Algebraic Structures on Smooth Vector Fields

Algebraic Structures on Smooth Vector Fields

The aim of this work is to investigate some algebraic structures of objects which are defined and related to a manifold. Consider L to be a smooth manifold and Γ∞(TL) to be the module of smooth vector fields over the ring of smooth functions C∞(L). We prove that the module Γ∞(TL) is projective and f...

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Veröffentlicht in:Symmetry (Basel) 2023-12, Vol.15 (12), p.2150
Hauptverfasser: Alkinani, Amnah A., Alghamdi, Ahmad M.
Format: Artikel
Sprache:eng
Schlagworte:
Algebra
C∞-functions
derivations
Fields (mathematics)
Geometry
Lie algebra
Lie groups
Linear algebra
Literature reviews
localization
Manifolds
Modules
symmetric C∞-algebras
vector fields
Vector space
Vectors (mathematics)
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Zusammenfassung:The aim of this work is to investigate some algebraic structures of objects which are defined and related to a manifold. Consider L to be a smooth manifold and Γ∞(TL) to be the module of smooth vector fields over the ring of smooth functions C∞(L). We prove that the module Γ∞(TL) is projective and finitely generated, but it is not semisimple. Therefore, it has a proper socle and nonzero Jacobson radical. Furthermore, we prove that this module is reflexive by showing that it is isomorphic to its bidual. Additionally, we investigate the structure of the Lie algebra of smooth vector fields. We give some questions and open problems at the end of the paper. We believe that our results are important because they link two different disciplines in modern pure mathematics.
ISSN:2073-8994
2073-8994
DOI:10.3390/sym15122150