Bases in which some numbers have exactly two expansions

Abstract

In this paper we answer several questions raised by Sidorov on the set B2 of bases in which there exist numbers with exactly two expansions. In particular, we prove that the set B2 is closed, and it contains both infinitely many isolated and accumulation points in (1, qKL), where qKL≈ 1.78723 is the Komornik-Loreti constant. Consequently we show that the second smallest element of B2 is the smallest accumulation point of B2. We also investigate the higher order derived sets of B2. Finally, we prove that there exists a δ>0 such that equation* H( B2(qKL, qKL+δ))<1, equation* where H denotes the Hausdorff dimension.