A parafermionic hypergeometric function and supersymmetric 6j-symbols
Abstract
We study properties of a parafermionic generalization of the hyperbolic hypergeometric function appearing as the most important part in the fusion matrix for Liouville field theory and the Racah-Wigner symbols for the Faddeev modular double. We show that this generalized hypergeometric function is a limiting form of the rarefied elliptic hypergeometric function and derive its transformation properties and a mixed difference-recurrence equation satisfied by it. At the intermediate level we describe symmetries of a more general rarefied hyperbolic hypergeometric function. An important case corresponds to the supersymmetric hypergeometric function given by the integral appearing in the fusion matrix of super Liouville field theory and the Racah-Wigner symbols of the quantum algebra . We indicate relations to the standard Regge symmetry and prove some previous conjectures for the supersymmetric Racah-Wigner symbols by establishing their different parametrizations.
Cite
@article{arxiv.2205.10276,
title = {A parafermionic hypergeometric function and supersymmetric 6j-symbols},
author = {Elena Apresyan and Gor Sarkissian and Vyacheslav P. Spiridonov},
journal= {arXiv preprint arXiv:2205.10276},
year = {2023}
}
Comments
29 pages