You are here

Home » Content

A Note on Nearly Quasi-Einstein Manifolds

Journal Name:

  • European Journal of Pure and Applied Mathematics

Publication Year:

  • 2012

Key Words:

Author Name

AMS Codes:

Abstract (2. Language): 
The object of the present paper is to study nearly quasi-Einstein manifold. Also we have studied decomposable Riemannian manifold and it is shown that a decomposable Riemannian manifold is nearly quasi-Einstein if and only if both the decompositions are Einstein.
Bookmark/Search this post with
FULL TEXT (PDF): 
PDF icon arastirmax-note-nearly-quasi-einstein-manifolds.pdf
  • 3
365-372
  • English

REFERENCES

References: 

[1] M. C. Chaki and R. K. Maity. On quasi-Einstein manifolds, Publ. Math. Debrecen 57,
297–306. 2000.
[2] U. C. De and A. K. Gaji. On nearly quasi-Einstein manifolds, Novi Sad J. Math., 38(2),
115–121. 2008
[3] F. Defever, R. Deszcz, M. Hotlo´s, M. Kucharski and Z. Sentürk. Generalisations of
Robertson-Walker spaces, Annales Univ. Sci. Budapest. Eötvös Sect. Math., 43, 13–24.
2000.
[4] R. Deszcz. On pseudosymmetric spaces, Bull. Belg. Math. Soc. Ser A, 44, 1–34. 1992.
[5] R. Deszcz, F. Dillen, L. Verstraelen and L. Vrancken. Quasi-Einstein totally real submani-
folds of S6(1), Tohoku Math. J., 51, 461–478. 1999.
[6] R. Deszcz and M. Glogowska. Some examples of nonsemisymmetric Ricci-semisymmetric
hypersurfaces, Colloq. Math., 94, 87–101. 2000.
[7] R. Deszcz, M. Glogowska, M. Hotlo´s and Z. Sentürk, Z. On certain quasi-Einstein semi-
symmetric hypersurfaces, Annales Univ. Sci. Budapest. Eötvös Sect. Math., 41, 151–164.
1998.
[8] R. Deszcz and M. Hotlo´s. On some pseudosymmetry type curvature condition, Tsukuba J.
Math., 27, 13–30. 2003.
[9] R. Deszcz and M. Hotlo´s On hypersurfaces with type number two in spaces of constant
curvature, Annales Univ. Sci. Budapest. Eötvös Sect. Math., 46, 19–34. 2003.
[10] R. Deszcz andM. Hotlo´s and Z. Sentürk. Quasi-Einstein hypersurfaces in semi-Riemannian
space forms, Colloq. Math., 81, 81–97. 2001.
[11] R. Deszcz and M. Hotlo´s and Z. Sentürk. On curvature properties of quasi-Einstein hyper-
surfaces in semi-Euclidean spaces, Soochow J. Math., 27(4), 375–389. 2001.
[12] R. Deszcz, P. Verheyen and L. Verstraelen. On some generalized Einstein metric conditions,
Publ. Inst. Math. (Beograd), 60:74, 108–120. 1996.
[13] D. Ferus. A remark on Codazzi tensors on constant curvature space, Lecture Notes Math.,
838, Global Differential Geometry and Global Analysis, Springer-Verlag, New York,
1981.
[14] A. K. Gaji and U. C. De. On the existence of nearly quasi-Einstein manifolds, Novi Sad J.
Math., 39(2), 111–117. 2009.
[15] A. A. Shaikh, Y. H. Kim and S. K. Hui. On Lorentzian quasi-Einstein manifolds, J. Korean
Math. Society, 48(4), 669–689. 2011.
[16] A. A. Shaikh, D. W. Yoon and S. K. Hui. On quasi-Einstein spacetimes, Tsukuba J. Math.,
33(2), 305–326. 2009.
[17] Y. Watanabe. Integral inequalities in compact orientable manifolds, Riemannian or Kahle-
rian, Kodai Math. Sem. Rep., 20, 261–271. 1968.
[18] K. Yano. Integral formulas in Riemannian Geometry, Marcel Dekker, New York, 1970.
[19] K. Yano and M. Kon. Structure on manifolds, World Scientific Publ., Singapore, 1984.

Thank you for copying data from http://www.arastirmax.com