On Projective φ-Recurrent Kenmotsu Manifolds

C. S. Bagewadi; S. Venkatesha

doi:10.12723/mjs.7.3

On para-Kenmotsu manifolds

Filomat ◽

10.2298/fil1814971z ◽

2018 ◽

Vol 32 (14) ◽

pp. 4971-4980 ◽

Cited By ~ 2

Author(s):

Simeon Zamkovoy

Keyword(s):

Sectional Curvature ◽

Ricci Tensor ◽

Constant Scalar Curvature ◽

Holomorphic Sectional Curvature ◽

Kenmotsu Manifold ◽

3 Dimensional ◽

Kenmotsu Manifolds ◽

Locally Conformally Flat ◽

Parallel Ricci Tensor ◽

Negative Sectional Curvature

In this paper we study para-Kenmotsu manifolds. We characterize this manifolds by tensor equations and study their properties. We are devoted to a study of ?-Einstein manifolds. We show that a locally conformally flat para-Kenmotsu manifold is a space of constant negative sectional curvature -1 and we prove that if a para-Kenmotsu manifold is a space of constant ?-para-holomorphic sectional curvature H, then it is a space of constant sectional curvature and H = -1. Finally the object of the present paper is to study a 3-dimensional para-Kenmotsu manifold, satisfying certain curvature conditions. Among other, it is proved that any 3-dimensional para-Kenmotsu manifold with ?-parallel Ricci tensor is of constant scalar curvature and any 3-dimensional para-Kenmotsu manifold satisfying cyclic Ricci tensor is a manifold of constant negative sectional curvature -1.

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AXIOM OF Φ-HOLOMORPHIC (2r+1)-PLANES FOR GENERALIZED KENMOTSU MANIFOLDS

Vestnik Tomskogo gosudarstvennogo universiteta Matematika i mekhanika ◽

10.17223/19988621/66/1 ◽

2020 ◽

pp. 5-23

Author(s):

Ahmad Abu-Saleem ◽

◽

A.R. Rustanov ◽

S.V. Kharitonova ◽

◽

...

Keyword(s):

Sectional Curvature ◽

Structural Equation ◽

Complete Classification ◽

Local Characteristic ◽

Holomorphic Sectional Curvature ◽

Kenmotsu Manifold ◽

Cosymplectic Structure ◽

Kenmotsu Manifolds ◽

Contact Metric Manifolds ◽

Simply Connected

In this paper we study generalized Kenmotsu manifolds (shortly, a GK-manifold) that satisfy the axiom of Φ-holomorphic (2r+1)-planes. After the preliminaries we give the definition of generalized Kenmotsu manifolds and the full structural equation group. Next, we define Φ- holomorphic generalized Kenmotsu manifolds and Φ-paracontact generalized Kenmotsu manifold give a local characteristic of this subclasses. The Φ-holomorphic generalized Kenmotsu manifold coincides with the class of almost contact metric manifolds obtained from closely cosymplectic manifolds by a canonical concircular transformation of nearly cosymplectic structure. A Φ- paracontact generalized Kenmotsu manifold is a special generalized Kenmotsu manifold of the second kind. An analytical expression is obtained for the tensor of Ф-holomorphic sectional curvature of generalized Kenmotsu manifolds of the pointwise constant Φ-holomorphic sectional curvature. Then we study the axiom of Φ-holomorphic (2r+1)-planes for generalized Kenmotsu manifolds and propose a complete classification of simply connected generalized Kenmotsu manifolds satisfying the axiom of Φ-holomorphic (2r+1)-planes. The main results are as follows. A simply connected GK-manifold of pointwise constant Φ-holomorphic sectional curvature satisfying the axiom of Φ-holomorphic (2r+1)-planes is a Kenmotsu manifold. A GK-manifold satisfies the axiom of Φ-holomorphic (2r+1)-planes if and only if it is canonically concircular to one of the following manifolds: (1) CPn×R; (2) Cn×R; and (3) CHn×R having the canonical cosymplectic structure.

