Singularity of random symmetric matrices revisited

Abstract

Let Mn be drawn uniformly from all 1 symmetric n × n matrices. We show that the probability that Mn is singular is at most (-c(n n)1/2), which represents a natural barrier in recent approaches to this problem. In addition to improving on the best-known previous bound of Campos, Mattos, Morris and Morrison of (-c n1/2) on the singularity probability, our method is different and considerably simpler.