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Diffeomorphisms of Foliated Manifolds I

Year 2024, Volume: 17 Issue: 2, 531 - 537, 27.10.2024
https://doi.org/10.36890/iejg.1441930

Abstract

The set $Diff(M)$ of all diffeomorphisms of manifold $M$ onto itself is the group related to composition and inverse mapping. The group of diffeomorphisms of smooth manifolds is of great importance in differential geometry and analysis. It is known that the group $Diff(M)$ is topological group in compact open topology.In this paper we investigate the group $Diff_{F}(M)$ of diffeomorphisms foliated manifold $(M,F)$ with foliated compact open topology.

In this paper we prove that if all leaves of the the foliation $F$ are closed subsets of $M$ then the foliated compact open topology of the group $Diff_{F}(M)$ coincides with compact open topology. In addition it is studied the question on the dimension of the group of isometries of foliated manifold is studied when foliation generated by riemannian submersion.

References

  • [1] Abdishukurova G., Narmanov.A.: Diffeomorphisms of Foliated Manifolds, Methods Funct. Anal. Topology, 27(1),1–9 (2021).
  • [2] Azamov A., Narmanov A.: On the Limit Sets of Orbits of Systems of Vector Fields, Differential Equations, 40 (2), 271-275 (2004).
  • [3] Hermann R., A Sufficient Condition That a Mapping of Riemannian Manifolds To Be a Fiber bundle, Proc. Amer. Math. Soc., 11(4), 236–242 (1960).
  • [4] Kobayashi Sh. and Nomizu K., Foundations of Differential Geometry,New York- London, Interscience 1963. [5] Molino P., Riemannian Foliations, Burkhauser, Boston 1988.
  • [6] Narmanov A., Sharipov A., On the Group of Foliation Isometries, Methods Funct. Anal. Topology, 15,(2),195–200 (2009).
  • [7] Narmanov A., Zoyidov A., On the Group of Diffeomorphisms of Foliated Manifolds, Vestnik Udmurtskogo Universiteta. Matematika. Mekhanika. Kompyuternye Nauki, 30(1),49–58 (2020).
  • [8] Narmanov A., Tursunov B., Geometry of Submersions on Manifolds of Nonnegative Curvature, Mathematica Aeterna, 5 (1),169 – 174 (2015).
  • [9] Narmanov A. and Abdushukurova G., On the Geometry of Riemannian Submersions, Uzbek Mathematical journal, 2,3–8 (2016).
  • [10] Reinhart B., Foliated Manifolds With Bundle-like Metrics, Annals of Mathematics, Second Series 69, 119–132 (1959).
  • [11] O’Neill B., The Fundamental Equations of Submersions, Michigan Mathematical Journal 13 459–469 (1966).
Year 2024, Volume: 17 Issue: 2, 531 - 537, 27.10.2024
https://doi.org/10.36890/iejg.1441930

Abstract

References

  • [1] Abdishukurova G., Narmanov.A.: Diffeomorphisms of Foliated Manifolds, Methods Funct. Anal. Topology, 27(1),1–9 (2021).
  • [2] Azamov A., Narmanov A.: On the Limit Sets of Orbits of Systems of Vector Fields, Differential Equations, 40 (2), 271-275 (2004).
  • [3] Hermann R., A Sufficient Condition That a Mapping of Riemannian Manifolds To Be a Fiber bundle, Proc. Amer. Math. Soc., 11(4), 236–242 (1960).
  • [4] Kobayashi Sh. and Nomizu K., Foundations of Differential Geometry,New York- London, Interscience 1963. [5] Molino P., Riemannian Foliations, Burkhauser, Boston 1988.
  • [6] Narmanov A., Sharipov A., On the Group of Foliation Isometries, Methods Funct. Anal. Topology, 15,(2),195–200 (2009).
  • [7] Narmanov A., Zoyidov A., On the Group of Diffeomorphisms of Foliated Manifolds, Vestnik Udmurtskogo Universiteta. Matematika. Mekhanika. Kompyuternye Nauki, 30(1),49–58 (2020).
  • [8] Narmanov A., Tursunov B., Geometry of Submersions on Manifolds of Nonnegative Curvature, Mathematica Aeterna, 5 (1),169 – 174 (2015).
  • [9] Narmanov A. and Abdushukurova G., On the Geometry of Riemannian Submersions, Uzbek Mathematical journal, 2,3–8 (2016).
  • [10] Reinhart B., Foliated Manifolds With Bundle-like Metrics, Annals of Mathematics, Second Series 69, 119–132 (1959).
  • [11] O’Neill B., The Fundamental Equations of Submersions, Michigan Mathematical Journal 13 459–469 (1966).
There are 10 citations in total.

Details

Primary Language English
Subjects Pure Mathematics (Other)
Journal Section Research Article
Authors

Narmanov Abdugappar Yakubovich 0000-0001-8689-4217

Guzal Abdishukurova 0000-0001-8035-2580

Early Pub Date September 23, 2024
Publication Date October 27, 2024
Submission Date February 29, 2024
Acceptance Date July 4, 2024
Published in Issue Year 2024 Volume: 17 Issue: 2

Cite

APA Abdugappar Yakubovich, N., & Abdishukurova, G. (2024). Diffeomorphisms of Foliated Manifolds I. International Electronic Journal of Geometry, 17(2), 531-537. https://doi.org/10.36890/iejg.1441930
AMA Abdugappar Yakubovich N, Abdishukurova G. Diffeomorphisms of Foliated Manifolds I. Int. Electron. J. Geom. October 2024;17(2):531-537. doi:10.36890/iejg.1441930
Chicago Abdugappar Yakubovich, Narmanov, and Guzal Abdishukurova. “Diffeomorphisms of Foliated Manifolds I”. International Electronic Journal of Geometry 17, no. 2 (October 2024): 531-37. https://doi.org/10.36890/iejg.1441930.
EndNote Abdugappar Yakubovich N, Abdishukurova G (October 1, 2024) Diffeomorphisms of Foliated Manifolds I. International Electronic Journal of Geometry 17 2 531–537.
IEEE N. Abdugappar Yakubovich and G. Abdishukurova, “Diffeomorphisms of Foliated Manifolds I”, Int. Electron. J. Geom., vol. 17, no. 2, pp. 531–537, 2024, doi: 10.36890/iejg.1441930.
ISNAD Abdugappar Yakubovich, Narmanov - Abdishukurova, Guzal. “Diffeomorphisms of Foliated Manifolds I”. International Electronic Journal of Geometry 17/2 (October 2024), 531-537. https://doi.org/10.36890/iejg.1441930.
JAMA Abdugappar Yakubovich N, Abdishukurova G. Diffeomorphisms of Foliated Manifolds I. Int. Electron. J. Geom. 2024;17:531–537.
MLA Abdugappar Yakubovich, Narmanov and Guzal Abdishukurova. “Diffeomorphisms of Foliated Manifolds I”. International Electronic Journal of Geometry, vol. 17, no. 2, 2024, pp. 531-7, doi:10.36890/iejg.1441930.
Vancouver Abdugappar Yakubovich N, Abdishukurova G. Diffeomorphisms of Foliated Manifolds I. Int. Electron. J. Geom. 2024;17(2):531-7.