Distribution of full cylinders and the Diophantine properties of the orbits in $\beta$-expansions

Yann Bugeaud; Bao-Wei Wang

doi:10.4171/jfg/6

JournalsjfgVol. 1, No. 2pp. 221–241

Distribution of full cylinders and the Diophantine properties of the orbits in $β$ -expansions

Yann Bugeaud
Université de Strasbourg, France
Bao-Wei Wang
Huazhong University of Science and Technology, Wuhan, China

$Distribution of full cylinders and the Diophantine properties of the orbits in $\beta$-expansions cover$

Download PDF

Abstract

Let $β > 1$ be a real number. Let $T_{β}$ denote the $β$ -transformation on $[0, 1)$ . A cylinder of order $n$ is a set of real numbers in $[0, 1)$ having the same first $n$ digits in their $β$ -expansion. A cylinder is called full if it has maximal length, i.e., if its length is equal to $β^{- n}$ . In this paper, we show that full cylinders are well distributed in $[0, 1)$ in a suitable sense. As an application to the metrical theory of $β$ -expansions, we determine the Hausdorff dimension of the set

{x \in [0, 1] : ∣ T_{β}^{n} x - z_{n} ∣ < e^{- S_{n} f (x)} for infinitely many n \in N},

where ${z_{n}}_{n \geq 1}$ is a sequence of real numbers in $[0, 1]$ , the function $f : [0, 1] \to R^{+}$ is continuous, and $S_{n} f (x)$ denotes the ergodic sum $f (x) + \dots + f (T_{β}^{n - 1} x)$ .

Cite this article

Yann Bugeaud, Bao-Wei Wang, Distribution of full cylinders and the Diophantine properties of the orbits in $β$ -expansions. J. Fractal Geom. 1 (2014), no. 2, pp. 221–241

DOI 10.4171/JFG/6