Periodic unique beta-expansions: the Sharkovskii ordering

Abstract

Let β∈(1,2). Each x∈[0,1β-1] can be represented in the form \[ x=Σk=1∞ εkβ-k, \] where εk∈\0,1\ for all k (a β-expansion of x). If β>1+52, then, as is well known, there always exist x∈(0,1β-1) which have a unique -expansion. In the present paper we study (purely) periodic unique β-expansions and show that for each n2 there exists βn∈[1+52,2) such that there are no unique periodic β-expansions of smallest period n for ββn and at least one such expansion for β>βn. Furthermore, we prove that βk<βm if and only if k is less than m in the sense of the Sharkovski ordering. We give two proofs of this result, one of which is independent, and the other one links it to the dynamics of a family of trapezoidal maps.