative error = 1.9054544442869627993617059595575e+18029 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4657.8MB, alloc=4.9MB, time=516.97
NO POLE
NO POLE
t[1] = 1.407
x2[1] (analytic) = 2.0034087612334956167225574185075
x2[1] (numeric) = -4.0838002581911707251133876547916e+18045
absolute error = 4.0838002581911707251133876547916e+18045
relative error = 2.0384258755446299149731407303407e+18047 %
h = 0.001
x1[1] (analytic) = 3.000440778262944853504548074064
x1[1] (numeric) = 4.5713761811672469463099151660184e+18047
absolute error = 4.5713761811672469463099151660184e+18047
relative error = 1.5235682084729460795672500353411e+18049 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4661.6MB, alloc=4.9MB, time=517.65
NO POLE
NO POLE
t[1] = 1.408
x2[1] (analytic) = 2.0034153650785960846787121937702
x2[1] (numeric) = 3.2653351263785948084931791882225e+18065
absolute error = 3.2653351263785948084931791882225e+18065
relative error = 1.6298842383344166320100819689633e+18067 %
h = 0.001
x1[1] (analytic) = 3.0004403377049975954417345519622
x1[1] (numeric) = -3.6551922906404509717651076491624e+18067
absolute error = 3.6551922906404509717651076491624e+18067
relative error = 1.2182186210162291166485942390560e+18069 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4665.4MB, alloc=4.9MB, time=518.34
memory used=4669.2MB, alloc=4.9MB, time=519.03
NO POLE
NO POLE
t[1] = 1.409
x2[1] (analytic) = 2.0034219823649924766040852161682
x2[1] (numeric) = -2.6109047488734413943237605837609e+18085
absolute error = 2.6109047488734413943237605837609e+18085
relative error = 1.3032225721070155254810790834971e+18087 %
h = 0.001
x1[1] (analytic) = 3.0004398975873880790713264445548
x1[1] (numeric) = 2.9226277059845813747134195821704e+18087
absolute error = 2.9226277059845813747134195821704e+18087
relative error = 9.7406640550761426563392691926385e+18088 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4673.0MB, alloc=4.9MB, time=519.70
NO POLE
NO POLE
t[1] = 1.41
x2[1] (analytic) = 2.0034286131193740058037432588128
x2[1] (numeric) = 2.0876336865459979730363521687187e+18105
absolute error = 2.0876336865459979730363521687187e+18105
relative error = 1.0420304835796046505011371965552e+18107 %
h = 0.001
x1[1] (analytic) = 3.0004394579096761867471309127516
x1[1] (numeric) = -2.3368819007582329817338696916707e+18107
absolute error = 2.3368819007582329817338696916707e+18107
relative error = 7.7884654349475675088963340832009e+18108 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4676.8MB, alloc=4.9MB, time=520.40
NO POLE
NO POLE
t[1] = 1.411
x2[1] (analytic) = 2.0034352573684835375923558394087
x2[1] (numeric) = -1.6692353143415613022899817679212e+18125
absolute error = 1.6692353143415613022899817679212e+18125
relative error = 8.3318655204965566507265831221205e+18126 %
h = 0.001
x1[1] (analytic) = 3.0004390186714222407206158218113
x1[1] (numeric) = 1.8685298188712312247144337949413e+18127
absolute error = 1.8685298188712312247144337949413e+18127
relative error = 6.2275213968474715644887101664837e+18128 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4680.7MB, alloc=4.9MB, time=521.08
memory used=4684.5MB, alloc=4.9MB, time=521.77
NO POLE
NO POLE
t[1] = 1.412
x2[1] (analytic) = 2.0034419151391176964855311019558
x2[1] (numeric) = 1.3346913074845987242597923083723e+18145
absolute error = 1.3346913074845987242597923083723e+18145
relative error = 6.6619915326665142306195809013670e+18146 %
h = 0.001
x1[1] (analytic) = 3.0004385798721870027012319561699
x1[1] (numeric) = -1.4940437010865302854828281313742e+18147
absolute error = 1.4940437010865302854828281313742e+18147
relative error = 4.9794177128270818186544204724973e+18148 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4688.3MB, alloc=4.9MB, time=522.45
NO POLE
NO POLE
t[1] = 1.413
x2[1] (analytic) = 2.0034485864581269736059688448024
x2[1] (numeric) = -1.0671957817868421141700196095111e+18165
absolute error = 1.0671957817868421141700196095111e+18165
relative error = 5.3267939541863906601126089917435e+18166 %
h = 0.001
x1[1] (analytic) = 3.0004381415115316734171746922881
x1[1] (numeric) = 1.1946111633930344428732802482448e+18167
absolute error = 1.1946111633930344428732802482448e+18167
relative error = 3.9814557309660941668569849904383e+18168 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4692.1MB, alloc=4.9MB, time=523.15
NO POLE
NO POLE
t[1] = 1.414
x2[1] (analytic) = 2.0034552713524158343048605394222
x2[1] (numeric) = 8.5331104673937588332787533494990e+18184
absolute error = 8.5331104673937588332787533494990e+18184
relative error = 4.2591968931922066388352884081981e+18186 %
h = 0.001
x1[1] (analytic) = 3.0004377035890178921765846902802
x1[1] (numeric) = -9.5519015318321425613303326505416e+18186
absolute error = 9.5519015318321425613303326505416e+18186
relative error = 3.1835027004248394858233883330864e+18188 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4695.9MB, alloc=4.9MB, time=523.83
memory used=4699.7MB, alloc=4.9MB, time=524.52
NO POLE
NO POLE
t[1] = 1.415
x2[1] (analytic) = 2.0034619698489428259989670450611
x2[1] (numeric) = -6.8229256047873451305977360482920e+18204
absolute error = 6.8229256047873451305977360482920e+18204
relative error = 3.4055678158451795222887006368016e+18206 %
h = 0.001
x1[1] (analytic) = 3.0004372661042077364291871655247
x1[1] (numeric) = 7.6375330877264785740368298791218e+18206
absolute error = 7.6375330877264785740368298791218e+18206
relative error = 2.5454733461710112483623312115394e+18208 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4703.5MB, alloc=4.9MB, time=525.20
NO POLE
NO POLE
t[1] = 1.416
x2[1] (analytic) = 2.0034686819747206862238055868856
x2[1] (numeric) = 5.4554917560654862256185231503550e+18224
absolute error = 5.4554917560654862256185231503550e+18224
relative error = 2.7230232272402061856636468572817e+18226 %
h = 0.001
x1[1] (analytic) = 3.0004368290566637213283693018958
x1[1] (numeric) = -6.1068376251286753721174310226949e+18226
absolute error = 6.1068376251286753721174310226949e+18226
relative error = 2.0353161799605902595328471726616e+18228 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4707.4MB, alloc=4.9MB, time=525.88
NO POLE
NO POLE
memory used=4711.2MB, alloc=4.9MB, time=526.55
t[1] = 1.417
x2[1] (analytic) = 2.0034754077568164509033784294896
x2[1] (numeric) = -4.3621156120499877251393793214482e+18244
absolute error = 4.3621156120499877251393793214482e+18244
relative error = 2.1772743479462089950594347165019e+18246 %
h = 0.001
x1[1] (analytic) = 3.0004363924459487992936953686937
x1[1] (numeric) = 4.8829203554768053885027398103500e+18246
absolute error = 4.8829203554768053885027398103500e+18246
relative error = 1.6274033896436844713902699670574e+18248 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4715.0MB, alloc=4.9MB, time=527.24
NO POLE
NO POLE
t[1] = 1.418
x2[1] (analytic) = 2.0034821472223515628368765435593
x2[1] (numeric) = 3.4878712064287521390083936926674e+18264
absolute error = 3.4878712064287521390083936926674e+18264
relative error = 1.7409045602249927557215818259878e+18266 %
h = 0.001
x1[1] (analytic) = 3.0004359562716263595738591037882
x1[1] (numeric) = -3.9042975532573366167554197102935e+18266
