On the mod p2 determination of Σk=1p-1Hk/(k· 2k): another proof of a conjecture by Sun

Abstract

For a positive integer n let Hn=Σk=1n1/k be the nth harmonic number. Z. W. Sun conjectured that for any prime p 5, Σk=1p-1Hkk· 2k 7/24pBp-3p2. This conjecture is recently confirmed by Z. W. Sun and L. L. Zhao. In this note we give another proof of the above congruence by establishing congruences for all the sums of the form Σk=1p-12 kHkr/ks \,(\, p4-r-s) with (r,s)∈\(1,1),(1,2),(2,1) \.