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The Weyl BMS group and Einstein’s equations

Laurent Freidel, Roberto Oliveri, Daniele Pranzetti, Simone Speziale

2021Journal of High Energy Physics130 citationsDOIOpen Access PDF

Abstract

A bstract We propose an extension of the BMS group, which we refer to as Weyl BMS or BMSW for short, that includes super-translations, local Weyl rescalings and arbitrary diffeomorphisms of the 2d sphere metric. After generalizing the Barnich-Troessaert bracket, we show that the Noether charges of the BMSW group provide a centerless representation of the BMSW Lie algebra at every cross section of null infinity. This result is tantamount to proving that the flux-balance laws for the Noether charges imply the validity of the asymptotic Einstein’s equations at null infinity. The extension requires a holographic renormalization procedure, which we construct without any dependence on background fields. The renormalized phase space of null infinity reveals new pairs of conjugate variables. Finally, we show that BMSW group elements label the gravitational vacua.

Topics & Concepts

Noether's theoremPhysicsMathematical physicsNull (SQL)Pure mathematicsExtension (predicate logic)Group (periodic table)Lie algebraVirasoro algebraRenormalization groupSpace (punctuation)Lie groupSection (typography)GravitationPhase spaceRepresentation (politics)RenormalizationWeyl groupHomogeneous spaceDomain (mathematical analysis)Type (biology)Algebra over a fieldRepresentation theoryWess–Zumino–Witten modelGroup representationBlack Holes and Theoretical PhysicsCosmology and Gravitation TheoriesGeometric Analysis and Curvature Flows