Growth rate for beta-expansions

Abstract

Let β>1 and let m> be an integer. Each x∈ I:=[0,m-1β-1] can be represented in the form \[ x=Σk=1∞ εkβ-k, \] where εk∈\0,1,...,m-1\ for all k (a β-expansion of x). It is known that a.e. x∈ Iβ has a continuum of distinct β-expansions. In this paper we prove that if β is a Pisot number, then for a.e. x this continuum has one and the same growth rate. We also link this rate to the Lebesgue-generic local dimension for the Bernoulli convolution parametrized by β. When β<1+52, we show that the set of β-expansions grows exponentially for every internal x.