# Estimate gaussian (mixture) density from a set of weighted samples

Assume I have a set of weighted samples, where each samples has a corresponding weight between 0 and 1. I'd like to estimate the parameters of a gaussian mixture distribution that is biased towards the samples with higher weight. In the usual non-weighted case gaussian mixture estimation is done via the EM algorithm. Does anyone know an implementation (any language is ok) that permits passing weights? If not, does anyone know how to modify the algorithm to account for the weights? If not, can some one give me a hint on how to incorporate the weights in the initial formula of the maximum-log-likelihood formulation of the problem?

Thanks!

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Is "EM" error minimization, or something else entirely? Also, there are many numeric and analysis packages ranging for basic and general to highly specialized. It might help if you said something about your problem domain and preferred environment. Fortran? C++? Java? Python? Are you OK learning a major new tool like R or root? –  dmckee Mar 22 '10 at 14:40
Ok, then my preferred language would be Python. But any of the above languages except root (never heard of it) would also be ok. EM stands for Estimation Maximization and is general iterative scheme that can be used for estimation of the parameters of a gaussian mixture model from data. –  Christian Mar 22 '10 at 14:56
I'm not familiar with that method and can't make any specific recommendations. –  dmckee Mar 22 '10 at 19:16
Try asking on math.stackexchange.com . This looks more like a Math question than a coding question to me. –  hwiechers Aug 29 '10 at 14:24

I've just had the same problem. Even though the post is older, it might be interesting to someone else. honk's answer is in principle correct, it's just not immediate to see how it affects the implementation of the algorithm. From the Wikipedia article for Expectation Maximization and a very nice Tutorial, the changes can be derived easily.

If $v_i$ is the weight of the i-th sample, the algorithm from the tutorial (see end of Section 6.2.) changes so that the $gamma_{ij}$ is multiplied by that weighting factor. For the calculation of the new weights $w_j$, $n_j$ has to be divided by the sum of the weights $\sum_{i=1}^{n} v_i$ instead of just n. That's it...

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You can calculate a weighted log-Likelihood function; just multiply the every point with it's weight. Note that you need to use the log-Likelihood function for this.

So your problem reduces to minimizing $-\ln L = \sum_i w_i \ln f(x_i|q)$ (see the Wikipedia article for the original form).

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Just a suggestion as no other answers are sent.

You could use the normal EM with GMM (OpenCV for ex. has many wrappers for many languages) and put some points twice in the cluster you want to have "more weight". That way the EM would consider those points more important. You can remove the extra points later if it does matter.

Otherwise I think this goes quite extreme mathematics unless you have strong background in advanced statistics.

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This doesn't work when you either have a lot of points or intrinsically non-integer weights. As it happened to me to have both: a histogram of millions of points with non-integer weights... –  ansgri Nov 9 '11 at 21:26

I was looking for a similar solution related to gaussian kernel estimation (instead of a gaussian mixture) of the distribution.

The standard gaussian_kde does not allow that but I found a python implementation of a modified version here http://mail.scipy.org/pipermail/scipy-user/2013-May/034580.html

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