On N(k)-Quasi Einstein Manifolds Admitting a Conharmonic Curvature Tensor
Rahuthanahalli Thimmegowda Naveen Kumar, Venkatesha Venkatesha
Keywords:
N(k)-quasi Einstein manifold, conharmonic curvature tensor, Ricci tensor, conharmonically pseudo-symmetric, conharmonically conservativeAbstract
In this paper, quasiEinstein manifolds whose characteristic vector field $\xi$ belongsto $k$-nullity distribution are called $N(k)$-quasi Einsteinmanifolds. Firstly, we have shown that a conharmonically flat quasiEinstein manifold is an $N\left(\frac{2a+b}{n-2}\right)$-quasiEinstein manifold. Later, we consider $N(k)$-quasi Einsteinmanifolds satisfying the conditions$\tilde{H}(\xi,X)\cdot\tilde{P}=0$ and$\tilde{H}(\xi,X)\cdot\tilde{Z}=0$. Moreover, we also studiedconharmonically pseudo-symmetric and conharmonically conservative$N(k)$-quasi Einstein manifolds.Downloads
Published
2022-03-31
How to Cite
Team, S. (2022). On N(k)-Quasi Einstein Manifolds Admitting a Conharmonic Curvature Tensor: Rahuthanahalli Thimmegowda Naveen Kumar, Venkatesha Venkatesha. Thai Journal of Mathematics, 20(1), 439–449. Retrieved from https://thaijmath2.in.cmu.ac.th/index.php/thaijmath/article/view/1336
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