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Linear and Multilinear Algebra Volume 67, 2019 - Issue 5
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Original Articles

A new look at the classification of the tri-covectors of a 6-dimensional symplectic space

J. Muñoz MasquéInstituto de Tecnologías Físicas y de la Información CSIC, Madrid, Spain.
&
L. M. Pozo CoronadoDepartamento de Matemática Aplicada a las T.I.C., E.T.S.I. Sistemas Informáticos, Universidad Politécnica de Madrid, Madrid, Spain.Correspondence[email protected]
ORCID Iconhttp://orcid.org/0000-0002-1568-3540
ORCID Icon
Pages 939-952 | Received 13 Jul 2017, Accepted 05 Feb 2018, Published online: 16 Feb 2018

References

  • Fogarty J . Invariant theory. New York (NY): WA Benjamin; 1969.
  • Kac VG , Popov VL , Vinberg EB . Sur les groupes linéaires algébriques dont l’algèbre des invariants est libre. C R Acad Sci Paris Sér A-B. 1976;283(12, Ai):A875–A878.
  • De Bruyn B , Kwiatkowski M . On the trivectors of a 6-dimensional symplectic vector space. Linear Alg Appl. 2011;435:289–306.
  • De Bruyn B , Kwiatkowski M . On the trivectors of a 6-dimensional symplectic vector space II. Linear Alg Appl. 2012;437:1215–1233.
  • De Bruyn B , Kwiatkowski M . On the trivectors of a 6-dimensional symplectic vector space III. Linear Alg Appl. 2013;438:374–398.
  • De Bruyn B , Kwiatkowski M . On the trivectors of a 6-dimensional symplectic vector space IV. Linear Alg Appl. 2013;438:2405–2429.
  • De Bruyn B , Kwiatkowski M . The classification of the trivectors of a 6-dimensional symplectic space: summary, consequences and connections. Linear Alg Appl. 2013;438:3516–3529.
  • Popov VL . Classification of spinors of dimension fourteen. Trans Mosc Math Soc. 1980;1:181–232.

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