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
```

`fitoptions`

. – horchler Dec 14 '13 at 19:07