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Affine Lie algebra symmetry of sine-Gordon theory at reflectionless points

The quantum affine symmetry of the sine-Gordon theory at q^2 = 1, which occurs at the reflectionless points, is studied. Conserved currents that correspond to the closure of simple root generators are considered, and shown to be local. We argue that they satisfy the affine sl(2) algebra. Examples of...

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Detalles Bibliográficos
Autores principales: LeClair, Andre, Nemeschansky, Dennis
Lenguaje:eng
Publicado: 1995
Materias:
Acceso en línea:https://dx.doi.org/10.1142/S0217732396000163
http://cds.cern.ch/record/284051
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author LeClair, Andre
Nemeschansky, Dennis
author_facet LeClair, Andre
Nemeschansky, Dennis
author_sort LeClair, Andre
collection CERN
description The quantum affine symmetry of the sine-Gordon theory at q^2 = 1, which occurs at the reflectionless points, is studied. Conserved currents that correspond to the closure of simple root generators are considered, and shown to be local. We argue that they satisfy the affine sl(2) algebra. Examples of these currents are explicitly constructed.
id cern-284051
institution Organización Europea para la Investigación Nuclear
language eng
publishDate 1995
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spelling cern-2840512023-03-14T18:55:57Zdoi:10.1142/S0217732396000163http://cds.cern.ch/record/284051engLeClair, AndreNemeschansky, DennisAffine Lie algebra symmetry of sine-Gordon theory at reflectionless pointsParticle Physics - TheoryThe quantum affine symmetry of the sine-Gordon theory at q^2 = 1, which occurs at the reflectionless points, is studied. Conserved currents that correspond to the closure of simple root generators are considered, and shown to be local. We argue that they satisfy the affine sl(2) algebra. Examples of these currents are explicitly constructed.The quantum affine symmetry of the sine-Gordon theory at q~2 = 1, which occurs at the reflectionless points, is studied. Conserved currents that correspond to the closure of simple root generators are considered, and shown to be local. We argue that they satisfy the affine sl(2) algebra. Examples of these currents are explicitly constructed.The quantum affine symmetry of the sine-Gordon theory at q^2 = 1, which occurs at the reflectionless points, is studied. Conserved currents that correspond to the closure of simple root generators are considered, and shown to be local. We argue that they satisfy the affine sl(2) algebra. Examples of these currents are explicitly constructed.hep-th/9506198CLNS-95-1340CERN-TH-95-113CERN-TH-95-113CLNS-1340oai:cds.cern.ch:2840511995-06-29
spellingShingle Particle Physics - Theory
LeClair, Andre
Nemeschansky, Dennis
Affine Lie algebra symmetry of sine-Gordon theory at reflectionless points
title Affine Lie algebra symmetry of sine-Gordon theory at reflectionless points
title_full Affine Lie algebra symmetry of sine-Gordon theory at reflectionless points
title_fullStr Affine Lie algebra symmetry of sine-Gordon theory at reflectionless points
title_full_unstemmed Affine Lie algebra symmetry of sine-Gordon theory at reflectionless points
title_short Affine Lie algebra symmetry of sine-Gordon theory at reflectionless points
title_sort affine lie algebra symmetry of sine-gordon theory at reflectionless points
topic Particle Physics - Theory
url https://dx.doi.org/10.1142/S0217732396000163
http://cds.cern.ch/record/284051
work_keys_str_mv AT leclairandre affineliealgebrasymmetryofsinegordontheoryatreflectionlesspoints
AT nemeschanskydennis affineliealgebrasymmetryofsinegordontheoryatreflectionlesspoints