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Autori principali: Paci, Gregorio, Zanusso, Omar
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2407.00415
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author Paci, Gregorio
Zanusso, Omar
author_facet Paci, Gregorio
Zanusso, Omar
contents Using cohomological methods, we identify both trivial and nontrivial contributions to the conformal anomaly in the presence of vectorial torsion in $d=2,4$ dimensions. In both cases, our analysis considers two scenarios: one in which the torsion vector transforms in an affine way, i.e., it is a gauge potential for Weyl transformations, and the other in which it is invariant under the Weyl group. An important outcome for the former case in both $d=2,4$ is the presence of anomalies of a "mixed" nature in relation to the classification of Deser and Schwimmer. For invariant torsion in $d=4$, we also find a new type of anomaly which we dub $Ψ$-anomaly. Taking these results into account, we integrate the different anomalies to obtain renormalized anomalous effective actions. Thereafter, we recast such actions in the covariant nonlocal and local forms, the latter being easier to work with. Along the way, we pause to comment on the physical usefulness of these effective actions, in particular to obtain renormalized energy-momentum tensors and thermodynamics of $2d$ black holes.
format Preprint
id arxiv_https___arxiv_org_abs_2407_00415
institution arXiv
publishDate 2024
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spellingShingle Weyl cohomology and the conformal anomaly in the presence of torsion
Paci, Gregorio
Zanusso, Omar
High Energy Physics - Theory
Using cohomological methods, we identify both trivial and nontrivial contributions to the conformal anomaly in the presence of vectorial torsion in $d=2,4$ dimensions. In both cases, our analysis considers two scenarios: one in which the torsion vector transforms in an affine way, i.e., it is a gauge potential for Weyl transformations, and the other in which it is invariant under the Weyl group. An important outcome for the former case in both $d=2,4$ is the presence of anomalies of a "mixed" nature in relation to the classification of Deser and Schwimmer. For invariant torsion in $d=4$, we also find a new type of anomaly which we dub $Ψ$-anomaly. Taking these results into account, we integrate the different anomalies to obtain renormalized anomalous effective actions. Thereafter, we recast such actions in the covariant nonlocal and local forms, the latter being easier to work with. Along the way, we pause to comment on the physical usefulness of these effective actions, in particular to obtain renormalized energy-momentum tensors and thermodynamics of $2d$ black holes.
title Weyl cohomology and the conformal anomaly in the presence of torsion
topic High Energy Physics - Theory
url https://arxiv.org/abs/2407.00415