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The Enumeration of Fully Commutative Elements of Coxeter Groups
dc.contributor.authorStembridge, John R.en_US
dc.date.accessioned2006-09-11T17:36:21Z
dc.date.available2006-09-11T17:36:21Z
dc.date.issued1998-05en_US
dc.identifier.citationStembridge, John R.; (1998). "The Enumeration of Fully Commutative Elements of Coxeter Groups." Journal of Algebraic Combinatorics 7(3): 291-320. <http://hdl.handle.net/2027.42/46294>en_US
dc.identifier.issn0925-9899en_US
dc.identifier.issn1572-9192en_US
dc.identifier.urihttps://hdl.handle.net/2027.42/46294
dc.description.abstractA Coxeter group element w is fully commutative if any reduced expression for w can be obtained from any other via the interchange of commuting generators. For example, in the symmetric group of degree n, the number of fully commutative elements is the nth Catalan number. The Coxeter groups with finitely many fully commutative elements can be arranged into seven infinite families A n , B n , D n , E n ,F n , H n and I 2 (m). For each family, we provide explicit generating functions for the number of fully commutative elements and the number of fully commutative involutions; in each case, the generating function is algebraic.en_US
dc.format.extent246501 bytes
dc.format.extent3115 bytes
dc.format.mimetypeapplication/pdf
dc.format.mimetypetext/plain
dc.language.isoen_US
dc.publisherKluwer Academic Publishers; Springer Science+Business Mediaen_US
dc.subject.otherMathematicsen_US
dc.subject.otherComputer Science, Generalen_US
dc.subject.otherGroup Theory and Generalizationsen_US
dc.subject.otherOrder, Lattices, Ordered Algebraic Structuresen_US
dc.subject.otherCombinatoricsen_US
dc.subject.otherConvex and Discrete Geometryen_US
dc.subject.otherCoxeter Groupen_US
dc.subject.otherReduced Worden_US
dc.subject.otherBraid Relationen_US
dc.titleThe Enumeration of Fully Commutative Elements of Coxeter Groupsen_US
dc.typeArticleen_US
dc.subject.hlbsecondlevelMathematicsen_US
dc.subject.hlbtoplevelScienceen_US
dc.description.peerreviewedPeer Revieweden_US
dc.contributor.affiliationumDepartment of Mathematics, University of Michigan, Ann Arbor, Michigan, 48109–1109en_US
dc.contributor.affiliationumcampusAnn Arboren_US
dc.description.bitstreamurlhttp://deepblue.lib.umich.edu/bitstream/2027.42/46294/1/10801_2004_Article_157578.pdfen_US
dc.identifier.doihttp://dx.doi.org/10.1023/A:1008623323374en_US
dc.identifier.sourceJournal of Algebraic Combinatoricsen_US
dc.owningcollnameInterdisciplinary and Peer-Reviewed


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