Multidimensional two-component Gaussian mixtures detection

Abstract

Let (X\1,…,X\n) be a d-dimensional i.i.d sample from a distribution with density f. The problem of detection of a two-component mixture is considered. Our aim is to decide whether f is the density of a standard Gaussian random d-vector (f=φ\d) against f is a two-component mixture: f=(1-)φ\d + φ\d (.-μ) where (,μ) are unknown parameters. Optimal separation conditions on , μ, n and the dimension d are established, allowing to separate both hypotheses with prescribed errors. Several testing procedures are proposed and two alternative subsets are considered.