Choosing a method for nonlinear data-fitting to find parameters
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I'm currently trying to fit nonlinear experimental data to find two parameters. Using lsqcurvefit has been working well about 90% of the time, but I wanted to try to improve that. I have found other methods for fitting data, but I'm confused about the differences between them, and how to choose one. I tried using MultiStart in addition to lsqcurvefit, but that did not seem to improve the results. I also tried lsqnonlin without any luck. Do you have any recommendations about other methods/options to try? I have access to the majority of the toolboxes. Some people were discussing the use of robustfit, but I was confused about the implementation of that. Any insight would be greatly appreciated!
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If lsqcurvefit is failing and your objective function is legal (differentiable, etc...), then it must be that you are deriving a bad initial guess in those failure cases. Since it is only a 2 parameter search, you should be able to derive a good initial guess of the optimum just by evaluating the least squares cost function on some coarse grid and either plotting them as a 2D surface or taking the minimum over the samples.
6 commentaires
John D'Errico
le 31 Juil 2017
Knowing the model itself would be of great importance, and some tools will not be even appropriate for some models.
For example, if you can formulate the model in a form admissable for a tool like my fminspleas, that will often greatly improve the robustness of the fitting process.
Nik
le 31 Juil 2017
lsqcurvefit looks for parameters x that minimize
cost(x) = norm(F(x,xdata)-ydata).^2
You could plot cost(x) as a 2D surface and look for where the minimum approximately occurs. Also, now that we see your model equation, I agree with John that fminspleas would work well for this problem: you only have one non-linear parameter, B.
John D'Errico
le 1 Août 2017
fminspleas will be more efficient here, as well as more robust, because it need to work with only the one nonlinear parameter, B. That means A does not need a starting value, nor is it really solved for in an iterative sense. This also makes the problem more robust, because the parameter search is now done in a 1-dimensional search space, instead of the 2-d space of the original problem.
You can even take advantage of the model form to use the expm1 function, since expm1(X)=exp(X)-1. This can be more accurate for some values of X. I doubt it is important here though.
funlist = {@(B,xdata) -expm1(-xdata*B)};
Nik
le 1 Août 2017
Plus de réponses (1)
Yahya Zakaria mohamed
le 1 Août 2017
1 vote
You can use the APP for curve fitting.
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It fits very well with about 95% I think nothing more You will get.You can generate code from the app and modify it as You wish.
1 commentaire
Nik
le 1 Août 2017
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