Classification of k-forms on $\R^n$ and the existence of associated geometry on manifolds
https://doi.org/10.22405/2226-8383-2020-21-2-362-382
Abstract
In this paper we survey methods and results of classification of $k$-forms (resp. $k$-vectors on $\R^n$),
understood as description of the orbit space of the standard $\GL(n, \R)$-action on $\Lambda^k \R^{n*}$
(resp. on $\Lambda ^k \R^n$). We discuss the existence of related geometry defined
by differential forms on smooth manifolds. This paper also contains an Appendix by Mikhail Borovoi on
Galois cohomology methods for finding real forms of complex orbits.
Keywords
$ \mathrm {GL} (n,
{\mathbb R})$-orbits in $\Lambda^k\R^{n*}$,
$\theta$-group,
geometry defined by differential forms,
Galois cohomology
Supporting agencies: The research of HVL was supported by the GAˇCR-project 18-00496S and RVO:67985840.
About the Authors
Hong Van Le
nstitute of Mathematics of the Czech Academy of Sciences
Czech Republic
Doctor of Sciences, Professor
Czech Republic
Doctor of Sciences, Professor
Jiri Vanzura
Institute of Mathematics of the Czech Academy of
Sciences
Czech Republic
Doctor of Sciences, Professor
Czech Republic
Doctor of Sciences, Professor
Review
For citations:
Le H.V., Vanzura J. Classification of k-forms on $\R^n$ and the existence of associated geometry on manifolds. Chebyshevskii Sbornik. 2020;21(2):362-382. https://doi.org/10.22405/2226-8383-2020-21-2-362-382
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