arXiv:1504.07696 Abstract | arXiv Analytics

arXiv:1504.07696 [math.NT]Abstract References Reviews Resources

On a family of polynomials related to $ζ(2,1)=ζ(3)$

Published 2015-04-29Version 1

We give a new proof of the identity $\zeta(\{2,1\}^l)=\zeta(\{3\}^l)$ of the multiple zeta values, where $l=1,2,\dots$, using generating functions of the underlying generalized polylogarithms. In the course of study we arrive at (hypergeometric) polynomials satisfying 3-term recurrence relations, whose properties we examine and compare with analogous ones of polynomials originated from an (ex-)conjectural identity of Borwein, Bradley and Broadhurst.

Comments: 8 pages

Categories: math.NT, math-ph, math.CA, math.CO, math.MP

Subjects: 11M06, 11M41, 11G55, 33C20

Keywords: polynomials, multiple zeta values, recurrence relations, conjectural identity, generating functions

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arXiv:1504.07696 [math.NT]Abstract References Reviews Resources

On a family of polynomials related to $ζ(2,1)=ζ(3)$

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arXiv:1504.07696 [math.NT]AbstractReferencesReviewsResources

On a family of polynomials related to $ζ(2,1)=ζ(3)$

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arXiv:1504.07696 [math.NT]Abstract References Reviews Resources