Universality for general Wigner-type matrices

Abstract

We consider the local eigenvalue distribution of large self-adjoint N× N random matrices H=H* with centered independent entries. In contrast to previous works the matrix of variances sij = E\, |hij|2 is not assumed to be stochastic. Hence the density of states is not the Wigner semicircle law. Its possible shapes are described in the companion paper [1]. We show that as N grows, the resolvent, G(z)=(H-z)-1, converges to a diagonal matrix, diag(m(z)) , where m(z)=(m1(z),…,mN(z)) solves the vector equation -1/mi(z) = z + Σj sij mj(z) that has been analyzed in [1]. We prove a local law down to the smallest spectral resolution scale, and bulk universality for both real symmetric and complex hermitian symmetry classes.