Elliptic enumeration of nonintersecting lattice paths
摘要
We enumerate lattice paths in the planar integer lattice consisting of positively directed unit vertical and horizontal steps with respect to a specific elliptic weight function. The elliptic generating function of paths from a given starting point to a given end point evaluates to an elliptic generalization of the binomial coefficient. Convolution gives an identity equivalent to Frenkel and Turaev's 10-V-9 summation. This appears to be the first combinatorial proof of the latter, and at the same time of some important degenerate cases including Jackson's 8-phi-7 and Dougall's 7-F-6 summation. By considering nonintersecting lattice paths we are led to a multivariate extension of the 10-V-9 summation which turns out to be a special case of an identity originally conjectured by Warnaar, later proved by Rosengren. We conclude with discussing some future perspectives.
引用
@article{arxiv.math/0602260,
title = {Elliptic enumeration of nonintersecting lattice paths},
author = {Michael Schlosser},
journal= {arXiv preprint arXiv:math/0602260},
year = {2019}
}
备注
minor changes, 17 pages, to appear in JCTA