Bulk universality for Wigner hermitian matrices with subexponential decay

Abstract

We consider the ensemble of n × n Wigner hermitian matrices H = (h k)1 ≤ ,k ≤ n that generalize the Gaussian unitary ensemble (GUE). The matrix elements hk = h k are given by h k = n-1/2 (x k + -1 y k), where x k, y k for 1 ≤ < k ≤ n are i.i.d. random variables with mean zero and variance 1/2, y=0 and x have mean zero and variance 1. We assume the distribution of x k, y k to have subexponential decay. In a recent paper, four of the authors recently established that the gap distribution and averaged k-point correlation of these matrices were universal (and in particular, agreed with those for GUE) assuming additional regularity hypotheses on the x k, y k. In another recent paper, the other two authors, using a different method, established the same conclusion assuming instead some moment and support conditions on the x k, y k. In this short note we observe that the arguments of these two papers can be combined to establish universality of the gap distribution and averaged k-point correlations for all Wigner matrices (with subexponentially decaying entries), with no extra assumptions.