Representations of Quantum Affinizations and Fusion Product
Identifieur interne : 000C03 ( Istex/Corpus ); précédent : 000C02; suivant : 000C04Representations of Quantum Affinizations and Fusion Product
Auteurs : David HernandezSource :
- Transformation Groups [ 1083-4362 ] ; 2005-06-01.
Abstract
Abstract: In this paper we study general quantum affinizations $\mathcal{U}_q(\widehat{\mathfrak{g}})$ of symmetrizable quantum Kac-Moody algebras and we develop their representation theory. We prove a triangular decomposition and we give a classication of (type 1) highest weight simple integrable representations analog to Drinfel'd-Chari-Presley one. A generalization of the q-characters morphism, introduced by Frenkel-Reshetikhin for quantum affine algebras, appears to be a powerful tool for this investigation. For a large class of quantum affinizations (including quantum affine algebras and quantum toroidal algebras), the combinatorics of q-characters give a ring structure * on the Grothendieck group $\text{Rep}(\mathcal{U}_q(\widehat{\mathfrak{g}}))$ of the integrable representations that we classified. We propose a new construction of tensor products in a larger category by using the Drinfel'd new coproduct (it cannot directly be used for $\text{Rep}(\mathcal{U}_q(\widehat{\mathfrak{g}}))$ because it involves infinite sums). In particular, we prove that * is a fusion product (a product of representations is a representation).
Url:
DOI: 10.1007/s00031-005-1005-9
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We prove a triangular decomposition and we give a classication of (type 1) highest weight simple integrable representations analog to Drinfel'd-Chari-Presley one. A generalization of the q-characters morphism, introduced by Frenkel-Reshetikhin for quantum affine algebras, appears to be a powerful tool for this investigation. For a large class of quantum affinizations (including quantum affine algebras and quantum toroidal algebras), the combinatorics of q-characters give a ring structure * on the Grothendieck group $\text{Rep}(\mathcal{U}_q(\widehat{\mathfrak{g}}))$ of the integrable representations that we classified. We propose a new construction of tensor products in a larger category by using the Drinfel'd new coproduct (it cannot directly be used for $\text{Rep}(\mathcal{U}_q(\widehat{\mathfrak{g}}))$ because it involves infinite sums). In particular, we prove that * is a fusion product (a product of representations is a representation).</div></front></TEI><istex><corpusName>springer-journals</corpusName><author><json:item><name>David Hernandez</name><affiliations><json:string>Ecole Normale Superieure-DMA, 45, Rue d'Ulm, F-75230 Paris, Cedex 05, France</json:string><json:string>E-mail: David.Hernandez@ens.fr</json:string></affiliations></json:item></author><articleId><json:string>1005</json:string><json:string>s00031-005-1005-9</json:string></articleId><arkIstex>ark:/67375/VQC-MPB556Z6-1</arkIstex><language><json:string>eng</json:string></language><originalGenre><json:string>OriginalPaper</json:string></originalGenre><abstract>Abstract: In this paper we study general quantum affinizations $\mathcal{U}_q(\widehat{\mathfrak{g}})$ of symmetrizable quantum Kac-Moody algebras and we develop their representation theory. We prove a triangular decomposition and we give a classication of (type 1) highest weight simple integrable representations analog to Drinfel'd-Chari-Presley one. A generalization of the q-characters morphism, introduced by Frenkel-Reshetikhin for quantum affine algebras, appears to be a powerful tool for this investigation. For a large class of quantum affinizations (including quantum affine algebras and quantum toroidal algebras), the combinatorics of q-characters give a ring structure * on the Grothendieck group $\text{Rep}(\mathcal{U}_q(\widehat{\mathfrak{g}}))$ of the integrable representations that we classified. We propose a new construction of tensor products in a larger category by using the Drinfel'd new coproduct (it cannot directly be used for $\text{Rep}(\mathcal{U}_q(\widehat{\mathfrak{g}}))$ because it involves infinite sums). 