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
-algebra.
-algebra.
| Original language | English |
|---|---|
| Article number | 202300270 |
| Pages (from-to) | 1-55 |
| Number of pages | 55 |
| Journal | Fortschritte der Physik |
| Early online date | 12 Nov 2024 |
| DOIs | |
| Publication status | Published - 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