absolute error = 3.9042975532573366167554197102935e+18266
relative error = 1.3012434226754362368182014087966e+18268 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4718.8MB, alloc=4.9MB, time=527.92
NO POLE
NO POLE
t[1] = 1.419
x2[1] (analytic) = 2.0034889003985019804027924311781
x2[1] (numeric) = -2.7888406990014805490628063147485e+18284
absolute error = 2.7888406990014805490628063147485e+18284
relative error = 1.3919920886243836664335749850360e+18286 %
h = 0.001
x1[1] (analytic) = 3.000435520533260227810072925928
x1[1] (numeric) = 3.1218079089235381195178180848283e+18286
absolute error = 3.1218079089235381195178180848283e+18286
relative error = 1.0404515902973667860892713371616e+18288 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4722.6MB, alloc=4.9MB, time=528.62
NO POLE
NO POLE
memory used=4726.4MB, alloc=4.9MB, time=529.31
t[1] = 1.42
x2[1] (analytic) = 2.0034956673124982864808771446776
x2[1] (numeric) = 2.2299081543124470350677055370444e+18304
absolute error = 2.2299081543124470350677055370444e+18304
relative error = 1.1130087230503771867035405561495e+18306 %
h = 0.001
x1[1] (analytic) = 3.0004350852304146655998935396058
x1[1] (numeric) = -2.4961429008111269601076112787787e+18306
absolute error = 2.4961429008111269601076112787787e+18306
relative error = 8.3192698055636780526421109232311e+18307 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4730.3MB, alloc=4.9MB, time=530.01
NO POLE
NO POLE
t[1] = 1.421
x2[1] (analytic) = 2.0035024479916257975923774050897
x2[1] (numeric) = -1.7829954857046871740964492513003e+18324
absolute error = 1.7829954857046871740964492513003e+18324
relative error = 8.8993925986565088818351873314927e+18325 %
h = 0.001
x1[1] (analytic) = 3.0004346503626543700614834963026
x1[1] (numeric) = 1.9958721237970941861009338635368e+18326
absolute error = 1.9958721237970941861009338635368e+18326
relative error = 6.6519433227977771639170409486822e+18327 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4734.1MB, alloc=4.9MB, time=530.69
NO POLE
NO POLE
t[1] = 1.422
x2[1] (analytic) = 2.0035092424632246732589895991681
x2[1] (numeric) = 1.4256519470971236248909390230393e+18344
absolute error = 1.4256519470971236248909390230393e+18344
relative error = 7.1157742469126249473016190656679e+18345 %
h = 0.001
x1[1] (analytic) = 3.000434215929544473398308276376
x1[1] (numeric) = -1.5958643766972935082800393906061e+18346
absolute error = 1.5958643766972935082800393906061e+18346
relative error = 5.3187780896002395121269069899578e+18347 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4737.9MB, alloc=4.9MB, time=531.37
memory used=4741.7MB, alloc=4.9MB, time=532.05
NO POLE
NO POLE
t[1] = 1.423
x2[1] (analytic) = 2.003516050754690025580968308589
x2[1] (numeric) = -1.1399263153257666970678113060004e+18364
absolute error = 1.1399263153257666970678113060004e+18364
relative error = 5.6896290643460333979159210290669e+18365 %
h = 0.001
x1[1] (analytic) = 3.0004337819306505424642684562857
x1[1] (numeric) = 1.2760251914166992220923904459982e+18366
absolute error = 1.2760251914166992220923904459982e+18366
relative error = 4.2528023751140133505684985586749e+18367 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4745.5MB, alloc=4.9MB, time=532.73
NO POLE
NO POLE
t[1] = 1.424
x2[1] (analytic) = 2.0035228728934720290348279013472
x2[1] (numeric) = 9.1146510690638750345580050632202e+18383
absolute error = 9.1146510690638750345580050632202e+18383
relative error = 4.5493122101973147943180020391276e+18385 %
h = 0.001
x1[1] (analytic) = 3.0004333483655385783292665262923
x1[1] (numeric) = -1.0202873833801175853070376283023e+18386
absolute error = 1.0202873833801175853070376283023e+18386
relative error = 3.4004667490311383087499236905879e+18387 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4749.3MB, alloc=4.9MB, time=533.41
NO POLE
NO POLE
t[1] = 1.425
x2[1] (analytic) = 2.0035297089070760304910765935161
x2[1] (numeric) = -7.2879152795981939563865374710098e+18403
absolute error = 7.2879152795981939563865374710098e+18403
relative error = 3.6375379148102307569375384697976e+18405 %
h = 0.001
x1[1] (analytic) = 3.0004329152337750158452079241924
x1[1] (numeric) = 8.1580391334507923971232970828465e+18405
absolute error = 8.1580391334507923971232970828465e+18405
relative error = 2.7189540189453523836782584965225e+18407 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4753.1MB, alloc=4.9MB, time=534.09
memory used=4757.0MB, alloc=4.9MB, time=534.80
NO POLE
NO POLE
t[1] = 1.426
x2[1] (analytic) = 2.0035365588230626594524232694551
x2[1] (numeric) = 5.8272893520712573623288312016283e+18423
absolute error = 5.8272893520712573623288312016283e+18423
relative error = 2.9085016324805081363919437857525e+18425 %
h = 0.001
x1[1] (analytic) = 3.0004324825349267232124358510942
x1[1] (numeric) = -6.5230251385083912261723556774438e+18425
absolute error = 6.5230251385083912261723556774438e+18425
relative error = 2.1740283030789577320124600806583e+18427 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4760.8MB, alloc=4.9MB, time=535.47
NO POLE
NO POLE
t[1] = 1.427
x2[1] (analytic) = 2.0035434226690479385128982302198
x2[1] (numeric) = -4.6593984548397808625821098302418e+18443
absolute error = 4.6593984548397808625821098302418e+18443
relative error = 2.3255789727944598771890420312548e+18445 %
h = 0.001
x1[1] (analytic) = 3.0004320502685610015465994356657
x1[1] (numeric) = 5.2156965983582050278133397577859e+18445
absolute error = 5.2156965983582050278133397577859e+18445
relative error = 1.7383151862717108892316176677176e+18447 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4764.6MB, alloc=4.9MB, time=536.15
NO POLE
NO POLE
t[1] = 1.428
x2[1] (analytic) = 2.0035503004727033940383299233728
x2[1] (numeric) = 3.7255733582624854856633553857387e+18463
absolute error = 3.7255733582624854856633553857387e+18463
relative error = 1.8594858124517763446973501476690e+18465 %
h = 0.001
x1[1] (analytic) = 3.0004316184342455844459548137265
x1[1] (numeric) = -4.1703796058566050389805732389350e+18465
absolute error = 4.1703796058566050389805732389350e+18465
relative error = 1.3899265626433068625423922010483e+18467 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4768.4MB, alloc=4.9MB, time=536.82
memory used=4772.2MB, alloc=4.9MB, time=537.51
NO POLE
NO POLE
t[1] = 1.429
x2[1] (analytic) = 2.0035571922617561670686205925983
x2[1] (numeric) = -2.9789031743739313502469452022083e+18483
absolute error = 2.9789031743739313502469452022083e+18483
relative error = 1.4868071577288672713215200755660e+18485 %
h = 0.001
x1[1] (analytic) = 3.0004311870315486375590986904809
x1[1] (numeric) = 3.3345624556496174006884032565008e+18485
absolute error = 3.3345624556496174006884032565008e+18485
relative error = 1.1113610837209830243844891841612e+18487 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4776.0MB, alloc=4.9MB, time=538.19
NO POLE
NO POLE
t[1] = 1.43
x2[1] (analytic) = 2.0035640980639891244422646725048
x2[1] (numeric) = 2.3818787791722973342711470150387e+18503
absolute error = 2.3818787791722973342711470150387e+18503
relative error = 1.1888208525366707428387044352569e+18505 %
h = 0.001
x1[1] (analytic) = 3.0004307560600387581531339531289
