On the rank of a random symmetric matrix in the large deviation regime

Abstract

Let A be an n× n random symmetric matrix with independent identically distributed subgaussian entries of unit variance. We prove the following large deviation inequality for the rank of A: for all 1≤ k≤ cn, P(Rank(A)≥ n-k)≥ 1-(-c'kn), for some fixed constants c,c'>0. A similar large deviation inequality is proven for the rank of the adjacency matrix of dense Erdos-Renyi graphs. This corank estimate enhances the recent breakthrough of Campos, Jensen, Michelen and Sahasrabudhe that the singularity probability of a random symmetric matrix is exponentially small, and echoes a large deviation inequality of Mark Rudelson for the rank of a random matrix with independent entries.