Some results on β-kenmotsu manifolds with a non-symmetric non-metric connection
Keywords:
Non-symmetric non-metric connection, -Kenmotsu manifold, conformal curvature tensor, Ricci soliton, Einstein manifold, Ricci semi-symmetricAbstract
The object of the present paper is to study some results on a $\beta$-Kenmotsu manifold with a non-symmetric non-metric connection. We obtain the condition for the manifold with a non-symmetric non-metric connection to be projectively flat and conformally flat. Also, it has been demonstrated that the manifold satisfying the condition $\mathcal{\breve{R}^{\dag}\cdot\breve{S}^{\dag}}$=$0$ is an Einstein manifold. Further, by virtue of this result, we found the condition of Ricci soliton in $\beta$-Kenmotsu manifold to be expanding.
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Published
2024-03-15
How to Cite
Singh, A. ., Ahmad, M. ., Yadav, S. K., & Patel, S. . (2024). Some results on β-kenmotsu manifolds with a non-symmetric non-metric connection. International Journal of Maps in Mathematics, 7(1), 20–32. Retrieved from https://simadp.com/journalmim/article/view/7-1-2
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