Spectral radii of sparse non-Hermitian random matrices

Abstract

We provide estimates for the spectral radii of an n× n sparse non-Hermitian random matrix Z with general entries in the regime p=d/n where 0<d<1 is fixed. Utilizing the structural results of (uczak, '90), we show that the spectral radius (Z) is 0 with probability converging to some nonzero value, and satisfies the inequality (φ (n))-1≤ (Z)≤ φ (n) in the asymptotic sense for any function φ satisfying n∞φ (n)=∞ with the remaining probability.

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