ON QUASI BI-SLANT RIEMANNIAN MAPS FROM LORENTZIAN PARA SASAKIAN MANIFOLDS

Rajendra Prasad; Sushil Kumar; Punit Kumar Singh

doi:10.22342/jims.30.2.1086.307-320

Submitted

October 30, 2021

Accepted

August 21, 2024

Published

August 31, 2024

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Abstract

We first introduce quasi bi-slant Riemannian maps and study such Riemannian maps from Lorentzian para Sasakian manifolds into Riemannian manifolds. We give necessary and sufficient conditions for the integrability of the distributions which are involved in the definition of the quasi bi-slant Riemannian map and investigate their leaves. We also obtain totally geodesic conditions for such maps. Moreover, we provide some examples for this notion.

Keywords

Riemannian map Quasi bi-slant Riemannian map Lorentzian para Sasakian manifolds.

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

Author Biographies

Rajendra Prasad, Department of Mathematics and Astronomy, University of Lucknow, Lucknow

Department of Mathematics and Astronomy, University of Lucknow

Sushil Kumar, Shri Jai Narayan Post Graduate College, University of Lucknow, Lucknow-India

Mathematics

Punit Kumar Singh, Department of Mathematics and Astronomy, University of Lucknow, Lucknow, India

Research Scholar

How to Cite

Prasad, R., Kumar, S., & Singh, P. K. (2024). ON QUASI BI-SLANT RIEMANNIAN MAPS FROM LORENTZIAN PARA SASAKIAN MANIFOLDS. Journal of the Indonesian Mathematical Society, 30(2), 307–320. https://doi.org/10.22342/jims.30.2.1086.307-320

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References

Baird, P. and Wood, J.C., Harmonic Morphisms Between Riemannian Manifolds, London Mathematical Society Monographs, Vol. 29 (Oxford University Press, The Clarendon Press, Oxford, 2003).
Bilal, M., Kumar, S., Prasad, R., Haseeb, A., and Kumar S., On h-Quasi-Hemi-Slant Riemannian Maps, Axioms. 11(11) (2022) Page 641.
Bourguignon, J.P. and Lawson, H.B., A mathematician’s visit to Kaluza-Klein theory, Rend. Semin. Mat. Univ. Politec. Torino Special Issue (1989), 143 − 163.
Bourguignon, J.P. and Lawson, H.B., Stability and isolation phenomena for Yang-mills fields, Commun. Math. Phys. 79 (1981), 189 − 230.
Falcitelli, M. Pastore, A.M. and Ianus, S., Riemannian submersions and related topics, World Scientific, River Edge, NJ, 2004.
Fischer, A.E., Riemannian maps between Riemannian manifolds, Contemp. Math. 132 (1992), 331 − 366.
Garcia-Rio, E. and Kupeli, D.N., Semi-Riemannian Maps and Their Applications, Kluwer Academic, Dordrecht, 1999.
Gray, A., Pseudo-Riemannian almost product manifolds and submersions, J. Math. Mech. 16 (1967), 715 − 737.
Gunduzalp, Y. and S¸ahin, B., Paracontact semi-Riemannian submersions, Turkish J. Math. 37(1) (2013), 114 − 128.
Ianus, S. and Visinescu, M., Kaluza-Klein theory with scalar fields and generalized Hopf manifolds, Class. Quantum Gravit. 4 (1987), 1317 − 1325.
Kumar, S., Prasad, R. and Singh, P.K., Conformal Semi-Slant Submersions from Lorentzian Para Sasakian Manifolds, Commun. Korean Math. Soc. 34(2)(2019), 637 − 655.
Kumar, S., Bilal, M., Prasad, R., Haseeb, A., and Chen, Z., V-quasi-bi-slant Riemannian maps, Symmetry 14(7) (2022), page 1360.
Magid, M.A., Submersions from anti-de Sitter space with totally geodesic fibers, J. Differential Geom. 16(2) (1981), 323 − 331.
O’Neill, B., The fundamental equations of a submersion, Mich. Math. J. 13 (1966), 458−469.
Park, K.S., Semi-slant Riemannian maps, Taiwanese Journal of Mathematics 17(3) (2013), 937 − 956.
Prasad, R., Kumar, S., Kumar, S. and Vanli, A.T., On Quasi-Hemi-Slant Riemannian Maps, Gazi University Journal of Science 34(2) 2021, 477 − 491
Prasad, R., and Kumar, S., Semi-slant Riemannian maps from almost contact metric manifolds into Riemannian manifolds, Tbilisi Math. J. 11(4) (2018), 19 − 34.
Prasad, R., Mofarreh, F., Haseeb, A., and Verma, S.K., On quasi bi-slant Lorentzian submersions from LP-Sasakian manifolds, Journal Of Math. and Comp. Sci. 24(3) (2021), 186−200.
S. ahin, B., Biharmonic Riemannian maps, Ann. Polon. Math. 102(1), (2011), 39 − 49.
S. ahin, B., Hemi-slant Riemannian Maps, Mediterr. J. Math. (2017) DOI 10.1007/s00009-016-0817-21660-5446/17/010001-17.
S. ahin, B., Invariant and anti-invariant Riemannian maps to Kahler manifolds, Int. J. Geom. Methods Mod. Phys. 7(3) (2010), 337 − 355.
S. ahin, B., Riemannian submersions, Riemannian maps in Hermitian Geometry and their applications, Elsevier, Academic Press, 2017.

