Distribution of singular values of random band matrices; Marchenko-Pastur law and more
Abstract
We consider the limiting spectral distribution of matrices of the form 12bn+1 (R + X)(R + X)*, where X is an n× n band matrix of bandwidth bn and R is a non random band matrix of bandwidth bn. We show that the Stieltjes transform of ESD of such matrices converges to the Stieltjes transform of a non-random measure. And the limiting Stieltjes transform satisfies an integral equation. For R=0, the integral equation yields the Stieltjes transform of the Marchenko-Pastur law.
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