The local circular law II: the edge case

Abstract

In the first part of this article, we proved a local version of the circular law up to the finest scale N-1/2+ for non-Hermitian random matrices at any point z ∈ with ||z| - 1| > c for any c>0 independent of the size of the matrix. Under the main assumption that the first three moments of the matrix elements match those of a standard Gaussian random variable after proper rescaling, we extend this result to include the edge case |z|-1=(1). Without the vanishing third moment assumption, we prove that the circular law is valid near the spectral edge |z|-1=(1) up to scale N-1/4+ .