Dimension theory of Diophantine approximation related to β-transformations

Abstract

Let Tβ be the β-transformation on [0,1) defined by Tβ(x)=β x mod 1. We study the Diophantine approximation of the orbit of a point x under Tβ. Precisely, for given two positive functions 1,~2: N → R+, define L(1):=\x∈[0,1]:Tβn x<1(n), for infinitely many n∈N\, U(2):=\x∈ [0,1]:∀~N1,~∃~n∈[0,N],\ s.t.\ Tnβ x<2(N)\, where means large enough. We compute the Hausdorff dimension of the set L(1)(2). As a corollary, we estimate the Hausdorff dimension of the set U(2).