lsqnonlin and stretched exponential function

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Alessandro el 29 de Mzo. de 2020

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Comentada: Torsten el 29 de Mzo. de 2020

Hi all,

I am currrently trying to fit my data with lsqnonlin instead lsqcurvefit for a comparative reason and I am facing some troubles.

Starting with the easiest example in https://se.mathworks.com/help/optim/ug/lsqnonlin.html, I modify the function as:

fun = @(r) r(1).*exp(-d.*r(2)).^r(3)-y

This function yields x = [1.0376 3.1962 0.4104].

From here, I calculate my errors in the way:

[x,resnorm,residual,exitflag,output,lambda,J] = lsqnonlin(fun,x0);

N = length(y(:,1));

[Q,R] = qr(J,0);

mse = sum(abs(residual).^2)/(size(J,1)-size(J,2));

Rinv = inv(R);

Sigma_var = Rinv*Rinv'*mse;

x_er = full(sqrt(diag(Sigma_var)));

Here, the values I get are not making any sense to me x_er = [0.02701 6458034.8422 829226.8633]; especially for x(2) and x(3).

Fit and errors are totally fine if I fit similar data in the form: (i) r(1).*exp(-d.*r(2)) or (ii) r(1).*exp(-d.*r(2))+r(3).*exp(-d.*r(4));

Could you please help me? Am I missing something?

Thanks a lot.

Best wishes

Alessandro

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Ameer Hamza el 29 de Mzo. de 2020

You code seems to give correct output

Alessandro el 29 de Mzo. de 2020

Yes, indeed but I need the errors as well.

When I insert the exponent in the function, i.e., r(3), something goes extremely wrong.

Any idea?

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Torsten el 29 de Mzo. de 2020

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Editada: Torsten el 29 de Mzo. de 2020

error_bounds = nlparci(x,residual,'jacobian',J)

after the call to lsqnonlin.

If you don't have a toolbox with nlparci, search the web for nlparci.m.

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Alessandro el 29 de Mzo. de 2020

Thanks. Right but I still don't get why the errors I got are making no sense to me

Torsten el 29 de Mzo. de 2020

There is no such thing as confidence intervals for dependent parameters.

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