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- Special_abelian_subgroup abstract "In mathematical group theory, a subgroup of a group is termed a special abelian subgroup or SA-subgroup if the centralizer of any nonidentity element in the subgroup is precisely the subgroup(Curtis & Reiner 1981, p.354). Equivalently, an SA subgroup is a centrally closed abelian subgroup. Any SA subgroup is a maximal abelian subgroup, that is, it is not properly contained in another abelian subgroup. For a CA group, the SA subgroups are precisely the maximal abelian subgroups.SA subgroups are known for certain characters associated with them termed exceptional characters.".
- Special_abelian_subgroup wikiPageID "5745412".
- Special_abelian_subgroup wikiPageLength "1067".
- Special_abelian_subgroup wikiPageOutDegree "9".
- Special_abelian_subgroup wikiPageRevisionID "447972757".
- Special_abelian_subgroup wikiPageWikiLink Abelian_group.
- Special_abelian_subgroup wikiPageWikiLink CA-group.
- Special_abelian_subgroup wikiPageWikiLink CA_group.
- Special_abelian_subgroup wikiPageWikiLink Category:Finite_groups.
- Special_abelian_subgroup wikiPageWikiLink Category:Subgroup_properties.
- Special_abelian_subgroup wikiPageWikiLink Centrally_closed_subgroup.
- Special_abelian_subgroup wikiPageWikiLink Exceptional_character.
- Special_abelian_subgroup wikiPageWikiLink Group_(mathematics).
- Special_abelian_subgroup wikiPageWikiLink John_Wiley_&_Sons.
- Special_abelian_subgroup wikiPageWikiLink Subgroup.
- Special_abelian_subgroup wikiPageWikiLinkText "Special abelian subgroup".
- Special_abelian_subgroup hasPhotoCollection Special_abelian_subgroup.
- Special_abelian_subgroup wikiPageUsesTemplate Template:Citation.
- Special_abelian_subgroup wikiPageUsesTemplate Template:Harv.
- Special_abelian_subgroup subject Category:Finite_groups.
- Special_abelian_subgroup subject Category:Subgroup_properties.
- Special_abelian_subgroup type Group.
- Special_abelian_subgroup type Group.
- Special_abelian_subgroup type Property.
- Special_abelian_subgroup comment "In mathematical group theory, a subgroup of a group is termed a special abelian subgroup or SA-subgroup if the centralizer of any nonidentity element in the subgroup is precisely the subgroup(Curtis & Reiner 1981, p.354). Equivalently, an SA subgroup is a centrally closed abelian subgroup. Any SA subgroup is a maximal abelian subgroup, that is, it is not properly contained in another abelian subgroup.".
- Special_abelian_subgroup label "Special abelian subgroup".
- Special_abelian_subgroup sameAs m.0f2dl9.
- Special_abelian_subgroup sameAs Q7574778.
- Special_abelian_subgroup sameAs Q7574778.
- Special_abelian_subgroup wasDerivedFrom Special_abelian_subgroup?oldid=447972757.
- Special_abelian_subgroup isPrimaryTopicOf Special_abelian_subgroup.