On Some Properties of Metric F-Structure Satisfying $F^{2k+1}+F=0$

Lakhan Singh; Shailendra Kumar Gautam

On Some Properties of Metric F-Structure Satisfying $F^{2k+1}+F=0$

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Authors

Lakhan Singh Department of Mathematics, D.J.College, Baraut, Baghpat (U.P.), India
Shailendra Kumar Gautam Department of Mathematics, Eshan College of Engineering, Mathura(UP), India

Keywords:

Differentiable manifold, projection operators, tangent bundles and metric

Abstract

In this paper, we have studied various properties of the \textit{F}-structure satisfying $F^{2k+1}+F=0$. Where $k$ is positive integer The metric F- structure, $f$ induced on each integral manifold of tangent bundle $l^{*}$ have also been discussed.

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Published

15-04-2017

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Lakhan Singh, & Shailendra Kumar Gautam. (2017). On Some Properties of Metric F-Structure Satisfying $F^{2k+1}+F=0$. International Journal of Mathematics And Its Applications, 5(2 - A), 63–66. Retrieved from http://ijmaa.in/index.php/ijmaa/article/view/796

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Vol. 5 No. 2 - A (2017)

Section

Research Article

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This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.

On Some Properties of Metric F-Structure Satisfying $F^{2k+1}+F=0$

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