Results 11 to 20 of about 1,416 (264)
Quarter-symmetric metric connection in a P-Sasakian manifold [PDF]
In this paper, we consider a quarter-symmetric metric connection in a P-Sasakian manifold. We investigate the curvature tensor and the Ricci tensor of a P-Sasakian manifold with respect to the quarter-symmetric metric connection.
Mandal Krishanu, De Uday Chand
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Quarter-Symmetric Metric Connection on a Cosymplectic Manifold
We study the quarter-symmetric metric A-connection on a cosymplectic manifold. Observing linearly independent curvature tensors with respect to the quarter-symmetric metric A-connection, we construct the Weyl projective curvature tensor on a cosymplectic
Miroslav D. Maksimović +1 more
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Quarter-symmetric metric connection on a p-Kenmotsu manifold
In the present paper we study para-Kenmotsu (p-Kenmotsu) manifold equipped with quarter-symmetric metric connection and discuss certain derivation conditions.
Bhawana Chaube, S. K. Chanyal
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The object of the present work is to study an almost generalized weakly symmetric Sasakian manifold admitting quarter symmetric metric connection with a non-trivial example.
Kanak Kanti Baishya +2 more
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On a Lorentzian Sasakian manifold endowed with a quarter-symmetric metric connection
In the present paper, some results on a Lorentzian Sasakian manifold endowed with a quarter-symmetric metric connection have been studied.
Prasad Rajendra +2 more
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Tangent Bundles of P-Sasakian Manifolds Endowed with a Quarter-Symmetric Metric Connection
The purpose of this study is to evaluate the curvature tensor and the Ricci tensor of a P-Sasakian manifold with respect to the quarter-symmetric metric connection on the tangent bundle TM. Certain results on a semisymmetric P-Sasakian manifold, generalized recurrent P-Sasakian manifolds, and pseudo-symmetric P-Sasakian manifolds on TM are proved.
Mohammad Nazrul Islam Khan +2 more
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Quarter-Symmetric Non-Metric Connection of Non-Integrable Distributions
In this paper, we focus on non-integrable distributions with a quarter-symmetric non-metric connection (QSNMC) in generalized Riemannian manifold. First, by studying a quarter-symmetric connection on the generalized Riemannian manifold, we obtain the condition that the connection is non-metric.
Haiming Liu, Liu Haiming
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On a generalized quarter symmetric metric recurrent connection
We introduce a generalized quarter-symmetric metric recurrent connection and study its geometrical properties. We also derive the Schur?s theorem for the generalized quarter-symmetric metric recurrent connection.
Tang, Wanxiao +4 more
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On quasi-recurrent spaces with Ricci quarter-symmetric metric connection [PDF]
In [3], Mishra and Pandey defined Ricci quarter-symmetric metric connection in Riemanian manifold. In [5],Uysal and Do˘gan defined D-recurrent spaces with semi-symmetric metric connection and constructed an example of these spaces. In these paper we define quasirecurrent spaces with Ricci quarter- symmetric metric connection and establish an example of
Uysal, Samiye Aynur +2 more
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$\eta$-Ricci solitons in a LP-Sasakian manifolds admitting quarter-symmetric metric connection [PDF]
The objective of this paper is to investigate the $\eta$-Ricci solitons in a LP-Sasakian manifolds admitting quarter-symmetric metric connection satisfying certain curvature conditions.
Abhishek Singh +2 more
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