Two congruences concerning Ap\'ery numbers
Abstract
Let n be a nonnegative integer. The n-th Ap\'ery number is defined by An:=Σk=0nn+kk2nk2. Z.-W. Sun ever investigated the congruence properties of Ap\'ery numbers and posed some conjectures. For example, Sun conjectured that for any prime p≥7 Σk=0p-1(2k+1)Ak p-72p2Hp-1p6 and for any prime p≥5 Σk=0p-1(2k+1)3Ak p3+4p4Hp-1+65p8Bp-5p9, where Hn=Σk=1n1/k denotes the n-th harmonic number and B0,B1,… are the well-known Bernoulli numbers. In this paper we shall confirm these two conjectures.
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