Codivergences and information matrices

Abstract

We propose a new concept of codivergence, which quantifies the similarity between two probability measures P1, P2 relative to a reference probability measure P0. In the neighborhood of the reference measure P0, a codivergence behaves like an inner product between the measures P1 - P0 and P2 - P0. Codivergences of covariance-type and correlation-type are introduced and studied with a focus on two specific correlation-type codivergences, the 2-codivergence and the Hellinger codivergence. We derive explicit expressions for several common parametric families of probability distributions. For a codivergence, we introduce moreover the divergence matrix as an analogue of the Gram matrix. It is shown that the 2-divergence matrix satisfies a data-processing inequality.