A note on the Duffin-Schaeffer conjecture with slow divergence

Abstract

For a non-negative function : ~ , let W() denote the set of real numbers x for which the inequality |n x - a| < (n) has infinitely many coprime solutions (a,n). The Duffin--Schaeffer conjecture, one of the most important unsolved problems in metric number theory, asserts that W() has full measure provided equation dsccond Σn=1∞ (n) (n)n = ∞. equation Recently Beresnevich, Harman, Haynes and Velani proved that W() has full measure under the extra divergence condition Σn=1∞ (n) (n)n (c ( n) ( n)) = ∞ for some c>0. In the present note we establish a slow divergence counterpart of their result: W() has full measure, provideddsccond holds and additionally there exists some c>0 such that Σn=22h+122h+1 (n) (n)n ≤ ch for all h ≥ 1.