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I want to cluster my data with KL-divergence as my metric.

In K-means:

  1. Choose the number of clusters.

  2. Initialize each cluster's mean at random.

  3. Assign each data point to a cluster c with minimal distance value.

  4. Update each cluster's mean to that of the data points assigned to it.

In the Euclidean case it's easy to update the mean, just by averaging each vector.

However, if I'd like to use KL-divergence as my metric, how do I update my mean?

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I kept getting down-voted, probably because people didn't want to put time into reading the literature, but you can cluster with vanilla KL-divergence: jmlr.csail.mit.edu/papers/volume6/banerjee05b/banerjee05b.pdf –  dave Apr 16 '13 at 23:44

2 Answers 2

up vote 2 down vote accepted

Clustering with KL-divergence may not be the best idea, because KLD is missing an important property of metrics: symmetry. Obtained clusters could then be quite hard to interpret. If you want to go ahead with KLD, you could use as distance the average of KLD's i.e.

d(x,y) = KLD(x,y)/2 + KLD(y,x)/2

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Thank you. but my question is how I could update the mean? What you are saying I guess is how to assign data to cluster. –  Jing Feb 2 '13 at 10:52
@Jing : I guess it depends on your problem. If an average vector does not make sense, then go for the "best" point m in the cluster C, i.e. for which the sum over x in C of d(m,x) is smallest. If an average does make sense, then you need to solve for any m (also outside of your points) which minimizes the above sum. –  mitchus Feb 2 '13 at 12:07
Yeah! I think so. thanks Since I guess for KLD, naively averaging vectors will not minimize that objective and so K-means will not converge. –  Jing Feb 2 '13 at 12:11

K-means is intended to work with Euclidean distance: if you want to use non-Euclidean similarities in clustering, you should use a different method. The most principled way to cluster with an arbitrary similarity metric is spectral clustering, and K-means can be derived as a variant of this where the similarities are the Euclidean distances.

And as mitchus says, KL divergence is not a metric. You want the Jenson Shannon divergence for symmetry.

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