Universal covariance formula for linear statistics on random matrices

Abstract

We derive an analytical formula for the covariance Cov(A,B) of two smooth linear statistics A=Σi a(λi) and B=Σi b(λi) to leading order for N∞, where \λi\ are the N real eigenvalues of a general one-cut random-matrix model with Dyson index β. The formula, carrying the universal 1/β prefactor, depends on the random-matrix ensemble only through the edge points [λ-,λ+] of the limiting spectral density. For A=B, we recover in some special cases the classical variance formulas by Beenakker and Dyson-Mehta, clarifying the respective ranges of applicability. Some choices of a(x) and b(x) lead to a striking decorrelation of the corresponding linear statistics. We provide two applications - the joint statistics of conductance and shot noise in ideal chaotic cavities, and some new fluctuation relations for traces of powers of random matrices.