An analogue of a theorem of Kurzweil
arXiv:1412.5992 · doi:10.1088/0951-7715/28/5/1401
Abstract
A theorem of Kurzweil ('55) on inhomogeneous Diophantine approximation states that if $θ$ is an irrational number, then the following are equivalent: (A) for every decreasing positive function $Ï$ such that $\sum_{q = 1}^\infty Ï(q) = \infty$, and for almost every $s\in\mathbb R$, there exist infinitely many $q\in\mathbb N$ such that $\|qθ- s\| < Ï(q)$, and (B) $θ$ is badly approximable. This theorem is not true if one adds to condition (A) the hypothesis that the function $q\mapsto qÏ(q)$ is decreasing. In this paper we find a condition on the continued fraction expansion of $θ$ which is equivalent to the modified version of condition (A). This expands on a recent paper of D. H. Kim ('14).