About: Cartan–Brauer

Property	Value
dbo:abstract	In abstract algebra, the Cartan–Brauer–Hua theorem (named after Richard Brauer, Élie Cartan, and Hua Luogeng) is a theorem pertaining to division rings. It says that given two division rings K ⊆ D such that xKx−1 is contained in K for every x not equal to 0 in D, either K is contained in the center of D, or K = D. In other words, if the unit group of K is a normal subgroup of the unit group of D, then either K = D or K is central . (en) 抽象代數中，布勞威耳-加當-華定理是個有關除環的定理，以德國數學家理查德·布饒爾、法國數學家埃利·嘉當、以及中國數學家華羅庚命名。給定兩個除環使得對於所有中非零的都有（亦即，的单位群是的单位群的正规子群），則要么被包含在的中心，要么。 (zh)
dbo:wikiPageExternalLink	https://archive.org/details/topicsinalgebra00hers/page/368
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dbo:wikiPageWikiLink	dbr:Hua_Luogeng dbr:Richard_Brauer dbr:Normal_subgroup dbr:Élie_Cartan dbr:Center_(ring_theory) dbr:Abstract_algebra dbr:Division_ring dbc:Theorems_in_ring_theory dbr:Unit_group dbr:Springer-Verlag
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rdf:type	yago:WikicatTheoremsInAlgebra yago:Abstraction100002137 yago:Communication100033020 yago:Message106598915 yago:Proposition106750804 yago:Statement106722453 yago:Theorem106752293
rdfs:comment	In abstract algebra, the Cartan–Brauer–Hua theorem (named after Richard Brauer, Élie Cartan, and Hua Luogeng) is a theorem pertaining to division rings. It says that given two division rings K ⊆ D such that xKx−1 is contained in K for every x not equal to 0 in D, either K is contained in the center of D, or K = D. In other words, if the unit group of K is a normal subgroup of the unit group of D, then either K = D or K is central . (en) 抽象代數中，布勞威耳-加當-華定理是個有關除環的定理，以德國數學家理查德·布饒爾、法國數學家埃利·嘉當、以及中國數學家華羅庚命名。給定兩個除環使得對於所有中非零的都有（亦即，的单位群是的单位群的正规子群），則要么被包含在的中心，要么。 (zh)
rdfs:label	Cartan–Brauer–Hua theorem (en) 布劳威尔-加当-华定理 (zh)
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About: Cartan–Brauer–Hua theorem