Please use this identifier to cite or link to this item: https://hdl.handle.net/20.500.14279/14217
Title: Conserved charges in (Lovelock) gravity in first order formalism
Authors: Gravanis, Elias 
Major Field of Science: Engineering and Technology
Field Category: Civil Engineering
Keywords: Gravitation;Algebra;Cosmological constant
Issue Date: 6-Apr-2010
Source: Physical Review D - Particles, Fields, Gravitation and Cosmology, 2010, vol. 81, no. 8
Volume: 81
Issue: 8
Journal: Physical Review D 
Abstract: We derive conserved charges as quasi-local Hamiltonians by covariant phase space methods for a class of geometric Lagrangians that can be written in terms of the spin connection, the vielbein and possibly other tensorial form fields, allowing also for non-zero torsion. We then re-calculate certain known results and derive some new ones in three to six dimensions hopefully enlightening certain aspects of all of them. The quasi-local energy is defined in terms of the metric and not its first derivatives, requiring `regularization' for convergence in most cases. Counter-terms consistent with Dirichlet boundary conditions in first order formalism are shown to be an efficient way to remove divergencies and derive the values of conserved charges, the clear-cut application being metrics with AdS (or dS) asymptotics. The emerging scheme is: all is required to remove the divergencies of a Lovelock gravity is a boundary Lovelock gravity.
ISSN: 24700029
DOI: 10.1103/PhysRevD.81.084013
Rights: © The American Physical Society
Type: Article
Affiliation : Cyprus University of Technology 
Publication Type: Peer Reviewed
Appears in Collections:Άρθρα/Articles

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