EN
Comments on Parallel Curves in 3-Dimensional Lie Group G
Öz
In this study, firstly, basic concepts in 3-dimensional Euclidean space and basic information about curves are given and some special curves are examined. Then, basic information about Lie algebra and Lie group basic concepts and curves are given and special curves such as helix, involute-evolute, Bertrand, Mannheim, Smarandache, are defined. Secondly, inspired by these special curves examined in the Lie group, the definitions of the parallel curve in the vector direction, the parallel curve in the direction of the vector B and the parallel curve in the direction of the linear combination of the vectors B and N of a curve according to the Frenet frame are given and characterized. Some theorems and results are obtained by finding the Frenet apparatus of these characterized curves. Finally, the findings are examined in more specific circumstances and new results are found.
Anahtar Kelimeler
Kaynakça
- O’ Neill B, Elementary Differential Geometry. Academic Press, New York. 1966.
- Willson FN. Theoretical and Practical Graphics. The Macmillan Company. 1898.
- Keskin Ö, Yüksel N, Karacan MK, İkiz H. Characterization of the Parallel Curve of the Adjoint Curve in E^3. General Mathematics Notes. 2016; 35:9-18.
- Aldossary MT, Gazwani MA. Montion of Parallel Curves and Surfaces in Euclidean 3-Space R3. Global J. Adv. Res. Class. Mod. Geo. 2020; 9:43-56.
- Bozkurt Z, Gök I, Okuyucu OZ, Ekmekçi FN. Characterizations of rectifying, normal and osculating curves in three-dimensional compact Lie groups. Life Science Journal. 2013; 10: 819-823.
- Çiftçi Ü. A generalization of Lancret’s theorem. Journal of Geometry and Physics. 2009; 59:1597-1603.
- Kızıltuğ S, Önder M. Associated Curves of Frenet Curves in Three-Dimensional Compact Lie Group. Miskolc Mathematical Notes 2015; 16:953-964.
- Okuyucu OZ, Gök I, Yaylı Y, Ekmekçi FN. Slant helices in three-dimensional Lie groups. Applied Mathematics and Computation. 2013, 221:672-683.
Ayrıntılar
Birincil Dil
İngilizce
Konular
Matematiksel Fizik (Diğer)
Bölüm
Araştırma Makalesi
Yayımlanma Tarihi
1 Ekim 2024
Gönderilme Tarihi
23 Ocak 2024
Kabul Tarihi
21 Mart 2024
Yayımlandığı Sayı
Yıl 2024 Sayı: 1
APA
Çakmak, A., & Epik, P. E. (2024). Comments on Parallel Curves in 3-Dimensional Lie Group G. Turkish Journal of Nature and Science, 1, 37-42. https://doi.org/10.46810/tdfd.1424728
AMA
1.Çakmak A, Epik PE. Comments on Parallel Curves in 3-Dimensional Lie Group G. TDFD. 2024;(1):37-42. doi:10.46810/tdfd.1424728
Chicago
Çakmak, Ali, ve Pelin Ezgi Epik. 2024. “Comments on Parallel Curves in 3-Dimensional Lie Group G”. Turkish Journal of Nature and Science, sy 1: 37-42. https://doi.org/10.46810/tdfd.1424728.
EndNote
Çakmak A, Epik PE (01 Ekim 2024) Comments on Parallel Curves in 3-Dimensional Lie Group G. Turkish Journal of Nature and Science 1 37–42.
IEEE
[1]A. Çakmak ve P. E. Epik, “Comments on Parallel Curves in 3-Dimensional Lie Group G”, TDFD, sy 1, ss. 37–42, Eki. 2024, doi: 10.46810/tdfd.1424728.
ISNAD
Çakmak, Ali - Epik, Pelin Ezgi. “Comments on Parallel Curves in 3-Dimensional Lie Group G”. Turkish Journal of Nature and Science. 1 (01 Ekim 2024): 37-42. https://doi.org/10.46810/tdfd.1424728.
JAMA
1.Çakmak A, Epik PE. Comments on Parallel Curves in 3-Dimensional Lie Group G. TDFD. 2024;:37–42.
MLA
Çakmak, Ali, ve Pelin Ezgi Epik. “Comments on Parallel Curves in 3-Dimensional Lie Group G”. Turkish Journal of Nature and Science, sy 1, Ekim 2024, ss. 37-42, doi:10.46810/tdfd.1424728.
Vancouver
1.Ali Çakmak, Pelin Ezgi Epik. Comments on Parallel Curves in 3-Dimensional Lie Group G. TDFD. 01 Ekim 2024;(1):37-42. doi:10.46810/tdfd.1424728