Ricci Yamabe soliton on f-Kenmotsu manifolds with generalized symmetric metric connection
DOI :
https://doi.org/10.5269/bspm.77379Résumé
This research investigates Ricci Yamabe soliton on f-Kenmotsu manifolds whose potential vector field is torse-forming admits a generalized symmetric metric connection. Some results of such soliton on CR-submanifolds of f-Kenmotsu manifolds with generalized symmetric metric connection are obtained.
Références
1. B.Y. Chen, (2017), classification of torqued vector fields and its applications to Ricci solitons, Kragujevac J. Math. 41(2), 239-250.
2. D. Janssens and L. Vanhecke, (1981), Almost contact structures and curvature tensors, Kodai Math.J., 4(1), 1–27.
3. G. Pitis, (1988), A remark on Kenmotsu manifolds, Bul. Univ. Brasov Ser. C, 30, 31–32.
4. G.S.Shivaprasanna, Md. Samiul Haque and G.Somashekhara, (2020), η-Ricci soliton on f-Kenmotsu manifolds, Journal of Physics: Conference Series, doi:10.1088/1742-6596/1543/1/012007.
5. G.S.Shivaprasanna, Md. Samiul Haque and G.Somashekhara, (2020), η-Ricci soliton in three-dimensional (ε, δ)-trans-Sasakian manifold, Waffen-UND Kostumkunde Journal, 11(3), 13-26.
6. G.S.Shivaprasanna, Md. Samiul Haque, Savithri Shashidhar and G.Somashekhara, (2021), Ricci Yamabe soliton on LP-Sasakian manifolds, J. Math. Comput. Sci., 11(5), https://doi.org/10.28919/jmcs/6253, 6242-6255.
7. G.S. Shivaprasanna, Prabhavati G. Angadi, R. Rajendra, P. S. K. Reddy and Somashekhara Ganganna, (2023), fKenmotsu manifolds with generalized symmetric metric connection, Bulletin of the International mathematical virtual institute, 13(3), DOI: 10.7251/BIMVI2303517A, 517-527.
8. K. Kenmotsu, (1972), A class of almost contact Riemannian manifolds, Tohoku Math. J., 24(1), DOI: 10.2748/tmj/1178241594, 93-103.
9. K Yano, (1944), on torse-forming direction in a Riemannian space, Proc.Imp. Acad. Tokyo 20(6), DOI: 10.3792/pia/1195572958, 340-345.
10. Md. Samiul Haque, G.S.Shivaprasanna and G.Somashekhara, (2024), Ricci Yamabe soliton in three-dimensional (ε, δ)-trans-Sasakian manifolds, Tuijin jishu/journal of propulsion technology, 45(1), 4837-4847.
11. M.Ramesha, S.K. Narasimhamurthy, (2017), Projectively Flat Finsler Space of Douglas Type with Weakly-Berwald (α, β)-Metric, International Journal of Pure Mathematical Sciences, 18, doi:10.18052/www.scipress.com/IJPMS.18.1, 1-12.
12. O. Bahadir, S. K. Chaubey, (2020), some notes on LP-Sasakian manifolds with generalized symmetric metric connection, Honam Mathematical Journal, 42(3), DOI:10.5831/HMJ.2020.42.3.461 461-476.
13. Pradeep Kumar, S. K. Narasimhamurthy, H. G. Nagaraja and S. T. Aveesh, (2009), On a special hypersurface of a Finsler space with (α, β)-metric, Tbilisi Mathematical Journal, 2, 51-60.
14. R.S. Hamilton, (1988), The Ricci flow on surfaces, Contemporary Mathematics, 71, https://doi.org/10.1090/conm/071/954419, 237-262.
15. S. Guler, and M. Crasmareanu, (2019), Ricci-Yamabe maps for Riemannian flow and their volume variation and volume entropy, Turk. J. Math., 43(5), DOI:10.3906/mat-1902-38, 2631-2641.
16. U.C. De, A.K. Sengupta, (2000), CR-submanifolds of a Lorentzian para-Sasakian manifold, Bull. Malaysian Math. Sci. Soc. 23(2), 99-106.