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We prove a triangular decomposition and we give a classication of (type 1) highest weight simple integrable representations analog to Drinfel'd-Chari-Presley one. A generalization of the q-characters morphism, introduced by Frenkel-Reshetikhin for quantum affine algebras, appears to be a powerful tool for this investigation. For a large class of quantum affinizations (including quantum affine algebras and quantum toroidal algebras), the combinatorics of q-characters give a ring structure * on the Grothendieck group $\text{Rep}(\mathcal{U}_q(\widehat{\mathfrak{g}}))$ of the integrable representations that we classified. We propose a new construction of tensor products in a larger category by using the Drinfel'd new coproduct (it cannot directly be used for $\text{Rep}(\mathcal{U}_q(\widehat{\mathfrak{g}}))$ because it involves infinite sums). In particular, we prove that * is a fusion product (a product of representations is a representation).</p></abstract><textClass><keywords scheme="Journal Subject"><list><head>Mathematics</head><item><term>Algebra</term></item><item><term>Topological Groups, Lie Groups</term></item></list></keywords></textClass></profileDesc><revisionDesc><change when="2003-12-17">Created</change><change when="2005-06-01">Published</change><change xml:id="refBibs-istex" who="#ISTEX-API" when="2017-11-30">References added</change></revisionDesc></teiHeader></istex:fulltextTEI></fulltext><metadata><istex:metadataXml wicri:clean="corpus springer-journals not found" wicri:toSee="no header"><istex:xmlDeclaration>version="1.0" encoding="UTF-8"</istex:xmlDeclaration><istex:docType PUBLIC="-//Springer-Verlag//DTD A++ V2.4//EN" URI="http://devel.springer.de/A++/V2.4/DTD/A++V2.4.dtd" name="istex:docType"></istex:docType><istex:document><Publisher><PublisherInfo><PublisherName>Birkhäuser-Verlag</PublisherName><PublisherLocation>Boston</PublisherLocation><PublisherURL>www.birkhauser.com</PublisherURL></PublisherInfo><Journal><JournalInfo JournalProductType="ArchiveJournal" NumberingStyle="Unnumbered"><JournalID>31</JournalID><JournalPrintISSN>1083-4362</JournalPrintISSN><JournalElectronicISSN>1531-586X</JournalElectronicISSN><JournalSPIN>s00031</JournalSPIN><JournalTitle>Transformation Groups</JournalTitle><JournalAbbreviatedTitle>Transformation Groups</JournalAbbreviatedTitle><JournalSubjectGroup><JournalSubject Type="Primary">Mathematics</JournalSubject><JournalSubject Type="Secondary">Algebra</JournalSubject><JournalSubject Type="Secondary">Topological Groups, Lie Groups</JournalSubject></JournalSubjectGroup></JournalInfo><Volume><VolumeInfo VolumeType="Regular" TocLevels="0"><VolumeIDStart>10</VolumeIDStart><VolumeIDEnd>10</VolumeIDEnd><VolumeIssueCount>6</VolumeIssueCount></VolumeInfo><Issue IssueType="Regular"><IssueInfo TocLevels="0"><IssueIDStart>2</IssueIDStart><IssueIDEnd>2</IssueIDEnd><IssueHistory><CoverDate><Year>2005</Year><Month>6</Month></CoverDate></IssueHistory><IssueCopyright><CopyrightHolderName>Birkhauser Boston</CopyrightHolderName><CopyrightYear>2005</CopyrightYear></IssueCopyright></IssueInfo><Article ID="s00031-005-1005-9"><ArticleInfo ArticleType="OriginalPaper" Language="En" NumberingStyle="Unnumbered" TocLevels="0" ContainsESM="No"><ArticleID>1005</ArticleID><ArticleDOI>10.1007/s00031-005-1005-9</ArticleDOI><ArticleSequenceNumber>2</ArticleSequenceNumber><ArticleTitle Language="En">Representations of Quantum Affinizations and Fusion Product</ArticleTitle><ArticleFirstPage>163</ArticleFirstPage><ArticleLastPage>200</ArticleLastPage><ArticleHistory><RegistrationDate><Year>2005</Year><Month>1</Month><Day>1</Day></RegistrationDate><Received><Year>2003</Year><Month>12</Month><Day>17</Day></Received><Accepted><Year>2004</Year><Month>8</Month><Day>12</Day></Accepted> </ArticleHistory><ArticleCopyright><CopyrightHolderName>Birkhauser