On Kurzweil's 0-1 Law in Inhomogeneous Diophantine Approximation
Abstract
We give a sufficient and necessary condition such that for almost all s∈ R \[ \|nθ-s\|<(n) infinitely many\ n∈ N, \] where θ is fixed and (n) is a positive, non-increasing sequence. This improves upon an old result of Kurzweil and contains several previous results as special cases: two theorems of Kurzweil, a theorem of Tseng and a recent result of the second author. Moreover, we also discuss an analogue of our result in the field of formal Laurent series which has similar consequences.
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