Add to ORKGThis paper is devoted to study the f-harmonic, f-biharmonic, bi-f-harmonic, biminimal and f-biminimal Frenet Legendre curves in three dimensional normal almost paracontact metric manifolds and determine the necessary and sufficient conditions for these properties. Besides these, some characterizations for such curves have been defined in particular cases of a three dimensional normal almost paracontact metric manifold and some nonexistence theorems have been obtained. © 2022, Bayram Sahin. All rights reserved
We give a moving frame of a Legendre curve (or, a frontal) in the unite tangent bundle and de ne a p...
The existence of curves and symmetric maps with minimal total tension is proved. Such curves and map...
AbstractWe define and study pseudoholomorphic vector bundle structures, particular cases of which ar...
WOS: 000503196700011In the present paper, we study bi-f-harmonic maps which generalize not only f-ha...
C. Baikousssis, D.E. Blair[1] made a study of Legendre curves in contact metric manifolds. J. I. Ino...
Biharmonic maps between Riemannian manifolds are defined as critical points of the bienergy and gene...
We study almost bi-paracontact structures on contact manifolds. We prove that if an almost bi-parac...
Abstract. The torsion of a Legendre curve of an α-Sasakian manifold is ob-tained. Necessary and suff...
summary:We study Legendre and slant curves for Bianchi-Cartan-Vranceanu metrics. These curves are ch...
Abstract:We study biharmonic Legendre curves in Sspace forms. We nd curvature characterizations of t...
We construct biharmonic non-harmonic maps between Riemannian manifolds (M, g) and (N, h) by first ma...
We study the interplays between paracontact geometry and the theory of bi-Legendrian manifolds. We ...
In this paper, we study biharmonic curves in the special three-dimensional o-Ricci Symmetric Para-Sa...
In this paper, we study biharmonic curves in the special three-dimensional Ricci symmetric para-Sasa...
We introduce and study H-paracontact metric manifolds, that is, paracontact metric manifolds whose ...
We give a moving frame of a Legendre curve (or, a frontal) in the unite tangent bundle and de ne a p...
The existence of curves and symmetric maps with minimal total tension is proved. Such curves and map...
AbstractWe define and study pseudoholomorphic vector bundle structures, particular cases of which ar...
WOS: 000503196700011In the present paper, we study bi-f-harmonic maps which generalize not only f-ha...
C. Baikousssis, D.E. Blair[1] made a study of Legendre curves in contact metric manifolds. J. I. Ino...
Biharmonic maps between Riemannian manifolds are defined as critical points of the bienergy and gene...
We study almost bi-paracontact structures on contact manifolds. We prove that if an almost bi-parac...
Abstract. The torsion of a Legendre curve of an α-Sasakian manifold is ob-tained. Necessary and suff...
summary:We study Legendre and slant curves for Bianchi-Cartan-Vranceanu metrics. These curves are ch...
Abstract:We study biharmonic Legendre curves in Sspace forms. We nd curvature characterizations of t...
We construct biharmonic non-harmonic maps between Riemannian manifolds (M, g) and (N, h) by first ma...
We study the interplays between paracontact geometry and the theory of bi-Legendrian manifolds. We ...
In this paper, we study biharmonic curves in the special three-dimensional o-Ricci Symmetric Para-Sa...
In this paper, we study biharmonic curves in the special three-dimensional Ricci symmetric para-Sasa...
We introduce and study H-paracontact metric manifolds, that is, paracontact metric manifolds whose ...
We give a moving frame of a Legendre curve (or, a frontal) in the unite tangent bundle and de ne a p...
The existence of curves and symmetric maps with minimal total tension is proved. Such curves and map...
AbstractWe define and study pseudoholomorphic vector bundle structures, particular cases of which ar...