On a Special Type Nearly Quasi-Einstein Manifold
On a special type nearly quasi-Einstein manifold
In the present paper, we consider a special type of nearly quasi-Einstein manifold denoted byN(QE)n. Most of the sections are based on some properties ofN(QE)n. We give some theorems about these manifolds. In the last section, a special type
___
- Chaki, M. C., Maity, R. K., On quasi-Einstein manifolds, Publ. Math. Debrecen, 57, (2000), 297-306.
- De, U. C., Gazi, A. K., On nearly quasi-Einstein manifolds, Novi Sad J. Math., 38(2), (2008), 115-121.
- De, U. C., Guha, N., Kamilya, D, On generalized Ricci-recurrent manifolds, Tensor N. S., 56, (1995), 312-317.
- Deszcz, R., Glogowska, M., Hotlos, M., Senturk, Z., On certain quasi-Einstein semisymmetric hypersurfaces, Annales Univ. Sci. Budapest. Eotvos Sect. Math., 41, (1998), 151-164.
- Gazi, A. K., De, U. C., On the existence of nearly quasi-Einstein manifolds, Novi Sad J. Math., 39(2), (2009), 111-117.
- Patterson, E. M., Some theorems on Ricci recurrent spaces, J. London Math. Soc., 27, (1952), 287-295.
- Prakasha, D. G., Bagewadi, C. S., On nearly quasi-Einstein manifolds, Mathematica Pannonica, 21(2), (2010), 265-273.
- Singh, R. N., Pandey, M. K., Gautam, D., On nearly quasi Einstein manifold, Int. Journal of Math. Analysis., 5(36), (2011), 1767-1773.
- Walker, M., Penrose, R., On quadratic first integrals of the geodesic equations for type {22} spacetimes, Commun. Math. Phys., 18, (1970), 265- 274.
- Yano, K., On the torse-forming directions in Riemannian spaces, Proc. Imp. Acad., 20(6), (1944), 340-345.