On the First Non-Universal Term in Random Polynomial Real Zeros

Abstract

Let Pn(x) = Σk=0n k xk be a Kac random polynomial, where the coefficients k are i.i.d.\ copies of a given random variable . Based on numerical experiments, it has been conjectured that if has mean zero, unit variance, and a finite (2+0)-moment for some 0>0, then \[ E[NR(Pn)] \;=\; 2π n + C + on(1), \] where NR(Pn) denotes the number of real roots of Pn, and C is an absolute constant depending only on , which is nonuniversal. Prior to this work, the existence of C had only been established by Do-Nguyen-Vu (2015, Proc.\ Lond.\ Math.\ Soc.) under the additional assumption that either admits a (1+p)-integrable density or is uniformly distributed on \ 1, 2, …, N\. In this paper, using a different method, we remove these extra conditions on , and extend the result to the setting where the k are independent but not necessarily identically distributed. Moreover, this proof strategy provides an alternative description of the constant C, and this new perspective serves as the key ingredient in establishing that C depends continuously on the distribution of .