The Random Matrix Regime of Maronna's M-estimator with elliptically distributed samples

Abstract

This article demonstrates that the robust scatter matrix estimator CN∈ CN× N of a multivariate elliptical population x1,…,xn∈ CN originally proposed by Maronna in 1976, and defined as the solution (when existent) of an implicit equation, behaves similar to a well-known random matrix model in the limiting regime where the population N and sample n sizes grow at the same speed. We show precisely that CN∈ CN× N is defined for all n large with probability one and that, under some light hypotheses, CN-SN 0 almost surely in spectral norm, where SN follows a classical random matrix model. As a corollary, the limiting eigenvalue distribution of CN is derived. This analysis finds applications in the fields of statistical inference and signal processing.