The random matrix regime of Maronna's M-estimator for observations corrupted by elliptical noises

Abstract

This article studies the behavior of the Maronna robust scatter estimator CN∈ CN× N of a sequence of observations y1,...,yn which is composed of a K dimensional signal drown in a heavy tailed noise, i.e yi=AN si+xi where AN ∈ CN× K and xi is drawn from elliptical distribution. In particular, we prove that as the population dimension N, the number of observations n and the rank of AN grow to infinity at the same pace and under some mild assumptions, the robust scatter matrix can be characterized by a random matrix SN that follows a standard random model. Our analysis can be very useful for many applications of the fields of statistical inference and signal processing.