Entropy plateaus, transitivity and bifurcation sets for the β-transformation with a hole at 0

Abstract

Given β>1, 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 enters the interval [0,t). Letting Eβ denote the bifurcation set of the set-valued map t Kβ(t), Kalle et al. [Ergodic Theory Dynam. Systems, 40 (9): 2482--2514, 2020] conjectured that \[ H(Eβ[t,1])=H Kβ(t) ∀\,t∈(0,1). \] The main purpose of this article is to prove this conjecture. We do so by investigating dynamical properties of the symbolic equivalent of the survivor set Kβ(t), in particular its entropy and topological transitivity. In addition, we compare Eβ with the bifurcation set Bβ of the map t H Kβ(t) (which is a decreasing devil's staircase by a theorem of Kalle et al.), and show that, for Lebesgue-almost every β>1, the difference EβBβ has positive Hausdorff dimension, but for every k∈\0,1,2,…\\0\, there are infinitely many values of β such that the cardinality of EβBβ is exactly k. For a countable but dense subset of β's, we also determine the intervals of constancy of the function t H Kβ(t). Some connections with other topics in dynamics, such as kneading invariants of Lorenz maps and the doubling map with an arbitrary hole, are also discussed.