Exponential anticoncentration of the permanent

Abstract

Let A∈Rn× n be a random matrix with independent entries, and suppose that the entries are "uniformly anticoncentrated" in the sense that there is a constant >0 such that each entry aij satisfies z[aij=z]1- (for example, A could be a uniformly random n× n matrix with 1 entries). Significantly improving previous bounds of Tao and Vu, we prove that the permanent of A is exponentially anticoncentrated: there is c>0 such that z[per(A)=z](-cn). Our proof also works for the determinant, giving an alternative proof of a classical theorem of Kahn, Koml\'os and Szemer\'edi. As a consequence, we see that there are at least exponentially many different permanents of n× n matrices with 1 entries, resolving a problem of Ingram and Razborov.