Critical values for the β-transformation with a hole at 0

Abstract

Given β∈(1,2], let Tβ be the β-transformation on the unit circle [0,1) such that Tβ(x)=β x 1. 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 open interval (0,t). Kalle et al. proved in [Ergodic Theory Dynam. Systems, 40 (9): 2482--2514, 2020] that the Hausdorff dimension function tH Kβ(t) is a non-increasing Devil's staircase. So there exists a critical value τ(β) such that H Kβ(t)>0 if and only if t<τ(β). In this paper we determine the critical value τ(β) for all β∈(1,2], answering a question of Kalle et al. (2020). For example, we find that for the Komornik-Loreti constant β≈ 1.78723 we have τ(β)=(2-β)/(β-1). Furthermore, we show that (i) the function τ: βτ(β) is left continuous on (1,2] with right-hand limits everywhere, but has countably infinitely many discontinuities; (ii) τ has no downward jumps, with τ(1+)=0 and τ(2)=1/2; and (iii) there exists an open set O⊂(1,2], whose complement (1,2] O has zero Hausdorff dimension, such that τ is real-analytic, convex and strictly decreasing on each connected component of O. Our strategy to find the critical value τ(β) depends on certain substitutions of Farey words and a renormalization scheme from dynamical systems.