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- Capable_group abstract "In mathematics, in the realm of group theory, a group is said to be capable if it occurs as the inner automorphism group of some group. These groups were first studied by Reinhold Baer, who showed that a finite abelian group is capable if and only if it is a product of cyclic groups of orders n1,...,nk where ni divides ni+1 and nk–1=nk.".
- Capable_group wikiPageExternalLink S0002-9939-05-07663-X.pdf.
- Capable_group wikiPageID "5826646".
- Capable_group wikiPageLength "960".
- Capable_group wikiPageOutDegree "7".
- Capable_group wikiPageRevisionID "652928170".
- Capable_group wikiPageWikiLink Abelian_group.
- Capable_group wikiPageWikiLink Category:Properties_of_groups.
- Capable_group wikiPageWikiLink Group_(mathematics).
- Capable_group wikiPageWikiLink Group_theory.
- Capable_group wikiPageWikiLink Inner_automorphism.
- Capable_group wikiPageWikiLink Mathematics.
- Capable_group wikiPageWikiLink Reinhold_Baer.
- Capable_group wikiPageWikiLinkText "Capable group".
- Capable_group hasPhotoCollection Capable_group.
- Capable_group wikiPageUsesTemplate Template:Abstract-algebra-stub.
- Capable_group wikiPageUsesTemplate Template:Citation.
- Capable_group subject Category:Properties_of_groups.
- Capable_group type Property.
- Capable_group comment "In mathematics, in the realm of group theory, a group is said to be capable if it occurs as the inner automorphism group of some group. These groups were first studied by Reinhold Baer, who showed that a finite abelian group is capable if and only if it is a product of cyclic groups of orders n1,...,nk where ni divides ni+1 and nk–1=nk.".
- Capable_group label "Capable group".
- Capable_group sameAs m.0f7nf_.
- Capable_group sameAs Q5034472.
- Capable_group sameAs Q5034472.
- Capable_group wasDerivedFrom Capable_group?oldid=652928170.
- Capable_group isPrimaryTopicOf Capable_group.