Results 21 to 30 of about 1,258 (109)

GENERALIZED CONFORMAL CURVATURE TENSOR OF LP-SASAKIAN MANIFOLD

open access: yesSouth East Asian J. of Mathematics and Mathematical Sciences, 2023
The object of the present paper is to generalize conformal curvature tensor of LP-Sasakian manifold with the help of a new generalized (0, 2) symmetric tensor Z introduced by Mantica and Suh [7]. Various geometric properties of the generalized conformal curvature tensor of LP-Sasakian manifold have been studied.
Pandey, Mayank   +3 more
openaire   +2 more sources

Semi-symmetry type LP-Sasakian manifolds

open access: yes, 2017
Recently the present authors have introduced the notion of generalized quasi-conformal curvature tensor $W$, which bridges conformal curvature tensor, concircular curvature tensor, projective curvature tensor and conharmonic curvature tensor. The present
Chowdhury, Partha Roy   +1 more
core   +2 more sources

ON M-Projectively Flat LP-Sasakian Manifolds [PDF]

open access: yesUkrainian Mathematical Journal, 2014
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
openaire   +3 more sources

$LP$-Sasakian manifolds with generalized symmetric metric connection

open access: yesNovi Sad Journal of Mathematics, 2020
Summary: The present study initially identifies the generalized symmetric connections of type \((\alpha,\beta)\), which can be regarded as more generalized forms of quarter and semi-symmetric connections. The quarter and semi-symmetric connections are obtained when \((\alpha,\beta)=(1,0)\) and \((\alpha,\beta)=(0,1)\), respectively.
Bahadir, Oğuzhan   +2 more
openaire   +1 more source

Eta-Ricci solitons on LP-Sasakian manifolds [PDF]

open access: yesRevista de la Unión Matemática Argentina, 2019
We consider η-Ricci solitons on Lorentzian para-Sasakian manifolds with Codazzi type of the Ricci tensor. Then we study η-Ricci solitons on ϕ-conformally semi-symmetric, ϕ-Ricci symmetric, and conformally Ricci semi-symmetric Lorentzian para-Sasakian manifolds.
Pradip Majhi, Debabrata Kar
openaire   +1 more source

LP-Sasakian Manifolds Equipped with Zamkovoy Connection and Conharmonic Curvature Tensor [PDF]

open access: yesJournal of the Indonesian Mathematical Society, 2021
In this paper we have proved some results on conharmonically flat, quasi conharmonically flat and φ-conharmonically flat LP-Sasakian manifolds with respect to Zamkovoy connection. Also, we study generalized conharmonic φ-recurrent LP-Sasakian manifolds with respect to Zamkovoy connection. Moreover, we study LP-Sasakian manifolds satisfying K*(ξ,U)∘R*=0,
Mandal, Abhijit, Das, Ashoke
openaire   +1 more source

On the Regularity of Weak Contact p‐Harmonic Maps

open access: yesJournal of Complex Analysis, Volume 2013, Issue 1, 2013., 2013
We prove Caccioppoli type estimates and consequently establish local Hölder continuity for a class of weak contact (2n + 2)‐harmonic maps from the Heisenberg group ℍn into the sphere S2m−1.
Sorin Dragomir   +2 more
wiley   +1 more source

Some Curvature Properties of (LCS) n‐Manifolds

open access: yesAbstract and Applied Analysis, Volume 2013, Issue 1, 2013., 2013
The object of the present paper is to study (LCS) n‐manifolds with vanishing quasi‐conformal curvature tensor. (LCS) n‐manifolds satisfying Ricci‐symmetric condition are also characterized.
Mehmet Atçeken, Narcisa C. Apreutesei
wiley   +1 more source

On Geometry of Submanifolds of (LCS)n‐Manifolds

open access: yesInternational Journal of Mathematics and Mathematical Sciences, Volume 2012, Issue 1, 2012., 2012
We show geometrical properties of a submanifold of a (LCS)n‐manifold. The properties of the induced structures on such a submanifold are also studied.
Mehmet Atceken, Attila Gilányi
wiley   +1 more source

EXISTENCE OF A PRODUCT SUB MANIFOLD OF AN LP-SASAKIAN MANIFOLD WITH A COEFFICIENT α

open access: yesBulletin of the Korean Mathematical Society, 2003
Summary: A Lorentzian paracontact manifold \((M,\varphi,\xi,\eta, g)\) is called LP-Sasakian with coefficient \(\alpha\) if there exists a smooth function \(\alpha\) on \(M\) such that \[ (\nabla_Z\Phi) (X,Y)= \alpha \bigl(g (\varphi X,\varphi Z)\eta(Y)+g(\varphi Y,\varphi Z)\eta(X) \bigr), \quad\Phi(X,Y)= \frac{1}{\alpha} (\nabla_X\eta)Y, \] for any ...
Sengupta, A. K., De, U. C., Jun, J. B.
openaire   +3 more sources

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