Sur les algèbres de lie d'un système de champs de vecteurs permutables
Keywords:
Lie Algebra, commuting vector fields, generalized foliation, local cohomology of Chevalley-Eilenberg, cohomology of de RhamAbstract
Let be M a Cꝏ — differentiable manifold and S a system of q Cꝏ — vector fields which commute mutually. This system defines a generalized foliation \(\mathcal{F}\) on M. The Lie algebra AS of vector fields in M which commute with S is both a module
over the ring of Cꝏ — functions that are constant on the leaves of \(\mathcal{F}\) and a sub-Lie algebra of the foliation preserving vector fields. We determine all derivations of the Lie algebra AS.
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Copyright (c) 2012 H.S.G. Ravelonirina, P. Randriambololondrantomalala, M. Anona

This work is licensed under a Creative Commons Attribution 4.0 International License.
L'opera è pubblicata sotto Licenza Creative Commons Attribuzione 4.0 Internazionale (CC-BY)

