English

Ap\'ery-like sequences defined by four-term recurrence relations

Number Theory 2024-05-09 v2

Abstract

The Ap\'ery numbers may be defined by a cubic three-term recurrence relation, that is, a three-term relation where the coefficients are polynomials in the index of degree 33. In this work, we first provide a systematic review of Ap\'ery numbers and other related sequences that satisfy quadratic or cubic three-term recurrence relations, and show how they are interrelated and how they may be classified. This leads to sequences defined by cubic kk-term recurrence relations. The cases corresponding to k=2k=2 in this framework lead to Ramanujan's theories of elliptic functions to alternative bases, while the cases corresponding to k=3k=3 correspond to the Ap\'ery, Domb, Almkvist--Zudilin numbers and other sequences that are well-studied. We conduct a detailed analysis for the case k=4k=4. Some of the sequences that arise are new. Of particular interest are ten sequences that are said to be self-starting in the sense that a single initial condition is enough to start the recurrence relation. Of additional interest are two sequences which take values in Z[i]\mathbb{Z}[i] and two others with values in Z[2]\mathbb{Z}[\sqrt{2}]. Congruence properties and asymptotic expansions for the ten self-starting sequences are investigated and several conjectures are presented. For example, we conjecture that the integer-valued sequence defined by the recurrence relation \begin{align*} (n+1)^3T(n+1) &=2(2n+1)(5n^2+5n+2)T(n) \\ &\qquad -8n(7n^2+1)T(n-1)+22n(2n-1)(n-1)T(n-2) \end{align*} and initial condition T(0)=1T(0)=1 satisfies a Lucas congruence for every prime pp. Moreover, the sequence is conjectured to satisfy the supercongruence T(pn)T(n)(modp2)for all positive integers n T(pn) \equiv T(n) \pmod{p^2} \quad\text{for all positive integers $n$} if p=2,  59p=2,\;59 or 55815581, and for no other primes p<104p<10^4.

Keywords

Cite

@article{arxiv.2302.00757,
  title  = {Ap\'ery-like sequences defined by four-term recurrence relations},
  author = {Shaun Cooper},
  journal= {arXiv preprint arXiv:2302.00757},
  year   = {2024}
}
R2 v1 2026-06-28T08:29:38.685Z