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- Q5255108 subject Q8653246.
- Q5255108 abstract "In mathematics, a Demazure module, introduced by Demazure (1974a, 1974b), is a submodule of a finite-dimensional representation generated by an extremal weight space under the action of a Borel subalgebra. The Demazure character formula, introduced by Demazure (1974b, theorem 2), gives the characters of Demazure modules, and is a generalization of the Weyl character formula.The dimension of a Demazure module is a polynomial in the highest weight, called a Demazure polynomial.".
- Q5255108 wikiPageExternalLink item?id=ASENS_1985_4_18_3_389_0.
- Q5255108 wikiPageExternalLink item?id=ASENS_1974_4_7_1_53_0.
- Q5255108 wikiPageWikiLink Q1385427.
- Q5255108 wikiPageWikiLink Q164405.
- Q5255108 wikiPageWikiLink Q2660497.
- Q5255108 wikiPageWikiLink Q2912114.
- Q5255108 wikiPageWikiLink Q32229.
- Q5255108 wikiPageWikiLink Q4944913.
- Q5255108 wikiPageWikiLink Q5312829.
- Q5255108 wikiPageWikiLink Q564426.
- Q5255108 wikiPageWikiLink Q7432938.
- Q5255108 wikiPageWikiLink Q768074.
- Q5255108 wikiPageWikiLink Q7990328.
- Q5255108 wikiPageWikiLink Q856666.
- Q5255108 wikiPageWikiLink Q8653246.
- Q5255108 comment "In mathematics, a Demazure module, introduced by Demazure (1974a, 1974b), is a submodule of a finite-dimensional representation generated by an extremal weight space under the action of a Borel subalgebra. The Demazure character formula, introduced by Demazure (1974b, theorem 2), gives the characters of Demazure modules, and is a generalization of the Weyl character formula.The dimension of a Demazure module is a polynomial in the highest weight, called a Demazure polynomial.".
- Q5255108 label "Demazure module".