Conformal Quasi-Hemi-Slant Riemannian Maps

Şener Yanan

doi:10.33434/cams.1084830

Research Article

Conformal Quasi-Hemi-Slant Riemannian Maps

Year 2022, Volume: 5 Issue: 2, 99 - 113, 30.06.2022

Şener Yanan

https://doi.org/10.33434/cams.1084830

Abstract

In this paper, we state some geometric properties of conformal quasi-hemi-slant Riemannian maps from almost Hermitian manifolds to Riemannian manifolds. We give necessary and sufficient conditions for certain distributions to be integrable and get examples. For such distributions, we examine which conditions define totally geodesic foliations on base manifold. In addition, we apply notion of pluriharmonicity to get some relations between horizontally homothetic maps and conformal quasi-hemi-slant Riemannian maps.

Keywords

Riemannian map, conformal Riemannian map, conformal quasi-hemi-slant Riemannian map

References

[1] M. A. Akyol, Conformal semi-slant submersions, Int. J. Geom, 14(7) (2017), 1750114.
[2] M. A. Akyol, B. S¸ ahin, Conformal anti-invariant submersions from almost Hermitian manifolds, Turk. J. Math., 40(1) (2016), 43-70.
[3] M. A. Akyol, B. S¸ ahin, Conformal semi-invariant submersions, Commun. Contemp. Math., 19(2) (2017), 1650011.
[4] M. A. Akyol, B. S¸ ahin, Conformal slant submersions, Hacettepe J. Math. Stat., 48(1) (2019), 28-44.
[5] P. Baird, J. C. Wood, Harmonic Morphism between Riemannian Manifolds, Clarendon Press, Oxford, 2003.
[6] B. Y. Chen, Riemannian Submanifolds. Handbook of Differential Geometry, North-Holland, Amsterdam, 2000.
[7] M. Falcitelli, S. Ianus, A. M. Pastore, Riemannian submersions and related topics, World Scientific, NJ, 2004.
[8] A. E. Fischer, Riemannian maps between Riemannian manifolds, Contemp. Math., 132 (1992), 331-366.
[9] E. Garcia-Rio, D. N. Kupeli, Semi-Riemannian Maps and Their Applications, Kluwer Academic, Dordrecht, 1999.
[10] A. Gray, Pseudo-Riemannian almost product manifolds and submersions, Appl. Math. Mech., 16(7) (1967), 715-737.
[11] S. Kumar, S. Kumar, S. Pandey, R. Prasad, Conformal hemi-slant submersions from almost Hermitian manifolds, Commun. Korean Math. Soc., 35(3) (2020), 999-1018.
[12] C.W. Lee, J.W. Lee, B. S¸ ahin, G. Vilcu, Optimal inequalities for Riemannian maps and Riemannian submersions involving Casorati curvatures, Ann. di Mat. Pura ed Appl., 200(3) (2021), 1277-1295.
[13] S. Longwap, F. Massamba, N. E. Homti, On quasi-hemi-slant Riemannian submersion, JAMCS, 34(1) (2019), 1-14.
[14] J. Miao, Y. Wang, X. Gu, S. T. Yau, Optimal global conformal surface parametrization for visualization, Comm. Inf. Sys., 4(2) (2005), 117-134.
[15] T. Nore, Second fundamental form of a map, Ann. di Mat. Pura ed Appl., 146 (1986), 281-310.
[16] Y. Ohnita, On pluriharmonicity of stable harmonic maps, J. London Math. Soc., s2-35(3) (1987), 563-587.
[17] B. O’Neill, The fundamental equations of a submersion, Mich. Math. J., 13(4) (1966), 459-469.
[18] K. S. Park, Semi-slant Riemannian map, Quaest. Math., 41(1) (2018), 1-14.
[19] R. Prasad, S. Kumar, S. Kumar, A. Turgut Vanlı, On quasi-hemi-slant Riemannian maps, Gazi Univ. J. Sci., 34(2) (2021), 477-491.
[20] B. S¸ ahin, Generic Riemannian maps, Miskolc Math. Notes, 18(1) (2017), 453-467.
[21] B. S¸ ahin, Semi-invariant Riemannian maps from almost Hermitian manifolds, Indag. Math., 23(1) (2012), 80-94.
[22] B. S¸ ahin, Slant Riemannian maps from almost Hermitian manifolds, Quaest. Math., 36(3) (2013), 449-461.
[23] B. S¸ ahin, Hemi-slant Riemannian maps, Mediterr. J. Math., 14 Article number:10 (2017).
[24] B. S¸ ahin, Conformal Riemannian maps between Riemannian manifolds, their harmonicity and decomposition theorems, Acta Appl. Math., 109 (2010), 829-847.
[25] B. S¸ ahin, Riemannian Submersions, Riemannian Maps in Hermitian Geometry, and Their Applications, Elsevier, London, 2017.
[26] B. S¸ ahin, S¸ . Yanan, Conformal Riemannian maps from almost Hermitian manifolds, Turk. J. Math., 42(5) (2018), 2436- 2451.
[27] B. S¸ ahin, S¸ . Yanan, Conformal semi-invariant Riemannian maps from almost Hermitian manifolds, Filomat, 33(4) (2019), 1125-1134.
[28] Y. Wang, X. Gu, S. T. Yau, Volumetric harmonic map, Comm. Inf. Sys., 3(3) (2003), 191-202.
[29] Y. Wang, X. Gu, T. F. Chan, P. M. Thompson, S. T. Yau, Brain surface conformal parametrization with the Ricci flow, Proceeding of the IEEE International Symposium on Biomedical Imaging-from Nano to Macro (ISBI), (2007), 1312-1315.
[30] B. Watson, Almost Hermitian submersions, J. Differ. Geom., 11 (1976), 147-165.
[31] S¸ . Yanan, Quasi-hemi-slant conformal submersions from almost Hermitian manifolds, Turk. J. Math. Comput. Sci., 13(1) (2021), 135-144.
[32] S¸ . Yanan, Conformal generic Riemannian maps from almost Hermitian manifolds, Turk. J. Sci., 6(2) (2021), 76-88.
[33] S¸ . Yanan, Conformal hemi-slant Riemannian maps, FCMS, 3(1) (2022), 57-74.
[34] S¸ . Yanan, Conformal semi-slant Riemannian maps from almost Hermitian manifolds onto Riemannian manifolds, Filomat, 36(5) (2022).
[35] S¸ . Yanan, B. S¸ ahin, Conformal slant Riemannian maps, Int. J. Maps Math., 5(1) (2022), 78-100.
[36] K. Yano, M. Kon, Structures on Manifolds, World Scientific, Singapore, 1984.

