Gauss Relations in Feynman Integrals
Abstract
Embedding Feynman integrals in Grassmannians, we can write Feynman integrals as some finite linear combinations of generalized hypergeometric functions. In this paper we present a general method to obtain Gauss relations among those generalized hypergeometric functions. The hypergeometric expressions of Feynman integral are continued from a connected component to another by the inverse Gauss relations, then continued to the whole domain of definition by the Gauss-Kummer relations. The Laurent series of the Feynman integral around the space-time dimension is obtained by the Gauss adjacent relations where the coefficient of the term with power of is given as the linear combinations of hypergeometric functions with integer parameters. As examples, we illustrate how to obtain the expressions for the Feynman integrals of the 1-loop self-energy and a 2-loop massless triangle diagram in the domains of definition.
Cite
@article{arxiv.2407.10287,
title = {Gauss Relations in Feynman Integrals},
author = {Tai-Fu Feng and Yang Zhou and Hai-Bin Zhang},
journal= {arXiv preprint arXiv:2407.10287},
year = {2024}
}
Comments
89 pages, including text of 31 pages + 2 figure +appendices of 58 pages