References

Baird, P. and Wood, J.C., Harmonic Morphisms Between Riemannian Manifolds, London Mathematical Society Monographs, Vol. 29 (Oxford University Press, The Clarendon Press, Oxford, 2003).

Bilal, M., Kumar, S., Prasad, R., Haseeb, A., and Kumar S., On h-Quasi-Hemi-Slant Riemannian Maps, Axioms. 11(11) (2022) Page 641.

Bourguignon, J.P. and Lawson, H.B., A mathematician’s visit to Kaluza-Klein theory, Rend. Semin. Mat. Univ. Politec. Torino Special Issue (1989), 143 − 163.

Bourguignon, J.P. and Lawson, H.B., Stability and isolation phenomena for Yang-mills fields, Commun. Math. Phys. 79 (1981), 189 − 230.

Falcitelli, M. Pastore, A.M. and Ianus, S., Riemannian submersions and related topics, World Scientific, River Edge, NJ, 2004.

Fischer, A.E., Riemannian maps between Riemannian manifolds, Contemp. Math. 132 (1992), 331 − 366.

Garcia-Rio, E. and Kupeli, D.N., Semi-Riemannian Maps and Their Applications, Kluwer Academic, Dordrecht, 1999.

Gray, A., Pseudo-Riemannian almost product manifolds and submersions, J. Math. Mech. 16 (1967), 715 − 737.

Gunduzalp, Y. and S¸ahin, B., Paracontact semi-Riemannian submersions, Turkish J. Math. 37(1) (2013), 114 − 128.

Ianus, S. and Visinescu, M., Kaluza-Klein theory with scalar fields and generalized Hopf manifolds, Class. Quantum Gravit. 4 (1987), 1317 − 1325.

Kumar, S., Prasad, R. and Singh, P.K., Conformal Semi-Slant Submersions from Lorentzian Para Sasakian Manifolds, Commun. Korean Math. Soc. 34(2)(2019), 637 − 655.

Kumar, S., Bilal, M., Prasad, R., Haseeb, A., and Chen, Z., V-quasi-bi-slant Riemannian maps, Symmetry 14(7) (2022), page 1360.

Magid, M.A., Submersions from anti-de Sitter space with totally geodesic fibers, J. Differential Geom. 16(2) (1981), 323 − 331.

O’Neill, B., The fundamental equations of a submersion, Mich. Math. J. 13 (1966), 458−469.

Park, K.S., Semi-slant Riemannian maps, Taiwanese Journal of Mathematics 17(3) (2013), 937 − 956.

Prasad, R., Kumar, S., Kumar, S. and Vanli, A.T., On Quasi-Hemi-Slant Riemannian Maps, Gazi University Journal of Science 34(2) 2021, 477 − 491

Prasad, R., and Kumar, S., Semi-slant Riemannian maps from almost contact metric manifolds into Riemannian manifolds, Tbilisi Math. J. 11(4) (2018), 19 − 34.

Prasad, R., Mofarreh, F., Haseeb, A., and Verma, S.K., On quasi bi-slant Lorentzian submersions from LP-Sasakian manifolds, Journal Of Math. and Comp. Sci. 24(3) (2021), 186−200.

S. ahin, B., Biharmonic Riemannian maps, Ann. Polon. Math. 102(1), (2011), 39 − 49.

S. ahin, B., Hemi-slant Riemannian Maps, Mediterr. J. Math. (2017) DOI 10.1007/s00009-016-0817-21660-5446/17/010001-17.

S. ahin, B., Invariant and anti-invariant Riemannian maps to Kahler manifolds, Int. J. Geom. Methods Mod. Phys. 7(3) (2010), 337 − 355.

S. ahin, B., Riemannian submersions, Riemannian maps in Hermitian Geometry and their applications, Elsevier, Academic Press, 2017.

ON QUASI BI-SLANT RIEMANNIAN MAPS FROM LORENTZIAN PARA SASAKIAN MANIFOLDS

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Rajendra Prasad, Department of Mathematics and Astronomy, University of Lucknow, Lucknow

Sushil Kumar, Shri Jai Narayan Post Graduate College, University of Lucknow, Lucknow-India

Punit Kumar Singh, Department of Mathematics and Astronomy, University of Lucknow, Lucknow, India

References

References