On smooth square-free numbers in arithmetic progressions

Abstract

A. Booker and C. Pomerance (2017) have shown that any residue class modulo a prime p 11 can be represented by a positive p-smooth square-free integer s = pO( p) with all prime factors up to p and conjectured that in fact one can find such s with s = pO(1). Using bounds on double Kloosterman sums due to M. Z. Garaev (2010) we prove this conjecture in a stronger form s p3/2 + o(1) and also consider more general versions of this question replacing p-smoothness of s by the stronger condition of pα-smoothness. Using bounds on multiplicative character sums and a sieve method, we also show that we can represent all residue classes by a positive square-free integer s p2+o(1) which is p1/(4e /2)+o(1)-smooth. Additionally, we obtain stronger results for almost all primes p.