x1[1] (numeric) = -2.6662577082941774136594206651032e+18505
absolute error = 2.6662577082941774136594206651032e+18505
relative error = 8.8862497590023553059543159026667e+18506 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4779.8MB, alloc=4.9MB, time=538.87
NO POLE
NO POLE
t[1] = 1.431
x2[1] (analytic) = 2.0035710179072409701435546427538
x2[1] (numeric) = -1.9045085343747927140821927550648e+18523
absolute error = 1.9045085343747927140821927550648e+18523
relative error = 9.5055703908318635044798014445969e+18524 %
h = 0.001
x1[1] (analytic) = 3.0004303255192849746822669020187
x1[1] (numeric) = 2.1318929429538017470771321827022e+18525
absolute error = 2.1318929429538017470771321827022e+18525
relative error = 7.1052906138883084426325356924945e+18526 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4783.7MB, alloc=4.9MB, time=539.57
memory used=4787.5MB, alloc=4.9MB, time=540.26
NO POLE
NO POLE
t[1] = 1.432
x2[1] (analytic) = 2.0035779518194063568729199461898
x2[1] (numeric) = 1.5228116515513254895505534698910e+18543
absolute error = 1.5228116515513254895505534698910e+18543
relative error = 7.6004612157390369785332531671089e+18544 %
h = 0.001
x1[1] (analytic) = 3.0004298954088567463568356689386
x1[1] (numeric) = -1.7046242402142020699164850765115e+18545
absolute error = 1.7046242402142020699164850765115e+18545
relative error = 5.6812666838927081439451492009242e+18546 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4791.3MB, alloc=4.9MB, time=540.96
NO POLE
NO POLE
t[1] = 1.433
x2[1] (analytic) = 2.0035848998284359978408454679601
x2[1] (numeric) = -1.2176135124864307309098892592928e+18563
absolute error = 1.2176135124864307309098892592928e+18563
relative error = 6.0771745314645422280516459508906e+18564 %
h = 0.001
x1[1] (analytic) = 3.000429465728323962712769391577
x1[1] (numeric) = 1.3629876724953413059570335589748e+18565
absolute error = 1.3629876724953413059570335589748e+18565
relative error = 4.5426419386415731261436895740672e+18566 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4795.1MB, alloc=4.9MB, time=541.64
NO POLE
NO POLE
t[1] = 1.434
x2[1] (analytic) = 2.0035918619623367787858169667182
x2[1] (numeric) = 9.7358242845016333308139779467829e+18582
absolute error = 9.7358242845016333308139779467829e+18582
relative error = 4.8591853806824086135798767270705e+18584 %
h = 0.001
x1[1] (analytic) = 3.0004290364772569431814777136087
x1[1] (numeric) = -1.0898210594147281657708829573673e+18585
absolute error = 1.0898210594147281657708829573673e+18585
relative error = 3.6322174134611929805327370692483e+18586 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4798.9MB, alloc=4.9MB, time=542.32
memory used=4802.7MB, alloc=4.9MB, time=543.01
NO POLE
NO POLE
t[1] = 1.435
x2[1] (analytic) = 2.0035988382491718702167417448991
x2[1] (numeric) = -7.7845944978988604283291042602500e+18602
absolute error = 7.7845944978988604283291042602500e+18602
relative error = 3.8853059551089395656409168584201e+18604 %
h = 0.001
x1[1] (analytic) = 3.0004286076552264366601701802981
x1[1] (numeric) = 8.7140182226989294599474136848020e+18604
absolute error = 8.7140182226989294599474136848020e+18604
relative error = 2.9042578118560055985836493485882e+18606 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4806.5MB, alloc=4.9MB, time=543.70
NO POLE
NO POLE
t[1] = 1.436
x2[1] (analytic) = 2.0036058287170608398802937427361
x2[1] (numeric) = 6.2244253517584163165537700072213e+18622
absolute error = 6.2244253517584163165537700072213e+18622
relative error = 3.1066117210010364906518938326112e+18624 %
h = 0.001
x1[1] (analytic) = 3.0004281792618036210826050999375
x1[1] (numeric) = -6.9675762758987489978861923774674e+18624
absolute error = 6.9675762758987489978861923774674e+18624
relative error = 2.3221939868638962690094682095416e+18626 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4810.4MB, alloc=4.9MB, time=544.37
NO POLE
NO POLE
t[1] = 1.437
x2[1] (analytic) = 2.0036128333941797654536331401768
x2[1] (numeric) = -4.9769414412106029805830253793575e+18642
absolute error = 4.9769414412106029805830253793575e+18642
relative error = 2.4839836111348498751381383204579e+18644 %
h = 0.001
x1[1] (analytic) = 3.0004277512965601029902674418707
x1[1] (numeric) = 5.5711518979852367157659172776320e+18644
absolute error = 5.5711518979852367157659172776320e+18644
relative error = 1.8567858851384780777673774175764e+18646 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4814.2MB, alloc=4.9MB, time=545.05
memory used=4818.0MB, alloc=4.9MB, time=545.74
NO POLE
NO POLE
t[1] = 1.438
x2[1] (analytic) = 2.0036198523087613474629514521401
x2[1] (numeric) = 3.9794751658869038924776977062133e+18662
absolute error = 3.9794751658869038924776977062133e+18662
relative error = 1.9861428111232647947737663893810e+18664 %
h = 0.001
x1[1] (analytic) = 3.000427323759067917103975342278
x1[1] (numeric) = -4.4545954348265734949559028355201e+18664
absolute error = 4.4545954348265734949559028355201e+18664
relative error = 1.4846536690132722560856453863653e+18666 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4821.8MB, alloc=4.9MB, time=546.44
NO POLE
NO POLE
t[1] = 1.439
x2[1] (analytic) = 2.0036268854890950224282940056369
x2[1] (numeric) = -3.1819186106514769640273240048169e+18682
absolute error = 3.1819186106514769640273240048169e+18682
relative error = 1.5880794142342301557330726274686e+18684 %
h = 0.001
x1[1] (analytic) = 3.0004268966488995258959147893308
x1[1] (numeric) = 3.5618164522051474494456036921420e+18684
absolute error = 3.5618164522051474494456036921420e+18684
relative error = 1.1871032272718424292112447308821e+18686 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4825.6MB, alloc=4.9MB, time=547.12
NO POLE
NO POLE
t[1] = 1.44
x2[1] (analytic) = 2.003633932963527076235112592183
x2[1] (numeric) = 2.5442063645982720749170368975766e+18702
absolute error = 2.5442063645982720749170368975766e+18702
relative error = 1.2697960055184318181654938120269e+18704 %
h = 0.001
x1[1] (analytic) = 3.0004264699656278191621020597496
x1[1] (numeric) = -2.8479660217882785619851798556354e+18704
absolute error = 2.8479660217882785619851798556354e+18704
relative error = 9.4918707400315135592768296995731e+18705 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4829.4MB, alloc=4.9MB, time=547.80
memory used=4833.2MB, alloc=4.9MB, time=548.48
NO POLE
NO POLE
t[1] = 1.441
x2[1] (analytic) = 2.0036409947604607577330019956325
x2[1] (numeric) = -2.0343028272294665347763545968364e+18722
absolute error = 2.0343028272294665347763545968364e+18722
relative error = 1.0153030570592170678438759396836e+18724 %
h = 0.001
x1[1] (analytic) = 3.0004260437088261135952734792275
x1[1] (numeric) = 2.2771837263649640549955111120710e+18724
absolute error = 2.2771837263649640549955111120710e+18724
relative error = 7.5895345967272622549223935763280e+18725 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4837.1MB, alloc=4.9MB, time=549.17
NO POLE
NO POLE
t[1] = 1.442
x2[1] (analytic) = 2.0036480709083563925620750040845
x2[1] (numeric) = 1.6265928937439980651907487251167e+18742
absolute error = 1.6265928937439980651907487251167e+18742
