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- Tate_Lie_algebra abstract "In mathematics, a Tate Lie algebra is a topological Lie algebra over a field whose underlying vector space is a Tate space (or Tate vector space), meaning that the topology has a base of commensurable subspaces. Tate spaces were introduced by Alexander Beilinson, B. Feigin, and Barry Mazur (1991), who named them after John Tate.An example of a Tate Lie algebra is the Lie algebra of formal power series over a finite-dimensional Lie algebra.".
- Tate_Lie_algebra wikiPageExternalLink M00-30.ps.gz.
- Tate_Lie_algebra wikiPageExternalLink manuscripts.html.
- Tate_Lie_algebra wikiPageID "37909132".
- Tate_Lie_algebra wikiPageRevisionID "528831617".
- Tate_Lie_algebra author1Link "Alexander Beilinson".
- Tate_Lie_algebra author3Link "Barry Mazur".
- Tate_Lie_algebra first "Alexander".
- Tate_Lie_algebra first "B.".
- Tate_Lie_algebra first "Barry".
- Tate_Lie_algebra hasPhotoCollection Tate_Lie_algebra.
- Tate_Lie_algebra last "Beilinson".
- Tate_Lie_algebra last "Feigin".
- Tate_Lie_algebra last "Mazur".
- Tate_Lie_algebra year "1991".
- Tate_Lie_algebra subject Category:Lie_algebras.
- Tate_Lie_algebra comment "In mathematics, a Tate Lie algebra is a topological Lie algebra over a field whose underlying vector space is a Tate space (or Tate vector space), meaning that the topology has a base of commensurable subspaces. Tate spaces were introduced by Alexander Beilinson, B. Feigin, and Barry Mazur (1991), who named them after John Tate.An example of a Tate Lie algebra is the Lie algebra of formal power series over a finite-dimensional Lie algebra.".
- Tate_Lie_algebra label "Tate Lie algebra".
- Tate_Lie_algebra sameAs m.0p79hm1.
- Tate_Lie_algebra sameAs Q7687956.
- Tate_Lie_algebra sameAs Q7687956.
- Tate_Lie_algebra wasDerivedFrom Tate_Lie_algebra?oldid=528831617.
- Tate_Lie_algebra isPrimaryTopicOf Tate_Lie_algebra.