A contraction between Lie algebras with necessarily singular components of the contraction matrix

Authors

  • D.R. Popovych

DOI:

https://doi.org/10.15407/dopovidi2014.07.029

Keywords:

contraction matrix, Lie algebras, singularity

Abstract

We present an example of a contraction between five-dimensional Lie algebras that is realized only with matrices, whose Euclidean norms necessarily approach infinity at the limit value of the contraction parameter. Dimension five is the lowest dimension of Lie algebras, between which contractions of the above kind exist.

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References

Campoamor-Stursberg R. Adv. Studies Theor. Phys., 2008, 2: 865–870.

Nesterenko M. O., Popovych R. O. J. Math. Phys., 2006, 47: 123515, 45 p.; arXiv:math-ph/0608018.

Popovych D. R., Popovych R. O. J. Algebra, 2010, 324; 2742–2756. https://doi.org/10.1016/j.jalgebra.2010.08.009

Weimar-Woods E. Rev. Math. Phys., 2000, 12: 1505–1529.

Mubarakzyanov G. M. Izv. vuzov. Matem., 1963, No. 3(34): 99–106 (in Russian).

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Published

28.02.2025

How to Cite

Popovych, D. (2025). A contraction between Lie algebras with necessarily singular components of the contraction matrix . Reports of the National Academy of Sciences of Ukraine, (7), 29–35. https://doi.org/10.15407/dopovidi2014.07.029

Issue

No. 7 (2014): Reports of the National Academy of Sciences of Ukraine

Section

Mathematics

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