A Short Note on the Jensen-Shannon Divergence between Simple Mixture Distributions

Abstract

This short note presents results about the symmetric Jensen-Shannon divergence between two discrete mixture distributions p1 and p2. Specifically, for i=1,2, pi is the mixture of a common distribution q and a distribution pi with mixture proportion λi. In general, p1≠ p2 and λ1≠λ2. We provide experimental and theoretical insight to the behavior of the symmetric Jensen-Shannon divergence between p1 and p2 as the mixture proportions or the divergence between p1 and p2 change. We also provide insight into scenarios where the supports of the distributions p1, p2, and q do not coincide.