On the Limiting Empirical Measure of the sum of rank one matrices with log-concave distribution

Abstract

We consider n× n real symmetric and hermitian random matrices Hn,m equals the sum of a non-random matrix Hn(0) matrix and the sum of m rank-one matrices determined by m i.i.d. isotropic random vectors with log-concave probability law and i.i.d. random amplitudes \τα \α =1m. This is a generalization of the case of vectors uniformly distributed over the unit sphere, studied in [Marchenko-Pastur (1967)]. We prove that if n ∞, m ∞, m/n c∈ 0,∞) and that the empirical eigenvalue measure of Hn(0) converges weakly, then the empirical eigenvalue measure of Hn,m converges in probability to a non-random limit, found in [Marchenko-Pastur (1967)].