Determining the right relative and absolute tolerances

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bayern science on 1 Aug 2011

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https://in.mathworks.com/matlabcentral/answers/12853-determining-the-right-relative-and-absolute-tolerances

Edited: Torsten on 5 Jan 2025

My program generates an essentially sinusoidal output. Using the various relative and absolute tolerances I obtained the following fits to a sine function (with about 2e4 data points):

ReTol = 1e-5, AbTol = 1e-7, Sinefit amplitude = 22.1383, phase = -0.10532, fminsearch err = 71211.296;

ReTol = 1e-5, AbTol = 1e-8, Sinefit amplitude = 22.1383, phase = -0.10532, fminsearch err = 71211.296;

ReTol = 1e-6, AbTol = 1e-7, Sinefit amplitude = 24.5425, phase = +0.22298, fminsearch err = 61670.879;

ReTol = 1e-6, AbTol = 1e-8, Sinefit amplitude = 24.5335, phase = +0.22210, fminsearch err = 106022.2668;

I tend to choose ReTol = 1e-5, AbTol = 1e-7, as reducing absolute tolerance doesn't change the result. However if I reduce relative tolerance I obtain different results (especially the phase). Thus what should I choose? ReTol = 1e-5, AbTol = 1e-7, or ReTol = 1e-6, AbTol = 1e-7?

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sajjad on 26 Dec 2024

Moved: John D'Errico on 26 Dec 2024

Open in MATLAB Online

This is first file of code:

SAVE THIS PART WITH NAME funn

function dydt = funn(t,y,x,nx,dx,delta,Reynolds,H,Hdot);
%persistent iter
%if isempty(iter)
%  iter = 0;
%end
%iter = iter + 1;
%if mod(iter,1000)==0
%  t
%  iter = 0;
%end
G = y(1:nx);
F = y(nx+1:2*nx);
% F
% Compute spatial derivatives
dFdx = zeros(nx,1);
d2Fdx2 = zeros(nx,1);
dFdx(2:nx-1) = (F(3:nx)-F(1:nx-2))/(2*dx);
dFdx(nx) = Hdot(t);           % This corresponds to F'(1,t) = H'(t)
d2Fdx2(2:nx-1) = (F(3:nx)-2*F(2:nx-1)+F(1:nx-2))/dx^2;
%d2Fdx2(nx) = (dFdx(nx)-dFdx(nx-1))/dx;
Fnxp1 = F(nx-1) + 2*dx*dFdx(nx);
d2Fdx2(nx) = (Fnxp1-2*F(nx)+F(nx-1))/dx^2;
% Compute temporal derivatives
dFdt = zeros(nx,1);
dFdt(1) = F(1);
dFdt(2:nx-1) = d2Fdx2(2:nx-1)+dFdx(2:nx-1)./x(2:nx-1)-...
    F(2:nx-1)./x(2:nx-1).^2+H(t)^2*G(2:nx-1);
dFdt(nx) = F(nx) + Hdot(t);     % This corresponds to F(1,t) =- H'(t)
% G
% Compute spatial derivatives
dGdx = zeros(nx,1);
d2Gdx2 = zeros(nx,1);
dGdx(2:nx-1) = (G(3:nx)-G(1:nx-2))/(2*dx);
d2Gdx2(2:nx-1) = (G(3:nx)-2*G(2:nx-1)+G(1:nx-2))/dx^2;
% Compute temporal derivatives
dGdt = zeros(nx,1);
dGdt(1) = G(1);
dGdt(2:nx-1) = Hdot(t)/H(t).*x(2:nx-1).*dGdx(2:nx-1)+ ...
    1/H(t).*F(2:nx-1).*dGdx(2:nx-1)- ...
    1/H(t).*dFdx(2:nx-1).*G(2:nx-1)- ...
    2.*F(2:nx-1).*G(2:nx-1)./(H(t)*x(2:nx-1))+ ...
    (d2Gdx2(2:nx-1)+dGdx(2:nx-1)./x(2:nx-1)-G(2:nx-1)./x(2:nx-1).^2)./ ...
    (H(t)^2*Reynolds);
dGdt(nx) = G(nx) - (d2Fdx2(nx)+dFdx(nx)/x(nx)-F(nx)/x(nx)^2)/(-H(t)^2);
%Taken from the article, should be the same as set
%dGdt(nx) = G(nx) + 2/H(t)^2*((F(nx-1)+Hdot(t)*(1+dx))/dx^2 + Hdot(t));
dydt = [dGdt;dFdt];
end

