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Autori principali: McNees, Robert, Zwikel, Céline
Natura: Preprint
Pubblicazione: 2023
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Accesso online:https://arxiv.org/abs/2306.16451
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author McNees, Robert
Zwikel, Céline
author_facet McNees, Robert
Zwikel, Céline
contents Constructing charges in the covariant phase space formalism often leads to formally divergent expressions, even when the fields satisfy physically acceptable fall-off conditions. These expressions can be rendered finite by corner ambiguities in the definition of the presymplectic potential, which in some cases may be motivated by arguments involving boundary Lagrangians. We show that the necessary corner terms are already present in the variation of the bulk action and can be extracted in a straightforward way. Once these corner terms are included in the presymplectic potential, charges derived from an associated codimension-2 form are automatically finite. We illustrate the procedure with examples in two and three dimensions, working in Bondi gauge and obtaining integrable charges. As a by-product, actions are derived for these theories that admit a well-defined variational principle when the fields satisfy boundary conditions on a timelike surface with corners. An interesting feature of our analysis is that the fields are not required to be fully on-shell.
format Preprint
id arxiv_https___arxiv_org_abs_2306_16451
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Finite Charges from the Bulk Action
McNees, Robert
Zwikel, Céline
High Energy Physics - Theory
Constructing charges in the covariant phase space formalism often leads to formally divergent expressions, even when the fields satisfy physically acceptable fall-off conditions. These expressions can be rendered finite by corner ambiguities in the definition of the presymplectic potential, which in some cases may be motivated by arguments involving boundary Lagrangians. We show that the necessary corner terms are already present in the variation of the bulk action and can be extracted in a straightforward way. Once these corner terms are included in the presymplectic potential, charges derived from an associated codimension-2 form are automatically finite. We illustrate the procedure with examples in two and three dimensions, working in Bondi gauge and obtaining integrable charges. As a by-product, actions are derived for these theories that admit a well-defined variational principle when the fields satisfy boundary conditions on a timelike surface with corners. An interesting feature of our analysis is that the fields are not required to be fully on-shell.
title Finite Charges from the Bulk Action
topic High Energy Physics - Theory
url https://arxiv.org/abs/2306.16451