Universality for Weakly Non-Hermitian Matrices: Bulk Limit

Abstract

We consider complex, weakly non-Hermitian matrices A = W1 +iτNW2 , where W1 and W2 are Hermitian matrices and τN = O(N-1). We first show that for pairs of Hermitian matrices (W1 , W2) such that W1 satisfies a multi-resolvent local law and W2 is bounded in norm, the bulk correlation functions of the weakly non-Hermitian Gauss-divisible matrix A + tB converge pointwise to a universal limit for t = O(N-1+ε). Using this and the reverse heat flow we deduce bulk universality in the case when W1 and W2 are independent Wigner matrices with sufficiently smooth density.

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