The shape of a Gaussian mixture is characterized by the probability density of the distance between two samples

Abstract

Let x be a random variable with density (x) taking values in Rd. We are interested in finding a representation for the shape of (x), i.e. for the orbit \ (g· x) | g∈ E(d) \ of under the Euclidean group. Let x1 and x2 be two random samples picked, independently, following (x), and let be the squared Euclidean distance between x1 and x2. We show, if (x) is a mixture of Gaussians whose covariance matrix is the identity, and if the means of the Gaussians are in generic position, then the density (x) is reconstructible, up to a rigid motion in E(d), from the density of . In other words, any two such Gaussian mixtures (x) and (x) with the same distribution of distances are guaranteed to be related by a rigid motion g∈ E(d) as (x)= (g· x). We also show that a similar result holds when the distance is defined by a symmetric bilinear form.