Fitting a 4 variable nonlinear equation using lsqcurvefit
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I tried to fit my data to a multi-exponential function using "lsqcurvefit" and to find out the coefficients. It gives an unexpected error, "The Levenberg-Marquardt algorithm does not handle bound constraints and the trust-region-reflective algorithm requires at least as many equations as variables; aborting."
As for matlab examples given for simple exponential function, it works fine. Any idea to figuring this out?
xdata=[50 400 800];
ydata=[350 200 90];
ff=@(x,b) x(1)*(x(2)*exp(-(x(3)+x(4))*b)+(1-x(2))*exp(-x(4)*b));
x0=[1,0.2,0.01,0.001]; %guess values
lb=[0, 0, 0.005, 0];
ub=[1500, 1, 0.1, 0.005];
options = optimset('Algorithm','levenberg-marquardt','MaxFunEvals',1e9,'MaxIter',1e9,'TolFun', 1e-8, 'TolX', 1e-8);
X=lsqcurvefit(ff,x0,xdata,ydata,lb,ub,options);
disp(X)
Accepted Answer
Star Strider
on 30 Sep 2015
2 votes
You are estimating four parameters with three data pairs. You cannot uniquely estimate more parameters than you have data. (Consider estimating a line — defined by two parameters — when you have only one point. An infinite number of lines could be drawn through that point.)
4 Comments
JayD
on 1 Oct 2015
Star Strider
on 1 Oct 2015
My pleasure.
A simple sum-of-exponentials is rarely a good model anyway. It is best that you derive a mathematical model your system and develop an objective function to fit that model to your data, so that the parameters have physical meaning.
In the interim, a single exponential would likely work with the data you have. I’d use something like this:
f = @(x,b) x(1) + x(2).*exp(x(3).*b);
(This is untested code.)
JayD
on 1 Oct 2015
Star Strider
on 1 Oct 2015
My pleasure.
The most sincere expression of appreciation here on MATLAB Answers is to Accept the Answer that most closely solves your problem.
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