Boston</CopyrightHolderName><CopyrightYear>2005</CopyrightYear></ArticleCopyright><ArticleGrants Type="Regular"><MetadataGrant Grant="OpenAccess"></MetadataGrant><AbstractGrant Grant="OpenAccess"></AbstractGrant><BodyPDFGrant Grant="Restricted"></BodyPDFGrant><BodyHTMLGrant Grant="Restricted"></BodyHTMLGrant><BibliographyGrant Grant="Restricted"></BibliographyGrant><ESMGrant Grant="Restricted"></ESMGrant></ArticleGrants></ArticleInfo><ArticleHeader><AuthorGroup><Author AffiliationIDS="Aff1" CorrespondingAffiliationID="Aff1"><AuthorName DisplayOrder="Western"><GivenName>David</GivenName><FamilyName>Hernandez</FamilyName></AuthorName><Contact><Email>David.Hernandez@ens.fr</Email></Contact></Author><Affiliation ID="Aff1"><OrgName>Ecole Normale Superieure-DMA, 45, Rue d'Ulm, F-75230 Paris, Cedex 05</OrgName><OrgAddress><Country>France</Country></OrgAddress></Affiliation></AuthorGroup><Abstract ID="Abs1" Language="En"><Heading>Abstract</Heading><Para>In this paper we
study general quantum affinizations <InlineEquation ID="eq1"><InlineMediaObject><ImageObject FileRef="31_2005_Article_1005_TeX2GIFeq1.gif" Format="GIF" Color="BlackWhite" Type="Linedraw" Rendition="HTML"></ImageObject></InlineMediaObject><EquationSource Format="TEX">$\mathcal{U}_q(\widehat{\mathfrak{g}})$</EquationSource></InlineEquation>
of symmetrizable quantum Kac-Moody algebras and we
develop their representation theory. We prove a
triangular decomposition and we give a classication
of (type 1) highest weight simple integrable
representations analog to Drinfel'd-Chari-Presley
one. A generalization of the q-characters
morphism, introduced by Frenkel-Reshetikhin for
quantum affine algebras, appears to be a powerful
tool for this investigation. For a large class of
quantum affinizations (including quantum affine
algebras and quantum toroidal algebras), the
combinatorics of q-characters give a ring
structure * on the Grothendieck group
<InlineEquation ID="eq2"><InlineMediaObject><ImageObject FileRef="31_2005_Article_1005_TeX2GIFeq2.gif" Format="GIF" Color="BlackWhite" Type="Linedraw" Rendition="HTML"></ImageObject></InlineMediaObject><EquationSource Format="TEX">$\text{Rep}(\mathcal{U}_q(\widehat{\mathfrak{g}}))$</EquationSource></InlineEquation>
of the integrable representations that we
classified. We propose a new construction of tensor
products in a larger category by using the
Drinfel'd new coproduct (it cannot directly be
used for <InlineEquation ID="eq3"><InlineMediaObject><ImageObject FileRef="31_2005_Article_1005_TeX2GIFeq3.gif" Format="GIF" Color="BlackWhite" Type="Linedraw" Rendition="HTML"></ImageObject></InlineMediaObject><EquationSource Format="TEX">$\text{Rep}(\mathcal{U}_q(\widehat{\mathfrak{g}}))$</EquationSource></InlineEquation>
because it involves infinite sums). In particular,
we prove that * is a fusion product (a product of
representations is a representation).</Para></Abstract></ArticleHeader><NoBody></NoBody></Article></Issue></Volume></Journal></Publisher></istex:document></istex:metadataXml><mods version="3.6"><titleInfo lang="en"><title>Representations of Quantum Affinizations and Fusion Product</title></titleInfo><titleInfo type="alternative" contentType="CDATA" lang="en"><title>Representations of Quantum Affinizations and Fusion Product</title></titleInfo><name type="personal" displayLabel="corresp"><namePart type="given">David</namePart><namePart type="family">Hernandez</namePart><affiliation>Ecole Normale Superieure-DMA, 45, Rue d'Ulm, F-75230 Paris, Cedex 05, France</affiliation><affiliation>E-mail: David.Hernandez@ens.fr</affiliation><role><roleTerm type="text">author</roleTerm></role></name><typeOfResource>text</typeOfResource><genre