I've answered this type of question a few times here, and each time I think "it just must be possible to do this sort of thing much simpler..." However, I haven't yet seen or thought of a simpler method, so...bear with me :)
If you know the number of peaks beforehand, you can just do this:
% DATA TO REPRODUCE
mu = [112 -45];
sigma = [ 12 24];
mu(1) + sigma(1)*randn(1e4, 1)
mu(2) + sigma(2)*randn(1e4, 1)];
% interpolate with splines through the histogram
[y,x] = hist(F, 1500);
G = spline(x,y);
% Find optimum curve fit
P0 = [% mu S A
80 2 2e3; % (some rough initial estimate)
-8 12 2e3];
P = fminunc(@(P) Obj(P, x,G), P0); % refine the estimate
% REPRODUCED DATA
figure, clf, hold on
plot(x, P(1,3)*Gaussian(P(1,1),P(1,2),x) + P(2,3)*Gaussian(P(2,1),P(2,2),x))
plot(x, ppval(G,x),'r.', 'MarkerSize', 1)
% The objective function for the curve fitting optimizer
function val = Obj(P, x,F)
G = zeros(size(x));
for ii = 1:size(P,1);
mu = P(ii,1); % mean
sigma = P(ii,2); % std. deviation
A = P(ii,3); % "amplitude"
G = G + A/sigma/sqrt(2*pi) * exp(-(x-mu).^2/2/sigma^2);
val = sum((G-ppval(F,x)).^2);
% just a function for plotting
function G = Gaussian(mu,sigma,x)
G = 1/sigma/sqrt(2*pi) * exp(-(x-mu).^2/2/sigma^2);
Pretty good results I'd say :)
As always, there's a few drawbacks to this method; it requires you to know beforehand
- the number of peaks in the data set
- an initial estimate that's "close enough" for the optimizer to converge to the real solution
If you don't know the number of peaks beforehand (and want to find the number of peaks automatically), you'll have to use
kmeans and some heuristics to locate the amount of peaks (and their means) in your dataset(s).
In any case, the important thing is that there are ways to find the number of peaks, but there are no ways to find suitable initial estimates automatically. If you only have one or a few dozen data sets, finding initial estimates can still be done manually, but anything beyond that will make the method above less and less attractive.
You could however use a global optimizer, in which case you don't have to come up with initial estimates anymore. But it is at this point that I can't help thinking
"That should not be necessary for such a simple problem!"
But oh well.