Local laws and spectral properties of deformed sparse random matrices

Abstract

We consider deformed sparse random matrices of the form H= W+ λ V, where W is a real symmetric sparse random matrix, V is a random or deterministic, real, diagonal matrix whose entries are independent of W, and λ = O(1) is a coupling constant. Under mild assumptions on the matrix entries of W and V, we prove local laws for H that compare the empirical spectral measure of it with a refined version of the deformed semicircle law. By applying the local laws, we also prove several spectral properties of H, including the rigidity of the eigenvalues and the asymptotic normality of the extremal eigenvalues.