English

The Membership Problem for Hypergeometric Sequences with Quadratic Parameters

Logic in Computer Science 2023-05-25 v2

Abstract

Hypergeometric sequences are rational-valued sequences that satisfy first-order linear recurrence relations with polynomial coefficients; that is, a hypergeometric sequence unn=0\langle u_n \rangle_{n=0}^{\infty} is one that satisfies a recurrence of the form f(n)un=g(n)un1f(n)u_n = g(n)u_{n-1} where f,gZ[x]f,g \in \mathbb{Z}[x]. In this paper, we consider the Membership Problem for hypergeometric sequences: given a hypergeometric sequence unn=0\langle u_n \rangle_{n=0}^{\infty} and a target value tQt\in \mathbb{Q}, determine whether un=tu_n=t for some index nn. We establish decidability of the Membership Problem under the assumption that either (i) ff and gg have distinct splitting fields or (ii) ff and gg are monic polynomials that both split over a quadratic extension of Q\mathbb{Q}. Our results are based on an analysis of the prime divisors of polynomial sequences f(n)n=1\langle f(n) \rangle_{n=1}^\infty and g(n)n=1\langle g(n) \rangle_{n=1}^\infty appearing in the recurrence relation.

Keywords

Cite

@article{arxiv.2303.09204,
  title  = {The Membership Problem for Hypergeometric Sequences with Quadratic Parameters},
  author = {George Kenison and Klara Nosan and Mahsa Shirmohammadi and James Worrell},
  journal= {arXiv preprint arXiv:2303.09204},
  year   = {2023}
}

Comments

18 pages (including appendices). Accepted at ISSAC 2023

R2 v1 2026-06-28T09:19:58.691Z