Anti-concentration of random variables from zero-free regions

Abstract

This paper provides a connection between the concentration of a random variable and the distribution of the roots of its probability generating function. Let X be a random variable taking values in \0,…,n\ with P(X = 0)P(X = n) > 0 and with probability generating function fX. We show that if all of the zeros ζ of fX satisfy |(ζ)| ≥ δ and R-1 ≤ |ζ| ≤ R then \[ Var(X) ≥ c R-2π/δn, \] where c > 0 is a absolute constant. We show that this result is sharp, up to the factor 2 in the exponent of R. As a consequence, we are able to deduce a Littlewood--Offord type theorem for random variables that are not necessarily sums of i.i.d.\ random variables.