On pseudospectrum of inhomogeneous non-Hermitian random matrices

Abstract

Let A be an n× n matrix with mutually independent centered Gaussian entries. Define align* σ*:=i,j≤ n E\,|Ai,j|2, σ:=(j≤ n E\,\| colj(A)\|22, i≤ n E\,\| rowi(A)\|22). align* Assume that σ≥ n\,σ* for a constant >0, and that a complex number z satisfies |z|=(σ). We prove that s(A-z\, Id) ≥ |z|\,(-no(1)\,(n\,σ*σ)2) with probability 1-o(1). Without extra assumptions on A, the bound is optimal up to the no(1) multiple in the power of exponent. We discuss applications of this estimate in context of empirical spectral distributions of inhomogeneous non-Hermitian random matrices.