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- Jacquet_module abstract "In mathematics, the Jacquet module J(V) of a linear representation V of a group N is the space of co-invariants of N; or in other words the largest quotient of V on which N acts trivially, or the zeroth homology group H0(N,V). The Jacquet functor J is the functor taking V to its Jacquet module J(V). Use of the phrase "Jacquet module" often implies that V is an admissible representation of a reductive algebraic group G over a local field, and N is the unipotent radical of a parabolic subgroup of G. In the case of p-adic groups they were studied by Jacquet (1971).".
- Jacquet_module wikiPageExternalLink ICM1978.2.
- Jacquet_module wikiPageID "32162058".
- Jacquet_module wikiPageLength "1636".
- Jacquet_module wikiPageOutDegree "11".
- Jacquet_module wikiPageRevisionID "581851842".
- Jacquet_module wikiPageWikiLink Admissible_representation.
- Jacquet_module wikiPageWikiLink Borel_subgroup.
- Jacquet_module wikiPageWikiLink Category:Representation_theory.
- Jacquet_module wikiPageWikiLink Functor.
- Jacquet_module wikiPageWikiLink Group_(mathematics).
- Jacquet_module wikiPageWikiLink Homology_(mathematics).
- Jacquet_module wikiPageWikiLink Homology_group.
- Jacquet_module wikiPageWikiLink Linear_representation.
- Jacquet_module wikiPageWikiLink Local_field.
- Jacquet_module wikiPageWikiLink Mathematics.
- Jacquet_module wikiPageWikiLink Parabolic_subgroup.
- Jacquet_module wikiPageWikiLink Reductive_algebraic_group.
- Jacquet_module wikiPageWikiLink Reductive_group.
- Jacquet_module wikiPageWikiLink Representation_theory.
- Jacquet_module wikiPageWikiLink Unipotent.
- Jacquet_module wikiPageWikiLink Unipotent_radical.
- Jacquet_module wikiPageWikiLinkText "Jacquet module".
- Jacquet_module hasPhotoCollection Jacquet_module.
- Jacquet_module wikiPageUsesTemplate Template:Citation.
- Jacquet_module wikiPageUsesTemplate Template:Harvs.
- Jacquet_module subject Category:Representation_theory.
- Jacquet_module hypernym Space.
- Jacquet_module type Field.
- Jacquet_module comment "In mathematics, the Jacquet module J(V) of a linear representation V of a group N is the space of co-invariants of N; or in other words the largest quotient of V on which N acts trivially, or the zeroth homology group H0(N,V). The Jacquet functor J is the functor taking V to its Jacquet module J(V).".
- Jacquet_module label "Jacquet module".
- Jacquet_module sameAs m.0gwypkc.
- Jacquet_module sameAs Q6120995.
- Jacquet_module sameAs Q6120995.
- Jacquet_module wasDerivedFrom Jacquet_module?oldid=581851842.
- Jacquet_module isPrimaryTopicOf Jacquet_module.