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Communications in Algebra Volume 47, 2019 - Issue 2
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Original Articles

On Lie algebras of type F4 and Chevalley groups F4(K), E6(K), and 2E6(K) for fields K of characteristic two

Shuaa Al-dhafeeriDepartment of Mathematics, PAAET, Ardiyah, Kuwait
&
Mashhour Bani AtaDepartment of Mathematics, PAAET, Ardiyah, KuwaitCorrespondence[email protected]
Pages 516-522 | Received 15 Nov 2017, Accepted 20 Apr 2018, Published online: 15 Nov 2018

References

  • Aschbacher, M. (1987). The 27-dimensional module for E6.1. Invent. Math. 89(1):159–195.
  • Wilson, R. (2013). Albert algebras and construction of the finite simple groups F4(q),E6(q) and 2E6(q) and their generic covers. arXiv 1310:5886V1.
  • Alazmi, A., Bani Ata, M. (2017). On construction of the maximal parabolic subgroup P1 of E6(K), for fields K of characteristic two. J. Lie Theory 27:1107–1118.
  • Freudenthal, H. (1985). Oktaven, ausnahmegruppen und oktavengeometric, mimeographed notes, Utrecht, 1951, 1960. Reprinted in Geom. Dedicata 19:7–63.
  • Jacobson, N. (1959). Some groups of transformations defined by Jordan algebras. I. J. Reine Angew. Math. 1959(201):178–195.
  • Jacobson, N. (1960). Some groups of transformations defined by Jordan algebras. II. Groups of type F4. J. Reine Angew. Math. 1960(204):74–98.
  • Jacobson, N. (1961). Some groups of transformations defined by Jordan algebras. III. Groups of type E6I. J. Reine Angew. Math. 1961(207):61–85.
  • Steinberg, R. (1968). Lectures on Chevalley Groups, Notes by J. Foulkes and R. Wilson. New Haven, CT: Yale University.
  • Al-Dhufeeri, S., Ata, M. B. (2017). On the construction of lie algebras of type E6(K), for fields K of characteristic 2. Beitr. Algebra Geom. 58(3):529–534.
  • Wilson, R. A. (2013). On the compact forms of the Lie algebras of type E6 and F4. Sib. Math. J. 54(1):159–172.

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