About: Module of covariants

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In algebra, given an algebraic group G, a G-module M and a G-algebra A, all over a field k, the module of covariants of type M is the -module where refers to taking the elements fixed by the action of G; thus, is the ring of invariants of A.

Property	Value
dbo:abstract	In algebra, given an algebraic group G, a G-module M and a G-algebra A, all over a field k, the module of covariants of type M is the -module where refers to taking the elements fixed by the action of G; thus, is the ring of invariants of A. (en) Inom matematiken, givet en G, en G-modul M och en G-algebra A, alla över en kropp k, är modulen av kovarianter av typ M -modulen (sv)
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dbo:wikiPageWikiLink	dbr:Algebraic_group dbc:Module_theory dbr:Local_cohomology dbr:Algebra dbr:Field_(mathematics) dbr:Group_representation dbr:Ring_of_invariants
dbp:wikiPageUsesTemplate	dbt:Algebra-stub
dcterms:subject	dbc:Module_theory
rdfs:comment	In algebra, given an algebraic group G, a G-module M and a G-algebra A, all over a field k, the module of covariants of type M is the -module where refers to taking the elements fixed by the action of G; thus, is the ring of invariants of A. (en) Inom matematiken, givet en G, en G-modul M och en G-algebra A, alla över en kropp k, är modulen av kovarianter av typ M -modulen (sv)
rdfs:label	Module of covariants (en) Modul av kovarianter (sv)
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