Invertibility of adjacency matrices for random d-regular directed graphs

Abstract

Let d≥ 3 be a fixed integer, and a prime number p such that (p,d)=1. Let A be the adjacency matrix of a random d-regular directed graph on n vertices. We show that as a random matrix in Fp, equation P(A is singular in Fp)≤ 1+o(1)p-1, equation as n goes to infinity. As a consequence, as a random matrix in R, equation P(A is singular in R)=o(1) equation as n goes to infinity. This answers an open problem by Frieze [12] and Vu [29,30], for random d-regular bipartite graphs. The proof combines a local central limit theorem and a large deviation estimate.