On a Generalisation of the Marcenko-Pastur Problem
Abstract
We study the spectrum of generalized Wishart matrices, defined as F=( X Y + Y X)/2T, where X and Y are N × T matrices with zero mean, unit variance IID entries and such that E[Xit Yjt]=c δi,j. The limit c=1 corresponds to the Marcenko-Pastur problem. For a general c, we show that the Stietjes transform of F is the solution of a cubic equation. In the limit c=0, T N the density of eigenvalues converges to the Wigner semi-circle.
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