Distribution of eigenvalues of sample covariance matrices with tensor product samples

Abstract

We consider n2× n2 real symmetric and hermitian matrices Mn, which are equal to sum of mn tensor products of vectors Xμ=B(Yμ Yμ), μ=1,…,mn, where Yμ are i.i.d. random vectors from Rn ( Cn) with zero mean and unit variance of components, and B is an n2× n2 positive definite non-random matrix. We prove that if mn/n2 c∈ [0,+∞) and the Normalized Counting Measure of eigenvalues of BJB, where J is defined below, converges weakly, then the Normalized Counting Measure of eigenvalues of Mn converges weakly in probability to a non-random limit and its Stieltjes transform can be found from a certain functional equation.