Perfecting one-loop BCJ numerators in SYM and supergravity
Abstract
We take a major step towards computing -dimensional one-loop amplitudes in general gauge theories, compatible with the principles of unitarity and the color-kinematics duality. For -point amplitudes with either supersymmetry multiplets or generic non-supersymmetric matter in the loop, simple all-multiplicity expressions are obtained for the maximal cuts of kinematic numerators of -gon diagrams. At points with maximal supersymmetry, we extend the cubic-diagram numerators to encode all contact terms, and thus solve the long-standing problem of \emph{simultaneously} realizing the following properties: color-kinematics duality, manifest locality, optimal power counting of loop momenta, quadratic rather than linearized Feynman propagators, compatibility with double copy as well as all graph symmetries. Color-kinematics dual representations with similar properties are presented in the half-maximally supersymmetric case at points. The resulting gauge-theory integrands and their supergravity counterparts obtained from the double copy are checked to reproduce the expected ultraviolet divergences.
Cite
@article{arxiv.2211.00638,
title = {Perfecting one-loop BCJ numerators in SYM and supergravity},
author = {Alex Edison and Song He and Henrik Johansson and Oliver Schlotterer and Fei Teng and Yong Zhang},
journal= {arXiv preprint arXiv:2211.00638},
year = {2023}
}
Comments
55 pages; Dedicated to the memory of Lars Brink; v2: minor changes, published version