On a Z-module connected to approximation theory

Abstract

This paper deals with the set of α∈R such that α ζn 1 tends to 0 for a fixed ζ∈R, which we call Mζ. Predominately the case of Pisot numbers ζ is studied. In this case the inclusions OQ(ζ)⊂Mζ⊂Q(ζ) are known. We will show the properties of Mζ are connected to the module structure of the ring of integers OQ(ζ). We will describe the module structure of Mζ and how much Mζ differs from OQ(ζ). The results besides allow to give some information on the shape of integral bases of real number fields.