Congruences for Ap\'ery numbers βn=Σk=0nnk2n+kk
Abstract
In this paper we establish some congruences involving the Ap\'ery numbers βn=Σk=0nnk2n+kk (n=0,1,2,…). For example, we show that Σk=0n-1(11k2+13k+4)βk02n2 for any positive integer n, and Σk=0p-1(11k2+13k+4)βk 4p2+4p7Bp-5p8 for any prime p>3, where Bp-5 is the (p-5)th Bernoulli number. We also present certain relations between congruence properties of the two kinds of A\'pery numbers, βn and An=Σk=0n nk2n+kk2.
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