An algebraic treatment of Mal'cev's theorems concerning nilpotent Lie groups and their Lie algebras
I. N. Stewart (1970)
Compositio Mathematica
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Displaying similar documents to “Locally coalescent classes of Lie algebras”
An algebraic treatment of Mal'cev's theorems concerning nilpotent Lie groups and their Lie algebras
Computations in finite-dimensional Lie algebras.
Cohen, A.M., de Graaf, W.A., Rónyai, L. (1997)
Discrete Mathematics and Theoretical Computer Science. DMTCS [electronic only]
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An improvement of a result of I. N. Stewart
Jan de Ruiter (1972)
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A note on 2-step subideals of Lie algebras
Ian Stewart (1973)
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Complex nilpotent Lie algebras of dimension 7 which are not derived from others.
Francisco J. Echarte, José R. Gómez, Juan Núñez (1994)
Extracta Mathematicae
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-gradations of Lie algebras and infinitesimal generators.
Richter, David A. (1999)
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On a nilpotent Lie superalgebra which generalizes Q.
José María Ancochea Bermúdez, Otto Rutwig Campoamor (2002)
Revista Matemática Complutense
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In Gilg (2000, 2001) the author introduces the notion of filiform Lie superalgebras, generalizing the filiform Lie algebras studied by Vergne in the sixties. In these appers, the superalgebras whose even part is isomorphic to the model filiform Lie algebra L are studied and classified in low dimensions. Here we consider a class of superalgebras whose even part is the filiform, naturally graded Lie algebra Q, which only exists in even dimension as a consequence of the centralizer property....
Classification of solvable Lie algebras.
de Graaf, W.A. (2005)
Experimental Mathematics
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Poisson-Lie groupoids and the contraction procedure
Kenny De Commer (2015)
Banach Center Publications
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On the level of Lie algebras, the contraction procedure is a method to create a new Lie algebra from a given Lie algebra by rescaling generators and letting the scaling parameter tend to zero. One of the most well-known examples is the contraction from 𝔰𝔲(2) to 𝔢(2), the Lie algebra of upper-triangular matrices with zero trace and purely imaginary diagonal. In this paper, we will consider an extension of this contraction by taking also into consideration the natural bialgebra structures...
Deformation of Lie algebras and Lie algebras of deformations
Harald Bjar, Olav Arnfinn Laudal (1990)
Compositio Mathematica
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