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Main Authors: González, Hernán A., Labrin, Oriana, Miskovic, Olivera
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2407.13866
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author González, Hernán A.
Labrin, Oriana
Miskovic, Olivera
author_facet González, Hernán A.
Labrin, Oriana
Miskovic, Olivera
contents We apply the Hamiltonian formalism to investigate the massless sector of scalar field theory coupled with Maxwell electrodynamics through the Pontryagin term. Specifically, we analyze asymptotic symmetries at the null infinity of this theory, conserved charges, and their algebra. We find that the theory possesses asymptotic shift symmetries of the fields not present in the bulk manifold coming from the zero modes of the symplectic matrix of constraints. Consequently, we conclude that the real scalar field also contains asymptotic symmetries previously found in the literature by a different approach. We show that these symmetries are the origin of the electric-magnetic duality in electromagnetism with the topological Pontryagin term, and obtain non-trivial central extension between the electric and magnetic conserved charges. Finally, we examine the full interacting theory and find that, due to the interaction, the symmetry generators are more difficult to identify among the constraints, such that we obtain them in the weak-coupling limit. We find that the asymptotic structure of the theory simplifies due to a fast fall-off of the scalar field, leading to decoupled scalar and Maxwell asymptotic sectors, and losing the electric-magnetic duality.
format Preprint
id arxiv_https___arxiv_org_abs_2407_13866
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Asymptotic structure of scalar-Maxwell theory at the null boundary
González, Hernán A.
Labrin, Oriana
Miskovic, Olivera
High Energy Physics - Theory
General Relativity and Quantum Cosmology
We apply the Hamiltonian formalism to investigate the massless sector of scalar field theory coupled with Maxwell electrodynamics through the Pontryagin term. Specifically, we analyze asymptotic symmetries at the null infinity of this theory, conserved charges, and their algebra. We find that the theory possesses asymptotic shift symmetries of the fields not present in the bulk manifold coming from the zero modes of the symplectic matrix of constraints. Consequently, we conclude that the real scalar field also contains asymptotic symmetries previously found in the literature by a different approach. We show that these symmetries are the origin of the electric-magnetic duality in electromagnetism with the topological Pontryagin term, and obtain non-trivial central extension between the electric and magnetic conserved charges. Finally, we examine the full interacting theory and find that, due to the interaction, the symmetry generators are more difficult to identify among the constraints, such that we obtain them in the weak-coupling limit. We find that the asymptotic structure of the theory simplifies due to a fast fall-off of the scalar field, leading to decoupled scalar and Maxwell asymptotic sectors, and losing the electric-magnetic duality.
title Asymptotic structure of scalar-Maxwell theory at the null boundary
topic High Energy Physics - Theory
General Relativity and Quantum Cosmology
url https://arxiv.org/abs/2407.13866