17. Z. Olszak and R. Rosco, (1991), Normal locally conformal almost cosympletic manifolds, Publ. Math.Debrecen, 39(3), DOI: 10.5486/PMD.1991.39.3-4.12, 315-323.
2. D. Janssens and L. Vanhecke, (1981), Almost contact structures and curvature tensors, Kodai Math.J., 4(1), 1–27.
3. G. Pitis, (1988), A remark on Kenmotsu manifolds, Bul. Univ. Brasov Ser. C, 30, 31–32.
4. G.S.Shivaprasanna, Md. Samiul Haque and G.Somashekhara, (2020), η-Ricci soliton on f-Kenmotsu manifolds, Journal of Physics: Conference Series, doi:10.1088/1742-6596/1543/1/012007.
5. G.S.Shivaprasanna, Md. Samiul Haque and G.Somashekhara, (2020), η-Ricci soliton in three-dimensional (ε, δ)-trans-Sasakian manifold, Waffen-UND Kostumkunde Journal, 11(3), 13-26.
6. G.S.Shivaprasanna, Md. Samiul Haque, Savithri Shashidhar and G.Somashekhara, (2021), Ricci Yamabe soliton on LP-Sasakian manifolds, J. Math. Comput. Sci., 11(5), https://doi.org/10.28919/jmcs/6253, 6242-6255.
7. G.S. Shivaprasanna, Prabhavati G. Angadi, R. Rajendra, P. S. K. Reddy and Somashekhara Ganganna, (2023), fKenmotsu manifolds with generalized symmetric metric connection, Bulletin of the International mathematical virtual institute, 13(3), DOI: 10.7251/BIMVI2303517A, 517-527.
8. K. Kenmotsu, (1972), A class of almost contact Riemannian manifolds, Tohoku Math. J., 24(1), DOI: 10.2748/tmj/1178241594, 93-103.
9. K Yano, (1944), on torse-forming direction in a Riemannian space, Proc.Imp. Acad. Tokyo 20(6), DOI: 10.3792/pia/1195572958, 340-345.
10. Md. Samiul Haque, G.S.Shivaprasanna and G.Somashekhara, (2024), Ricci Yamabe soliton in three-dimensional (ε, δ)-trans-Sasakian manifolds, Tuijin jishu/journal of propulsion technology, 45(1), 4837-4847.
11. M.Ramesha, S.K. Narasimhamurthy, (2017), Projectively Flat Finsler Space of Douglas Type with Weakly-Berwald (α, β)-Metric, International Journal of Pure Mathematical Sciences, 18, doi:10.18052/www.scipress.com/IJPMS.18.1, 1-12.
12. O. Bahadir, S. K. Chaubey, (2020), some notes on LP-Sasakian manifolds with generalized symmetric metric connection, Honam Mathematical Journal, 42(3), DOI:10.5831/HMJ.2020.42.3.461 461-476.
13. Pradeep Kumar, S. K. Narasimhamurthy, H. G. Nagaraja and S. T. Aveesh, (2009), On a special hypersurface of a Finsler space with (α, β)-metric, Tbilisi Mathematical Journal, 2, 51-60.
14. R.S. Hamilton, (1988), The Ricci flow on surfaces, Contemporary Mathematics, 71, https://doi.org/10.1090/conm/071/954419, 237-262.
15. S. Guler, and M. Crasmareanu, (2019), Ricci-Yamabe maps for Riemannian flow and their volume variation and volume entropy, Turk. J. Math., 43(5), DOI:10.3906/mat-1902-38, 2631-2641.
16. U.C. De, A.K. Sengupta, (2000), CR-submanifolds of a Lorentzian para-Sasakian manifold, Bull. Malaysian Math. Sci. Soc. 23(2), 99-106.
17. Z. Olszak and R. Rosco, (1991), Normal locally conformal almost cosympletic manifolds, Publ. Math.Debrecen, 39(3), DOI: 10.5486/PMD.1991.39.3-4.12, 315-323.
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2025-09-02
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