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- Cosocle abstract "In mathematics, the term cosocle has several related meanings.In group theory, a cosocle of a group G, denoted by Cosoc(G), is the intersection of all maximal normal subgroups of G.If G is a quasisimple group, then Cosoc(G) = Z(G).In the context of Lie algebras, a cosocle of a symmetric Lie algebra is the eigenspace of its structural automorphism which corresponds to the eigenvalue +1. (A symmetric Lie algebra decomposes into the direct sum of its socle and cosocle.)".
- Cosocle wikiPageID "24762871".
- Cosocle wikiPageLength "1231".
- Cosocle wikiPageOutDegree "15".
- Cosocle wikiPageRevisionID "468925468".
- Cosocle wikiPageWikiLink Automorphism.
- Cosocle wikiPageWikiLink Category:Group_theory.
- Cosocle wikiPageWikiLink Center_(group_theory).
- Cosocle wikiPageWikiLink Direct_sum_of_modules.
- Cosocle wikiPageWikiLink Eigenspace.
- Cosocle wikiPageWikiLink Eigenvalues_and_eigenvectors.
- Cosocle wikiPageWikiLink Group_(mathematics).
- Cosocle wikiPageWikiLink Group_theory.
- Cosocle wikiPageWikiLink Lie_algebra.
- Cosocle wikiPageWikiLink Mathematics.
- Cosocle wikiPageWikiLink Maximal_subgroup.
- Cosocle wikiPageWikiLink Normal_subgroup.
- Cosocle wikiPageWikiLink Orthogonal_symmetric_Lie_algebra.
- Cosocle wikiPageWikiLink Quasisimple_group.
- Cosocle wikiPageWikiLink Socle_(mathematics).
- Cosocle wikiPageWikiLink Symmetric_Lie_algebra.
- Cosocle wikiPageWikiLinkText "Cosocle".
- Cosocle wikiPageWikiLinkText "cosocle".
- Cosocle hasPhotoCollection Cosocle.
- Cosocle wikiPageUsesTemplate Template:Abstract-algebra-stub.
- Cosocle wikiPageUsesTemplate Template:Reflist.
- Cosocle subject Category:Group_theory.
- Cosocle hypernym Intersection.
- Cosocle type RoadJunction.
- Cosocle comment "In mathematics, the term cosocle has several related meanings.In group theory, a cosocle of a group G, denoted by Cosoc(G), is the intersection of all maximal normal subgroups of G.If G is a quasisimple group, then Cosoc(G) = Z(G).In the context of Lie algebras, a cosocle of a symmetric Lie algebra is the eigenspace of its structural automorphism which corresponds to the eigenvalue +1. (A symmetric Lie algebra decomposes into the direct sum of its socle and cosocle.)".
- Cosocle label "Cosocle".
- Cosocle sameAs m.0809zdz.
- Cosocle sameAs Q5174667.
- Cosocle sameAs Q5174667.
- Cosocle wasDerivedFrom Cosocle?oldid=468925468.
- Cosocle isPrimaryTopicOf Cosocle.