Gaussian Fluctuations of Eigenvalues in Wigner Random Matrices

Abstract

We study the fluctuations of eigenvalues from a class of Wigner random matrices that generalize the Gaussian orthogonal ensemble. We begin by considering an n × n matrix from the Gaussian orthogonal ensemble (GOE) or Gaussian symplectic ensemble (GSE) and let xk denote eigenvalue number k. Under the condition that both k and n-k tend to infinity with n, we show that xk is normally distributed in the limit. We also consider the joint limit distribution of m eigenvalues from the GOE or GSE with similar conditions on the indices. The result is an m-dimensional normal distribution. Using a recent universality result by Tao and Vu, we extend our results to a class of Wigner real symmetric matrices with non-Gaussian entries that have an exponentially decaying distribution and whose first four moments match the Gaussian moments.