Asymptotic Independence in the Spectrum of the Gaussian Unitary Ensemble

Abstract

Consider a n × n matrix from the Gaussian Unitary Ensemble (GUE). Given a finite collection of bounded disjoint real Borel sets (i,n,\ 1≤ i≤ p), properly rescaled, and eventually included in any neighbourhood of the support of Wigner's semi-circle law, we prove that the related counting measures ( Nn(i,n), 1≤ i≤ p), where Nn() represents the number of eigenvalues within , are asymptotically independent as the size n goes to infinity, p being fixed. As a consequence, we prove that the largest and smallest eigenvalues, properly centered and rescaled, are asymptotically independent; we finally describe the fluctuations of the condition number of a matrix from the GUE.