Finding new relationships between hypergeometric functions by evaluating Feynman integrals
Abstract
Several new relationships between hypergeometric functions are found by comparing results for Feynman integrals calculated using different methods. A new expression for the one-loop propagator-type integral with arbitrary masses and arbitrary powers of propagators is derived in terms of only one Appell hypergeometric function F_1. From the comparison of this expression with a previously known one, a new relation between the Appell functions F_1 and F_4 is found. By comparing this new expression for the case of equal masses with another known result, a new formula for reducing the F_1 function with particular arguments to the hypergeometric function _3F_2 is derived. By comparing results for a particular one-loop vertex integral obtained using different methods, a new relationship between F_1 functions corresponding to a quadratic transformation of the arguments is established. Another reduction formula for the F_1 function is found by analysing the imaginary part of the two-loop self-energy integral on the cut. An explicit formula relating the F_1 function and the Gaussian hypergeometric function _2F_1 whose argument is the ratio of polynomials of degree six is presented.
Cite
@article{arxiv.1108.6019,
title = {Finding new relationships between hypergeometric functions by evaluating Feynman integrals},
author = {Bernd A. Kniehl and Oleg V. Tarasov},
journal= {arXiv preprint arXiv:1108.6019},
year = {2015}
}
Comments
14 pages, 3 figures