Proof of a congruence for harmonic numbers conjectured by Z.-W. Sun
Abstract
For a positive integer n let Hn=Σk=1n1/k be the nth harmonic number. In this note we prove that for any prime p 7, Σk=1p-1Hk2k2 4/5pBp-5p2, which confirms the conjecture recently proposed by Z. W. Sun. Furthermore, we also prove two similar congruences modulo p2.
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