Mesoscopic linear statistics of Wigner matrices

Abstract

We study linear spectral statistics of N × N Wigner random matrices H on mesoscopic scales. Under mild assumptions on the matrix entries of H, we prove that after centering and normalizing, the trace of the resolvent Tr(H-z)-1 converges to a stationary Gaussian process as N ∞ on scales N-1/3 Im(z) 1 and explicitly compute the covariance structure. The limit process is related to certain regularizations of fractional Brownian motion and logarithmically correlated fields appearing in FKS13. Finally, we extend our results to general mesoscopic linear statistics and prove that the limiting covariance is given by the H1/2-norm of the test functions.