Joint convergence of sample cross-covariance matrices

Abstract

Suppose X and Y are p× n matrices each with mean 0, variance 1 and where all moments of any order are uniformly bounded as p,n ∞. Moreover, the entries (Xij, Yij) are independent across i,j with a common correlation . Let C=n-1XY* be the sample cross-covariance matrix. We show that if n, p ∞, p/n y≠ 0, then C converges in the algebraic sense and the limit moments depend only on . Independent copies of such matrices with same p but different n, say \nl\, different correlations \l\, and different non-zero y's, say \yl\ also converge jointly and are asymptotically free. When y=0, the matrix np-1(C- Ip) converges to an elliptic variable with parameter 2. In particular, this elliptic variable is circular when =0 and is semi-circular when =1. If we take independent Cl, then the matrices \nlp-1(Cl-l Ip)\ converge jointly and are also asymptotically free. As a consequence, the limiting spectral distribution of any symmetric matrix polynomial exists and has compact support.