Following is the second part of code:

format long;
clear all;
close all;
clc;
nx = 101;        %The number of points or grid cells used to discretize the spetial domain
xstart = 0.0;
xend = 1.0;
x = linspace(xstart,xend,nx).';
dx = (xend-xstart)/(nx-1);
tstart = 0;
tend =8000;
tspan = [tstart,tend];
G0 = zeros(nx,1);        % corresponding to F(etta,0)=0
F0 = zeros(nx,1);        % corresponding to G(etta,0)=0
y0 = [G0;F0];
delta = 0.3;
Reynolds = 1000;
H = @(t) 1 + delta*cos(2*t);
Hdot = @(t) -delta*2*sin(2*t);
M = [eye(nx),zeros(nx);zeros(nx,2*nx)];
M(1,1) = 0;
M(nx,nx) = 0;
options = odeset('Mass',M, 'RelTol', 1e-7, 'AbsTol', 1e-8);
[T,Y] = ode23t(@(t,y)funn(t,y,x,nx,dx,delta,Reynolds,H,Hdot),tspan,y0, options);
G = Y(:,1:nx);
F = Y(:,nx+1:2*nx);
idx = T >= 0;
figure(1)
plot(T(idx),G(:,nx));
% Assuming G and T have already been defined and filtered for t <= 800
G1 = G (: , nx); % Values of G at eta = 1
t_range = T (idx); % Corresponding time points
% Find maxima
[maxima, locs_max] = findpeaks (G1 (idx)); % Find peaks and their locations
max_times = t_range (locs_max); % Times at which maxima occur
% Find minima
[minima, locs_min] = findpeaks (-G1 (idx)); % Negate to find minima
min_times = t_range (locs_min); % Times at which minima occur
% Plot Maxima as points only
figure(2);
plot(max_times, maxima, 'ro', 'MarkerFaceColor', 'r','MarkerSize', 3)  % Plot maxima as red points
xlabel('Time (t)');
ylabel('Maxima of G(1,t)');
title('Maxima of G(1,t)');
grid on;
% Plot Minima as points only
figure(3);
plot (min_times, -minima, 'go', 'MarkerFaceColor', 'g','MarkerSize', 3) % Plot minima as green points
xlabel (' Time (t)');
ylabel (' Minima of G (1, t)');
title (' Minima of G (1, t)');
grid on;
[pks1,locs] = findpeaks(G(:,nx));
figure(4)
plot(T(locs),pks1,'o')
[pks2,locs] = findpeaks(-G(:,nx));
%pks = -pks
figure(5)
plot(T(locs),pks2,'o')
% Create return map for maxima: plot max(i+1) vs max(i)
figure (6)
plot(maxima(1:end-1), maxima(2:end), 'ro', 'MarkerFaceColor', 'r','MarkerSize', 3);  % Return map for maxima
xlabel('Max(i)');
ylabel('Max(i+1)');
title('Return Map of Maxima');
grid on;
% Display data for return map
return_map_maxima = [maxima(1:end-1), maxima(2:end)];  % Prepare data for return map
disp('Return Map Data for Maxima (Max(i), Max(i+1)):');
disp(return_map_maxima);  % Display the consecutive maxima pairs in the Command Window
% Create return map for minima: plot min(i+1) vs min(i)
figure(7)
plot(-minima(1:end-1), -minima(2:end), 'go', 'MarkerFaceColor', 'g','MarkerSize', 3);  % Return map for minima
xlabel('Min(i)');
ylabel('Min(i+1)');
title('Return Map of Minima');
grid on;
% Display data for return map
return_map_minima = [minima(1:end-1), minima(2:end)];  % Prepare data for return map
disp('Return Map Data for Maxima (Max(i), Max(i+1)):');
disp(return_map_minima);  % Display the consecutive maxima pairs in the Command Window

sajjad on 5 Jan 2025

I am not receiving more output yet.

Torsten on 5 Jan 2025

Edited: Torsten on 5 Jan 2025

As I answered in another question of yours

https://uk.mathworks.com/matlabcentral/answers/491227-ode45-solver-results-changes-how-to-select-optimal-reltol-and-abstol?s_tid=srchtitle

, it's impossible to get more maxima because the number of maxima if given by the solution of the PDE system. E.g. if your solution were y(x)=sin(x), you would get maxima and minima at odd multiples of pi/2, and no modification of the code could give you more of them. Or do I get wrong what you are asking for ?

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Determining the right relative and absolute tolerances

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Determining the right relative and absolute tolerances

11 Comments Show 9 older commentsHide 9 older comments

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11 Comments
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