On the singularity of adjacency matrices for random regular digraphs

Abstract

We prove that the (non-symmetric) adjacency matrix of a uniform random d-regular directed graph on n vertices is asymptotically almost surely invertible, assuming (d,n-d) C2n for a sufficiently large constant C>0. The proof makes use of a coupling of random regular digraphs formed by "shuffling" the neighborhood of a pair of vertices, as well as concentration results for the distribution of edges recently obtained by the author (arXiv:1410.5595). We also apply our general approach to prove a.a.s.\ invertibility of Hadamard products , where is a matrix of iid uniform 1 signs, and is a 0/1 matrix whose associated digraph satisfies certain "expansion" properties.