Mesoscopic linear statistics of Wigner matrices of mixed symmetry class

Abstract

We prove a central limit theorem for the mesoscopic linear statistics of N× N Wigner matrices H satisfying E|Hij|2=1/N and E Hij2= σ /N, where σ ∈ [-1,1]. We show that on all mesoscopic scales η (1/N η 1), the linear statistics of H have a sharp transition at 1-σ η. As an application, we identify the mesoscopic linear statistics of Dyson's Brownian motion Ht started from a real symmetric Wigner matrix H0 at any nonnegative time t ∈ [0,∞]. In particular, we obtain the transition from the central limit theorem for GOE to the one for GUE at time t η.