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- Manin_triple abstract "In mathematics, a Manin triple (g, p, q) consists of a Lie algebra g with a non-degenerate invariant symmetric bilinear form, together with two isotropic subalgebras p and q such that g is the direct sum of p and q as a vector space. Manin triples were introduced by Drinfeld (1987, p.802), who named them after Yuri Manin.Delorme (2001) classified the Manin triples where g is a complex reductive Lie algebra.".
- Manin_triple wikiPageExternalLink ICM1986.1.
- Manin_triple wikiPageExternalLink jabr.2001.8887.
- Manin_triple wikiPageID "37482078".
- Manin_triple wikiPageLength "2521".
- Manin_triple wikiPageOutDegree "10".
- Manin_triple wikiPageRevisionID "626966061".
- Manin_triple wikiPageWikiLink American_Mathematical_Society.
- Manin_triple wikiPageWikiLink Borel_subalgebra.
- Manin_triple wikiPageWikiLink Borel_subgroup.
- Manin_triple wikiPageWikiLink Category:Lie_algebras.
- Manin_triple wikiPageWikiLink Cocommutator_map.
- Manin_triple wikiPageWikiLink Journal_of_Algebra.
- Manin_triple wikiPageWikiLink Lie_algebra.
- Manin_triple wikiPageWikiLink Lie_bialgebra.
- Manin_triple wikiPageWikiLink Lie_coalgebra.
- Manin_triple wikiPageWikiLink Reductive_Lie_algebra.
- Manin_triple wikiPageWikiLink Symmetric_bilinear_form.
- Manin_triple wikiPageWikiLink Yuri_I._Manin.
- Manin_triple wikiPageWikiLink Yuri_Manin.
- Manin_triple wikiPageWikiLinkText "Manin triple".
- Manin_triple authorlink "Vladimir Drinfeld".
- Manin_triple hasPhotoCollection Manin_triple.
- Manin_triple last "Drinfeld".
- Manin_triple loc "p.802".
- Manin_triple wikiPageUsesTemplate Template:Citation.
- Manin_triple wikiPageUsesTemplate Template:Harvs.
- Manin_triple wikiPageUsesTemplate Template:Harvtxt.
- Manin_triple year "1987".
- Manin_triple subject Category:Lie_algebras.
- Manin_triple hypernym Sum.
- Manin_triple type Settlement.
- Manin_triple type Algebra.
- Manin_triple comment "In mathematics, a Manin triple (g, p, q) consists of a Lie algebra g with a non-degenerate invariant symmetric bilinear form, together with two isotropic subalgebras p and q such that g is the direct sum of p and q as a vector space. Manin triples were introduced by Drinfeld (1987, p.802), who named them after Yuri Manin.Delorme (2001) classified the Manin triples where g is a complex reductive Lie algebra.".
- Manin_triple label "Manin triple".
- Manin_triple sameAs m.0nb38vk.
- Manin_triple sameAs Q6749777.
- Manin_triple sameAs Q6749777.
- Manin_triple wasDerivedFrom Manin_triple?oldid=626966061.
- Manin_triple isPrimaryTopicOf Manin_triple.