Non-anticommutative chiral singlet deformation of N=(1,1) gauge theory

We study the SO(4)x SU(2) invariant Q-deformation of Euclidean N=(1,1) gauge theories in the harmonic superspace formulation. This deformation preserves chirality and Grassmann harmonic analyticity but breaks N=(1,1) to N=(1,0) supersymmetry. The action of the deformed gauge theory is an integral ov...

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Autores principales: Ferrara, S., Ivanov, E., Lechtenfeld, O., Sokatchev, E., Zupnik, B.
Lenguaje:eng
Publicado: 2004
Materias:
Particle Physics - Theory
Acceso en línea:https://dx.doi.org/10.1016/j.nuclphysb.2004.10.038
http://cds.cern.ch/record/733885
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author Ferrara, S.
Ivanov, E.
Lechtenfeld, O.
Sokatchev, E.
Zupnik, B.
author_facet Ferrara, S.
Ivanov, E.
Lechtenfeld, O.
Sokatchev, E.
Zupnik, B.
author_sort Ferrara, S.
collection CERN
description We study the SO(4)x SU(2) invariant Q-deformation of Euclidean N=(1,1) gauge theories in the harmonic superspace formulation. This deformation preserves chirality and Grassmann harmonic analyticity but breaks N=(1,1) to N=(1,0) supersymmetry. The action of the deformed gauge theory is an integral over the chiral superspace, and only the purely chiral part of the covariant superfield strength contributes to it. We give the component form of the N=(1,0) supersymmetric action for the gauge groups U(1) and U(n>1). In the U(1) and U(2) cases, we find the explicit nonlinear field redefinition (Seiberg-Witten map) relating the deformed N=(1,1) gauge multiplet to the undeformed one. This map exists in the general U(n) case as well, and we use this fact to argue that the deformed U(n) gauge theory can be nonlinearly reduced to a theory with the gauge group SU(n).
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institution Organización Europea para la Investigación Nuclear
language eng
publishDate 2004
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spelling cern-7338852023-03-14T18:21:04Zdoi:10.1016/j.nuclphysb.2004.10.038http://cds.cern.ch/record/733885engFerrara, S.Ivanov, E.Lechtenfeld, O.Sokatchev, E.Zupnik, B.Non-anticommutative chiral singlet deformation of N=(1,1) gauge theoryParticle Physics - TheoryWe study the SO(4)x SU(2) invariant Q-deformation of Euclidean N=(1,1) gauge theories in the harmonic superspace formulation. This deformation preserves chirality and Grassmann harmonic analyticity but breaks N=(1,1) to N=(1,0) supersymmetry. The action of the deformed gauge theory is an integral over the chiral superspace, and only the purely chiral part of the covariant superfield strength contributes to it. We give the component form of the N=(1,0) supersymmetric action for the gauge groups U(1) and U(n>1). In the U(1) and U(2) cases, we find the explicit nonlinear field redefinition (Seiberg-Witten map) relating the deformed N=(1,1) gauge multiplet to the undeformed one. This map exists in the general U(n) case as well, and we use this fact to argue that the deformed U(n) gauge theory can be nonlinearly reduced to a theory with the gauge group SU(n).We study the SO(4)x SU(2) invariant Q-deformation of Euclidean N=(1,1) gauge theories in the harmonic superspace formulation. This deformation preserves chirality and Grassmann harmonic analyticity but breaks N=(1,1) to N=(1,0) supersymmetry. The action of the deformed gauge theory is an integral over the chiral superspace, and only the purely chiral part of the covariant superfield strength contributes to it. We give the component form of the N=(1,0) supersymmetric action for the gauge groups U(1) and U(n>1). In the U(1) and U(2) cases, we find the explicit nonlinear field redefinition (Seiberg-Witten map) relating the deformed N=(1,1) gauge multiplet to the undeformed one. This map exists in the general U(n) case as well, and we use this fact to argue that the deformed U(n) gauge theory can be nonlinearly reduced to a theory with the gauge group SU(n).We study the SO ( 4 ) × SU ( 2 ) invariant Q-deformation of Euclidean N = ( 1 , 1 ) gauge theories in the harmonic superspace formulation. This deformation preserves chirality and Grassmann harmonic analyticity but breaks N = ( 1 , 1 ) to N = ( 1 , 0 ) supersymmetry. The action of the deformed gauge theory is an integral over the chiral superspace, and only the purely chiral part of the covariant superfield strength contributes to it. We give the component form of the N = ( 1 , 0 ) supersymmetric action for the gauge groups U(1) and U ( n > 1 ) . In the U(1) and U(2) cases, we find the explicit nonlinear field redefinition (Seiberg–Witten map) relating the deformed N = ( 1 , 1 ) gauge multiplet to the undeformed one. This map exists in the general U ( n ) case as well, and we use this fact to argue that the deformed U ( n ) gauge theory can be nonlinearly reduced to a theory with the gauge group SU ( n ) .hep-th/0405049CERN-PH-TH-2004-032ITP-UH-10-04LAPTH-1041-04CERN-PH-TH-2004-032ITP-UH-2004-10LAPP-TH-1041oai:cds.cern.ch:7338852004
spellingShingle Particle Physics - Theory
Ferrara, S.
Ivanov, E.
Lechtenfeld, O.
Sokatchev, E.
Zupnik, B.
Non-anticommutative chiral singlet deformation of N=(1,1) gauge theory
title Non-anticommutative chiral singlet deformation of N=(1,1) gauge theory
title_full Non-anticommutative chiral singlet deformation of N=(1,1) gauge theory
title_fullStr Non-anticommutative chiral singlet deformation of N=(1,1) gauge theory
title_full_unstemmed Non-anticommutative chiral singlet deformation of N=(1,1) gauge theory
title_short Non-anticommutative chiral singlet deformation of N=(1,1) gauge theory
title_sort non-anticommutative chiral singlet deformation of n=(1,1) gauge theory
topic Particle Physics - Theory
url https://dx.doi.org/10.1016/j.nuclphysb.2004.10.038
http://cds.cern.ch/record/733885
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AT ivanove nonanticommutativechiralsingletdeformationofn11gaugetheory
AT lechtenfeldo nonanticommutativechiralsingletdeformationofn11gaugetheory
AT sokatcheve nonanticommutativechiralsingletdeformationofn11gaugetheory
AT zupnikb nonanticommutativechiralsingletdeformationofn11gaugetheory

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