Results 81 to 90 of about 196 (113)
Notes on Generalized Dual Connections on Para-Kenmotsu Manifolds
, 2017 Adara M. Blaga
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The Interesting Characterizations of Some Solitons in Lorentzian Para-Kenmotsu Manifolds
Tuğba Mert, Mehmet Atçeken
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η- ricci solitons defined with W8− curvature tensor and cyclic ricci tensor on para-kenmotsu manifolds [PDF]
, 2019 LF Uwimbabazi Ruganzu +3 more
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Conformal semi-slant submersions from Lorentzian para Kenmotsu manifolds
Tbilisi Mathematical Journal, 2021The paper deals with the notion of conformal semi-slant submersions from Lorentzian para Kenmotsu manifolds onto Riemannian manifolds. In this paper, we study the integrability of the distributions and the geometry of leaves manifolds.
Prasad, Rajendra +2 more
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Study on Semi-symmetric Para Kenmotsu Manifolds
2021We investigate several interesting characteristics of para Kenmotsu (briefly p-Kenmotsu) manifolds satisfying the conditions R(X,Y) . R = 0, R(X,Y) . P = 0 and P(X,Y) . R = 0, where R(X,Y) is the Riemannian curvature tensor and P(X,Y) is the Weyl projective curvature tensor of the manifold. It is demonstrated that a semi symmetric p-Kenmotsu manifold (
T. Satyanarayana, K. L. Sai Prasad
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Certain results on invariant submanifolds of para-Kenmotsu manifolds
2021Summary: The purpose of this paper is to study invariant pseudoparallel, Ricci generalized pseudoparallel and 2-Ricci generalized pseudoparallel submanifold of a para-Kenmotsu manifold and I obtained some equivalent conditions of invariant submanifolds of para-Kenmotsu manifolds under some conditions which the submanifolds are totally geodesic. Finally,
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ON PARA-KENMOTSU MANIFOLDS ADMITTING ZAMKOVOY CONNECTION
jnanabhaThe goal of this paper is to study a PK-manifold (briefly, PK-manifold) that admits a Zamkovoy connection. We use a new (0, 2) type symmetric tensor Z to derive a new tensor field from the Mprojective curvature tensor (briefly, MP-curvature tensor).
Jain, Swati, Pandey, M. K., Goyal, A.
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CERTAIN CURVATURE CONDITIONS ON LORENTZIAN PARA-KENMOTSU MANIFOLDS
2022We classify Lorentzian para-Kenmotsu manifolds which satisfy the curvature conditions W2.C = 0, Z.C = LCQ(g, C), W2.Z − Z.W2 = 0 and W2.Z + Z.W2 = 0, where W2 is the Weyl-projective tensor, Z is the concircular tensor, and C is the Weyl conformal curvature tensor.
S. Sunitha Devi +2 more
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