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Globally conformal invariant gauge field theory with rational correlation functions
Operator product expansions (OPE) for the product of a scalar field with its conjugate are presented as infinite sums of bilocal fields $V_{\kappa} (x_1, x_2)$ of dimension $(\kappa, \kappa)$. For a {\it globally conformal invariant} (GCI) theory we write down the OPE of $V_{\kappa}$ into a series o...
| Autores principales: | , , |
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| Lenguaje: | eng |
| Publicado: |
2003
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| Materias: | |
| Acceso en línea: | https://dx.doi.org/10.1016/j.nuclphysb.2003.08.006 http://cds.cern.ch/record/617903 |
| _version_ | 1780900316311453696 |
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| author | Nikolov, Nikolay M. Stanev, Yassen S. Todorov, Ivan T. |
| author_facet | Nikolov, Nikolay M. Stanev, Yassen S. Todorov, Ivan T. |
| author_sort | Nikolov, Nikolay M. |
| collection | CERN |
| description | Operator product expansions (OPE) for the product of a scalar field with its conjugate are presented as infinite sums of bilocal fields $V_{\kappa} (x_1, x_2)$ of dimension $(\kappa, \kappa)$. For a {\it globally conformal invariant} (GCI) theory we write down the OPE of $V_{\kappa}$ into a series of {\it twist} (dimension minus rank) $2\kappa$ symmetric traceless tensor fields with coefficients computed from the (rational) 4-point function of the scalar field. We argue that the theory of a GCI hermitian scalar field ${\cal L} (x)$ of dimension 4 in $D = 4$ Minkowski space such that the 3-point functions of a pair of ${\cal L}$'s and a scalar field of dimension 2 or 4 vanish can be interpreted as the theory of local observables of a conformally invariant fixed point in a gauge theory with Lagrangian density ${\cal L} (x)$. |
| id | cern-617903 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 2003 |
| record_format | invenio |
| spelling | cern-6179032023-03-14T18:09:13Zdoi:10.1016/j.nuclphysb.2003.08.006http://cds.cern.ch/record/617903engNikolov, Nikolay M.Stanev, Yassen S.Todorov, Ivan T.Globally conformal invariant gauge field theory with rational correlation functionsParticle Physics - TheoryOperator product expansions (OPE) for the product of a scalar field with its conjugate are presented as infinite sums of bilocal fields $V_{\kappa} (x_1, x_2)$ of dimension $(\kappa, \kappa)$. For a {\it globally conformal invariant} (GCI) theory we write down the OPE of $V_{\kappa}$ into a series of {\it twist} (dimension minus rank) $2\kappa$ symmetric traceless tensor fields with coefficients computed from the (rational) 4-point function of the scalar field. We argue that the theory of a GCI hermitian scalar field ${\cal L} (x)$ of dimension 4 in $D = 4$ Minkowski space such that the 3-point functions of a pair of ${\cal L}$'s and a scalar field of dimension 2 or 4 vanish can be interpreted as the theory of local observables of a conformally invariant fixed point in a gauge theory with Lagrangian density ${\cal L} (x)$.Operator product expansions (OPE) for the product of a scalar field with its conjugate are presented as infinite sums of bilocal fields V_k (x_1, x_2) of dimension (k,k). For a {\it globally conformal invariant} (GCI) theory we write down the OPE of V_k into a series of {\it twist} (dimension minus rank) 2k symmetric traceless tensor fields with coefficients computed from the (rational) 4-point function of the scalar field. We argue that the theory of a GCI hermitian scalar field L(x) of dimension 4 in D = 4 Minkowski space such that the 3-point functions of a pair of L's and a scalar field of dimension 2 or 4 vanish can be interpreted as the theory of local observables of a conformally invariant fixed point in a gauge theory with Lagrangian density L(x).Operator product expansions (OPE) for the product of a scalar field with its conjugate are presented as infinite sums of bilocal fields V κ ( x 1 , x 2 ) of dimension ( κ , κ ). For a globally conformal invariant (GCI) theory we write down the OPE of V κ into a series of twist (dimension minus rank) 2 κ symmetric traceless tensor fields with coefficients computed from the (rational) 4-point function of the scalar field.hep-th/0305200IHES-P-03-16CERN-TH-2003-056ROM2F-2003-12IHES-P-2003-16CERN-TH-2003-056oai:cds.cern.ch:6179032003-05-22 |
| spellingShingle | Particle Physics - Theory Nikolov, Nikolay M. Stanev, Yassen S. Todorov, Ivan T. Globally conformal invariant gauge field theory with rational correlation functions |
| title | Globally conformal invariant gauge field theory with rational correlation functions |
| title_full | Globally conformal invariant gauge field theory with rational correlation functions |
| title_fullStr | Globally conformal invariant gauge field theory with rational correlation functions |
| title_full_unstemmed | Globally conformal invariant gauge field theory with rational correlation functions |
| title_short | Globally conformal invariant gauge field theory with rational correlation functions |
| title_sort | globally conformal invariant gauge field theory with rational correlation functions |
| topic | Particle Physics - Theory |
| url | https://dx.doi.org/10.1016/j.nuclphysb.2003.08.006 http://cds.cern.ch/record/617903 |
| work_keys_str_mv | AT nikolovnikolaym globallyconformalinvariantgaugefieldtheorywithrationalcorrelationfunctions AT stanevyassens globallyconformalinvariantgaugefieldtheorywithrationalcorrelationfunctions AT todorovivant globallyconformalinvariantgaugefieldtheorywithrationalcorrelationfunctions |