The Duffin-Schaeffer conjecture with extra divergence

Abstract

The Duffin-Schaeffer conjecture is a fundamental unsolved problem in metric number theory. It asserts that for every non-negative function :~N → R for almost all reals x there are infinitely many coprime solutions (a,n) to the inequality |nx - a| < (n), provided that the series Σn=1∞ (n) (n) /n is divergent. In the present paper we prove that the conjecture is true under the "extra divergence" assumption that divergence of the series still holds when (n) is replaced by (n) / ( n) for some > 0. This improves a result of Beresnevich, Harman, Haynes and Velani, and solves a problem posed by Haynes, Pollington and Velani.