Add to ORKGWe have studied contact metric hypersurfaces of a Bochner-Kaehler manifold and obtained the following two results: (1) A contact metric constant mean curvature (C M C) hypersurface of a Bochner-Kaehler manifold is a (k, µ)-contact manifold, and (2) If M is a compact contact metric C M C hypersurface of a Bochner-Kaehler manifold with a conformal vector field V that is neither tangential nor normal anywhere, then it is totally umbilical and Sasakian, and under certain conditions on V , is isometric to a unit sphere
We classify locally the contact metric (k, μ)–spaces whose Boeckx invariant is <= -1 as tangent h...
The paper deals with the study of $\mathcal{M}$-projective curvature tensor on $(k, \mu)$-contact me...
This paper studies conformal and related changes of the product metric on the product of two almost ...
Abstract: We have studied contact metric hypersurfaces of a Bochner-Kaehler manifold and obtained th...
Let M be a 3-dimensional almost contact metric manifold satisfying (*)-condition. We denote such ama...
By a $contact$ $manifold$ we mean a (2n + 1)-dimensional $C^\infty$ manifold M together with a globa...
AbstractWe prove that a contact metric manifold M=(M;η,ξ,φ,g) with η-parallel tensor h is either a K...
First we improve a result of Tanno that says If a conformal vector field on a contact metric manifo...
For Sasakian manifolds, Matsumoto and Chūman [6] defined the contact Bochner curvature tensor (see a...
We present a classification of the complete, simply connected, contact metric (κ, μ)--spaces as homo...
For a Lagrangian submanifold M of S 6 with nearly Kaehler structure, we provide conditions for a can...
The object of the present paper is to obtain sufficient conditions for a K-contact manifold to be a...
summary:In the present paper we investigate a contact metric manifold satisfying (C) $(\bar{\nabla }...
ABSTRACT: Recently, K.Yano and M.Kon [5] have introduced the notion of a contact CR-submanifold of a...
For a (2n + 1)-dimensional N(k)-contact metric hypersurface in a real space form (M) over tilde (c),...
We classify locally the contact metric (k, μ)–spaces whose Boeckx invariant is <= -1 as tangent h...
The paper deals with the study of $\mathcal{M}$-projective curvature tensor on $(k, \mu)$-contact me...
This paper studies conformal and related changes of the product metric on the product of two almost ...
Abstract: We have studied contact metric hypersurfaces of a Bochner-Kaehler manifold and obtained th...
Let M be a 3-dimensional almost contact metric manifold satisfying (*)-condition. We denote such ama...
By a $contact$ $manifold$ we mean a (2n + 1)-dimensional $C^\infty$ manifold M together with a globa...
AbstractWe prove that a contact metric manifold M=(M;η,ξ,φ,g) with η-parallel tensor h is either a K...
First we improve a result of Tanno that says If a conformal vector field on a contact metric manifo...
For Sasakian manifolds, Matsumoto and Chūman [6] defined the contact Bochner curvature tensor (see a...
We present a classification of the complete, simply connected, contact metric (κ, μ)--spaces as homo...
For a Lagrangian submanifold M of S 6 with nearly Kaehler structure, we provide conditions for a can...
The object of the present paper is to obtain sufficient conditions for a K-contact manifold to be a...
summary:In the present paper we investigate a contact metric manifold satisfying (C) $(\bar{\nabla }...
ABSTRACT: Recently, K.Yano and M.Kon [5] have introduced the notion of a contact CR-submanifold of a...
For a (2n + 1)-dimensional N(k)-contact metric hypersurface in a real space form (M) over tilde (c),...
We classify locally the contact metric (k, μ)–spaces whose Boeckx invariant is <= -1 as tangent h...
The paper deals with the study of $\mathcal{M}$-projective curvature tensor on $(k, \mu)$-contact me...
This paper studies conformal and related changes of the product metric on the product of two almost ...