relative error = 8.1181566631438429959011582861458e+18743 %
h = 0.001
x1[1] (analytic) = 3.0004256178780681523582020796099
x1[1] (numeric) = -1.8207962047122081431027297990641e+18744
absolute error = 1.8207962047122081431027297990641e+18744
relative error = 6.0684597340556435479483218592170e+18745 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4840.9MB, alloc=4.9MB, time=549.86
NO POLE
NO POLE
memory used=4844.7MB, alloc=4.9MB, time=550.55
t[1] = 1.443
x2[1] (analytic) = 2.0036551614357314972074314248571
x2[1] (numeric) = -1.3005951751941552564361302072832e+18762
absolute error = 1.3005951751941552564361302072832e+18762
relative error = 6.4911128433008688996696209741573e+18763 %
h = 0.001
x1[1] (analytic) = 3.0004251924729281046574407261456
x1[1] (numeric) = 1.4558767396368784276453237434021e+18764
absolute error = 1.4558767396368784276453237434021e+18764
relative error = 4.8522347542248025795087841070470e+18765 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4848.5MB, alloc=4.9MB, time=551.23
NO POLE
NO POLE
t[1] = 1.444
x2[1] (analytic) = 2.0036622663711608932821775336853
x2[1] (numeric) = 1.0399331118709167883480829978819e+18782
absolute error = 1.0399331118709167883480829978819e+18782
relative error = 5.1901616820600357791478706205005e+18783 %
h = 0.001
x1[1] (analytic) = 3.0004247674929805653174912885542
x1[1] (numeric) = -1.1640935298141857323963277781254e+18784
absolute error = 1.1640935298141857323963277781254e+18784
relative error = 3.8797624337265077128618496632755e+18785 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4852.3MB, alloc=4.9MB, time=551.91
NO POLE
NO POLE
t[1] = 1.445
x2[1] (analytic) = 2.0036693857432768220394533032888
x2[1] (numeric) = -8.3151229359595790398305841907722e+18801
absolute error = 8.3151229359595790398305841907722e+18801
relative error = 4.1499475887210899239525388500509e+18803 %
h = 0.001
x1[1] (analytic) = 3.0004243429378005543553994300777
x1[1] (numeric) = 9.3078878813136338376602154112930e+18803
absolute error = 9.3078878813136338376602154112930e+18803
relative error = 3.1021904962282824562490769443978e+18805 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4856.1MB, alloc=4.9MB, time=552.61
NO POLE
NO POLE
memory used=4860.0MB, alloc=4.9MB, time=553.30
t[1] = 1.446
x2[1] (analytic) = 2.0036765195807690591139256722729
x2[1] (numeric) = 6.6486265944288261425061858442655e+18821
absolute error = 6.6486265944288261425061858442655e+18821
relative error = 3.3182135586536313430281035058771e+18823 %
h = 0.001
x1[1] (analytic) = 3.0004239188069635165557745891106
x1[1] (numeric) = -7.4424240486015151284471895253744e+18823
absolute error = 7.4424240486015151284471895253744e+18823
relative error = 2.4804575120041008858179528795490e+18825 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4863.8MB, alloc=4.9MB, time=553.98
NO POLE
NO POLE
t[1] = 1.447
x2[1] (analytic) = 2.0036836679123850294932070329803
x2[1] (numeric) = -5.3161253216089712803498583084527e+18841
absolute error = 5.3161253216089712803498583084527e+18841
relative error = 2.6531759512457278825649364587569e+18843 %
h = 0.001
x1[1] (analytic) = 3.00042349510004532104623472843
x1[1] (numeric) = 5.9508318563228066655710696808291e+18843
absolute error = 5.9508318563228066655710696808291e+18843
relative error = 1.9833306418380728333709921507533e+18845 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4867.6MB, alloc=4.9MB, time=554.65
NO POLE
NO POLE
t[1] = 1.448
x2[1] (analytic) = 2.0036908307669299227196590363969
x2[1] (numeric) = 4.2506806531642744471909018637853e+18861
absolute error = 4.2506806531642744471909018637853e+18861
relative error = 2.1214254154855266853904134105029e+18863 %
h = 0.001
x1[1] (analytic) = 3.0004230718166222608732754274695
x1[1] (numeric) = -4.7581808764149343365487622997588e+18863
absolute error = 4.7581808764149343365487622997588e+18863
relative error = 1.5858366512073472938123913141318e+18865 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4871.4MB, alloc=4.9MB, time=555.34
memory used=4875.2MB, alloc=4.9MB, time=556.03
NO POLE
NO POLE
t[1] = 1.449
x2[1] (analytic) = 2.0036980081732668083230427335477
x2[1] (numeric) = -3.3987697659686735706928847565153e+18881
absolute error = 3.3987697659686735706928847565153e+18881
relative error = 1.6962485125526810449372733137666e+18883 %
h = 0.001
x1[1] (analytic) = 3.0004226489562710525785628935057
x1[1] (numeric) = 3.8045580515983337048749380696618e+18883
absolute error = 3.8045580515983337048749380696618e+18883
relative error = 1.2680073765346991062436211900225e+18885 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4879.0MB, alloc=4.9MB, time=556.71
NO POLE
NO POLE
t[1] = 1.45
x2[1] (analytic) = 2.0037052001603167514844769959899
x2[1] (numeric) = 2.7175967485262695905557403026158e+18901
absolute error = 2.7175967485262695905557403026158e+18901
relative error = 1.3562857192309698402558638707381e+18903 %
h = 0.001
x1[1] (analytic) = 3.0004222265185688357756504680507
x1[1] (numeric) = -3.0420579511234736280754419734572e+18903
absolute error = 3.0420579511234736280754419734572e+18903
relative error = 1.0138766218423915943443899600304e+18905 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4882.8MB, alloc=4.9MB, time=557.39
NO POLE
NO POLE
t[1] = 1.451
x2[1] (analytic) = 2.0037124067570589289321680830329
x2[1] (numeric) = -2.1729427399139171632664291009119e+18921
absolute error = 2.1729427399139171632664291009119e+18921
relative error = 1.0844583946209884636324226589089e+18923 %
h = 0.001
x1[1] (analytic) = 3.0004218045030931727271182051673
x1[1] (numeric) = 2.4323762320056589360005504823254e+18923
absolute error = 2.4323762320056589360005504823254e+18923
relative error = 8.1067809477824082671483941362197e+18924 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4886.7MB, alloc=4.9MB, time=558.09
memory used=4890.5MB, alloc=4.9MB, time=558.78
NO POLE
NO POLE
t[1] = 1.452
x2[1] (analytic) = 2.0037196279925307450693741501884
x2[1] (numeric) = 1.7374469385515455293023214601305e+18941
absolute error = 1.7374469385515455293023214601305e+18941
relative error = 8.6711080446531524467053479558437e+18942 %
h = 0.001
x1[1] (analytic) = 3.0004213829094220479221350988457
x1[1] (numeric) = -1.9448854127979447846959054925000e+18943
absolute error = 1.9448854127979447846959054925000e+18943
relative error = 6.4820409022416895091062157131300e+18944 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4894.3MB, alloc=4.9MB, time=559.48
NO POLE
NO POLE
t[1] = 1.453
x2[1] (analytic) = 2.0037268638958279483350694220831
x2[1] (numeric) = -1.3892321269366385000923383559012e+18961
absolute error = 1.3892321269366385000923383559012e+18961
relative error = 6.9332410118790696324258422276957e+18962 %
h = 0.001
x1[1] (analytic) = 3.0004209617371338676544435370047
x1[1] (numeric) = 1.5550962960180051195698214574432e+18963
absolute error = 1.5550962960180051195698214574432e+18963
relative error = 5.1829270487353924783133336293602e+18964 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4898.1MB, alloc=4.9MB, time=560.16
NO POLE
NO POLE
t[1] = 1.454
x2[1] (analytic) = 2.0037341144961047477977736836531
x2[1] (numeric) = 1.1108056653067332798206772954566e+18981
