The β-transformation with a hole at 0: the general case
Abstract
Given β>1, let Tβ be the β-transformation on the unit circle [0,1), defined by Tβ(x)=βx- βx. For each t∈[0,1) let Kβ(t) be the survivor set consisting of all x∈[0,1) whose orbit \Tnβ(x): n 0\ never hits the interval [0,t). Kalle et al.~[ Ergodic Theory Dynam. Systems 40 (2020), no.~9, 2482--2514] considered the case β∈(1,2]. They studied the set-valued bifurcation set Eβ:=\t∈[0,1): Kβ(t') Kβ(t)~∀ t'>t\ and proved that the Hausdorff dimension function tH Kβ(t) is a non-increasing Devil's staircase. In a previous paper [ Ergodic Theory Dynam. Systems 43 (2023), no.~6, 1785--1828] we determined, for all β∈(1,2], the critical value τ(β):=\t>0: ηβ(t)=0\. The purpose of the present article is to extend these results to all β>1. In addition to calculating τ(β), we show that (i) the function τ: βτ(β) is left continuous on (1,∞) with right-hand limits everywhere, but has countably infinitely many discontinuities; (ii) τ has no downward jumps; and (iii) there exists an open set O⊂(1,∞), whose complement (1,∞) O has zero Hausdorff dimension, such that τ is real-analytic, strictly convex and strictly decreasing on each connected component of O. We also prove several topological properties of the bifurcation set Eβ. The key to extending the results from β∈(1,2] to all β>1 is an appropriate generalization of the Farey words that are used to parametrize the connected components of the set O. Some of the original proofs from the above-mentioned papers are simplified.
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