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- C-closed_subgroup abstract "In the branch of abstract algebra known as group theory, a C-closed subgroup is a subgroup that is the centralizer of some subgroup, or equivalently, of its own centralizer. For any group G, Z(G) and G itself are always C-closed, being the centralizers of G and the trivial subgroup respectively.".
- C-closed_subgroup wikiPageExternalLink C-closed_subgroup.
- C-closed_subgroup wikiPageID "46928725".
- C-closed_subgroup wikiPageLength "622".
- C-closed_subgroup wikiPageOutDegree "5".
- C-closed_subgroup wikiPageRevisionID "682802482".
- C-closed_subgroup wikiPageWikiLink Abstract_algebra.
- C-closed_subgroup wikiPageWikiLink Category:Group_theory.
- C-closed_subgroup wikiPageWikiLink Centralizer.
- C-closed_subgroup wikiPageWikiLink Centralizer_and_normalizer.
- C-closed_subgroup wikiPageWikiLink Group_theory.
- C-closed_subgroup wikiPageWikiLink Subgroup.
- C-closed_subgroup wikiPageWikiLinkText "C-closed subgroup".
- C-closed_subgroup wikiPageWikiLinkText "C-closed".
- C-closed_subgroup hasPhotoCollection C-closed_subgroup.
- C-closed_subgroup wikiPageUsesTemplate Template:Algebra-stub.
- C-closed_subgroup wikiPageUsesTemplate Template:Multiple_issues.
- C-closed_subgroup wikiPageUsesTemplate Template:Reflist.
- C-closed_subgroup subject Category:Group_theory.
- C-closed_subgroup hypernym Subgroup.
- C-closed_subgroup type EthnicGroup.
- C-closed_subgroup comment "In the branch of abstract algebra known as group theory, a C-closed subgroup is a subgroup that is the centralizer of some subgroup, or equivalently, of its own centralizer. For any group G, Z(G) and G itself are always C-closed, being the centralizers of G and the trivial subgroup respectively.".
- C-closed_subgroup label "C-closed subgroup".
- C-closed_subgroup sameAs m.013d7p_b.
- C-closed_subgroup wasDerivedFrom C-closed_subgroup?oldid=682802482.
- C-closed_subgroup isPrimaryTopicOf C-closed_subgroup.