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I am trying to fit my data to Gaussian Mixture Model using matlab , but the problem is that I can't determine the optimal number of components to do this , Can any body help !!! Also if there are already build functions to get that optimal number please help .

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that's the classic "model selection" problem. There is no unique solution, only some heuristics to help you choose. check the link that YBE wrote. you can also search for "model selection" papers, you'l get a lot.. –  Ran Jul 2 '12 at 15:21

4 Answers 4

Matlab has built-in kmeans function. In order to determine the number of clusters you should experiment and for which cluster # data fits well. If you want a more solid approach, check this page.

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The Infinite Gaussian Mixture Model (www.gatsby.ucl.ac.uk/~edward/pub/inf.mix.nips.99.pdf) can automatically learn the number of clusters.

This page (http://www.cs.brown.edu/~fwood/code.html) has some matlab code that implements it (I haven't tried the code).

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Good reviews of the different approaches to find the optimal number of components for gaussian model mixture are :

  • Assessing the number of components in mixture models: a review by A Oliveira-Brochado and FV Martins (2005) : available here
  • Chapter 6 of Finite mixture models by McLachlan and Peel (2000)

PS : I don't have the solution for your problem in Matlab but BIC criterion is implemented in R package mclust

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In Matlab , we already have 2 criterion: AIC and BIC implemented. Fit GMM

See code snippet: SRC: http://www.mathworks.in/help/stats/gmdistribution.fit.html

AIC = zeros(1,4);

obj = cell(1,4);

 `for k = 1:4`

      `obj{k} = gmdistribution.fit(X,k);`

      `AIC(k)= obj{k}.AIC;`


[minAIC,numComponents] = min(AIC);


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