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dc.contributor.author오세진*
dc.date.accessioned2019-07-01T16:30:05Z-
dc.date.available2019-07-01T16:30:05Z-
dc.date.issued2019*
dc.identifier.issn0925-9899*
dc.identifier.issn1572-9192*
dc.identifier.otherOAK-24923*
dc.identifier.urihttps://dspace.ewha.ac.kr/handle/2015.oak/250027-
dc.description.abstractWe prove that the Grothendieck rings of category CQ(t)</mml:msubsup> over quantum affine algebras Uq</mml:msubsup>(g(t))(t=1,2) associated with each Dynkin quiver Q of finite type A2n-1 (resp. Dn+1) are isomorphic to one of the categories CQ over the Langlands dual Uq(Lg(2)) of Uq(g(2)) associated with any twisted adapted class [Q] of <mml:msub>A2n-1 (resp. <mml:msub>Dn+1). This results provide simplicity-preserving correspondences on Langlands duality for finite-dimensional representation of quantum affine algebras, suggested by Frenkel-Hernandez.*
dc.languageEnglish*
dc.publisherSPRINGER*
dc.subjectLongest element*
dc.subjectr-Cluster point*
dc.subjectSchur-Weyl diagram*
dc.subjectCombinatorial Auslander-Reiten quivers*
dc.subjectLanglands duality*
dc.titleCategorical relations between Langlands dual quantum affine algebras: doubly laced types*
dc.typeArticle*
dc.relation.issue4*
dc.relation.volume49*
dc.relation.indexSCIE*
dc.relation.indexSCOPUS*
dc.relation.startpage401*
dc.relation.lastpage435*
dc.relation.journaltitleJOURNAL OF ALGEBRAIC COMBINATORICS*
dc.identifier.doi10.1007/s10801-018-0829-z*
dc.identifier.wosidWOS:000468972800002*
dc.author.googleKashiwara, Masaki*
dc.author.googleOh, Se-jin*
dc.contributor.scopusid오세진(55636183200)*
dc.date.modifydate20240222164805*
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자연과학대학 > 수학전공 > Journal papers
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