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Classification of the Quasifiliform Nilpotent Lie Algebras of Dimension 9

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  • Mercedes Pérez
  • Francisco P. Pérez
  • Emilio Jiménez

Abstract

On the basis of the family of quasifiliform Lie algebra laws of dimension 9 of 16 parameters and 17 constraints, this paper is devoted to identify the invariants that completely classify the algebras over the complex numbers except for isomorphism. It is proved that the nullification of certain parameters or of parameter expressions divides the family into subfamilies such that any couple of them is nonisomorphic and any quasifiliform Lie algebra of dimension 9 is isomorphic to one of them. The iterative and exhaustive computation with Maple provides the classification, which divides the original family into 263 subfamilies, composed of 157 simple algebras, 77 families depending on 1 parameter, 24 families depending on 2 parameters, and 5 families depending on 3 parameters.

Suggested Citation

  • Mercedes Pérez & Francisco P. Pérez & Emilio Jiménez, 2014. "Classification of the Quasifiliform Nilpotent Lie Algebras of Dimension 9," Journal of Applied Mathematics, John Wiley & Sons, vol. 2014(1).
  • Handle: RePEc:wly:jnljam:v:2014:y:2014:i:1:n:173072
    DOI: 10.1155/2014/173072
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    References listed on IDEAS

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    1. K. S. Govinder, 2013. "Symbolic Implementation of Preliminary Group Classiffication for Ordinary Differential Equations," Journal of Applied Mathematics, Hindawi, vol. 2013, pages 1-6, September.
    2. K. S. Govinder, 2013. "Symbolic Implementation of Preliminary Group Classiffication for Ordinary Differential Equations," Journal of Applied Mathematics, John Wiley & Sons, vol. 2013(1).
    3. R. J. Moitsheki & M. D. Mhlongo, 2012. "Classical Lie Point Symmetry Analysis of a Steady Nonlinear One-Dimensional Fin Problem," Journal of Applied Mathematics, Hindawi, vol. 2012, pages 1-13, January.
    4. R. J. Moitsheki & M. D. Mhlongo, 2012. "Classical Lie Point Symmetry Analysis of a Steady Nonlinear One‐Dimensional Fin Problem," Journal of Applied Mathematics, John Wiley & Sons, vol. 2012(1).
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