Deterministic equivalents for certain functionals of large random matrices

Abstract

Consider an N× n random matrix Yn=(Ynij) where the entries are given by Ynij=σij(n)nXnij, the Xnij being independent and identically distributed, centered with unit variance and satisfying some mild moment assumption. Consider now a deterministic N× n matrix An whose columns and rows are uniformly bounded in the Euclidean norm. Let n=Yn+An. We prove in this article that there exists a deterministic N× N matrix-valued function Tn(z) analytic in C-R+ such that, almost surely, \[n+∞,N/n c(1N Trace(nnT-zIN)-1-1N TraceTn(z))=0.\] Otherwise stated, there exists a deterministic equivalent to the empirical Stieltjes transform of the distribution of the eigenvalues of nnT. For each n, the entries of matrix Tn(z) are defined as the unique solutions of a certain system of nonlinear functional equations. It is also proved that 1N Trace Tn(z) is the Stieltjes transform of a probability measure πn(dλ), and that for every bounded continuous function f, the following convergence holds almost surely \[1NΣk=1Nf(λk)-∫0∞f(λ)π n(dλ) n∞0,\] where the (λk)1 k N are the eigenvalues of nnT. This work is motivated by the context of performance evaluation of multiple inputs/multiple output (MIMO) wireless digital communication channels. As an application, we derive a deterministic equivalent to the mutual information: \[Cn(σ2)=1NE (IN+nnTσ2),\] where σ2 is a known parameter.

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