English

The Threshold Problem for Hypergeometric Sequences with Quadratic Parameters

Logic in Computer Science 2024-04-25 v4 Number Theory

Abstract

Hypergeometric sequences are rational-valued sequences that satisfy first-order linear recurrence relations with polynomial coefficients; that is, unn=0\langle u_n \rangle_{n=0}^\infty is hypergeometric if it satisfies a first-order linear recurrence of the form p(n)un+1=q(n)unp(n)u_{n+1} = q(n)u_{n} with polynomial coefficients p,qZ[x]p,q\in\mathbb{Z}[x] and u0Qu_0\in\mathbb{Q}. In this paper, we consider the Threshold Problem for hypergeometric sequences: given a hypergeometric sequence unn=0\langle u_n\rangle_{n=0}^\infty and a threshold tQt\in\mathbb{Q}, determine whether untu_n \ge t for each nN0n\in\mathbb{N}_0. We establish decidability for the Threshold Problem under the assumption that the coefficients pp and qq are monic polynomials whose roots lie in an imaginary quadratic extension of Q\mathbb{Q}. We also establish conditional decidability results; for example, under the assumption that the coefficients pp and qq are monic polynomials whose roots lie in any number of quadratic extensions of Q\mathbb{Q}, the Threshold Problem is decidable subject to the truth of Schanuel's conjecture. Finally, we show how our approach both recovers and extends some of the recent decidability results on the Membership Problem for hypergeometric sequences with quadratic parameters.

Keywords

Cite

@article{arxiv.2211.02447,
  title  = {The Threshold Problem for Hypergeometric Sequences with Quadratic Parameters},
  author = {George Kenison},
  journal= {arXiv preprint arXiv:2211.02447},
  year   = {2024}
}

Comments

20 pages. Updated Introduction and added two appendices. Updated title

R2 v1 2026-06-28T05:11:24.946Z