Large deviations of the empirical spectral measure of supercritical sparse Wigner matrices

Abstract

Let be the adjacency matrix of an Erdos-R\'enyi graph on n vertices and with parameter p and consider A a n× n centered random symmetric matrix with bounded i.i.d. entries above the diagonal. When the mean degree np diverges, the empirical spectral measure of the normalized Hadamard product (A )/np converges weakly in probability to the semicircle law. In the regime where p 1 and np n, we prove a large deviations principle for the empirical spectral measure with speed n2p and with a good rate function solution of a certain variational problem. The rate function reveals in particular that the only possible deviations at the exponential scale n2p are around measures coming from Quadratic Vector Equations. As a byproduct, we obtain a large deviations principle for the empirical spectral measure of supercritical Erdos-R\'enyi graphs.