Ap\'ery-like sequences defined by four-term recurrence relations
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 . 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 -term recurrence relations. The cases corresponding to in this framework lead to Ramanujan's theories of elliptic functions to alternative bases, while the cases corresponding to correspond to the Ap\'ery, Domb, Almkvist--Zudilin numbers and other sequences that are well-studied. We conduct a detailed analysis for the case . 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 and two others with values in . 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 satisfies a Lucas congruence for every prime . Moreover, the sequence is conjectured to satisfy the supercongruence if or , and for no other primes .
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}
}