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I am currently unable to have accurate gaussian fit. How can I fix the height? (see picture).

ft=fit(x,y,'gauss2') 
Co=coeffvalues(ft)
sigma=Co(3)/sqrt(2)  
mu = Co(2)
C=Co(1)

plot(X,C*exp(-(X - mu).^2 / (2*sigma^2))+min(y), '-r') 
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I don't see a picture. –  Rafa Dec 14 '13 at 17:37
    
Seems to work fine for me on R2013a but then I don't know what your data is. You might try playing with fitoptions. –  horchler Dec 14 '13 at 19:07

1 Answer 1

You can try lsqcurvefit to do single or multiple Gaussian fitting accurately.

x = lsqcurvefit(fun,x0,xdata,ydata)

fun is your Gaussian function, x0 holds the initial value of the Gaussian parameters (mu, sigma, height, etc). fun(x0) return the gaussian in vector/array form. When the routine returns, the fitted parameters are in x. You can customize the function fun to fit one Gaussian or multiple Gaussians to your data.

Matlab document of lsqcurvefit

In my case, I use the following routine to do multiple Gaussian fitting:

x0 = [1000;10.6;0.6;
     1100;12.8;0.7; %3 Gaussians
     300;10;2];     %each row is the height, mu, sigma of one Gaussian

options = optimset('TolFun',10e-6,'MaxFunEvals',150000);
%lb, ub are the similar matrix as x0 that define lower and upper bound of x.
[x, resnorm] = lsqcurvefit(@myfit, x0, xdata, ydata, lb, ub);

The myfit function that calculates superposition of multiple Gaussians:

function [ F ] = myfit(x, xdata)
    F = zeros(1,size(xdata,2));
    len = size(x,1);
    for i = 1:3:len
        F = F + x(i)*gauss(xdata, x(i+1), x(i+2));
    end
end

The Gaussian function:

function [ g ] = gauss(x, mu, sigma)
    g = exp(-0.5*((x-mu)/sigma).^2);
end
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