English

Beatty Sequences for a Quadratic Irrational: Decidability and Applications

Number Theory 2026-04-03 v3 Discrete Mathematics Formal Languages and Automata Theory Combinatorics Logic

Abstract

Let α\alpha and β\beta belong to the same quadratic field. We show that the inhomogeneous Beatty sequence (nα+β)n1(\lfloor n \alpha + \beta \rfloor)_{n \geq 1} is synchronized, in the sense that there is a finite automaton that takes as input the Ostrowski representations of nn and yy in parallel, and accepts if and only if y=nα+βy = \lfloor n \alpha + \beta \rfloor. Since it is already known that the addition relation is computable for Ostrowski representations based on a quadratic number, a consequence is a new and rather simple proof that the first-order logical theory of these sequences with addition is decidable. The decision procedure is easily implemented in the free software Walnut. As an application, we show that for each r1r \geq 1 it is decidable whether the set {nα+β:n1}\{ \lfloor n \alpha + \beta \rfloor \, : \, n \geq 1 \} forms an additive basis (or asymptotic additive basis) of order rr. Using our techniques, we also solve some open problems of Reble and Kimberling, and give an explicit characterization of a sequence of Hildebrand et al.

Keywords

Cite

@article{arxiv.2402.08331,
  title  = {Beatty Sequences for a Quadratic Irrational: Decidability and Applications},
  author = {Luke Schaeffer and Jeffrey Shallit and Stefan Zorcic},
  journal= {arXiv preprint arXiv:2402.08331},
  year   = {2026}
}
R2 v1 2026-06-28T14:47:09.087Z