Marchenko-Pastur Law for Tyler's M-estimator

Abstract

This paper studies the limiting behavior of Tyler's M-estimator for the scatter matrix, in the regime that the number of samples n and their dimension p both go to infinity, and p/n converges to a constant y with 0<y<1. We prove that when the data samples x1, …, xn are identically and independently generated from the Gaussian distribution N(0, I), the operator norm of the difference between a properly scaled Tyler's M-estimator and Σi=1n xi xi/n tends to zero. As a result, the spectral distribution of Tyler's M-estimator converges weakly to the Marcenko-Pastur distribution.