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- Q10268855 subject Q7451460.
- Q10268855 subject Q8653246.
- Q10268855 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.".
- Q10268855 wikiPageExternalLink books?id=LvvuAAAAMAAJ.
- Q10268855 wikiPageExternalLink 1195516260.
- Q10268855 wikiPageWikiLink Q1006450.
- Q10268855 wikiPageWikiLink Q1062934.
- Q10268855 wikiPageWikiLink Q1317188.
- Q10268855 wikiPageWikiLink Q1479654.
- Q10268855 wikiPageWikiLink Q1755512.
- Q10268855 wikiPageWikiLink Q2660497.
- Q10268855 wikiPageWikiLink Q32229.
- Q10268855 wikiPageWikiLink Q395.
- Q10268855 wikiPageWikiLink Q5196235.
- Q10268855 wikiPageWikiLink Q5253966.
- Q10268855 wikiPageWikiLink Q5530426.
- Q10268855 wikiPageWikiLink Q603880.
- Q10268855 wikiPageWikiLink Q7133735.
- Q10268855 wikiPageWikiLink Q7451460.
- Q10268855 wikiPageWikiLink Q7606832.
- Q10268855 wikiPageWikiLink Q8653246.
- Q10268855 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.".
- Q10268855 label "Alvis–Curtis duality".