Notes on cluster algebras and some all-loop Feynman integrals
Abstract
We study cluster algebras for some all-loop Feynman integrals, including box-ladder, penta-box-ladder, and (seven-point) double-penta-ladder integrals. In addition to the well-known box ladder whose symbol alphabet is , we show that penta-box ladder has an alphabet of and provide strong evidence that the alphabet of double-penta ladder can be identified with a cluster algebra. We relate the symbol letters to the variables of cluster configuration space, which provide a gauge-invariant description of the cluster algebra, and we find various sub-algebras associated with limits of the integrals. We comment on constraints similar to extended-Steinmann relations or cluster adjacency conditions on cluster function spaces. Our study of the symbol and alphabet is based on the recently proposed Wilson-loop representation, which allows us to predict higher-loop alphabet recursively; by applying such recursions to six-dimensional hexagon integrals, we also find and cluster functions for the two-mass-easy and three-mass-easy case, respectively.
Cite
@article{arxiv.2103.02796,
title = {Notes on cluster algebras and some all-loop Feynman integrals},
author = {Song He and Zhenjie Li and Qinglin Yang},
journal= {arXiv preprint arXiv:2103.02796},
year = {2021}
}
Comments
28 pages, several figures; v2: typos corrected, functions of ladder integrals computed to higher loops; v3: more examples of double-penta-ladder integrals and discussions about their alphabet added