Coset construction from functional integrals
Identifieur interne : 000674 ( France/Analysis ); précédent : 000673; suivant : 000675Coset construction from functional integrals
Auteurs : K. Gawe Dzki [France] ; A. Kupiainen [Finlande]Source :
- Nuclear Physics, Section B [ 0550-3213 ] ; 1989.
English descriptors
- KwdEn :
- Algebra, Cartan, Cartan subgroup, Central charge, Chiral, Chiral gauge transformations, Commun, Compact case, Conformal, Conformal weights, Coroot lattice, Correlation functions, Coset, Coset construction, Cosetconstruction, Dual space, Factorized, Factorized form, Factorized picture, Field configurations, Functional integral, Functional integrals, Gauge field, Gauge fields, Gawgdzki, Highest weight, Highest weights, Invariance, Irreducible, Kupiainen, Kupiainen coset construction, Kupiainen cosetconstruction, Lett, Mass matrices, Matrix, Nucl, Operator language, Parafermionic, Parafermionic theories, Partition, Partition function, Partition functions, Phys, Preprint, Primary field, Primary states, Scalar product, Second term, Sect, Sesquilinear combination, Sigma model, Simple components, String functions, Subgroup, Toroidal, Toroidal partition function, Toroidal partition functions, Unitary, Virasoro, Virasoro algebra, Ward identities, Weyl, Zamolodchikov.
- Teeft :
- Algebra, Cartan, Cartan subgroup, Central charge, Chiral, Chiral gauge transformations, Commun, Compact case, Conformal, Conformal weights, Coroot lattice, Correlation functions, Coset, Coset construction, Cosetconstruction, Dual space, Factorized, Factorized form, Factorized picture, Field configurations, Functional integral, Functional integrals, Gauge field, Gauge fields, Gawgdzki, Highest weight, Highest weights, Invariance, Irreducible, Kupiainen, Kupiainen coset construction, Kupiainen cosetconstruction, Lett, Mass matrices, Matrix, Nucl, Operator language, Parafermionic, Parafermionic theories, Partition, Partition function, Partition functions, Phys, Preprint, Primary field, Primary states, Scalar product, Second term, Sect, Sesquilinear combination, Sigma model, Simple components, String functions, Subgroup, Toroidal, Toroidal partition function, Toroidal partition functions, Unitary, Virasoro, Virasoro algebra, Ward identities, Weyl, Zamolodchikov.
Abstract
Abstract: A detailed study of the gauged Wess-Zumino-Witten models is presented. These models are shown to be conformal field theories realizing the Goddard-Kent-Olive coset construction. Partition functions are computed for an arbitrary group G with a subgroup H gauged. Correlation functions are shown to be computable in terms of WZW ones. Explicit cases of the minimal models and parafemmionic theories are worked out.
Url:
DOI: 10.1016/0550-3213(89)90015-1
Affiliations:
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ISTEX:9CAADECFDF6C925BD6269E29D5A52151B4E9B10CLe document en format XML
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Kupiainen</name><affiliation wicri:level="1"><country xml:lang="fr">Finlande</country><wicri:regionArea>Research Institute for Theoretical Physics, Helsinki University, 00170 Helsinki</wicri:regionArea><wicri:noRegion>00170 Helsinki</wicri:noRegion></affiliation></author></analytic><monogr></monogr><series><title level="j">Nuclear Physics, Section B</title><title level="j" type="abbrev">NUPHB</title><idno type="ISSN">0550-3213</idno><imprint><publisher>ELSEVIER</publisher><date type="published" when="1989">1989</date><biblScope unit="volume">320</biblScope><biblScope unit="issue">3</biblScope><biblScope unit="page" from="625">625</biblScope><biblScope unit="page" to="668">668</biblScope></imprint><idno type="ISSN">0550-3213</idno></series></biblStruct></sourceDesc><seriesStmt><idno type="ISSN">0550-3213</idno></seriesStmt></fileDesc><profileDesc><textClass><keywords scheme="KwdEn" xml:lang="en"><term>Algebra</term><term>Cartan</term><term>Cartan subgroup</term><term>Central charge</term><term>Chiral</term><term>Chiral gauge transformations</term><term>Commun</term><term>Compact case</term><term>Conformal</term><term>Conformal weights</term><term>Coroot lattice</term><term>Correlation functions</term><term>Coset</term><term>Coset construction</term><term>Cosetconstruction</term><term>Dual