Second Approximate Exponential Change of Finsler Metric

Authors

  • S.K. Tiwari Department of Mathematics, K.S. Saket P.G. College, Ayodhya (224123), Uttar Pradesh, India Author
  • Ved Mani Department of Mathematics, K.S. Saket P.G. College, Ayodhya (224123), Uttar Pradesh, India Author
  • C.P. Maurya Adarsh Inter College Saltauwa Gopalpur, Basti (272190), Uttar Pradesh, India Author

DOI:

https://doi.org/10.32628/IJSRST25138

Keywords:

Exponential change, projective change, Douglas space

Abstract

The purpose of the present paper is to find the necessary and sufficient condition under which a second approximate exponential change of Finsler metric becomes a projective change. The condition under which a second approximate exponential change of Finsler metric of Douglas space becomes a Douglas space have been also found.

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References

H.S. Shukla, B.N. Prasad, O.P. Pandey : Exponential change of Finsler Metric. Int. J. Contemp. Math. Sciences 7 (2012), No. 46, 2253-2263.

Ioan Bucataru, R. Miron, Finsler-Lagrange Geometry. Application to dynamical system. Publishers July 2007.

M. Matsumoto : Foundation of Finsler Geometry and special Finsler space. Publisher, 1982.

M. Matsumoto : Theory of Finsler space with -metric. Rep. Math. Phy. 31 (1992), 43-83. DOI: https://doi.org/10.1016/0034-4877(92)90005-L

M. Matsumoto : Finsler space with -metric of Douglas type. Tensor N.S. 60 (1998), 123-134.

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Published

12-08-2025

Issue

Vol. 12 No. 4 (2025): July-August

Section

Research Articles

License

Copyright (c) 2025 International Journal of Scientific Research in Science and Technology

Creative Commons License

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

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How to Cite

Second Approximate Exponential Change of Finsler Metric. (2025). International Journal of Scientific Research in Science and Technology, 12(4), 1029-1032. https://doi.org/10.32628/IJSRST25138