Random orthonormal polynomials: local universality and expected number of real roots

Abstract

We consider random orthonormal polynomials Fn(x)=Σi=0nipi(x), where 0, …, n are independent random variables with zero mean, unit variance and uniformly bounded (2+) moments, and (pn)n=0∞ is the system of orthonormal polynomials with respect to a fixed compactly supported measure on the real line. Under mild technical assumptions satisfied by many classes of classical polynomial systems, we establish universality for the leading asymptotics of the average number of real roots of Fn, both globally and locally. Prior to this paper, these results were known only for random orthonormal polynomials with Gaussian coefficients lubinsky2016linear using the Kac-Rice formula, a method that does not extend to the generality of our paper.