type="research-article" displayLabel="OriginalPaper" authority="ISTEX" authorityURI="https://content-type.data.istex.fr" valueURI="https://content-type.data.istex.fr/ark:/67375/XTP-1JC4F85T-7">research-article</genre><originInfo><publisher>Birkhäuser-Verlag; www.birkhauser.com</publisher><place><placeTerm type="text">Boston</placeTerm></place><dateCreated encoding="w3cdtf">2003-12-17</dateCreated><dateIssued encoding="w3cdtf">2005-06-01</dateIssued><dateIssued encoding="w3cdtf">2005</dateIssued><copyrightDate encoding="w3cdtf">2005</copyrightDate></originInfo><language><languageTerm type="code" authority="rfc3066">en</languageTerm><languageTerm type="code" authority="iso639-2b">eng</languageTerm></language><abstract lang="en">Abstract: In this paper we study general quantum affinizations $\mathcal{U}_q(\widehat{\mathfrak{g}})$ of symmetrizable quantum Kac-Moody algebras and we develop their representation theory. We prove a triangular decomposition and we give a classication of (type 1) highest weight simple integrable representations analog to Drinfel'd-Chari-Presley one. A generalization of the q-characters morphism, introduced by Frenkel-Reshetikhin for quantum affine algebras, appears to be a powerful tool for this investigation. For a large class of quantum affinizations (including quantum affine algebras and quantum toroidal algebras), the combinatorics of q-characters give a ring structure * on the Grothendieck group $\text{Rep}(\mathcal{U}_q(\widehat{\mathfrak{g}}))$ of the integrable representations that we classified. We propose a new construction of tensor products in a larger category by using the Drinfel'd new coproduct (it cannot directly be used for $\text{Rep}(\mathcal{U}_q(\widehat{\mathfrak{g}}))$ because it involves infinite sums). In particular, we prove that * is a fusion product (a product of representations is a representation).</abstract><relatedItem type="host"><titleInfo><title>Transformation Groups</title></titleInfo><titleInfo type="abbreviated"><title>Transformation Groups</title></titleInfo><genre type="journal" displayLabel="Archive Journal" authority="ISTEX" valueURI="https://publication-type.data.istex.fr/ark:/67375/JMC-0GLKJH51-B">journal</genre><originInfo><publisher>Springer</publisher><dateIssued encoding="w3cdtf">2005-06-01</dateIssued><copyrightDate encoding="w3cdtf">2005</copyrightDate></originInfo><subject><genre>Mathematics</genre><topic>Algebra</topic><topic>Topological Groups, Lie Groups</topic></subject><identifier type="ISSN">1083-4362</identifier><identifier type="eISSN">1531-586X</identifier><identifier type="JournalID">31</identifier><identifier type="JournalSPIN">s00031</identifier><identifier type="VolumeIssueCount">6</identifier><part><date>2005</date><detail type="volume"><number>10</number><caption>vol.</caption></detail><detail type="issue"><number>2</number><caption>no.</caption></detail><extent unit="pages"><start>163</start><end>200</end></extent></part><recordInfo><recordOrigin>Birkhauser Boston, 2005</recordOrigin></recordInfo></relatedItem><identifier type="istex">3A8EE31E1EB1ACBFB453DA841496F21B4882AE62</identifier><identifier type="ark">ark:/67375/VQC-MPB556Z6-1</identifier><identifier type="DOI">10.1007/s00031-005-1005-9</identifier><identifier type="ArticleID">1005</identifier><identifier type="ArticleID">s00031-005-1005-9</identifier><accessCondition type="use and reproduction" contentType="copyright">Birkhauser Boston, 2005</accessCondition><recordInfo><recordContentSource authority="ISTEX" authorityURI="https://loaded-corpus.data.istex.fr" valueURI="https://loaded-corpus.data.istex.fr/ark:/67375/XBH-3XSW68JL-F">springer</recordContentSource><recordOrigin>Birkhauser Boston, 2005</recordOrigin></recordInfo></mods><json:item><extension>json</extension><original>false</original><mimetype>application/json</mimetype><uri>https://api.istex.fr/document/3A8EE31E1EB1ACBFB453DA841496F21B4882AE62/metadata/json</uri></json:item></metadata><serie></serie></istex></record>Pour manipuler ce document sous Unix (Dilib)
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