On an Einstein projective Sasakian manifold.

Khan, Quddus

Displaying similar documents to “On an Einstein projective Sasakian manifold.”

On a type of P-Sasakian manifold.

Debasish Tarafdar, U. C. De (1993)

Extracta Mathematicae

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On para-A-Einstein manifolds.

Sinha, B.B., Sharma, Ramesh (1983)

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On $Φ$ -recurrent Sasakian manifolds.

De, U.C., Shaikh, A.A., Biswas, Sudipta (2003)

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Second order parallel tensors on $α$ – Sasakian manifold.

Das, Lovejoy (2007)

Acta Mathematica Academiae Paedagogicae Nyí regyháziensis. New Series [electronic only]

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On conharmonic curvature tensor in $K$ -contact and Sasakian manifolds.

Dwivedi, Mohit Kumar, Kim, Jeong-Sik (2011)

Bulletin of the Malaysian Mathematical Sciences Society. Second Series

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On generalized M-projectively recurrent manifolds

Uday Chand De, Prajjwal Pal (2014)

Annales Universitatis Paedagogicae Cracoviensis. Studia Mathematica

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The purpose of the present paper is to study generalized M-projectively recurrent manifolds. Some geometric properties of generalized M projectively recurrent manifolds have been studied under certain curvature conditions. An application of such a manifold in the theory of relativity has also been shown. Finally, we give an example of a generalized M-projectively recurrent manifold.

$φ$ -recurrent trans-Sasakian manifolds

H. G. Nagaraja (2011)

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A note on $ξ$ -conformally flat contact manifolds.

De, U.C., Biswas, Sudipta (2006)

Bulletin of the Malaysian Mathematical Sciences Society. Second Series

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On K-contact Riemannian manifolds with vanishing E-contact Bochner curvature tensor

Hiroshi Endo (1991)

Colloquium Mathematicae

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For Sasakian manifolds, Matsumoto and Chūman [6] defined the contact Bochner curvature tensor (see also Yano [9]). Hasegawa and Nakane [4] and Ikawa and Kon [5] have studied Sasakian manifolds with vanishing contact Bochner curvature tensor. Such manifolds were studied in the theory of submanifolds by Yano ([9] and [10]). In this paper we define an extended contact Bochner curvature tensor in K-contact Riemannian manifolds and call it the E-contact Bochner curvature tensor. Then we show...

On Einstein-like P-Sasakian manifold

R. Sharma (1982)

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Two theorems on $(ε)$ -Sasakian manifolds.

Xu, Xufeng, Chao, Xiaoli (1998)

International Journal of Mathematics and Mathematical Sciences

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Some results on trans-Sasakian manifolds

Rajendra Prasad, Vibha Srivastava (2013)

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