Year 2022, Volume: 5 Issue: 2, 99 - 113, 30.06.2022

Şener Yanan

https://doi.org/10.33434/cams.1084830

Abstract

References

[1] M. A. Akyol, Conformal semi-slant submersions, Int. J. Geom, 14(7) (2017), 1750114.
[2] M. A. Akyol, B. S¸ ahin, Conformal anti-invariant submersions from almost Hermitian manifolds, Turk. J. Math., 40(1) (2016), 43-70.
[3] M. A. Akyol, B. S¸ ahin, Conformal semi-invariant submersions, Commun. Contemp. Math., 19(2) (2017), 1650011.
[4] M. A. Akyol, B. S¸ ahin, Conformal slant submersions, Hacettepe J. Math. Stat., 48(1) (2019), 28-44.
[5] P. Baird, J. C. Wood, Harmonic Morphism between Riemannian Manifolds, Clarendon Press, Oxford, 2003.
[6] B. Y. Chen, Riemannian Submanifolds. Handbook of Differential Geometry, North-Holland, Amsterdam, 2000.
[7] M. Falcitelli, S. Ianus, A. M. Pastore, Riemannian submersions and related topics, World Scientific, NJ, 2004.
[8] A. E. Fischer, Riemannian maps between Riemannian manifolds, Contemp. Math., 132 (1992), 331-366.
[9] E. Garcia-Rio, D. N. Kupeli, Semi-Riemannian Maps and Their Applications, Kluwer Academic, Dordrecht, 1999.
[10] A. Gray, Pseudo-Riemannian almost product manifolds and submersions, Appl. Math. Mech., 16(7) (1967), 715-737.
[11] S. Kumar, S. Kumar, S. Pandey, R. Prasad, Conformal hemi-slant submersions from almost Hermitian manifolds, Commun. Korean Math. Soc., 35(3) (2020), 999-1018.
[12] C.W. Lee, J.W. Lee, B. S¸ ahin, G. Vilcu, Optimal inequalities for Riemannian maps and Riemannian submersions involving Casorati curvatures, Ann. di Mat. Pura ed Appl., 200(3) (2021), 1277-1295.
[13] S. Longwap, F. Massamba, N. E. Homti, On quasi-hemi-slant Riemannian submersion, JAMCS, 34(1) (2019), 1-14.
[14] J. Miao, Y. Wang, X. Gu, S. T. Yau, Optimal global conformal surface parametrization for visualization, Comm. Inf. Sys., 4(2) (2005), 117-134.
[15] T. Nore, Second fundamental form of a map, Ann. di Mat. Pura ed Appl., 146 (1986), 281-310.
[16] Y. Ohnita, On pluriharmonicity of stable harmonic maps, J. London Math. Soc., s2-35(3) (1987), 563-587.
[17] B. O’Neill, The fundamental equations of a submersion, Mich. Math. J., 13(4) (1966), 459-469.
[18] K. S. Park, Semi-slant Riemannian map, Quaest. Math., 41(1) (2018), 1-14.
[19] R. Prasad, S. Kumar, S. Kumar, A. Turgut Vanlı, On quasi-hemi-slant Riemannian maps, Gazi Univ. J. Sci., 34(2) (2021), 477-491.
[20] B. S¸ ahin, Generic Riemannian maps, Miskolc Math. Notes, 18(1) (2017), 453-467.
[21] B. S¸ ahin, Semi-invariant Riemannian maps from almost Hermitian manifolds, Indag. Math., 23(1) (2012), 80-94.
[22] B. S¸ ahin, Slant Riemannian maps from almost Hermitian manifolds, Quaest. Math., 36(3) (2013), 449-461.
[23] B. S¸ ahin, Hemi-slant Riemannian maps, Mediterr. J. Math., 14 Article number:10 (2017).
[24] B. S¸ ahin, Conformal Riemannian maps between Riemannian manifolds, their harmonicity and decomposition theorems, Acta Appl. Math., 109 (2010), 829-847.
[25] B. S¸ ahin, Riemannian Submersions, Riemannian Maps in Hermitian Geometry, and Their Applications, Elsevier, London, 2017.
[26] B. S¸ ahin, S¸ . Yanan, Conformal Riemannian maps from almost Hermitian manifolds, Turk. J. Math., 42(5) (2018), 2436- 2451.
[27] B. S¸ ahin, S¸ . Yanan, Conformal semi-invariant Riemannian maps from almost Hermitian manifolds, Filomat, 33(4) (2019), 1125-1134.
[28] Y. Wang, X. Gu, S. T. Yau, Volumetric harmonic map, Comm. Inf. Sys., 3(3) (2003), 191-202.
[29] Y. Wang, X. Gu, T. F. Chan, P. M. Thompson, S. T. Yau, Brain surface conformal parametrization with the Ricci flow, Proceeding of the IEEE International Symposium on Biomedical Imaging-from Nano to Macro (ISBI), (2007), 1312-1315.
[30] B. Watson, Almost Hermitian submersions, J. Differ. Geom., 11 (1976), 147-165.
[31] S¸ . Yanan, Quasi-hemi-slant conformal submersions from almost Hermitian manifolds, Turk. J. Math. Comput. Sci., 13(1) (2021), 135-144.
[32] S¸ . Yanan, Conformal generic Riemannian maps from almost Hermitian manifolds, Turk. J. Sci., 6(2) (2021), 76-88.
[33] S¸ . Yanan, Conformal hemi-slant Riemannian maps, FCMS, 3(1) (2022), 57-74.
[34] S¸ . Yanan, Conformal semi-slant Riemannian maps from almost Hermitian manifolds onto Riemannian manifolds, Filomat, 36(5) (2022).
[35] S¸ . Yanan, B. S¸ ahin, Conformal slant Riemannian maps, Int. J. Maps Math., 5(1) (2022), 78-100.
[36] K. Yano, M. Kon, Structures on Manifolds, World Scientific, Singapore, 1984.

