Real roots of random polynomials: expectation and repulsion

Abstract

Let Pn(x)= Σi=0n i xi be a Kac random polynomial where the coefficients i are iid copies of a given random variable . Our main result is an optimal quantitative bound concerning real roots repulsion. This leads to an optimal bound on the probability that there is a double root. As an application, we consider the problem of estimating the number of real roots of Pn, which has a long history and in particular was the main subject of a celebrated series of papers by Littlewood and Offord from the 1940s. We show, for a large and natural family of atom variables , that the expected number of real roots of Pn(x) is exactly 2π n +C +o(1), where C is an absolute constant depending on the atom variable . Prior to this paper, such a result was known only for the case when is Gaussian.