Why do you need a "modified" curvefitting tool? Is there any reason why the many such tools already in existence will not work? Thus why not use nlinfit, lsqnonlin, lsqcurvefit, or the curvefitting toolbox itself? There are probably others I've just forgotten to add in that list. And, yes, you could use a tool like fminsearch too.
How can I create a modified curve fitting function?
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Hi,
i want to fit a recovery curve of my experiment to the following expression:
F(t)=k*exp(-D/2t)[I0(D/2t)+I1(D/2t)]
where I0 and I1 are the modified Bessel fundtions of the first kind of zero and first order. I want to determine D and k.
Is there any simple solution for this problem?
Thanks for helping
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Respuestas (2)
John D'Errico
el 19 de Mzo. de 2017
Editada: John D'Errico
el 19 de Mzo. de 2017
Yes. Of course it is possible to do this. What toolbox do you have available? It sounds like the curve fitting TB is what you have. READ THE HELP. Look at the examples provided.
You said modified first kind Bessel, so you would use besseli. I'll get you started:
I0 = @(z) besseli(0,z);
I1 = @(z) besseli(1,z);
F = @(P,t) P(1)*exp(-P(2)/2*t).*(I0(P(2)/2*t)+I1(P(2)/2*t));
The curve fitting toolbox should be able to use this, as well as nlinfit and lsqcurvefit.
Note that I made the assumption that D/2t should be interpreted as (D/2)*t, NOT as D/(2*t).
3 comentarios
Sung YunSing
el 18 de Ag. de 2021
Hi just want to mention that if you were working at FRAP, maybe D/(2*t) is more conform to the origin FRAP equation.
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