There are 36 citations in total.

Details

Primary Language	English
Subjects	Mathematical Sciences
Journal Section	Articles
Authors	Şener Yanan 0000-0003-1600-6522
Publication Date	June 30, 2022
Submission Date	March 8, 2022
Acceptance Date	June 7, 2022
Published in Issue	Year 2022 Volume: 5 Issue: 2

Cite

APA	Yanan, Ş. (2022). Conformal Quasi-Hemi-Slant Riemannian Maps. Communications in Advanced Mathematical Sciences, 5(2), 99-113. https://doi.org/10.33434/cams.1084830
AMA	Yanan Ş. Conformal Quasi-Hemi-Slant Riemannian Maps. Communications in Advanced Mathematical Sciences. June 2022;5(2):99-113. doi:10.33434/cams.1084830
Chicago	Yanan, Şener. “Conformal Quasi-Hemi-Slant Riemannian Maps”. Communications in Advanced Mathematical Sciences 5, no. 2 (June 2022): 99-113. https://doi.org/10.33434/cams.1084830.
EndNote	Yanan Ş (June 1, 2022) Conformal Quasi-Hemi-Slant Riemannian Maps. Communications in Advanced Mathematical Sciences 5 2 99–113.
IEEE	Ş. Yanan, “Conformal Quasi-Hemi-Slant Riemannian Maps”, Communications in Advanced Mathematical Sciences, vol. 5, no. 2, pp. 99–113, 2022, doi: 10.33434/cams.1084830.
ISNAD	Yanan, Şener. “Conformal Quasi-Hemi-Slant Riemannian Maps”. Communications in Advanced Mathematical Sciences 5/2 (June 2022), 99-113. https://doi.org/10.33434/cams.1084830.
JAMA	Yanan Ş. Conformal Quasi-Hemi-Slant Riemannian Maps. Communications in Advanced Mathematical Sciences. 2022;5:99–113.
MLA	Yanan, Şener. “Conformal Quasi-Hemi-Slant Riemannian Maps”. Communications in Advanced Mathematical Sciences, vol. 5, no. 2, 2022, pp. 99-113, doi:10.33434/cams.1084830.
Vancouver	Yanan Ş. Conformal Quasi-Hemi-Slant Riemannian Maps. Communications in Advanced Mathematical Sciences. 2022;5(2):99-113.

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