Analysis of the limiting spectral measure of large random matrices of the separable covariance type

Abstract

Consider the random matrix = D1/2 X D1/2 where D and D are deterministic Hermitian nonnegative matrices with respective dimensions N × N and n × n, and where X is a random matrix with independent and identically distributed centered elements with variance 1/n. Assume that the dimensions N and n grow to infinity at the same pace, and that the spectral measures of D and D converge as N,n ∞ towards two probability measures. Then it is known that the spectral measure of * converges towards a probability measure μ characterized by its Stieltjes Transform. In this paper, it is shown that μ has a density away from zero, this density is analytical wherever it is positive, and it behaves in most cases as |x - a| near an edge a of its support. A complete characterization of the support of μ is also provided. \\ Beside its mathematical interest, this analysis finds applications in a certain class of statistical estimation problems.