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Mod $p$ structure of alternating and non-alternating multiple harmonic sums

Jianqiang Zhao — 2011

Journal de Théorie des Nombres de Bordeaux

The well-known Wolstenholme’s Theorem says that for every prime $p > 3$ the $(p - 1)$ -st partial sum of the harmonic series is congruent to $0$ modulo $p^{2}$ . If one replaces the harmonic series by $\sum_{k \geq 1} 1 / n^{k}$ for $k$ even, then the modulus has to be changed from $p^{2}$ to just $p$ . One may consider generalizations of this to multiple harmonic sums (MHS) and alternating multiple harmonic sums (AMHS) which are partial sums of multiple zeta value series and the alternating Euler sums, respectively. A lot of results along this direction...

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Mod $p$ structure of alternating and non-alternating multiple harmonic sums

Maximal independent systems of units in global function fields

Standard relations of multiple polylogarithm values at roots of unity.

A note on colored Tornheim's double series.

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Currently displaying 1 – 4 of 4

Mod p structure of alternating and non-alternating multiple harmonic sums

Maximal independent systems of units in global function fields

Standard relations of multiple polylogarithm values at roots of unity.

A note on colored Tornheim's double series.

Mod $p$ structure of alternating and non-alternating multiple harmonic sums