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- Alvis–Curtis_duality abstract "In mathematics, Alvis–Curtis duality is a duality operation on the characters of a reductive group over a finite field, introduced by Charles W. Curtis (1980) and studied by his student Dean Alvis (1979). Kawanaka (1981, 1982) introduced a similar duality operation for Lie algebras.Alvis–Curtis duality has order 2 and is an isometry on generalized characters.Carter (1985, 8.2) discusses Alvis–Curtis duality in detail.".
- Alvis–Curtis_duality wikiPageExternalLink books?id=LvvuAAAAMAAJ.
- Alvis–Curtis_duality wikiPageExternalLink 1195516260.
- Alvis–Curtis_duality wikiPageID "32376723".
- Alvis–Curtis_duality wikiPageLength "4353".
- Alvis–Curtis_duality wikiPageOutDegree "18".
- Alvis–Curtis_duality wikiPageRevisionID "637269306".
- Alvis–Curtis_duality wikiPageWikiLink (B,_N)_pair.
- Alvis–Curtis_duality wikiPageWikiLink BN-pair.
- Alvis–Curtis_duality wikiPageWikiLink Category:Duality_theories.
- Alvis–Curtis_duality wikiPageWikiLink Category:Representation_theory.
- Alvis–Curtis_duality wikiPageWikiLink Character_(mathematics).
- Alvis–Curtis_duality wikiPageWikiLink Cuspidal_character.
- Alvis–Curtis_duality wikiPageWikiLink Cuspidal_representation.
- Alvis–Curtis_duality wikiPageWikiLink Deligne–Lusztig_character.
- Alvis–Curtis_duality wikiPageWikiLink Deligne–Lusztig_theory.
- Alvis–Curtis_duality wikiPageWikiLink Duality_(mathematics).
- Alvis–Curtis_duality wikiPageWikiLink Finite_field.
- Alvis–Curtis_duality wikiPageWikiLink Gelfand–Graev_character.
- Alvis–Curtis_duality wikiPageWikiLink Gelfand–Graev_representation.
- Alvis–Curtis_duality wikiPageWikiLink Inventiones_Mathematicae.
- Alvis–Curtis_duality wikiPageWikiLink John_Wiley_&_Sons.
- Alvis–Curtis_duality wikiPageWikiLink Journal_of_Algebra.
- Alvis–Curtis_duality wikiPageWikiLink Mathematics.
- Alvis–Curtis_duality wikiPageWikiLink Parabolic_induction.
- Alvis–Curtis_duality wikiPageWikiLink Reductive_group.
- Alvis–Curtis_duality wikiPageWikiLink Steinberg_character.
- Alvis–Curtis_duality wikiPageWikiLink Steinberg_representation.
- Alvis–Curtis_duality wikiPageWikiLinkText "Alvis–Curtis duality".
- Alvis–Curtis_duality authorlink "Charles W. Curtis".
- Alvis–Curtis_duality b "PJ".
- Alvis–Curtis_duality b "T".
- Alvis–Curtis_duality first "Charles W.".
- Alvis–Curtis_duality hasPhotoCollection Alvis–Curtis_duality.
- Alvis–Curtis_duality last "Curtis".
- Alvis–Curtis_duality p "G".
- Alvis–Curtis_duality p "θ".
- Alvis–Curtis_duality wikiPageUsesTemplate Template:Citation.
- Alvis–Curtis_duality wikiPageUsesTemplate Template:Harvs.
- Alvis–Curtis_duality wikiPageUsesTemplate Template:Harvtxt.
- Alvis–Curtis_duality wikiPageUsesTemplate Template:Su.
- Alvis–Curtis_duality year "1980".
- Alvis–Curtis_duality subject Category:Duality_theories.
- Alvis–Curtis_duality subject Category:Representation_theory.
- Alvis–Curtis_duality comment "In mathematics, Alvis–Curtis duality is a duality operation on the characters of a reductive group over a finite field, introduced by Charles W. Curtis (1980) and studied by his student Dean Alvis (1979). Kawanaka (1981, 1982) introduced a similar duality operation for Lie algebras.Alvis–Curtis duality has order 2 and is an isometry on generalized characters.Carter (1985, 8.2) discusses Alvis–Curtis duality in detail.".
- Alvis–Curtis_duality label "Alvis–Curtis duality".
- Alvis–Curtis_duality sameAs Dualidade_de_Alvis-Curtis.
- Alvis–Curtis_duality sameAs m.0gytqq2.
- Alvis–Curtis_duality sameAs Q10268855.
- Alvis–Curtis_duality sameAs Q10268855.
- Alvis–Curtis_duality wasDerivedFrom Alvis–Curtis_duality?oldid=637269306.
- Alvis–Curtis_duality isPrimaryTopicOf Alvis–Curtis_duality.