Solution of Matrix Dyson Equation for Random Matrices with Fast Correlation Decay

Abstract

We consider the solution of Matrix Dyson Equation -M(z)-1 = z + S(M(z)), where entries of the linear operator S: CN× N → CN× N decay exponentially. We show that M(z) also has exponential off-diagonal decay and can be represented as Laurent series with coefficients determined by entries of S. We also prove that for Hermitian random matrices with exponential correlation decay empirical density converges to the deterministic density obtained from M(z). These results have already been proved in [arXiv:1604.08188] with the resolvent method, here we give an alternate proof via the conceptually much simpler moment method.