Rigidity Results On Generalized m-Quasi Einstein Manifolds with Associated Affine Killing Vector Field.

Rahul Poddar; Balasubramanian Subramanian; R. Sharma

doi:10.36890/iejg.1286128

Research Article

Year 2023, , 266 - 271, 30.04.2023

Rahul Poddar , Balasubramanian Subramanian , R. Sharma

https://doi.org/10.36890/iejg.1286128

Abstract

References

[1] Barros, A. and Ribeiro, E.: Integral formulae on quasi-Einstein manifolds and applications, Glasg. Math. J. 54, 213-223 (2012).
[2] Barros, A. and Ribeiro, E.: Characterizations and integral formulae for generalized m-quasi-Einstein metrics, Bull. Braz. Math. Soc., New Series 45, 325-341 (2014).
[3] Case, J., Shu, Y. and Wei, G.: Rigidity of quasi-Einstein metrics, Diff. Geom. Appl. 29, 93-100 (2011).
[4] Catino, G.: Generalized quasi-Einstein manifolds with harmonic Weyl tensor, Math. Zeits. 271, 751-756 (2012).
[5] Ghosh, A. & Sharma, R.: Sasakian metric as a Ricci soliton and related results, Journal of Geometry and Physics 75, 1-6 (2014).
[6] He, C., Petersen, P. Wylie, W.: On the classification of warped product Einstein metrics, ArXiv Preprint ArXiv: 1010.5488, (2010).
[7] Pigola, S., Rigoli, M., Rimoldi, M. and Setti, A.G.: Ricci almost solitons, Ann.Della Scuola Norm. Sup. Di Pisa-Classe Di Sci. 10, 757-799 (2011).
[8] Sharma, R.: Some results on almost Ricci solitons and geodesic vector fields, Beitr. Alg. Geom. 59, 289-294 (2018).
[9] Tashiro, Y.: Complete Riemannian manifolds and some vector fields. Trans. Amer. Math. Soc. 117, 251-275 (1965).
[10] Yano, K.: Integral formulas in Riemannian geometry, Marcel Dekker, 1970.

Rigidity Results On Generalized m-Quasi Einstein Manifolds with Associated Affine Killing Vector Field.

Year 2023, , 266 - 271, 30.04.2023

Rahul Poddar , Balasubramanian Subramanian , R. Sharma

https://doi.org/10.36890/iejg.1286128

Abstract

We study a non-trivial generalized $m$-quasi Einstein manifold $M$ with finite $m$ and associated divergence-free affine Killing vector field, and show that $M$ reduces to an $m$-quasi Einstein manifold. In addition, if $M$ is complete, then it splits as the product of a line and an $(n-1)$-dimensional negatively Einstein manifold. Finally, we show that the same result holds for a complete non-trivial $m$-quasi Einstein manifold $M$ with finite $m$ and associated affine Killing vector field.

Keywords

Generalized $m$-quasi Einstein manifold, affine Killing vector field, Einstein manifold, Ricci almost soliton

References

[1] Barros, A. and Ribeiro, E.: Integral formulae on quasi-Einstein manifolds and applications, Glasg. Math. J. 54, 213-223 (2012).
[2] Barros, A. and Ribeiro, E.: Characterizations and integral formulae for generalized m-quasi-Einstein metrics, Bull. Braz. Math. Soc., New Series 45, 325-341 (2014).
[3] Case, J., Shu, Y. and Wei, G.: Rigidity of quasi-Einstein metrics, Diff. Geom. Appl. 29, 93-100 (2011).
[4] Catino, G.: Generalized quasi-Einstein manifolds with harmonic Weyl tensor, Math. Zeits. 271, 751-756 (2012).
[5] Ghosh, A. & Sharma, R.: Sasakian metric as a Ricci soliton and related results, Journal of Geometry and Physics 75, 1-6 (2014).
[6] He, C., Petersen, P. Wylie, W.: On the classification of warped product Einstein metrics, ArXiv Preprint ArXiv: 1010.5488, (2010).
[7] Pigola, S., Rigoli, M., Rimoldi, M. and Setti, A.G.: Ricci almost solitons, Ann.Della Scuola Norm. Sup. Di Pisa-Classe Di Sci. 10, 757-799 (2011).
[8] Sharma, R.: Some results on almost Ricci solitons and geodesic vector fields, Beitr. Alg. Geom. 59, 289-294 (2018).
[9] Tashiro, Y.: Complete Riemannian manifolds and some vector fields. Trans. Amer. Math. Soc. 117, 251-275 (1965).
[10] Yano, K.: Integral formulas in Riemannian geometry, Marcel Dekker, 1970.

There are 10 citations in total.

Details

Primary Language	English
Subjects	Mathematical Sciences
Journal Section	Research Article
Authors	Rahul Poddar 0000-0002-5671-2774 Balasubramanian Subramanian 0000-0001-8947-4840 R. Sharma 0000-0001-5026-8564
Publication Date	April 30, 2023
Acceptance Date	April 20, 2023
Published in Issue	Year 2023

Cite

APA	Poddar, R., Subramanian, B., & Sharma, R. (2023). Rigidity Results On Generalized m-Quasi Einstein Manifolds with Associated Affine Killing Vector Field. International Electronic Journal of Geometry, 16(1), 266-271. https://doi.org/10.36890/iejg.1286128
AMA	Poddar R, Subramanian B, Sharma R. Rigidity Results On Generalized m-Quasi Einstein Manifolds with Associated Affine Killing Vector Field. Int. Electron. J. Geom. April 2023;16(1):266-271. doi:10.36890/iejg.1286128
Chicago	Poddar, Rahul, Balasubramanian Subramanian, and R. Sharma. “Rigidity Results On Generalized M-Quasi Einstein Manifolds With Associated Affine Killing Vector Field”. International Electronic Journal of Geometry 16, no. 1 (April 2023): 266-71. https://doi.org/10.36890/iejg.1286128.
EndNote	Poddar R, Subramanian B, Sharma R (April 1, 2023) Rigidity Results On Generalized m-Quasi Einstein Manifolds with Associated Affine Killing Vector Field. International Electronic Journal of Geometry 16 1 266–271.
IEEE	R. Poddar, B. Subramanian, and R. Sharma, “Rigidity Results On Generalized m-Quasi Einstein Manifolds with Associated Affine Killing Vector Field”., Int. Electron. J. Geom., vol. 16, no. 1, pp. 266–271, 2023, doi: 10.36890/iejg.1286128.
ISNAD	Poddar, Rahul et al. “Rigidity Results On Generalized M-Quasi Einstein Manifolds With Associated Affine Killing Vector Field”. International Electronic Journal of Geometry 16/1 (April 2023), 266-271. https://doi.org/10.36890/iejg.1286128.
JAMA	Poddar R, Subramanian B, Sharma R. Rigidity Results On Generalized m-Quasi Einstein Manifolds with Associated Affine Killing Vector Field. Int. Electron. J. Geom. 2023;16:266–271.
MLA	Poddar, Rahul et al. “Rigidity Results On Generalized M-Quasi Einstein Manifolds With Associated Affine Killing Vector Field”. International Electronic Journal of Geometry, vol. 16, no. 1, 2023, pp. 266-71, doi:10.36890/iejg.1286128.
Vancouver	Poddar R, Subramanian B, Sharma R. Rigidity Results On Generalized m-Quasi Einstein Manifolds with Associated Affine Killing Vector Field. Int. Electron. J. Geom. 2023;16(1):266-71.