On universality of local edge regime for the deformed Gaussian Unitary Ensemble
Abstract
We consider the deformed Gaussian ensemble Hn=Hn(0)+Mn in which Hn(0) is a hermitian matrix (possibly random) and Mn is the Gaussian unitary random matrix (GUE) independent of Hn(0). Assuming that the Normalized Counting Measure of Hn(0) converges weakly (in probability if random) to a non-random measure N(0) with a bounded support and assuming some conditions on the convergence rate, we prove universality of the local eigenvalue statistics near the edge of the limiting spectrum of Hn.
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