About: Diagonalizable group

An Entity of Type: Abstraction100002137, from Named Graph: http://dbpedia.org, within Data Space: dbpedia.org

In mathematics, an affine algebraic group is said to be diagonalizable if it is isomorphic to a subgroup of Dn, the group of diagonal matrices. A diagonalizable group defined over a field k is said to split over k or k-split if the isomorphism is defined over k. This coincides with the usual notion of split for an algebraic group. Every diagonalizable group splits over the separable closure ks of k. Any closed subgroup and image of diagonalizable groups are diagonalizable. The torsion subgroup of a diagonalizable group is dense.

Property	Value
dbo:abstract	In mathematics, an affine algebraic group is said to be diagonalizable if it is isomorphic to a subgroup of Dn, the group of diagonal matrices. A diagonalizable group defined over a field k is said to split over k or k-split if the isomorphism is defined over k. This coincides with the usual notion of split for an algebraic group. Every diagonalizable group splits over the separable closure ks of k. Any closed subgroup and image of diagonalizable groups are diagonalizable. The torsion subgroup of a diagonalizable group is dense. The category of diagonalizable groups defined over k is equivalent to the category of finitely generated abelian groups with Gal(ks/k)-equivariant morphisms without p-torsion, if k is of characteristic p. This is an analog of Poincaré duality and motivated the terminology. A diagonalizable k-group is said to be anisotropic if it has no nontrivial k-valued character. The so-called "rigidity" states that the identity component of the centralizer of a diagonalizable group coincides with the identity component of the normalizer of the group. The fact plays a crucial role in the structure theory of solvable groups. A connected diagonalizable group is called an algebraic torus (which is not necessarily compact, in contrast to a complex torus). A k-torus is a torus defined over k. The centralizer of a maximal torus is called a Cartan subgroup. (en)
dbo:wikiPageID	26817254 (xsd:integer)
dbo:wikiPageLength	1880 (xsd:nonNegativeInteger)
dbo:wikiPageRevisionID	1093120390 (xsd:integer)
dbo:wikiPageWikiLink	dbr:Algebraic_torus dbc:Algebraic_groups dbr:Mathematics dbr:Equivalence_of_categories dbr:Complex_torus dbr:Subgroup dbr:Poincaré_duality dbr:Field_(mathematics) dbr:Diagonal_subgroup dbr:Isomorphic dbr:Characteristic_(algebra) dbr:Diagonal_matrices dbr:Splitting_lemma dbr:Cartan_subgroup dbr:Category_(mathematics) dbr:Separable_closure dbr:Solvable_group dbr:Finitely_generated_abelian_group dbr:Torsion_subgroup dbr:Affine_algebraic_group dbr:Normalizer dbr:Centralizer
dbp:wikiPageUsesTemplate	dbt:Reflist dbt:Abstract-algebra-stub
dcterms:subject	dbc:Algebraic_groups
rdf:type	yago:Abstraction100002137 yago:Group100031264 yago:WikicatAlgebraicGroups
rdfs:comment	In mathematics, an affine algebraic group is said to be diagonalizable if it is isomorphic to a subgroup of Dn, the group of diagonal matrices. A diagonalizable group defined over a field k is said to split over k or k-split if the isomorphism is defined over k. This coincides with the usual notion of split for an algebraic group. Every diagonalizable group splits over the separable closure ks of k. Any closed subgroup and image of diagonalizable groups are diagonalizable. The torsion subgroup of a diagonalizable group is dense. (en)
rdfs:label	Diagonalizable group (en)
owl:sameAs	freebase:Diagonalizable group yago-res:Diagonalizable group wikidata:Diagonalizable group https://global.dbpedia.org/id/4jEWi
prov:wasDerivedFrom	wikipedia-en:Diagonalizable_group?oldid=1093120390&ns=0
foaf:isPrimaryTopicOf	wikipedia-en:Diagonalizable_group
is dbo:wikiPageWikiLink of	dbr:Diagonal_subgroup dbr:Diagonalizable_matrix dbr:Group_scheme
is foaf:primaryTopic of	wikipedia-en:Diagonalizable_group