V. V. Krutskikh, A. V. Loboda Application of systems analysis and computer algorithms in studying orbits of 7-dimensional Lie algebras

https://doi.org/10.15688/mpcm.jvolsu.2024.3.4

Vladislav V. Krutskikh
Voronezh State University
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Pl. Universitetskaya, 1, 394018 Voronezh, Russian Federation

Alexandr V. Loboda
Doctor of Sciences (Physics and Mathematics), Leading Researcher, 
Voronezh State Technical University
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https://orcid.org/0000-0002-0285-5841
Prosp. Moskovskiy, 14, 394000 Voronezh, Russian Federation

Abstract. We discuss a systematic approach to the problem of describing holomorphically homogeneous real hypersurfaces in the space C4, each of which is an orbit of some real Lie algebra. When studying the family of 7-dimensional Lie algebras, which plays an important role in the problem at hand and contains more than a thousand different types of algebras, it is natural to use computer algorithms. With the participation of the authors of this article, classification results on the orbits of several large blocks of algebras from this family were previously obtained. Relations are established between the presence and dimens- ions of nilpotent and Abelian subalgebras of the original Lie algebras and such properties of their orbits in C4 as Levi degeneracy and tubularity. In this article, the above ideas and computer algorithms are applied to a family of 18 types of 7-dimensional Lie algebras that have a common 6-dimensional nil-radical. Holo- morphic realizations in C4 of these algebras are constructed and by integrating them, all holomorphically homogeneous (in the local sense) Levi-nondegenerate 7-dimensional orbits of this family are obtained. Using a quadratic change of variables, it is shown that all these orbits are holomorphically equivalent to tubular hypersurfaces.

Key words: homogeneous manifold, Lie algebra, nil-radical, Abelian subalgebra, holomorphic transformation, vector field, orbit of an algebra, tubular manifold, real hypersurface.

Creative Commons License
Application of systems analysis and computer algorithms in studying orbits of 7-dimensional Lie algebras by V. V. Krutskikh, A. V. Loboda  is licensed under a Creative Commons Attribution 4.0 International License.

Citation in EnglishMathematical Physics and Computer Simulation. Vol. 27 No. 3 2024, pp. 38-59

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