absolute error = 1.1108056653067332798206772954566e+18981
relative error = 5.5436779624130748521017387621875e+18982 %
h = 0.001
x1[1] (analytic) = 3.000420540985807459600765560101
x1[1] (numeric) = -1.2434277484810155583900583138818e+18983
absolute error = 1.2434277484810155583900583138818e+18983
relative error = 4.1441782293374094057843880657319e+18984 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4901.9MB, alloc=4.9MB, time=560.84
memory used=4905.7MB, alloc=4.9MB, time=561.53
NO POLE
NO POLE
t[1] = 1.455
x2[1] (analytic) = 2.0037413798225739299830136758895
x2[1] (numeric) = -8.8818074542974546330175390495166e+19000
absolute error = 8.8818074542974546330175390495166e+19000
relative error = 4.4326116851885923043780839469689e+19002 %
h = 0.001
x1[1] (analytic) = 3.0004201206550220723996305027539
x1[1] (numeric) = 9.9422303921085706487666833737901e+19002
absolute error = 9.9422303921085706487666833737901e+19002
relative error = 3.3136127583153525689212833208662e+19004 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4909.5MB, alloc=4.9MB, time=562.21
NO POLE
NO POLE
t[1] = 1.456
x2[1] (analytic) = 2.0037486599045069759348839167252
x2[1] (numeric) = 7.1017376053290508730461219201565e+19020
absolute error = 7.1017376053290508730461219201565e+19020
relative error = 3.5442257541759252920882041930597e+19022 %
h = 0.001
x1[1] (analytic) = 3.0004197007443573752306235972118
x1[1] (numeric) = -7.9496332047053826823664592286413e+19022
absolute error = 7.9496332047053826823664592286413e+19022
relative error = 2.6495070682055588941180410856855e+19024 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4913.4MB, alloc=4.9MB, time=562.89
NO POLE
NO POLE
t[1] = 1.457
x2[1] (analytic) = 2.0037559547712341785121754038352
x2[1] (numeric) = -5.6784249461005854557661452038589e+19040
absolute error = 5.6784249461005854557661452038589e+19040
relative error = 2.8338904907952639082235232478612e+19042 %
h = 0.001
x1[1] (analytic) = 3.0004192812533934573940551179101
x1[1] (numeric) = 6.3563874097622355418598189235413e+19042
absolute error = 6.3563874097622355418598189235413e+19042
relative error = 2.1184997208479882359167543809874e+19044 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4917.2MB, alloc=4.9MB, time=563.57
memory used=4921.0MB, alloc=4.9MB, time=564.28
NO POLE
NO POLE
t[1] = 1.458
x2[1] (analytic) = 2.00376326445214475991954159419
x2[1] (numeric) = 4.5403690843634632467251253221391e+19060
absolute error = 4.5403690843634632467251253221391e+19060
relative error = 2.2659209123712824888900364402572e+19062 %
h = 0.001
x1[1] (analytic) = 3.0004188621817108278910496467884
x1[1] (numeric) = -5.0824559904309750646429212898908e+19062
absolute error = 5.0824559904309750646429212898908e+19062
relative error = 1.6939154910975800546004253456925e+19064 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4924.8MB, alloc=4.9MB, time=564.96
NO POLE
NO POLE
t[1] = 1.459
x2[1] (analytic) = 2.0037705889766869894741719951352
x2[1] (numeric) = -3.6303995593707629219480452628227e+19080
absolute error = 3.6303995593707629219480452628227e+19080
relative error = 1.8117840332334576761199003592131e+19082 %
h = 0.001
x1[1] (analytic) = 3.0004184435288904150040550394581
x1[1] (numeric) = 4.0638427505213910596743294100425e+19082
absolute error = 4.0638427505213910596743294100425e+19082
relative error = 1.3544253333350972483122829025177e+19084 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4928.6MB, alloc=4.9MB, time=565.65
NO POLE
NO POLE
t[1] = 1.46
x2[1] (analytic) = 2.0037779283743683016084446435969
x2[1] (numeric) = 2.9028038725021780757282212724603e+19100
absolute error = 2.9028038725021780757282212724603e+19100
relative error = 1.4486654590796768414217929696485e+19102 %
h = 0.001
x1[1] (analytic) = 3.0004180252945135658777706727272
x1[1] (numeric) = -3.2493774529594823698567956823924e+19102
absolute error = 3.2493774529594823698567956823924e+19102
relative error = 1.0829749140173664855160870419074e+19104 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4932.4MB, alloc=4.9MB, time=566.32
memory used=4936.2MB, alloc=4.9MB, time=567.01
NO POLE
NO POLE
t[1] = 1.461
x2[1] (analytic) = 2.0037852826747554141090296937147
x2[1] (numeric) = -2.3210311108769857122401369360144e+19120
absolute error = 2.3210311108769857122401369360144e+19120
relative error = 1.1583232649452112394195675143415e+19122 %
h = 0.001
x1[1] (analytic) = 3.0004176074781620461004945544123
x1[1] (numeric) = 2.5981452728324203352452684837717e+19122
absolute error = 2.5981452728324203352452684837717e+19122
relative error = 8.6592788495737103105147132668157e+19123 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4940.1MB, alloc=4.9MB, time=567.70
NO POLE
NO POLE
t[1] = 1.462
x2[1] (analytic) = 2.0037926519074744465929172788013
x2[1] (numeric) = 1.8558558050341763654770691671104e+19140
absolute error = 1.8558558050341763654770691671104e+19140
relative error = 9.2617157931362196820900102140697e+19141 %
h = 0.001
x1[1] (analytic) = 3.0004171900794180392858888767832
x1[1] (numeric) = -2.0774314330867687287466688658317e+19142
absolute error = 2.0774314330867687287466688658317e+19142
relative error = 6.9238085955366133548976190242831e+19143 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4943.9MB, alloc=4.9MB, time=568.38
NO POLE
NO POLE
t[1] = 1.463
x2[1] (analytic) = 2.0038000361022110392208437610144
x2[1] (numeric) = -1.4839097817080457662278693884336e+19160
absolute error = 1.4839097817080457662278693884336e+19160
relative error = 7.4054783659678185685817839826741e+19161 %
h = 0.001
x1[1] (analytic) = 3.0004167730978641466551635954075
x1[1] (numeric) = 1.6610777712487474575654691300855e+19162
absolute error = 1.6610777712487474575654691300855e+19162
relative error = 5.5361567970896299595370682816430e+19163 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4947.7MB, alloc=4.9MB, time=569.07
memory used=4951.5MB, alloc=4.9MB, time=569.76
NO POLE
NO POLE
t[1] = 1.464
x2[1] (analytic) = 2.0038074352887104716485914315148
x2[1] (numeric) = 1.1865082590337720216368745743167e+19180
absolute error = 1.1865082590337720216368745743167e+19180
relative error = 5.9212688711418958717573809305089e+19181 %
h = 0.001
x1[1] (analytic) = 3.0004163565330833866196776155775
x1[1] (numeric) = -1.3281686789714915601433039084535e+19182
absolute error = 1.3281686789714915601433039084535e+19182
relative error = 4.4266145799383720296915519426140e+19183 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4955.3MB, alloc=4.9MB, time=570.46
NO POLE
NO POLE
t[1] = 1.465
x2[1] (analytic) = 2.0038148494967777822166376751655
x2[1] (numeric) = -9.4871121284402511028706419085545e+19199
absolute error = 9.4871121284402511028706419085545e+19199
relative error = 4.7345253134653480740818659346769e+19201 %
h = 0.001
x1[1] (analytic) = 3.0004159403846591943639571689199
x1[1] (numeric) = 1.0619804023232046984806249277101e+19202
absolute error = 1.0619804023232046984806249277101e+19202
relative error = 3.5394439418524644051973978832604e+19203 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4959.1MB, alloc=4.9MB, time=571.14
NO POLE
NO POLE
t[1] = 1.466
x2[1] (analytic) = 2.0038222787562778873786305670182
