On small bases for which 1 has countably many expansions

Abstract

Let q∈(1,2). A q-expansion of a number x in [0,1q-1] is a sequence (δi)i=1∞∈\0,1\N satisfying x=Σi=1∞δiqi. Let B_0 denote the set of q for which there exists x with a countable number of q-expansions, and let B1, 0 denote the set of q for which 1 has a countable number of q-expansions. In Sidorov6 it was shown that _0=1,0=1+52, and in Baker it was shown that B_0(1+52, q1]=\ q1\, where q1(≈1.64541) is the positive root of x6-x4-x3-2x2-x-1=0. In this paper we show that the second smallest point of B1,0 is q3(≈1.68042), the positive root of x5-x4-x3-x+1=0. Enroute to proving this result we show that B_0(q1, q3]=\ q2, q3\, where q2(≈1.65462) is the positive root of x6-2x4-x3-1=0.