Distribution of Linear Statistics of Singular Values of the Product of Random Matrices
Abstract
In this paper we consider the product of two independent random matrices X(1) and X(2). Assume that Xjk(q), 1 j,k n, q = 1, 2, are i.i.d. random variables with E Xjk(q) = 0, E (Xjk(q))2 = 1. Denote by s1, ..., sn the singular values of W: = 1n X(1) X(2). We prove the central limit theorem for linear statistics of the squared singular values s12, ..., sn2 showing that the limiting variance depends on 4: = E (X111)4 - 3.
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