A Semicircle Law for Derivatives of Random Polynomials

Abstract

Let x1, …, xn be n independent and identically distributed random variables with mean zero, unit variance, and finite moments of all remaining orders. We study the random polynomial pn having roots at x1, …, xn. We prove that for ∈ N fixed as n → ∞, the (n-)-th derivative of pn behaves like a Hermite polynomial: for x in a compact interval,n/2 !n! · pn(n-)( xn) → He(x + γn), where He is the -th probabilists' Hermite polynomial and γn is a random variable converging to the standard N(0,1) Gaussian as n → ∞. Thus, there is a universality phenomenon when differentiating a random polynomial many times: the remaining roots follow a Wigner semicircle distribution.