Abstract
The identities for elliptic gamma functions discovered by Felder and Varchenko [8] are generalized to an infinite set of identities for elliptic gamma functions associated to pairs of planes in -dimensional space. The language of stacks and gerbes gives a natural framework for a systematic description of these identities and their domain of validity. A triptic curve is the quotient of the complex plane by a subgroup of rank three. (It is a stack.) Our identities can be summarized by saying that elliptic gamma functions form a meromorphic section of a hermitian holomorphic abelian gerbe over the universal oriented triptic curve
Citation
Giovanni Felder. André Henriques. Carlo A. Rossi. Chenchang Zhu. "A gerbe for the elliptic gamma function." Duke Math. J. 141 (1) 1 - 74, 15 January 2008. https://doi.org/10.1215/S0012-7094-08-14111-0
Information