Multiple harmonic sums and Wolstenholme's theorem
Abstract
We give a family of congruences for the binomial coefficients in terms of multiple harmonic sums, a generalization of the harmonic numbers. Each congruence in this family (which depends on an additional parameter ) involves a linear combination of multiple harmonic sums, and holds . The coefficients in these congruences are integers depending on and , but independent of . More generally, we construct a family of congruences for , whose members contain a variable number of terms, and show that in this family there is a unique "optimized" congruence involving the fewest terms. The special case and recovers Wolstenholme's theorem , valid for all primes . We also characterize those triples for which the optimized congruence holds modulo an extra power of : they are precisely those with either dividing the numerator of the Bernoulli number , or .
Cite
@article{arxiv.1302.0073,
title = {Multiple harmonic sums and Wolstenholme's theorem},
author = {Julian Rosen},
journal= {arXiv preprint arXiv:1302.0073},
year = {2018}
}
Comments
22 pages