On the binomial transforms of Apéry-like sequences

Abstract: In the proof of the irrationality of $\zeta(3)$ and $\zeta(2)$, Ap\'ery defined two integer sequences through $3$-term recurrences, which are known as the famous Ap\'ery numbers. Zagier, Almkvist--Zudilin and Cooper successively introduced the other $13$ sporadic sequences through variants of Ap\'ery's $3$-term recurrences. All of the $15$ sporadic sequences are called Ap\'ery-like sequences. Motivated by Gessel's congruences mod $24$ for the Ap\'ery numbers, we investigate the congruences in the form $u_n\equiv \alpha^n \pmod{N_{\alpha}}~(\alpha\in \mathbb{Z},N_{\alpha}\in \mathbb{N}^{+})$ for all of the $15$ Ap\'ery-like sequences ${u_n}{n\ge 0}$. Let $N{\alpha}$ be the largest positive integer such that $u_n\equiv \alpha^n \pmod{N_{\alpha}}$ for all non-negative integers $n$. We determine the values of $\max{N_{\alpha}|\alpha \in \mathbb{Z}}$ for all of the $15$ Ap\'ery-like sequences ${u_n}_{n\ge 0}$.The binomial transforms of Ap\'ery-like sequences provide us a unified approach to this type of congruences for Ap\'ery-like sequences.