how to use lsqnonlin to solve conditional equation

3 visualizaciones (últimos 30 días)
cheng li
cheng li el 5 de Sept. de 2021
Comentada: cheng li el 8 de Sept. de 2021
i would like to input the following equation in matlab and use lsqnonlin to find the C0, Cinfi1, k1, t2start, Cinfi2 and k2 that can fit an obriginal data?
Are there anyone knowning how to do that?

Respuesta aceptada

Fabio Freschi
Fabio Freschi el 7 de Sept. de 2021
Editada: Fabio Freschi el 7 de Sept. de 2021
The following code should be self explainatory. In the opposite case, simply ask
clear all, close all
% some dummy params values
C0 = 2;
Cinf1 = 10;
k1 = 2;
t2start = 3;
Cinf2 = 8;
k2 = 3;
% t vector
tData = linspace(0,10,50);
% data + noise
rng(0); % for reproducibility
yData = C0+Cinf1*(1-exp(-k1*tData))+(tData >= t2start).*(Cinf2*(1-exp(-k2*(tData-t2start))))+0.3*randn(size(tData));
% anonymous function for fitting (function-data) that must be minimized
% using least squares
% x(1) = C0
% x(2) = Cinf1
% x(3) = k1
% x(4) = t2start
% x(5) = Cinf2
% x(6) = k2
C = @(x)x(1)+x(2)*(1-exp(-x(3)*tData))+(tData >= x(4)).*(x(5)*(1-exp(-x(6)*(tData-x(4)))))-yData;
% initial values (experience may help here)
x0 = [1 1 1 1 1 1];
% fitting
x = lsqnonlin(C,x0);
Local minimum possible. lsqnonlin stopped because the final change in the sum of squares relative to its initial value is less than the value of the function tolerance.
% plot
figure, hold on
plot(tData,yData,'o');
% reconstruction of the best fit from the anonymous function
plot(tData,C(x)+yData);
legend('data','best fit');

Más respuestas (0)

Categorías

Más información sobre Fit Postprocessing en Help Center y File Exchange.

Etiquetas

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by