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On a conjecture of Borwein, Bradley and Broadhurst
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Jianqiang Zhao
Published/Copyright:
January 20, 2010
Abstract
In this short note we shall prove the following conjecture of Borwein, Bradley and Broadhurst: for every positive integer n
where
The main idea of the proof is to use the double shuffle relations and the distribution relations among the multiple zeta values and the alternating Euler sums.
Received: 2008-06-25
Revised: 2008-10-22
Published Online: 2010-01-20
Published in Print: 2010-February
© Walter de Gruyter Berlin · New York 2010
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Articles in the same Issue
- Deformation quantization of surjective submersions and principal fibre bundles
- Complete moduli spaces of branchvarieties
- DG-algebras and derived A∞-algebras
- Subshifts and perforation
- On a conjecture of Atkin
- Mukai duality for gerbes with connection
- The structure of crossed products of irrational rotation algebras by finite subgroups of SL2(ℤ)
- On a conjecture of Borwein, Bradley and Broadhurst
