lsqnonlin and stretched exponential function

29 Mzo. 2020
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Actualizado a las 29 Mzo. 2020
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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
Ameer Hamza el 29 de Mzo. de 2020
Can you share a sample dataset? I suspect the error is related to the initial guess x0.
Alessandro
Alessandro el 29 de Mzo. de 2020
Editada: Ameer Hamza el 29 de Mzo. de 2020
I used this:
rng default
d = linspace(0,3);
y = exp(-1.3*d) + 0.05*randn(size(d));
I get the same issues with my experimental data.
I also attach everything else on my test script:
fun = @(r) r(1).*exp(-d.*r(2)) .^r(3)-y;
x0 = [1 4 0.2];
[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)))';
figure(1)
hold off
plot(d,y,'ko',d,x(1).*exp(-x(2).*d).^x(3),'b-')
Thanks
A
Ameer Hamza
Ameer Hamza el 29 de Mzo. de 2020
You code seems to give correct output
Alessandro
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
Torsten el 29 de Mzo. de 2020
Editada: Torsten el 29 de Mzo. de 2020

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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
Alessandro el 29 de Mzo. de 2020
Thanks. I am getting this output:
error_bounds = [ 0.985780584540947 1.08943145408670
-13252964.8453212 13252978.5087471
-372444.576861838 372444.960841471];
But the fitted params are still ~ [1.03760601931382 6.83171295901538 0.191989816441892]
Why is it generating these huge errors? Once again, this appears only when I add the strecth exponent to the function.
Torsten
Torsten el 29 de Mzo. de 2020
exp(-d*r2)^r3 = exp(-d*r2*r3)
Thus r2 and r3 are dependent fitting parameters which explains the behaviour.
Alessandro
Alessandro el 29 de Mzo. de 2020
same result, nothing changes unfortunately.
fun = @(r) r(1).*exp(-d.*r(2).*r(3)) -y;
Torsten
Torsten el 29 de Mzo. de 2020
Editada: Torsten el 29 de Mzo. de 2020
What I meant is that - as written - your fitting problem is ill defined.
Say you get r2=3 and r3 = 5 as result. Then r2 = 1 and r3 = 15 give the same goodness of fit. r2 and r3 are dependent parameters and can be replaced by a single parameter r23.
Maybe you mean exp((-d*r2).^r3) in your model function ?
Alessandro
Alessandro el 29 de Mzo. de 2020
No, I use the fucntion as it is:
y = r(1)*exp(-d*r2)^r3
I cannot replace with one parameter (r23) as you had suggest because I need all three to characterize my samples etc. Why the addition of the r(3) is messing up the errors? This not happens in lsqcurvefit
Torsten
Torsten el 29 de Mzo. de 2020
Editada: Torsten el 29 de Mzo. de 2020
Your function to be fitted is
y= r1*exp(-d*r2*r3).
with three fitting parameters.
Say r1 = 1, r2 = 3 and r3 = 4 is what the solver returns.
But why should this result be better than
r1 = 1, r2 = 2 and r3 = 6 because both give the same fitted data.
So only the product r2*r3 is relevant, and the result returned by the solver was only arbitrary.
Mathematically speaking, parameters r1 and r2 do not contain individual information -only their product does.
Test it by choosing different initial values for r2. My guess is that the final r2 and r3 in each run will be different, but their product will remain constant.
If you search for "streched exponential function" in Wikipedia, it's of the form
exp(-r2*d^r3), not
exp(-r2*d)^r3.
Alessandro
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
Torsten el 29 de Mzo. de 2020
There is no such thing as confidence intervals for dependent parameters.

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Alessandro
Alessandro
el 29 de Mzo. de 2020

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Torsten
Torsten
el 29 de Mzo. de 2020

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