Two congruences involving harmonic numbers with applications
Abstract
The harmonic numbers Hn=Σ0<k n1/k\ (n=0,1,2,…) play important roles in mathematics. Let p>3 be a prime. With helps of some combinatorial identities, we establish the following two new congruences: Σk=1p-12kkkHk13( p3)Bp-2(13)p and Σk=1p-12kkkH2k712( p3)Bp-2(13)p, where Bn(x) denotes the Bernoulli polynomial of degree n. As an application, we determine Σn=1p-1gn and Σn=1p-1hn modulo p3, where gn=Σk=0n nk22kkand hn=Σk=0n nk2Ck with Ck=2kk/(k+1).
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