Quantitative results on the k-dimensional Duffin-Schaeffer conjecture

Abstract

For all k≥ 2, we provide almost-sharp quantitative results for the k-dimensional Duffin-Schaeffer conjecture, analogous to recent developments in the 1-D case of Koukoulopoulos-Maynard-Yang. In particular, for :N[0,1/2] such that Σq∈ N((q)(q)/q)k diverges, Q≥ 1 and α∈R, we denote by Sk(α, Q) the number of pairs (a,q)∈Zk× N with q≤ Q, (ai,q)=1 for each i∈\1,…,k\, satisfying \|qα-a\|∞<(q). Defining k(Q)=Σq≤ Q(2(q)(q)/q)k, we show that for all >0 and almost all α one has Sk(α,Q)=k(Q)+O,k((Q)1/2+).