x2[1] (numeric) = 7.5857286160733127799894935721044e+19219
absolute error = 7.5857286160733127799894935721044e+19219
relative error = 3.7856294425379798790661649733224e+19221 %
h = 0.001
x1[1] (analytic) = 3.000415524652175421429130963209
x1[1] (numeric) = -8.4914092070888489775464413493421e+19221
absolute error = 8.4914092070888489775464413493421e+19221
relative error = 2.8300777466725111606351930888895e+19223 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4963.0MB, alloc=4.9MB, time=571.82
memory used=4966.8MB, alloc=4.9MB, time=572.50
NO POLE
NO POLE
t[1] = 1.467
x2[1] (analytic) = 2.0038297230971357013691688229333
x2[1] (numeric) = -6.0654156773599831559668046315731e+19239
absolute error = 6.0654156773599831559668046315731e+19239
relative error = 3.0269117218129825908795256148831e+19241 %
h = 0.001
x1[1] (analytic) = 3.0004151093352163352967816888159
x1[1] (numeric) = 6.7895820077750386625896131163357e+19241
absolute error = 6.7895820077750386625896131163357e+19241
relative error = 2.2628808882646124629991734935919e+19243 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4970.6MB, alloc=4.9MB, time=573.19
NO POLE
NO POLE
t[1] = 1.468
x2[1] (analytic) = 2.0038371825493362561113649836854
x2[1] (numeric) = 4.8498000918740896540023259425433e+19259
absolute error = 4.8498000918740896540023259425433e+19259
relative error = 2.4202565628131731986983245415488e+19261 %
h = 0.001
x1[1] (analytic) = 3.0004146944333666189732134656474
x1[1] (numeric) = -5.4288308001713500627232690026732e+19261
absolute error = 5.4288308001713500627232690026732e+19261
relative error = 1.8093601561955401386685657785543e+19263 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4974.4MB, alloc=4.9MB, time=573.86
NO POLE
NO POLE
memory used=4978.2MB, alloc=4.9MB, time=574.54
t[1] = 1.469
x2[1] (analytic) = 2.0038446571429248213646716708333
x2[1] (numeric) = -3.8778151708440576026415201497835e+19279
absolute error = 3.8778151708440576026415201497835e+19279
relative error = 1.9351875191628046805017551592453e+19281 %
h = 0.001
x1[1] (analytic) = 3.0004142799462113705741348148396
x1[1] (numeric) = 4.3407979788946107262304130471076e+19281
absolute error = 4.3407979788946107262304130471076e+19281
relative error = 1.4467328754922565242385402823646e+19283 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4982.0MB, alloc=4.9MB, time=575.23
NO POLE
NO POLE
t[1] = 1.47
x2[1] (analytic) = 2.0038521469080070251134517134794
x2[1] (numeric) = 3.1006330599943271710965986042468e+19299
absolute error = 3.1006330599943271710965986042468e+19299
relative error = 1.5473362467279235026230138097636e+19301 %
h = 0.001
x1[1] (analytic) = 3.0004138658733361029097567398918
x1[1] (numeric) = -3.4708260005047147711710723455035e+19301
absolute error = 3.4708260005047147711710723455035e+19301
relative error = 1.1567824159132976557361761162944e+19303 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4985.8MB, alloc=4.9MB, time=575.91
NO POLE
NO POLE
t[1] = 1.471
x2[1] (analytic) = 2.0038596518747489741967739078099
x2[1] (numeric) = -2.4792118626523365880499310664831e+19319
absolute error = 2.4792118626523365880499310664831e+19319
relative error = 1.2372183153310476711907386786552e+19321 %
h = 0.001
x1[1] (analytic) = 3.0004134522143267430703055023367
x1[1] (numeric) = 2.7752116510262575021905914294463e+19321
absolute error = 2.7752116510262575021905914294463e+19321
relative error = 9.2494307708763647582558958289429e+19322 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4989.7MB, alloc=4.9MB, time=576.59
NO POLE
NO POLE
memory used=4993.5MB, alloc=4.9MB, time=577.29
t[1] = 1.472
x2[1] (analytic) = 2.0038671720733773751799171360024
x2[1] (numeric) = 1.9823343623664109748970341150179e+19339
absolute error = 1.9823343623664109748970341150179e+19339
relative error = 9.8925437274133960693479500105111e+19340 %
h = 0.001
x1[1] (analytic) = 3.0004130389687696320119496774608
x1[1] (numeric) = -2.2190106063720620459194457994005e+19341
absolute error = 2.2190106063720620459194457994005e+19341
relative error = 7.3956837860387629069211313296148e+19342 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=4997.3MB, alloc=4.9MB, time=577.96
NO POLE
NO POLE
t[1] = 1.473
x2[1] (analytic) = 2.0038747075341796554680665377181
x2[1] (numeric) = -1.5850398198783165181613587235369e+19359
absolute error = 1.5850398198783165181613587235369e+19359
relative error = 7.9098748735081823391104212424991e+19360 %
h = 0.001
x1[1] (analytic) = 3.0004126261362515241431410760011
x1[1] (numeric) = 1.7742819973283249504048270651637e+19361
absolute error = 1.7742819973283249504048270651637e+19361
relative error = 5.9134599750472892355734995822217e+19362 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5001.1MB, alloc=4.9MB, time=578.65
NO POLE
NO POLE
t[1] = 1.474
x2[1] (analytic) = 2.0038822582875040846626863959501
x2[1] (numeric) = 1.2673700654619978637451333306714e+19379
absolute error = 1.2673700654619978637451333306714e+19379
relative error = 6.3245735133414400032161131055189e+19380 %
h = 0.001
x1[1] (analytic) = 3.0004122137163595869113691181598
x1[1] (numeric) = -1.4186847944770712552863997931192e+19381
absolute error = 1.4186847944770712552863997931192e+19381
relative error = 4.7282996249367519111451919677829e+19382 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5004.9MB, alloc=4.9MB, time=579.34
memory used=5008.7MB, alloc=4.9MB, time=580.03
NO POLE
NO POLE
t[1] = 1.475
x2[1] (analytic) = 2.0038898243637598961610553695083
x2[1] (numeric) = -1.0133668963297456859777342741685e+19399
absolute error = 1.0133668963297456859777342741685e+19399
relative error = 5.0569990625681840908889139362431e+19400 %
h = 0.001
x1[1] (analytic) = 3.0004118017086814003903282466914
x1[1] (numeric) = 1.1343555021755725413545828989019e+19401
absolute error = 1.1343555021755725413545828989019e+19401
relative error = 3.7806660456727212112076079087244e+19402 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5012.5MB, alloc=4.9MB, time=580.71
NO POLE
NO POLE
t[1] = 1.476
x2[1] (analytic) = 2.003897405793417408999450676857
x2[1] (numeric) = 8.1027041316668493405446801084106e+19418
absolute error = 8.1027041316668493405446801084106e+19418
relative error = 4.0434725391835555748649884807040e+19420 %
h = 0.001
x1[1] (analytic) = 3.0004113901128049568674979662282
x1[1] (numeric) = -9.0701078232835883072030962782672e+19420
absolute error = 9.0701078232835883072030962782672e+19420
relative error = 3.0229547365311741562667173113886e+19422 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5016.4MB, alloc=4.9MB, time=581.39
NO POLE
NO POLE
t[1] = 1.477
x2[1] (analytic) = 2.0039050026070081499404688104167
x2[1] (numeric) = -6.4787802407122970224290838680241e+19438
absolute error = 6.4787802407122970224290838680241e+19438
relative error = 3.2330775322600809651343920114823e+19440 %
h = 0.001
x1[1] (analytic) = 3.0004109789283186604321350964264
x1[1] (numeric) = 7.2522992807996364990072242791192e+19440
absolute error = 7.2522992807996364990072242791192e+19440
relative error = 2.4171019676077840421465382998941e+19442 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5020.2MB, alloc=4.9MB, time=582.10
