Finding sigma from fit using Curve Toolbox gaussian?

30 visualizzazioni (ultimi 30 giorni)
Gary
Gary il 22 Gen 2013
Commentato: Fynn Reinbacher il 5 Nov 2020
I am using the gaussin fitting functions in the Matlab curve fitting toolbox, which uses the model:
ans(x) = a1*exp(-((x-b1)/c1)^2) + a2*exp(-((x-b2)/c2)^2)
This all works well for my data and I get the fits, but now I want to know what sigma is for these two gaussians? That isn't just c, is it? Can someone tells me how the fit coefficients relate to sigma?
Much appreciation.
Gary

Accedi per rispondere a questa domanda.

Risposte (1)

Shashank Prasanna
Shashank Prasanna il 22 Gen 2013
Modificato: Shashank Prasanna il 22 Gen 2013
If you look at the gaussian equation the curve fitting toolbox fits:
http://www.mathworks.com/help/curvefit/gaussian.html
you will notice that it is different from the standard normal/gaussian distribution equation given here:
http://en.wikipedia.org/wiki/Normal_distribution
which means you can equate the coefficients you can equate them and get the value of sigma.
a1 = 1/sigma*sqrt(2*pi)
-1/c^2 = -1/2*sigma^2
  1 Commento
Fynn Reinbacher
Fynn Reinbacher il 5 Nov 2020
sigma = 1/(a*sqrt(2*pi));
Has to be used with caution.
This works only for normalized datasets.
In the matlab version of the gaussian:
where f(x) is the data you fitted.
For nomalized data and the above answer is indeed valid
In order to get σ from a you'd need to integrate your data first
% if:
[x, cnts] = load('mydata.mat'); % data you are fitting
f1 = fit(x, cnts, 'gauss1');
% then:
mu = f1.b1;
sigma = f1.c1/sqrt(2);
% or:
intergral = trapz(x, cnts);
sigma = integral/(f.a1*sqrt(2*pi));
This has me bugged for a long time.

Accedi per commentare.

Categorie

Scopri di più su Get Started with Curve Fitting Toolbox in Help Center e File Exchange

Tag

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by