The smallest singular value of dense random regular digraphs

Abstract

Let A be the adjacency matrix of a uniformly random d-regular digraph on n vertices, and suppose that (d,n-d)≥λ n. We show that for any ≥ 0, \[P[sn(A)≤]≤ Cλn+2e-cλ n.\] Up to the constants Cλ, cλ > 0, our bound matches optimal bounds for n× n random matrices, each of whose entries is an i.i.d Ber(d/n) random variable. The special case = 0 of our result confirms a conjecture of Cook regarding the probability of singularity of dense random regular digraphs.