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Extended corner symmetry, charge bracket and Einstein’s equations

Laurent Freidel, Roberto Oliveri, Daniele Pranzetti, Simone Speziale

2021Journal of High Energy Physics116 citationsDOIOpen Access PDF

Abstract

A bstract We develop the covariant phase space formalism allowing for non-vanishing flux, anomalies, and field dependence in the vector field generators. We construct a charge bracket that generalizes the one introduced by Barnich and Troessaert and includes contributions from the Lagrangian and its anomaly. This bracket is uniquely determined by the choice of Lagrangian representative of the theory. We then extend the notion of corner symmetry algebra to include the surface translation symmetries and prove that the charge bracket provides a canonical representation of the extended corner symmetry algebra. This representation property is shown to be equivalent to the projection of the gravitational equations of motion on the corner, providing us with an encoding of the bulk dynamics in a locally holographic manner.

Topics & Concepts

PhysicsCovariant transformationBracketEquations of motionCharge (physics)Homogeneous spaceHypersurfaceMathematical physicsSymmetry (geometry)Poisson bracketPhase spaceClassical mechanicsFormalism (music)LagrangianGravitationTheoretical physicsGravitational fieldQuantum field theoryKilling vector fieldSpontaneous symmetry breakingProjection (relational algebra)Quantization (signal processing)Field (mathematics)Translational symmetryChiral modelQuantum mechanicsConfiguration spaceCentral chargeSurface (topology)Representation (politics)Symmetry groupVector fieldPath integral formulationSpacetimeTranslation (biology)Symmetry breakingField equationNoether's theoremScalar (mathematics)Black Holes and Theoretical PhysicsNoncommutative and Quantum Gravity TheoriesAlgebraic and Geometric Analysis
Extended corner symmetry, charge bracket and Einstein’s equations | Litcius