The Asymptotic Infinitesimal Distribution of a Real Wishart Random Matrix
Abstract
Let XN be a N × N real Wishart random matrix with aspect ratio M/N. The limit eigenvalue distribution of XN is the Marchenko-Pastur law with parameter c = N M/N. The limit moments \mn\n are given by mn = Σπ c\#(π) where the sum runs over NC(n). Let mn' be the limit of N( E( tr(XNn)) - mn). These are the asymptotic infinitesimal moments of a real Wishart matrix. We show that m'n can be written as a sum over planar diagrams with two terms, Σπ c'(\#(π) -1) c\#(π)-1, and Σπ ∈ SNCδ(n,-n) c\#(π)/2, where SNCδ(n,-n) is a set of non-crossing annular permutations satisfying a symmetry condition. Moreover we present a recursion formula for the second term which is related to one for higher order freeness.
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