Mesoscopic Central Limit Theorem for non-Hermitian Random Matrices

Abstract

We prove that the mesoscopic linear statistics Σi f(na(σi-z0)) of the eigenvalues \σi\i of large n× n non-Hermitian random matrices with complex centred i.i.d. entries are asymptotically Gaussian for any H20-functions f around any point z0 in the bulk of the spectrum on any mesoscopic scale 0<a<1/2. This extends our previous result [arXiv:1912.04100], that was valid on the macroscopic scale, a=0, to cover the entire mesoscopic regime. The main novelty is a local law for the product of resolvents for the Hermitization of X at spectral parameters z1, z2 with an improved error term in the entire mesoscopic regime |z1-z2| n-1/2. The proof is dynamical; it relies on a recursive tandem of the characteristic flow method and the Green function comparison idea combined with a separation of the unstable mode of the underlying stability operator.