Multiple harmonic sums and Wolstenholme's theorem

Abstract

We give a family of congruences for the binomial coefficients kp-1 p-1 in terms of multiple harmonic sums, a generalization of the harmonic numbers. Each congruence in this family (which depends on an additional parameter n) involves a linear combination of n multiple harmonic sums, and holds p2n+3. The coefficients in these congruences are integers depending on n and k, but independent of p. More generally, we construct a family of congruences for kp-1 p-1 p2n+3, 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 k=2 and n=0 recovers Wolstenholme's theorem 2p-1 p-1 1p3, valid for all primes p≥ 5. We also characterize those triples (n, k, p) for which the optimized congruence holds modulo an extra power of p: they are precisely those with either p dividing the numerator of the Bernoulli number Bp-2n-k, or k 0, 1 p.