space</term><term>Factorized</term><term>Factorized form</term><term>Factorized picture</term><term>Field configurations</term><term>Functional integral</term><term>Functional integrals</term><term>Gauge field</term><term>Gauge fields</term><term>Gawgdzki</term><term>Highest weight</term><term>Highest weights</term><term>Invariance</term><term>Irreducible</term><term>Kupiainen</term><term>Kupiainen coset construction</term><term>Kupiainen cosetconstruction</term><term>Lett</term><term>Mass matrices</term><term>Matrix</term><term>Nucl</term><term>Operator language</term><term>Parafermionic</term><term>Parafermionic theories</term><term>Partition</term><term>Partition function</term><term>Partition functions</term><term>Phys</term><term>Preprint</term><term>Primary field</term><term>Primary states</term><term>Scalar product</term><term>Second term</term><term>Sect</term><term>Sesquilinear combination</term><term>Sigma model</term><term>Simple components</term><term>String functions</term><term>Subgroup</term><term>Toroidal</term><term>Toroidal partition function</term><term>Toroidal partition functions</term><term>Unitary</term><term>Virasoro</term><term>Virasoro algebra</term><term>Ward identities</term><term>Weyl</term><term>Zamolodchikov</term></keywords><keywords scheme="Teeft" xml:lang="en"><term>Algebra</term><term>Cartan</term><term>Cartan subgroup</term><term>Central charge</term><term>Chiral</term><term>Chiral gauge transformations</term><term>Commun</term><term>Compact case</term><term>Conformal</term><term>Conformal weights</term><term>Coroot lattice</term><term>Correlation functions</term><term>Coset</term><term>Coset construction</term><term>Cosetconstruction</term><term>Dual space</term><term>Factorized</term><term>Factorized form</term><term>Factorized picture</term><term>Field configurations</term><term>Functional integral</term><term>Functional integrals</term><term>Gauge field</term><term>Gauge fields</term><term>Gawgdzki</term><term>Highest weight</term><term>Highest weights</term><term>Invariance</term><term>Irreducible</term><term>Kupiainen</term><term>Kupiainen coset construction</term><term>Kupiainen cosetconstruction</term><term>Lett</term><term>Mass matrices</term><term>Matrix</term><term>Nucl</term><term>Operator language</term><term>Parafermionic</term><term>Parafermionic theories</term><term>Partition</term><term>Partition function</term><term>Partition functions</term><term>Phys</term><term>Preprint</term><term>Primary field</term><term>Primary states</term><term>Scalar product</term><term>Second term</term><term>Sect</term><term>Sesquilinear combination</term><term>Sigma model</term><term>Simple components</term><term>String functions</term><term>Subgroup</term><term>Toroidal</term><term>Toroidal partition function</term><term>Toroidal partition functions</term><term>Unitary</term><term>Virasoro</term><term>Virasoro algebra</term><term>Ward identities</term><term>Weyl</term><term>Zamolodchikov</term></keywords></textClass><langUsage><language ident="en">en</language></langUsage></profileDesc></teiHeader><front><div type="abstract" xml:lang="en">Abstract: A detailed study of the gauged Wess-Zumino-Witten models is presented. These models are shown to be conformal field theories realizing the Goddard-Kent-Olive coset construction. Partition functions are computed for an arbitrary group G with a subgroup H gauged. Correlation functions are shown to be computable in terms of WZW ones. Explicit cases of the minimal models and parafemmionic theories are worked out.</div></front></TEI><affiliations><list><country><li>Finlande</li><li>France</li></country><region><li>Île-de-France</li></region><settlement><li>Bures-sur-Yvette</li></settlement></list><tree><country name="France"><region name="Île-de-France"><name sortKey="Gawe Dzki, K" sort="Gawe Dzki, K" uniqKey="Gawe Dzki K" first="K." last="Gawe Dzki">K. Gawe Dzki</name></region></country><country name="Finlande"><noRegion><name sortKey="Kupiainen, A" sort="Kupiainen, A" uniqKey="Kupiainen A" first="A." last="Kupiainen">A. Kupiainen</name></noRegion></country></tree></affiliations></record>Pour manipuler ce document sous Unix (Dilib)
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