Construction of symplectic quadratic Lie algebras from Poisson algebras
 
 
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):
Date:  2007-02-13
Start Time:   10:00
Speaker:  Said Benayadi (Dep Mat, U Metz, França)
Place:  5.4
Research Groups: -Geometry
See more:   <Main>  
 
© Centre for Mathematics, University of Coimbra, funded by
Science and Technology Foundation
Powered by: rdOnWeb v1.4 | technical support