Extended Congruences for Harmonic Numbers
Number Theory
2019-02-15 v1
Abstract
We derive -adic expansions for the generalized Harmonic numbers and involving the Bernoulli numbers and the the base-2 Fermat quotient . While most of our results are not new, we obtain them elementarily, without resorting to the theory of -adic L-functions as was the case previously. Moreover, we show that \begin{equation*}\sum_{j=0}^{n-1}\left(\frac{(2^{j+1}-1)}{(j+1)}\frac{(2^{j+2}-1)}{(j+2)}\frac{B_{j+2}}{2^{j}}H^{(j+1)}_{\frac{p-1}{2}}+2(-1)^j\frac{q_p^{j+1}}{j+1}\right)p^j\equiv 0 \pmod {p^n} \end{equation*} holds under the condition that . This is another generalization, modulo any prime power, of the old -congruence attributed to Eisenstein, which is stronger than the one which has been published recently.
Cite
@article{arxiv.1902.05258,
title = {Extended Congruences for Harmonic Numbers},
author = {René Gy},
journal= {arXiv preprint arXiv:1902.05258},
year = {2019}
}
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