On the regularity of \b(α n+β)\n≥0

Abstract

Let α,β be real numbers and b≥2 be an integer. Allouche and Shallit showed that the sequence \α n+β\n≥0 is b-regular if and only if α is rational. In this paper, using a base-independent regular language, we prove a similar result that the sequence \b(α n+β)\n≥0 is b-regular if and only if α is rational. In particular, when α=2,β=0 and b=2, we answer the question of Allouche and Shallit that the sequence \12+2n\n≥0 is not 2-regular, which has been proved by Bell, Moshe and Rowland respectively.