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Construction of symplectic quadratic Lie algebras from Poisson algebras
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Description: |
By using the Koecher-Kantor-Tits construction and the notion of double extension of
quadratic Lie algebras, we give a construction of symplectic quadratic Lie algebras
g(A) from an arbitrary Poisson algebra A. In particular, if the dimension of A is
finite, then the dimension of g(A) is at least equal to $4n2.$
Area(s):
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Date: |
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| Start Time: |
10:00 |
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Speaker: |
Said Benayadi (Dep Mat, U Metz, França)
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Place: |
5.4
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| Research Groups: |
-Geometry
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See more:
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<Main>
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