memory used=5024.0MB, alloc=4.9MB, time=582.78
NO POLE
NO POLE
t[1] = 1.478
x2[1] (analytic) = 2.0039126148351249758049713367788
x2[1] (numeric) = 5.1803191533798825483874486462277e+19458
absolute error = 5.1803191533798825483874486462277e+19458
relative error = 2.5851023218425626589749603123122e+19460 %
h = 0.001
x1[1] (analytic) = 3.0004105681548113265636778269229
x1[1] (numeric) = -5.7988114235279306113795448329224e+19460
absolute error = 5.7988114235279306113795448329224e+19460
relative error = 1.9326726432289819196730467270568e+19462 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5027.8MB, alloc=4.9MB, time=583.47
NO POLE
NO POLE
t[1] = 1.479
x2[1] (analytic) = 2.003920242508422196049145316577
x2[1] (numeric) = -4.1420924207677806638814536432303e+19478
absolute error = 4.1420924207677806638814536432303e+19478
relative error = 2.0669946502376189404177935307682e+19480 %
h = 0.001
x1[1] (analytic) = 3.0004101577918721817205611625083
x1[1] (numeric) = 4.6366280021927622471262088401459e+19480
absolute error = 4.6366280021927622471262088401459e+19480
relative error = 1.5453313908272632564583585055361e+19482 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5031.6MB, alloc=4.9MB, time=584.14
NO POLE
NO POLE
t[1] = 1.48
x2[1] (analytic) = 2.0039278856576156955871688580143
x2[1] (numeric) = 3.3119445181264381864809110211723e+19498
absolute error = 3.3119445181264381864809110211723e+19498
relative error = 1.6527263989041099480734597627793e+19500 %
h = 0.001
x1[1] (analytic) = 3.0004097478390908629294433473304
x1[1] (numeric) = -3.7073665033305590570216854210900e+19500
absolute error = 3.7073665033305590570216854210900e+19500
relative error = 1.2356200702256156035754719989270e+19502 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5035.4MB, alloc=4.9MB, time=584.83
memory used=5039.2MB, alloc=4.9MB, time=585.51
NO POLE
NO POLE
t[1] = 1.481
x2[1] (analytic) = 2.003935544313483057859973300257
x2[1] (numeric) = -2.6481728017827639319918981705679e+19518
absolute error = 2.6481728017827639319918981705679e+19518
relative error = 1.3214860175006209951763824345281e+19520 %
h = 0.001
x1[1] (analytic) = 3.0004093382960574173748428573563
x1[1] (numeric) = 2.9643452922074731281960380025702e+19520
absolute error = 2.9643452922074731281960380025702e+19520
relative error = 9.8798029134615839364610374381343e+19521 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5043.1MB, alloc=4.9MB, time=586.19
NO POLE
NO POLE
t[1] = 1.482
x2[1] (analytic) = 2.0039432185068636881505945070912
x2[1] (numeric) = 2.1174325686074942805705199820239e+19538
absolute error = 2.1174325686074942805705199820239e+19538
relative error = 1.0566330168702042397979756107914e+19540 %
h = 0.001
x1[1] (analytic) = 3.0004089291623623019891855507274
x1[1] (numeric) = -2.3702385516884801570019825826030e+19540
absolute error = 2.3702385516884801570019825826030e+19540
relative error = 7.8997183638904525841691792179560e+19541 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5046.9MB, alloc=4.9MB, time=586.87
NO POLE
NO POLE
t[1] = 1.483
x2[1] (analytic) = 2.0039509082686589371466067373873
x2[1] (numeric) = -1.6930619782747565204134186224115e+19558
absolute error = 1.6930619782747565204134186224115e+19558
relative error = 8.4486200300061282372078982537614e+19559 %
h = 0.001
x1[1] (analytic) = 3.0004085204375963830432615660568
x1[1] (numeric) = 1.8952012124494101265499488941288e+19560
absolute error = 1.8952012124494101265499488941288e+19560
relative error = 6.3164772381495682702934557577885e+19561 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5050.7MB, alloc=4.9MB, time=587.55
memory used=5054.5MB, alloc=4.9MB, time=588.17
NO POLE
NO POLE
t[1] = 1.484
x2[1] (analytic) = 2.0039586136298322247501335470448
x2[1] (numeric) = 1.3537426904530549272727499837185e+19578
absolute error = 1.3537426904530549272727499837185e+19578
relative error = 6.7553425567056942214845518162600e+19579 %
h = 0.001
x1[1] (analytic) = 3.0004081121213509357370915591255
x1[1] (numeric) = -1.5153696800311692432780530689112e+19580
absolute error = 1.5153696800311692432780530689112e+19580
relative error = 5.0505452038648547842311161931213e+19581 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5058.3MB, alloc=4.9MB, time=588.46
NO POLE
NO POLE
t[1] = 1.485
x2[1] (analytic) = 2.0039663346214091641359311671921
x2[1] (numeric) = -1.0824289337727193851700764451134e+19598
absolute error = 1.0824289337727193851700764451134e+19598
relative error = 5.4014327240542824695525683598730e+19599 %
h = 0.001
x1[1] (analytic) = 3.0004077042132176437912018688418
x1[1] (numeric) = 1.2116630424639231452620950415570e+19600
absolute error = 1.2116630424639231452620950415570e+19600
relative error = 4.0383279937672725936094454205405e+19601 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5062.1MB, alloc=4.9MB, time=588.75
NO POLE
NO POLE
t[1] = 1.486
x2[1] (analytic) = 2.0039740712744776860580407955044
x2[1] (numeric) = 8.6549120813810715567742370005358e+19617
absolute error = 8.6549120813810715567742370005358e+19617
relative error = 4.3188742835763152631342759941338e+19619 %
h = 0.001
x1[1] (analytic) = 3.000407296712788599038308203742
x1[1] (numeric) = -9.6882453688972666749945638676118e+19619
absolute error = 9.6882453688972666749945638676118e+19619
relative error = 3.2289767390952541093966106875600e+19621 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5065.9MB, alloc=4.9MB, time=589.03
memory used=5069.8MB, alloc=4.9MB, time=589.32
NO POLE
NO POLE
t[1] = 1.487
x2[1] (analytic) = 2.0039818236201881634055072315712
x2[1] (numeric) = -6.9203160410126813044184852440279e+19637
absolute error = 6.9203160410126813044184852440279e+19637
relative error = 3.4532828389187421101821613202332e+19639 %
h = 0.001
x1[1] (analytic) = 3.0004068896196563010154074407134
x1[1] (numeric) = 7.7465512307027427450199542114843e+19639
absolute error = 7.7465512307027427450199542114843e+19639
relative error = 2.5818335698078359215883755677643e+19641 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5073.6MB, alloc=4.9MB, time=589.61
NO POLE
NO POLE
t[1] = 1.488
x2[1] (analytic) = 2.0039895916897535360076622833087
x2[1] (numeric) = 5.5333634423072568157516537040010e+19657
absolute error = 5.5333634423072568157516537040010e+19657
relative error = 2.7611737432436231964529458473174e+19659 %
h = 0.001
x1[1] (analytic) = 3.000406482933413656556277128033
x1[1] (numeric) = -6.1940066219372100574104433253573e+19659
absolute error = 6.1940066219372100574104433253573e+19659
relative error = 2.0643891609917809203339669484617e+19661 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5077.4MB, alloc=4.9MB, time=589.89
NO POLE
NO POLE
t[1] = 1.489
x2[1] (analytic) = 2.0039973755144494356894723694689
x2[1] (numeric) = -4.4243804478302304910503925119417e+19677
absolute error = 4.4243804478302304910503925119417e+19677
relative error = 2.2077775659234287011644452546887e+19679 %
h = 0.001
x1[1] (analytic) = 3.0004060766536539793843822852204
x1[1] (numeric) = 4.9526191578702812066182307370098e+19679
absolute error = 4.9526191578702812066182307370098e+19679
relative error = 1.6506496225317361050034858362250e+19681 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5081.2MB, alloc=4.9MB, time=590.18
