Universality theorems for zeros of random real polynomials with fixed coefficients

Abstract

Consider a monic polynomial of degree n whose subleading coefficients are independent, identically distributed, nondegenerate random variables having zero mean, unit variance, and finite moments of all orders, and let m ≥ 0 be a fixed integer. We prove that such a random monic polynomial has exactly m real zeros with probability n-3/4+o(1) as n ∞ through integers of the same parity as m. More generally, we determine conditions under which a similar asymptotic formula describes the corresponding probability for families of random real polynomials with multiple fixed coefficients. Our work extends well-known universality results of Dembo, Poonen, Shao, and Zeitouni, who considered the family of real polynomials with all coefficients random. As a number-theoretic consequence of these results, we deduce that an algebraic integer α of degree n has exactly m real Galois conjugates with probability n-3/4+o(1), when such α are ordered by the heights of their minimal polynomials.