Approximation properties of the intermediate β-expansions

Abstract

Given β>1 and α∈[0,1), let Tβ, α(x)=β x+α 1. Then under the map Tβ,α each x∈[0,1] has an intermediate β-expansion of the form x=Σi=1∞ci-αβi with each ci∈\0,1,…, β+α\. In this paper we study the approximation properties of Tβ,α by considering the expected value Mβ(α) of the normalized errors (θβ,αn(x))n≥ 1, where θβ,αn(x):=βn(x-Σi=1nci-αβi), n∈N. We prove that Mβ(·) is continuous on [0,1). As a result, Mβ:=\Mβ(α):α∈[0,1)\ is a closed interval. In particular, if β is a multinacci number, the map Tβ,α has matching for Lebesgue almost every α∈[0,1), and then Mβ(·) is locally linear almost everywhere on [0,1).