Singularity of random symmetric matrices -- a combinatorial approach to improved bounds

Abstract

Let Mn denote a random symmetric n × n matrix whose upper diagonal entries are independent and identically distributed Bernoulli random variables (which take values 1 and -1 with probability 1/2 each). It is widely conjectured that Mn is singular with probability at most (2+o(1))-n. On the other hand, the best known upper bound on the singularity probability of Mn, due to Vershynin (2011), is 2-nc, for some unspecified small constant c > 0. This improves on a polynomial singularity bound due to Costello, Tao, and Vu (2005), and a bound of Nguyen (2011) showing that the singularity probability decays faster than any polynomial. In this paper, improving on all previous results, we show that the probability of singularity of Mn is at most 2-n1/4n/1000 for all sufficiently large n. The proof utilizes and extends a novel combinatorial approach to discrete random matrix theory, which has been recently introduced by the authors together with Luh and Samotij.