A CLT for Information-theoretic statistics of Gram random matrices with a given variance profile

Abstract

Consider a N× n random matrix Yn=(Yijn) where the entries are given by Yijn=σij(n)n Xijn the Xijn being centered, independent and identically distributed random variables with unit variance and (σij(n); 1 i N, 1 j n) being an array of numbers we shall refer to as a variance profile. We study in this article the fluctuations of the random variable (Yn Yn* + IN) where Y* is the Hermitian adjoint of Y and > 0 is an additional parameter. We prove that when centered and properly rescaled, this random variable satisfies a Central Limit Theorem (CLT) and has a Gaussian limit whose parameters are identified. A complete description of the scaling parameter is given; in particular it is shown that an additional term appears in this parameter in the case where the 4th moment of the Xij's differs from the 4th moment of a Gaussian random variable. Such a CLT is of interest in the field of wireless communications.