LSD of the Commutator of two data Matrices

Abstract

We study the spectral properties of a class of random matrices of the form Sn- = n-1(X1 X2* - X2 X1*) where Xk = k1/2Zk, Zk's are independent p× n complex-valued random matrices, and k are p× p positive semi-definite matrices that commute and are independent of the Zk's for k=1,2. We assume that Zk's have independent entries with zero mean and unit variance. The skew-symmetric/skew-Hermitian matrix Sn- will be referred to as a random commutator matrix associated with the samples X1 and X2. We show that, when the dimension p and sample size n increase simultaneously, so that p/n c ∈ (0,∞), there exists a limiting spectral distribution (LSD) for Sn-, supported on the imaginary axis, under the assumptions that the joint spectral distribution of 1, 2 converges weakly and the entries of Zk's have moments of sufficiently high order. This nonrandom LSD can be described through its Stieltjes transform, which satisfies a system of Marcenko-Pastur-type functional equations. Moreover, we show that the companion matrix Sn+ = n-1(X1X2* + X2X1*), under identical assumptions, has an LSD supported on the real line, which can be similarly characterized.

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