An extension of Gauss congruences for Ap\'ery numbers
Abstract
Osburn, Sahu and Straub introduced the numbers: align* An(r,s,t)=Σk=0nn krn+k ks2k nt, align* for non-negative integers n,r,s,t with r 2, which includes two kinds of Ap\'ery numbers and four kinds of Ap\'ery-like numbers as special cases, and showed that the numbers \An(r,s,t)\n 0 satisfy the Gauss congruences of order 3. We establish an extension of Osburn--Sahu--Straub congruence through Bernoulli numbers, which is one step deep congruence of the Gauss congruence for An(r,s,t).
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