A simple proof of almost sure convergence for the largest singular value of a product of Gaussian matrices

Abstract

Let m ≥ 1 and consider the product of m independent n × n matrices W = W1 … Wm, each Wi with i.i.d. normalised N(0, n-1/2) entries. It is shown in Penson et al. (2011) that the empirical distribution of the squared singular values of W converges to a deterministic distribution compactly supported on [0, um], where um = (m+1)m+1mm. This generalises the well-known case of m=1, corresponding to the Marchenko-Pastur distribution for square matrices. Moreover, for m=1, it was first shown by Geman (1980) that the largest squared singular value almost surely converges to the right endpoint (the so-called ``soft edge'') of the support, i.e. s12(W) a.s. u1. Herein, we present a proof for the general case s12(W) a.s. um for m≥ 1. Although we do not claim novelty for our result, the proof is simple and does not require familiarity with modern techniques of free probability.