Double Copy From Tensor Products of Metric BV ■ ‐Algebras

Leron Borsten, Branislav Jurčo, Hyungrok Kim, Tommaso Macrelli, Christian Saemann, Martin Wolf

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Abstract

Field theories with kinematic Lie algebras, such as field theories featuring color–kinematics duality, possess an underlying algebraic structure known as BV -algebra. If, additionally, matter fields are present, this structure is supplemented by a module for the BV -algebra. The authors explain this perspective, expanding on our previous work and providing many additional mathematical details. The authors also show how the tensor product of two metric BV -algebras yields the action of a new syngamy field theory, a construction which comprises the familiar double copy construction. As examples, the authors discuss various scalar field theories, Chern–Simons theory, self-dual Yang–Mills theory, and the pure spinor formulations of both M2-brane models and supersymmetric Yang–Mills theory. The latter leads to a new cubic pure spinor action for 10-dimensional supergravity. A homotopy-algebraic perspective on colour–flavour-stripping is also given, obtain a new restricted tensor product over a wide class of bialgebras, and it is also show that any field theory (even one without colour–kinematics duality) comes with a kinematic (Formula presented.) -algebra.

Original languageEnglish
Article number202300270
Pages (from-to)1-55
Number of pages55
JournalFortschritte der Physik
Early online date12 Nov 2024
DOIs
Publication statusPublished - 12 Nov 2024

Keywords

  • kinematic L∞‐algebra
  • Batalin‐Vilkovisky algebras
  • colour‐kinematics duality
  • double copy
  • color‐kinematics duality
  • syngamy
  • kinematic Lie algebra
  • Hopf algebras
  • BV ■ ‐algebras
  • color-kinematics duality
  • Batalin-Vilkovisky algebras
  • BV -algebras
  • kinematic L -algebra
  • colour-kinematics duality

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