Metric results for numbers with multiple q-expansions

Abstract

Let M be a positive integer and q∈ (1, M+1]. A q-expansion of a real number x is a sequence (ci)=c1c2·s with ci∈ \0,1,…, M\ such that x=Σi=1∞ciq-i. In this paper we study the set Uqj consisting of those real numbers having exactly j q-expansions. Our main result is that for Lebesgue almost every q∈ (qKL, M+1), we have HUqj≤ \0, 2HUq-1\ for all j∈\2,3,…\. Here qKL is the Komornik-Loreti constant. As a corollary of this result, we show that for any j∈\2,3,…\, the function mapping q to HUqj is not continuous.