memory used=5085.0MB, alloc=4.9MB, time=590.47
NO POLE
NO POLE
t[1] = 1.49
x2[1] (analytic) = 2.004005175125614311577450743346
x2[1] (numeric) = 3.5376570780574188177240628417098e+19697
absolute error = 3.5376570780574188177240628417098e+19697
relative error = 1.7652933844522994829610952240761e+19699 %
h = 0.001
x1[1] (analytic) = 3.0004056707799709897061890926124
x1[1] (numeric) = -3.9600274943252043718154398186252e+19699
absolute error = 3.9600274943252043718154398186252e+19699
relative error = 1.3198306925262458660535523127661e+19701 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5088.8MB, alloc=4.9MB, time=590.76
NO POLE
NO POLE
t[1] = 1.491
x2[1] (analytic) = 2.0040129905546495556566357648431
x2[1] (numeric) = -2.8286486095623331312812839141651e+19717
absolute error = 2.8286486095623331312812839141651e+19717
relative error = 1.4114921524433080826066774618710e+19719 %
h = 0.001
x1[1] (analytic) = 3.0004052653119588138048850639726
x1[1] (numeric) = 3.1663685932505723381810721955850e+19719
absolute error = 3.1663685932505723381810721955850e+19719
relative error = 1.0553136370800755636473837651751e+19721 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5092.7MB, alloc=4.9MB, time=591.04
NO POLE
NO POLE
t[1] = 1.492
x2[1] (analytic) = 2.0040208218330196285791376521169
x2[1] (numeric) = 2.2617378620464055692349389052701e+19737
absolute error = 2.2617378620464055692349389052701e+19737
relative error = 1.1285999813004236406571937031476e+19739 %
h = 0.001
x1[1] (analytic) = 3.000404860249211983634505295856
x1[1] (numeric) = -2.5317728431660895978122246306738e+19739
absolute error = 2.5317728431660895978122246306738e+19739
relative error = 8.4381040595828188757564004709656e+19740 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5096.5MB, alloc=4.9MB, time=591.33
memory used=5100.3MB, alloc=4.9MB, time=591.62
NO POLE
NO POLE
t[1] = 1.493
x2[1] (analytic) = 2.0040286689922521857247571500936
x2[1] (numeric) = -1.8084459622596043809923662887399e+19757
absolute error = 1.8084459622596043809923662887399e+19757
relative error = 9.0240523513518461005370006143526e+19758 %
h = 0.001
x1[1] (analytic) = 3.0004044555913254364144643878552
x1[1] (numeric) = 2.0243612013637908124521311664632e+19759
absolute error = 2.0243612013637908124521311664632e+19759
relative error = 6.7469610558381398062903583491572e+19760 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5104.1MB, alloc=4.9MB, time=591.91
NO POLE
NO POLE
t[1] = 1.494
x2[1] (analytic) = 2.0040365320639382035141805612314
x2[1] (numeric) = 1.4460017021839836454969178074177e+19777
absolute error = 1.4460017021839836454969178074177e+19777
relative error = 7.2154458217124426210684387504481e+19778 %
h = 0.001
x1[1] (analytic) = 3.0004040513378945142244936282596
x1[1] (numeric) = -1.6186437439080353247639715883813e+19779
absolute error = 1.6186437439080353247639715883813e+19779
relative error = 5.3947525606968646076467071601000e+19780 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5107.9MB, alloc=4.9MB, time=592.19
NO POLE
NO POLE
memory used=5111.7MB, alloc=4.9MB, time=592.47
t[1] = 1.495
x2[1] (analytic) = 2.0040444110797321059752565940121
x2[1] (numeric) = -1.1561976229062597585605052464025e+19797
absolute error = 1.1561976229062597585605052464025e+19797
relative error = 5.7693213609139909641709764186930e+19798 %
h = 0.001
x1[1] (analytic) = 3.0004036474885149635999830400653
x1[1] (numeric) = 1.2942391742775696098766846739387e+19799
absolute error = 1.2942391742775696098766846739387e+19799
relative error = 4.3135501963574510618526077397635e+19800 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5115.5MB, alloc=4.9MB, time=592.76
NO POLE
NO POLE
t[1] = 1.496
x2[1] (analytic) = 2.0040523060713518915628614967645
x2[1] (numeric) = 9.2447535932706481251717155176453e+19816
absolute error = 9.2447535932706481251717155176453e+19816
relative error = 4.6130300917113386472117914156803e+19818 %
h = 0.001
x1[1] (analytic) = 3.0004032440427829351277278826773
x1[1] (numeric) = -1.0348509649136573280523087392767e+19819
absolute error = 1.0348509649136573280523087392767e+19819
relative error = 3.4490396148195249859652865017668e+19820 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5119.4MB, alloc=4.9MB, time=593.05
NO POLE
NO POLE
t[1] = 1.497
x2[1] (analytic) = 2.0040602170705792602328599585772
x2[1] (numeric) = -7.3919429781788943618272588784818e+19836
absolute error = 7.3919429781788943618272588784818e+19836
relative error = 3.6884834673201658228030516730816e+19838 %
h = 0.001
x1[1] (analytic) = 3.0004028410002949830420792050509
x1[1] (numeric) = 8.2744869794294529517537812820775e+19838
absolute error = 8.2744869794294529517537812820775e+19838
relative error = 2.7577920092459476010333081101330e+19840 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5123.2MB, alloc=4.9MB, time=593.33
NO POLE
NO POLE
memory used=5127.0MB, alloc=4.9MB, time=593.63
t[1] = 1.498
x2[1] (analytic) = 2.0040681441092597407706702752387
x2[1] (numeric) = 5.9104680769882154309067762500217e+19856
absolute error = 5.9104680769882154309067762500217e+19856
relative error = 2.9492350818316199782845741971720e+19858 %
h = 0.001
x1[1] (analytic) = 3.0004024383606480648214980464218
x1[1] (numeric) = -6.6161347956476128635747137418071e+19858
absolute error = 6.6161347956476128635747137418071e+19858
relative error = 2.2050824619588427827085482823637e+19860 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5130.8MB, alloc=4.9MB, time=593.91
NO POLE
NO POLE
t[1] = 1.499
x2[1] (analytic) = 2.0040760872193028183749432963576
x2[1] (numeric) = -4.7259067057499337795847431039299e+19876
absolute error = 4.7259067057499337795847431039299e+19876
relative error = 2.3581473457463521047038850451775e+19878 %
h = 0.001
x1[1] (analytic) = 3.0004020361234395407855128811804
x1[1] (numeric) = 5.2901454486544320958874552962485e+19878
absolute error = 5.2901454486544320958874552962485e+19878
relative error = 1.7631455334863631657980485728614e+19880 %
h = 0.001
TOP MAIN SOLVE Loop
memory used=5134.6MB, alloc=4.9MB, time=594.19
NO POLE
NO POLE
t[1] = 1.5
x2[1] (analytic) = 2.0040840464326820624968656900721
x2[1] (numeric) = 3.7787521902720399628893708697075e+19896
absolute error = 3.7787521902720399628893708697075e+19896
relative error = 1.8855258076617644844717306493818e+19898 %
h = 0.001
x1[1] (analytic) = 3.0004016342882671736920799048474
x1[1] (numeric) = -4.2299076019928430245674110509934e+19898
absolute error = 4.2299076019928430245674110509934e+19898
relative error = 1.4097804619401329106453933205804e+19900 %
h = 0.001
Finished!
Maximum Iterations Reached before Solution Completed!
diff (x2,t,2) = 3.0 * diff(x2,t,1) - 2.0 * x2 - diff(x1,t,2) - diff (x1,t,1) + x1;
diff (x1,t,1) = 4.0 * x2 - 2.0 * diff (x2,t ,1) - 2.0 * x1;
Iterations = 1000
Total Elapsed Time = 9 Minutes 54 Seconds
Elapsed Time(since restart) = 9 Minutes 54 Seconds
Expected Time Remaining = 34 Minutes 37 Seconds
Optimized Time Remaining = 34 Minutes 37 Seconds
Time to Timeout = 5 Minutes 5 Seconds
Percent Done = 22.24 %
> quit
memory used=5137.5MB, alloc=4.9MB, time=594.39