Expansions in non-integer bases: lower order revisited

Abstract

Let q∈(1,2) and x∈[0,1q-1]. We say that a sequence (i)i=1∞∈\0,1\N is an expansion of x in base q (or a q-expansion) if \[ x=Σi=1∞iq-i. \] For any k∈ N, let Bk denote the set of q such that there exists x with exactly k expansions in base q. In [12] it was shown that B2=q2≈ 1.71064, the appropriate root of x4=2x2+x+1. In this paper we show that for any k≥ 3, Bk=qf≈1.75488, the appropriate root of x3=2x2-x+1.