Öz
Kaynakça
- [1] N. Ayy\i ld\i z , A. C. \c{C}\"{o}ken and Ahmet Y\"{u}cesan, \emph{A Characterization of Dual Lorentzian Spherical Curves in the Dual Lorentzian Space}, Taiwanese Journal of Mathematics, \textbf{11} (2007), 4, pp. 999-1018.
- [2] R. A. Abdel Bakey, \emph{An Explicit Characterization of Dual Spherical Curve}, Commun. Fac. Sci. Univ. Ank. Series, \textbf{51} (2002), 2, pp. 1-9.
- [3] M. Barros, A. Ferrández, P. Lucas, Meroño MA., \emph{General helices in the 3-dimensional Lorentzian space forms}, Rocky Mt J Math, \textbf{31}, (2001), pp. 373-388.
- [4] S. Breuer, D. Gottlieb, \emph{Explicit Characterization of Spherical Curves}, Proc. Am. Math. Soc. \textbf{27} (1971), pp. 126-127.
- [5] K. Ilarslan, \c{C}. Camci, H. Kocayigit, \emph{On the explicit characterization of spherical curves in 3-dimensional Lorentzian space}, Journal of Inverse and Ill-posed Problems, \textbf{11} (2003), 4, pp. 389-397.
- [6] O. Kose, \emph{An Expilicit Characterization of Dual Spherical Curves}, Do\u{g}a Mat. \textbf{12} (1998), 3, pp. 105-113.
- [7] H. Simsek, M. \"{O}zdemir, \emph{Generating hyperbolical rotation matrix for a given hyperboloid}, Linear Algebra Appl., \textbf{496} (2016), pp. 221-245.
- [8] Z. Ozdemir, I. Gok, Y. Yayli, and F.N. Ekmekci, \emph{Notes on Magnetic Curves in 3D semi-Riemannian Manifolds}, Turk J Math., \textbf{39}, (2015), pp. 412-426.
- [9] F. Ates, Z. \"{O}zdemir, \emph{Hyperbolic motions of a point on the general hyperboloid} (submitted).
- [10] Y. C. Wong, \emph{On an Explicit Characterization of Spherical Curves}, Proc. Am. Math. Soc., \textbf{34} (1972), 1, pp. 239-242.
- [11] Y. C. Wong, \emph{A global formulation of the condition for a curve to lie in a sphere}, Monatsh. Math. \textbf{67} (1963), pp. 363-365.
Öz
In this work, we give the Darboux vectors $\{\gamma \left( s\right) ,T\left( s\right) ,Y\left( s\right)\}$ of a given curve using the hyperbolically motion and hyperbolically inner product defined by Simsek and Özdemir in \cite{ozd}. Then, we present the variations of the geodesic curvature function $\kappa _{g}(s,w)$ and the speed function $v(s,w)$ of the curve $ \gamma $ at $w=0 $. Also, we define the new type curves whose Darboux frame vectors of a given curve makes a constant angle with the constant Killing vector field and also we obtain the parametric characterizations of these curves. At the end of this article, we exemplify these curves on the general hyperboloid with their figures using the program Mathematica.
Anahtar Kelimeler
General hyperboloid Special curves Euclidean space Darboux frame
Kaynakça
- [1] N. Ayy\i ld\i z , A. C. \c{C}\"{o}ken and Ahmet Y\"{u}cesan, \emph{A Characterization of Dual Lorentzian Spherical Curves in the Dual Lorentzian Space}, Taiwanese Journal of Mathematics, \textbf{11} (2007), 4, pp. 999-1018.
- [2] R. A. Abdel Bakey, \emph{An Explicit Characterization of Dual Spherical Curve}, Commun. Fac. Sci. Univ. Ank. Series, \textbf{51} (2002), 2, pp. 1-9.
- [3] M. Barros, A. Ferrández, P. Lucas, Meroño MA., \emph{General helices in the 3-dimensional Lorentzian space forms}, Rocky Mt J Math, \textbf{31}, (2001), pp. 373-388.
- [4] S. Breuer, D. Gottlieb, \emph{Explicit Characterization of Spherical Curves}, Proc. Am. Math. Soc. \textbf{27} (1971), pp. 126-127.
- [5] K. Ilarslan, \c{C}. Camci, H. Kocayigit, \emph{On the explicit characterization of spherical curves in 3-dimensional Lorentzian space}, Journal of Inverse and Ill-posed Problems, \textbf{11} (2003), 4, pp. 389-397.
- [6] O. Kose, \emph{An Expilicit Characterization of Dual Spherical Curves}, Do\u{g}a Mat. \textbf{12} (1998), 3, pp. 105-113.
- [7] H. Simsek, M. \"{O}zdemir, \emph{Generating hyperbolical rotation matrix for a given hyperboloid}, Linear Algebra Appl., \textbf{496} (2016), pp. 221-245.
- [8] Z. Ozdemir, I. Gok, Y. Yayli, and F.N. Ekmekci, \emph{Notes on Magnetic Curves in 3D semi-Riemannian Manifolds}, Turk J Math., \textbf{39}, (2015), pp. 412-426.
- [9] F. Ates, Z. \"{O}zdemir, \emph{Hyperbolic motions of a point on the general hyperboloid} (submitted).
- [10] Y. C. Wong, \emph{On an Explicit Characterization of Spherical Curves}, Proc. Am. Math. Soc., \textbf{34} (1972), 1, pp. 239-242.
- [11] Y. C. Wong, \emph{A global formulation of the condition for a curve to lie in a sphere}, Monatsh. Math. \textbf{67} (1963), pp. 363-365.
Ayrıntılar
| Birincil Dil | İngilizce |
|---|---|
| Konular | Mühendislik |
| Bölüm | Articles |
| Yazarlar | |
| Yayımlanma Tarihi | 25 Kasım 2019 |
| Kabul Tarihi | 10 Ekim 2019 |
| Yayımlandığı Sayı | Yıl 2019 Cilt: 2 Sayı: 2 |
