Research Article
Year 2023,
Volume: 15 Issue: 1, 118 - 124, 30.06.2023
Abstract
References
- Chen, B.Y., Ishikawa, S., Biharmonic surfaces in pseudo-Euclidean spaces, Mem. Fac. Sci. Kyushu Univ. Ser. A, 45 (1991), 323–347.
- Chen, B.Y., On the total curvature of immersed manifolds, VI : Submanifolds of nite type and their applications, Bull. Ins. Math. Acad. Sinica, 11(1983), 309–328.
- Çakmak, A., Şahin, V., Characterizations of adjoint curves according to alternative moving frame, Fundamental Journal of Mathematics and Applications, 5(1)(2022), 42–50.
- Ferrandez, A., Lucas, P., Merono, M.A., Biharmonic Hopf cylinders, Rocky Mountain J., 28(1998), 957–975.
- Inoguchi, J., Biharmonic curves in Minkowski 3-space, International J. Math. Sci., 21(2003), 1365-1368.
- Inoguchi, J., Biharmonic curves in Minkowski 3-space part II, International J. of Math. and Mathematical Sci., (2006), Article ID 92349, 1–4.
- Kilic, B., Finite Type Curves and Surfaces, Ph. Thesis, University of Hacettepe, 2002.
- Kocayiğit, H., Hacısalihoğlu, H.H., 1-type and biharmonic curves in Euclidean 3-space, International Electronic Journal of Geometry , 4(2011), 97–101.
- Körpınar, T., Turhan, E., Biharmonic curves according to parallel transport frame in $E^{4}$, Bol. Soc. Paran. Mat., 31(2)(2013), 213–217.
- Külahcı, M., Biharmonic curves in isotropic space $I_{1}^{3}$ , Prespacetime Journal, 7(10)(2016), 1411–1415.
- Ozturk, G., Bayram, B.K., Arslan, K., Weak biharmonic curve and harmonic 1-type curve in semi-Euclidean space $E_{1}^{4}$, Acta Universitatis Apulensis, 40(2014), 97–101.
- Perktas¸, S.Y., Kılıç, E., On biharmonic curves in 3-dimensional Heisenberg group, Adıyaman University Journal of Science, 2(2)(2012), 58–74.
- Uzunoğlu, B., Gök, I., Yaylı, Y., A new approach on curves of constant precession, Appl. Math. Comput. 275(2016), 317–323.
Year 2023,
Volume: 15 Issue: 1, 118 - 124, 30.06.2023
Abstract
In this paper, we obtain some characterizations for a Frenet curve with the help of an alternative frame different from Frenet frame. Also, in the present study we consider weak biharmonic and harmonic 1-type curves by using the mean curvature vector field of the curve. We also study 1-type and biharmonic curves whose mean curvature vector field is in the kernel of Laplacian. We give some theorems for them in the Euclidean 3-space. Moreover, we give the classifications of these type curves.
References
- Chen, B.Y., Ishikawa, S., Biharmonic surfaces in pseudo-Euclidean spaces, Mem. Fac. Sci. Kyushu Univ. Ser. A, 45 (1991), 323–347.
- Chen, B.Y., On the total curvature of immersed manifolds, VI : Submanifolds of nite type and their applications, Bull. Ins. Math. Acad. Sinica, 11(1983), 309–328.
- Çakmak, A., Şahin, V., Characterizations of adjoint curves according to alternative moving frame, Fundamental Journal of Mathematics and Applications, 5(1)(2022), 42–50.
- Ferrandez, A., Lucas, P., Merono, M.A., Biharmonic Hopf cylinders, Rocky Mountain J., 28(1998), 957–975.
- Inoguchi, J., Biharmonic curves in Minkowski 3-space, International J. Math. Sci., 21(2003), 1365-1368.
- Inoguchi, J., Biharmonic curves in Minkowski 3-space part II, International J. of Math. and Mathematical Sci., (2006), Article ID 92349, 1–4.
- Kilic, B., Finite Type Curves and Surfaces, Ph. Thesis, University of Hacettepe, 2002.
- Kocayiğit, H., Hacısalihoğlu, H.H., 1-type and biharmonic curves in Euclidean 3-space, International Electronic Journal of Geometry , 4(2011), 97–101.
- Körpınar, T., Turhan, E., Biharmonic curves according to parallel transport frame in $E^{4}$, Bol. Soc. Paran. Mat., 31(2)(2013), 213–217.
- Külahcı, M., Biharmonic curves in isotropic space $I_{1}^{3}$ , Prespacetime Journal, 7(10)(2016), 1411–1415.
- Ozturk, G., Bayram, B.K., Arslan, K., Weak biharmonic curve and harmonic 1-type curve in semi-Euclidean space $E_{1}^{4}$, Acta Universitatis Apulensis, 40(2014), 97–101.
- Perktas¸, S.Y., Kılıç, E., On biharmonic curves in 3-dimensional Heisenberg group, Adıyaman University Journal of Science, 2(2)(2012), 58–74.
- Uzunoğlu, B., Gök, I., Yaylı, Y., A new approach on curves of constant precession, Appl. Math. Comput. 275(2016), 317–323.
There are 13 citations in total.
Details
| Primary Language | English |
|---|---|
| Subjects | Mathematical Sciences |
| Journal Section | Articles |
| Authors | |
| Publication Date | June 30, 2023 |
| Published in Issue | Year 2023 Volume: 15 Issue: 1 |