p-adic root separation and the discriminant of integer polynomials

Abstract

In this paper we investigate the following related problems: (A) the separation of p-adic roots of integer polynomials of fixed degree and bounded height; and (B) counting integer polynomials of a fixed degree and bounded height with discriminant divisible by a (large) power of a fixed prime. One of the consequences of our findings is the existence, for all large Q>1, of Q2/n integer irreducible polynomials P of degree n and height Q with an almost prime power discriminant of maximal size, that is |D(P)| Q2n-2 and D(P)=pkCP with CP∈Z satisfying |CP|1. Our method generalises techniques developed for the real case and relies on a quantitative non-divergence estimate developed by Kleinbock and Tomanov.