Factorization Statistics of Restricted Polynomial Specializations over Large Finite Fields

Abstract

For a polynomial F(t,A1,…,An)∈Fp[t,A1,…,An] (p being a prime number) we study the factorization statistics of its specializations F(t,a1,…,an)∈Fp[t] with (a1,…,an)∈ S, where S⊂Fpn is a subset, in the limit p∞ and deg F fixed. We show that for a sufficiently large and regular subset S⊂Fpn, e.g. a product of n intervals of length H1,…,Hn with Πi=1nHn>pn-1/2+ε, the factorization statistics is the same as for unrestricted specializations (i.e. S=Fpn) up to a small error. This is a generalization of the well-known P\'olya-Vinogradov estimate of the number of quadratic residues modulo p in an interval.