On the least singular value of random symmetric matrices

Abstract

Let Fn be an n by n symmetric matrix whose entries are bounded by nγ for some γ>0. Consider a randomly perturbed matrix Mn=Fn+Xn, where Xn is a random symmetric matrix whose upper diagonal entries xij are iid copies of a random variable . Under a very general assumption on , we show that for any B>0 there exists A>0 such that P(σn(Mn) n-A) n-B. The proof uses an inverse-type result concerning concentration of quadratic forms, which is of interest of its own.