A dichotomy law for the Diophantine properties in β-dynamical systems

Abstract

Let β>1 be a real number and define the β-transformation on [0,1] by Tβ:x β x 1. Further, define Wy(Tβ,):=\x∈ [0, 1]:|Tβnx-y|<(n) for infinitely many n\ and W(Tβ,):=\(x, y)∈ [0, 1]2:|Tβnx-y|<(n) for infinitely many n\, where :N>0 is a positive function such that (n) 0 as n ∞. In this paper, we show that each of the above sets obeys a Jarn\'ik-type dichotomy, that is, the generalised Hausdorff measure is either zero or full depending upon the convergence or divergence of a certain series. This work completes the metrical theory of these sets.