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Communications in Algebra Volume 46, 2018 - Issue 11
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Articles

Classification of three-dimensional zeropotent algebras over the real number field

Kiyoshi ShirayanagiDepartment of Information Science, Toho University, Funabashi, ChibaJapanCorrespondence[email protected]
,
Sin-Ei TakahasiLaboratory of Mathematics and Games, Funabashi, ChibaJapan
,
Makoto TsukadaDepartment of Information Science, Toho University, Funabashi, ChibaJapan
&
Yuji KobayashiDepartment of Information Science, Toho University, Funabashi, ChibaJapan
Pages 4663-4681 | Received 26 Dec 2017, Published online: 02 Apr 2018

References

  • Bianchi, L. (1898). Sugli spazii a tre dimensioni che ammettono un gruppo continuo di movimenti. (On the spaces of three dimensions that admit a continuous group of movements). Soc. Ital. Sci. Mem. di Mat. 11:267.
  • Fowler-Wright, A. (2014). The classification of three-dimensional Lie algebras. Thesis. The University of Warwick, Coventry.
  • Jacobson, N. (1979). Lie Algebras. New York: Dover Publications.
  • Kobayashi, Y., Shirayanagi, K., Takahasi, S.-E., Tsukada, M. (2017). Classification of three-dimensional zeropotent algebras over an algebraically closed field. Comm. Algebra 45(12):5037–5052.
  • Lang, S. (2002). Algebra, Graduate Texts in Math., 211, Revised 3rd ed. New York: Springer-Verlag.

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