Interpolating sesqui harmonic slant curve in \(S\)-space form
Authors
F. Mofarreh
- Mathematical Science Department, Faculty of Science, Princess Nourah bint Abdulrahman University, Riyadh-11546, Kingdom of Saudi Arabia.
A. Haseeb
- Department of Mathematics, College of Science, Jazan University, Jazan-2097, Kingdom of Saudi Arabia.
S. K. Yadav
- Department of Mathematics, Jamia Millia Islamia, New Delhi-110025, India.
M. Aslam
- Department of Mathematics, Jamia Millia Islamia, New Delhi-110025, India.
Abstract
In this paper, we study interpolating sesqui harmonic slant curve in \(S\)-space form and thus generalizing the results of the papers [D. Fetcu, J. Korean Math. Soc., \(\textbf{45}\) (2008), 393--404], [C. Özgür, S. Güvenç, Turkish J. Math., \(\textbf{38}\) (2014), 454--461], [F. Karaca, C. Özgür, U. C. De, Int. J. Geom. Methods Mod. Phys., \(\textbf{17}\) (2020), 13 pages]. Finally we give examples in support of our results.
Share and Cite
ISRP Style
F. Mofarreh, A. Haseeb, S. K. Yadav, M. Aslam, Interpolating sesqui harmonic slant curve in \(S\)-space form, Journal of Mathematics and Computer Science, 28 (2023), no. 1, 11--20
AMA Style
Mofarreh F., Haseeb A., Yadav S. K., Aslam M., Interpolating sesqui harmonic slant curve in \(S\)-space form. J Math Comput SCI-JM. (2023); 28(1):11--20
Chicago/Turabian Style
Mofarreh, F., Haseeb, A., Yadav, S. K., Aslam, M.. "Interpolating sesqui harmonic slant curve in \(S\)-space form." Journal of Mathematics and Computer Science, 28, no. 1 (2023): 11--20
Keywords
- Interpolating sesqui harmonic map
- slant curve
- \(S\)-space form
MSC
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