Ponencia
Computational method for obtaining filiform Lie algebras of arbitrary dimension
Autor/es | Ceballos González, Manuel
Núñez Valdés, Juan Tenorio Villalón, Ángel Francisco |
Coordinador/Director | Vasek, Vladimir
Shmaliy, Yuriy S. Trcek, Denis Kobayashi, Nobuhiko P. Choras, Ryszard S. Klos, Zbigniew |
Departamento | Universidad de Sevilla. Departamento de Geometría y Topología |
Fecha de publicación | 2011-09 |
Fecha de depósito | 2017-02-23 |
Publicado en |
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ISBN/ISSN | 9781618040022 2223-2877 |
Resumen | This paper shows a new computational method to obtain filiform Lie algebras, which is based on the relation between some known invariants of these algebras and the maximal dimension of their abelian ideals. Using this ... This paper shows a new computational method to obtain filiform Lie algebras, which is based on the relation between some known invariants of these algebras and the maximal dimension of their abelian ideals. Using this relation, the law of each of these algebras can be completely determined and characterized by means of the triple consisting of its dimension and the invariants z1 and z2. As examples of application, we have included a table showing all valid triples determining filiform Lie algebras for dimension 13. |
Cita | Ceballos González, M., Núñez Valdés, J. y Tenorio Villalón, Á.F. (2011). Computational method for obtaining filiform Lie algebras of arbitrary dimension. (60-65), WSEAS Press. |
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