LSD of sample covariances of superposition of matrices with separable covariance structure

Abstract

We study the asymptotic behavior of the spectra of matrices of the form Sn = 1nXX* where X =Σr=1K Xr, where Xr = Ar12ZrBr12, K ∈ N and Ar,Br are sequences of positive semi-definite matrices of dimensions p× p and n× n, respectively. We establish the existence of a limiting spectral distribution for Sn by assuming that matrices \Ar\r=1K are simultaneously diagonalizable and \Br\r=1K are simultaneously digaonalizable, and that the joint spectral distributions of \Ar\r=1K and \Br\r=1K converge to K-dimensional distributions, as p,n ∞ such that p/n c ∈ (0,∞). The LSD of Sn is characterized by system of equations with unique solutions within the class of Stieltjes transforms of measures on R+. These results generalize existing results on the LSD of sample covariances when the data matrices have a separable covariance structure.