Extended Congruences for Harmonic Numbers

Abstract

We derive p-adic expansions for the generalized Harmonic numbers H(j)p-1 and H(j)p-12 involving the Bernoulli numbers Bj and the the base-2 Fermat quotient qp. While most of our results are not new, we obtain them elementarily, without resorting to the theory of p-adic L-functions as was the case previously. Moreover, we show that equation*Σj=0n-1((2j+1-1)(j+1)(2j+2-1)(j+2)Bj+22jH(j+1)p-12+2(-1)jqpj+1j+1)pj 0 pn equation* holds under the condition that p >n+12. This is another generalization, modulo any prime power, of the old p-congruence Hp-12+2qp 0 p attributed to Eisenstein, which is stronger than the one which has been published recently.