Hypergeometric Functions and Feynman Diagrams
Abstract
The relationship between Feynman diagrams and hypergeometric functions is discussed. Special attention is devoted to existing techniques for the construction of the -expansion. As an example, we present a detailed discussion of the construction of the epsilon-expansion of the Appell function around rational values of parameters via an iterative solution of differential equations. As a by-product, we have found that the one-loop massless pentagon diagram in dimension is not expressible in terms of multiple polylogarithms. Another interesting example is the Puiseux-type solution involving a differential operator generated by a hypergeometric function of three variables. The holonomic properties of the hypergeometric functions are briefly discussed.
Cite
@article{arxiv.2012.14492,
title = {Hypergeometric Functions and Feynman Diagrams},
author = {Mikhail Kalmykov and Vladimir Bytev and Bernd Kniehl and Sven-Olaf Moch and Bennie Ward and Scott Yost},
journal= {arXiv preprint arXiv:2012.14492},
year = {2021}
}
Comments
Based on the talk given by M.Kalmykov at the workshop "Antidifferentiation and the Calculation of Feynman Amplitudes" Zeuthen, 4.10.2020-9.10.2020; v2: few references added, small style corrections