The β-transformation with a hole

Abstract

This paper extends those of Glendinning and Sidorov [3] and of Hare and Sidorov [6] from the case of the doubling map to the more general β-transformation. Let β ∈ (1,2) and consider the β-transformation Tβ(x)=β x 1. Let Jβ (a,b) := \ x ∈ (0,1) : Tβn(x) (a,b) for all n ≥ 0 \. An integer n is bad for (a,b) if every n-cycle for Tβ intersects (a,b). Denote the set of all bad n for (a,b) by Bβ(a,b). In this paper we completely describe the following sets: \[ D0(β) = \ (a,b) ∈ [0,1)2 : Jβ(a,b) ≠ \, \] \[ D1(β) = \ (a,b) ∈ [0,1)2 : Jβ(a,b) is uncountable \, \] \[ D2(β) = \ (a,b) ∈ [0,1)2 : Bβ(a,b) is finite \. \]