A note on evaluations of multiple zeta values
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Publication:3617580
DOI10.1090/S0002-9939-08-09592-0zbMath1180.11031arXiv0802.4331OpenAlexW2049390104MaRDI QIDQ3617580
Publication date: 30 March 2009
Published in: Proceedings of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0802.4331
Combinatorial identities, bijective combinatorics (05A19) Other combinatorial number theory (11B75) Multiple Dirichlet series and zeta functions and multizeta values (11M32)
Related Items (4)
Bowman-Bradley type theorem for finite multiple zeta values ⋮ The Bowman-Bradley theorem for multiple zeta-star values ⋮ \(\zeta(\{ \{ 2 \}^m, 1, \{2 \}^m, 3 \}^n, \{2 \}^m) / \pi^{4 n + 2 m(2 n + 1)}\) is rational ⋮ Bowman-Bradley type theorem for finite multiple zeta values in \(\mathcal{A}_2\)
Cites Work
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- Combinatorial aspects of multiple zeta values
- Multiple harmonic series
- The algebra of multiple harmonic series
- Evaluations of \(k\)-fold Euler/Zagier sums: a compendium of results for arbitrary \(k\)
- The algebra and combinatorics of shuffles and multiple zeta values
- Special values of multiple polylogarithms
- Derivation and double shuffle relations for multiple zeta values
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