No outliers in the spectrum of the product of independent non-Hermitian random matrices with independent entries

Abstract

We consider products of independent square random non-Hermitian matrices. More precisely, let n≥ 2 and let X1,…,Xn be independent N× N random matrices with independent centered entries with variance N-1. It was shown by G\"otze and Tikhomirov and by Soshnikov and O'Rourke that the limit of the empirical spectral distribution of the product X1·s Xn is supported in the unit disk. We prove that if the entries of the matrices X1,…,Xn satisfy uniform subexponential decay condition, then the spectral radius of X1·s Xn converges to 1 almost surely as N→ ∞.