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Extremities for statistical submanifolds in Кenmotsu statistical manifolds

Filomat ◽

10.2298/fil2102591s ◽

2021 ◽

Vol 35 (2) ◽

pp. 591-603

Author(s):

Aliya Siddiqui ◽

Young Suh ◽

Oğuzhan Bahadır

Keyword(s):

Sectional Curvature ◽

Contact Geometry ◽

Optimization Techniques ◽

Constant Sectional Curvature ◽

Theoretical Physics ◽

Statistical Manifold ◽

Kenmotsu Manifold ◽

Ricci Flat ◽

Statistical Manifolds ◽

Counter Example

Kenmotsu geometry is a valuable part of contact geometry with nice applications in other fields such as theoretical physics. In this article, we study the statistical counterpart of a Kenmotsu manifold, that is, Kenmotsu statistical manifold with some related examples. We investigate some statistical curvature properties of Kenmotsu statistical manifolds. It has been shown that a Kenmotsu statistical manifold is not a Ricci-flat statistical manifold by constructing a counter-example. Finally, we prove a very well-known Chen-Ricci inequality for statistical submanifolds in Kenmotsu statistical manifolds of constant ?-sectional curvature by adopting optimization techniques on submanifolds. This article ends with some concluding remarks.

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A note on invariant submanifolds of CR-integrable almost Kenmotsu manifolds

Filomat ◽

10.2298/fil1719211s ◽

2017 ◽

Vol 31 (19) ◽

pp. 6211-6218 ◽

Cited By ~ 1

Author(s):

Young Suh ◽

Krishanu Mandal ◽

Uday De

Keyword(s):

Invariant Submanifold ◽

Kenmotsu Manifold ◽

Totally Geodesic ◽

Almost Kenmotsu Manifold ◽

Kenmotsu Manifolds ◽

Almost Kenmotsu Manifolds ◽

Invariant Submanifolds

The present paper deals with invariant submanifolds of CR-integrable almost Kenmotsu manifolds. Among others it is proved that every invariant submanifold of a CR-integrable (k,?)'-almost Kenmotsu manifold with k < -1 is totally geodesic. Finally, we construct an example of an invariant submanifold of a CR-integrable (k,?)'-almost Kenmotsu manifold which is totally geodesic.

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Pointwise pseudo-slant submanifolds of a Kenmotsu manifold

Filomat ◽

10.2298/fil1718833k ◽

2017 ◽

Vol 31 (18) ◽

pp. 5833-5853 ◽

Cited By ~ 1

Author(s):

Viqar Khan ◽

Mohammad Shuaib

Keyword(s):

Present Article ◽

Warped Product ◽

Shape Operator ◽

Warped Products ◽

Canonical Structure ◽

Slant Submanifold ◽

Kenmotsu Manifold ◽

Slant Submanifolds ◽

Kenmotsu Manifolds

In the present article, we have investigated pointwise pseudo-slant submanifolds of Kenmotsu manifolds and have sought conditions under which these submanifolds are warped products. To this end first, it is shown that these submanifolds can not be expressed as non-trivial doubly warped product submanifolds. However, as there exist non-trivial (single) warped product submanifolds of a Kenmotsu manifold, we have worked out characterizations in terms of a canonical structure T and the shape operator under which a pointwise pseudo slant submanifold of a Kenmotsu manifold reduces to a warped product submanifold.

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Homogeneous Einstein Finsler Metrics on -dimensional Spheres

Canadian Mathematical Bulletin ◽

10.4153/s0008439518000139 ◽

2018 ◽

Vol 62 (3) ◽

pp. 509-523

Author(s):

Libing Huang ◽

Xiaohuan Mo

Keyword(s):

Sectional Curvature ◽

Ricci Curvature ◽

Einstein Metrics ◽

Constant Sectional Curvature ◽

Einstein Metric ◽

Finsler Metrics ◽

Dimensional Sphere ◽

Order Ordinary Differential Equation ◽

Canonical Metric ◽

Homogeneous Einstein Metrics

AbstractIn this paper, we study a class of homogeneous Finsler metrics of vanishing $S$-curvature on a $(4n+3)$-dimensional sphere. We find a second order ordinary differential equation that characterizes Einstein metrics with constant Ricci curvature $1$ in this class. Using this equation we show that there are infinitely many homogeneous Einstein metrics on $S^{4n+3}$ of constant Ricci curvature $1$ and vanishing $S$-curvature. They contain the canonical metric on $S^{4n+3}$ of constant sectional curvature $1$ and the Einstein metric of non-constant sectional curvature given by Jensen in 1973.

