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- Iwahori–Hecke_algebra abstract "In mathematics, the Iwahori–Hecke algebra, or Hecke algebra, named for Erich Hecke and Nagayoshi Iwahori, is a one-parameter deformation of the group algebra of a Coxeter group.Hecke algebras are quotients of the group rings of Artin braid groups. This connection found a spectacular application in Vaughan Jones' construction of new invariants of knots. Representations of Hecke algebras led to discovery of quantum groups by Michio Jimbo. Michael Freedman proposed Hecke algebras as a foundation for topological quantum computation.".
- Iwahori–Hecke_algebra wikiPageID "521808".
- Iwahori–Hecke_algebra wikiPageRevisionID "583014531".
- Iwahori–Hecke_algebra b "s".
- Iwahori–Hecke_algebra p "-1".
- Iwahori–Hecke_algebra p "±½".
- Iwahori–Hecke_algebra p "½".
- Iwahori–Hecke_algebra subject Category:Algebras.
- Iwahori–Hecke_algebra subject Category:Representation_theory.
- Iwahori–Hecke_algebra comment "In mathematics, the Iwahori–Hecke algebra, or Hecke algebra, named for Erich Hecke and Nagayoshi Iwahori, is a one-parameter deformation of the group algebra of a Coxeter group.Hecke algebras are quotients of the group rings of Artin braid groups. This connection found a spectacular application in Vaughan Jones' construction of new invariants of knots. Representations of Hecke algebras led to discovery of quantum groups by Michio Jimbo.".
- Iwahori–Hecke_algebra label "Algèbre de Hecke".
- Iwahori–Hecke_algebra label "Iwahori–Hecke algebra".
- Iwahori–Hecke_algebra label "ヘッケ環".
- Iwahori–Hecke_algebra label "黑克代數".
- Iwahori–Hecke_algebra sameAs Iwahori%E2%80%93Hecke_algebra.
- Iwahori–Hecke_algebra sameAs Algèbre_de_Hecke.
- Iwahori–Hecke_algebra sameAs ヘッケ環.
- Iwahori–Hecke_algebra sameAs Q1012612.
- Iwahori–Hecke_algebra sameAs Q1012612.
- Iwahori–Hecke_algebra wasDerivedFrom Iwahori–Hecke_algebra?oldid=583014531.