From some Pisot numerations to topological groups

Abstract

A Pisot numeration system U for N is a sequence of natural numbers generated by an integral homogeneous linear recurrence whose characteristic polynomial is the minimal polynomial of a Pisot number. The purpose of this paper is to introduce the analogue of the group of p-adic integers for such numerations when they preserve zeros, which is equivalent to the `Condition F' introduced by Frougny and Solomyak for β-numerations. We show that these topological groups ZU project homomorphically onto a torus. Equipping ZU with the appropriate topology, we also show that if U is unimodular, then ZU is continuously isomorphic to a torus.