On the mod p7 determination of 2p-1 p-1
Abstract
In this paper we prove that for any prime p 11 holds 2p-1 p-1 1 -2p Σk=1p-11k +4p2Σ1 i<j p-11ijp7. This is a generalization of the famous Wolstenholme's theorem which asserts that 2p-1 p-1 1 \,\,(\,\,p3) for all primes p 5. Our proof is elementary and it does not use a standard technique involving the classic formula for the power sums in terms of the Bernoulli numbers. Notice that the above congruence reduced modulo p6, p5 and p4 yields related congruences obtained by R. Tauraso, J. Zhao and J.W.L. Glaisher, respectively.
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