Adjacency matrices of random digraphs: singularity and anti-concentration

Abstract

Let Dn,d be the set of all d-regular directed graphs on n vertices. Let G be a graph chosen uniformly at random from Dn,d and M be its adjacency matrix. We show that M is invertible with probability at least 1-C3 d/d for C≤ d≤ cn/2 n, where c, C are positive absolute constants. To this end, we establish a few properties of d-regular directed graphs. One of them, a Littlewood-Offord type anti-concentration property, is of independent interest. Let J be a subset of vertices of G with |J|≈ n/d. Let δi be the indicator of the event that the vertex i is connected to J and define δ = (δ1, δ2, ..., δn)∈ \0, 1\n. Then for every v∈\0,1\n the probability that δ=v is exponentially small. This property holds even if a part of the graph is "frozen".