Article
Stationary Acceleration of Frenet Curves
Journal of Inequalities and Applications
Abstract
In this paper, the stationary acceleration of the spherical general helix in a 3-dimensional Lie group is studied by using a bi-invariant metric. The relationship between the Frenet elements of the stationary acceleration curve in 4-dimensional Euclidean space and the intrinsic Frenet elements of the Lie group is outlined. As a consequence, the corresponding curvature and torsion of these curves are computed. In Minkowski space, for the curves on a timelike surface to have a stationary acceleration, a necessary and sufficient condition is refined.
Department(s)
Mathematics and Statistics
Comments
The first author would like to thank the University of Mohaghegh Ardabili for financial support.
Keywords and Phrases
- Bi-invariant metric,
- Frenet elements,
- Minkowski space,
- Spherical general helix,
- Stationary acceleration
Document Type
Article - Journal
Document Version
Final Version
File Type
text
Language(s)
English
Rights
© 2017 The Author(s), All rights reserved.
Creative Commons Licensing
Creative Commons Attribution 4.0
Publication Date
4-1-2017
Publication Date
01 Apr 2017
Disciplines
Citation Information
Nemat Abazari, Martin Bohner, Ilgin Sager and Yusuf Yayli. "Stationary Acceleration of Frenet Curves" Journal of Inequalities and Applications Vol. 2017 (2017) ISSN: 1025-5834; 1029-242X Available at: http://works.bepress.com/martin-bohner/185/