A CLT for Information-theoretic statistics of Non-centered Gram random matrices

Abstract

In this article, we study the fluctuations of the random variable: In() = 1N (n n* + IN), (>0) where n= n-1/2 Dn1/2 Xn Dn1/2 +An, as the dimensions of the matrices go to infinity at the same pace. Matrices Xn and An are respectively random and deterministic N× n matrices; matrices Dn and Dn are deterministic and diagonal, with respective dimensions N× N and n× n; matrix Xn=(Xij) has centered, independent and identically distributed entries with unit variance, either real or complex. We prove that when centered and properly rescaled, the random variable In() satisfies a Central Limit Theorem and has a Gaussian limit. The variance of In() depends on the moment Xij2 of the variables Xij and also on its fourth cumulant = |Xij|4 - 2 - | Xij2|2. The main motivation comes from the field of wireless communications, where In() represents the mutual information of a multiple antenna radio channel. This article closely follows the companion article "A CLT for Information-theoretic statistics of Gram random matrices with a given variance profile", Ann. Appl. Probab. (2008) by Hachem et al., however the study of the fluctuations associated to non-centered large random matrices raises specific issues, which are addressed here.