On the number of unique expansions in non-integer bases

Abstract

Let q > 1 be a real number and let m=m(q) be the largest integer smaller than q. It is well known that each number x ∈ Jq:=[0, Σi=1∞ m q-i] can be written as x=Σi=1∞ciq-i with integer coefficients 0 ci < q. If q is a non-integer, then almost every x ∈ Jq has continuum many expansions of this form. In this note we consider some properties of the set Uq consisting of numbers x ∈ Jq having a unique representation of this form. More specifically, we compare the size of the sets Uq and Ur for values q and r satisfying 1< q < r and m(q)=m(r).