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Some Results on Weakly Symmetric Kenmotsu Manifolds

Science & Technology Journal ◽

10.22232/stj.2019.07.01.02 ◽

2019 ◽

Vol 7 (1) ◽

pp. 13-21

Author(s):

J. P. Singh ◽

◽

K. Lalnunsiami

Keyword(s):

Kenmotsu Manifold ◽

Kenmotsu Manifolds ◽

Metric Connection ◽

Weakly Symmetric ◽

Symmetric Properties

In this paper, we investigate weakly symmetric, weakly Ricci symmetric, weakly concircular symmetric and weakly concircular Ricci symmetric properties of a Kenmotsu manifold admitting a semi-symmetric metric connection. Some results on weakly -projectively symmetric Kenmotsu manifold with respect to a semi-symmetric metric connection are obtained. An example of a weakly symmetric and weakly Ricci symmetric Kenmotsu manifold with respect to this connection is constructed.

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On the quasi-conformal curvature tensor of an almost Kenmotsu manifold with nullity distributions

Facta Universitatis Series Mathematics and Informatics ◽

10.22190/fumi1802255d ◽

2018 ◽

Vol 33 (2) ◽

pp. 255

Author(s):

Dibakar Dey ◽

Pradip Majhi

Keyword(s):

Vector Field ◽

Curvature Tensor ◽

Conformally Flat ◽

Kenmotsu Manifold ◽

Conformal Curvature ◽

Conformal Curvature Tensor ◽

Kenmotsu Manifolds ◽

Almost Kenmotsu Manifolds ◽

Nullity Distribution ◽

Characteristic Vector Field

The object of the present paper is to characterize quasi-conformally flat and $\xi$-quasi-conformally flat almost Kenmotsu manifolds with $(k,\mu)$-nullity and $(k,\mu)'$-nullity distributions respectively. Also we characterize almost Kenmotsu manifolds with vanishing extended quasi-conformal curvature tensor and extended $\xi$-quasi-conformally flat almost Kenmotsu manifolds such that the characteristic vector field $\xi$ belongs to the $(k,\mu)$-nullity distribution.

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Kenmotsu manifolds admitting Schouten-Van Kampen Connection

Facta Universitatis Series Mathematics and Informatics ◽

10.22190/fumi1901023h ◽

2019 ◽

pp. 23

Author(s):

Nagaraja Gangadharappa Halammanavar ◽

Kiran Kumar Lakshmana Devasandra

Keyword(s):

Ricci Soliton ◽

Kenmotsu Manifold ◽

Kenmotsu Manifolds ◽

Equivalent Conditions

The objective of the present paper is to study Kenmotsu manifold admitting Schouten-van Kampen connection. We study Kenmotsu manifold admitting Schouten-van Kampen connection satisifying certain curvature conditions. Also we prove equivalent conditions for Ricci soliton in a Kenmotsu manifold is steady with respect to the Schouten-van Kampen connection.

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Some Symmetric Properties of Kenmotsu Manifolds Admitting Semi-Symmetric Metric Connection

Facta Universitatis Series Mathematics and Informatics ◽

10.22190/fumi1901035v ◽

2019 ◽

pp. 35

Author(s):

Venkatesha Venkatesh ◽

Arasaiah Arasaiah ◽

Vishnuvardhana Srivaishnava Vasudeva ◽

Naveen Kumar Rahuthanahalli Thimmegowda

Keyword(s):

Kenmotsu Manifold ◽

3 Dimensional ◽

Kenmotsu Manifolds ◽

Metric Connection ◽

Symmetric Properties

The object of the present paper is to study some symmetric propertiesof Kenmotsu manifold endowed with a semi-symmetric metric connection. Here weconsider pseudo-symmetric, Ricci pseudo-symmetric, projective pseudo-symmetric and -projective semi-symmetric Kenmotsu manifold with respect to semi-symmetric metric connection. Finally, we provide an example of 3-dimensional Kenmotsu manifold admitting a semi-symmetric metric connection which verify our results.

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