中文

Multiple $q$-Zeta Values

量子代数 2007-06-13 v1 数论

摘要

We introduce a qq-analog of the multiple harmonic series commonly referred to as multiple zeta values. The multiple qq-zeta values satisfy a qq-stuffle multiplication rule analogous to the stuffle multiplication rule arising from the series representation of ordinary multiple zeta values. Additionally, multiple qq-zeta values can be viewed as special values of the multiple qq-polylogarithm, which admits a multiple Jackson qq-integral representation whose limiting case is the Drinfel'd simplex integral for the ordinary multiple polylogarithm when q=1q=1. The multiple Jackson qq-integral representation for multiple qq-zeta values leads to a second multiplication rule satisfied by them, referred to as a qq-shuffle. Despite this, it appears that many numerical relations satisfied by ordinary multiple zeta values have no interesting qq-extension. For example, a suitable qq-analog of Broadhurst's formula for ζ({3,1}n)\zeta(\{3,1\}^n), if one exists, is likely to be rather complicated. Nevertheless, we show that a number of infinite classes of relations, including Hoffman's partition identities, Ohno's cyclic sum identities, Granville's sum formula, Euler's convolution formula, Ohno's generalized duality relation, and the derivation relations of Ihara and Kaneko extend to multiple qq-zeta values.

关键词

引用

@article{arxiv.math/0402093,
  title  = {Multiple $q$-Zeta Values},
  author = {David M. Bradley},
  journal= {arXiv preprint arXiv:math/0402093},
  year   = {2007}
}

备注

35 pages