Conference Paper
Year 2019,
Volume: 2 Issue: 2, 129 - 133, 25.11.2019
Abstract
References
- [1] R. P. Encheva and G. H. Georgiev, Similar Frenet curves, Result.Math, 55 (2009), 359-372.
- [2] D. Khadjiev, İ. Ören, Ö. Pekşen, , Global invariants of path and curves for the group of all linear similarities in the two-dimensional Euclidean space, Int.J.Geo. Modern Phys, 15(6) (2018),1-28.
- [3] M. İncesu, LS(2)Equivalence conditions of control points and application to planar Bézier curves, NTMSCI 5(3) (2017), 70-84.
- [4] M. İncesu, Düzlemsel Bézier e˘grilerinin S(2) denklik ¸sartları, MSU J. of Sci., 5(2) (2018), 471-477.
- [5] İ. Ören, , Equivalence conditions of two Bézier curves in the Euclidean geometry, Iran J Sci Technol Trans Sci., 42 (2018), 1563-1577.
- [6] D. Marsh , Applied geometry for computer graphics and CAD, Springer-Verlag, London,1999.
- [7] M. Berger, Geometry I, Springer-Verlag, Berlin Heidelberg, 1987.
- [8] WK. Wang, H. Zhang, XM. Liu, JC. Paul, Conditions for coincidence of two cubic Bézier curves, J. Comput. Appl. Math.,235 (2011), 5198-5202 .
- [9] J. Sanchez-Reyes, On the conditions for the coincidence of two cubic Bézier curves. J. Comput. Appl. Math.,236 (2011), 1675-1677.
- [10] X.Chen, W. Ma, C. Deng, Conditions for the coincidence of two quartic Bézier curves. Appl Math Comput 225 (2013),731-736 .
- [11] XD. Chen, C. Yang, W. Ma, Coincidence condition of two Bézier curves of an arbitrary degree, Comput. Graph 54 (2016),121-126 .
Year 2019,
Volume: 2 Issue: 2, 129 - 133, 25.11.2019
Abstract
In this paper, for linear similarity groups, global invariants of plane Bezier curves ( plane polynomial curves) in $E_{2}$ are introduced. Using complex numbers and the global $G$-invariants of a plane Bezier curve( a plane polynomial curve), for given two plane Bezier curves (plane polynomial curves) $x(t)$ and $y(t)$, evident forms of all transformations $g\in G$, carrying $x(t)$ to $y(t)$, are obtained.
References
- [1] R. P. Encheva and G. H. Georgiev, Similar Frenet curves, Result.Math, 55 (2009), 359-372.
- [2] D. Khadjiev, İ. Ören, Ö. Pekşen, , Global invariants of path and curves for the group of all linear similarities in the two-dimensional Euclidean space, Int.J.Geo. Modern Phys, 15(6) (2018),1-28.
- [3] M. İncesu, LS(2)Equivalence conditions of control points and application to planar Bézier curves, NTMSCI 5(3) (2017), 70-84.
- [4] M. İncesu, Düzlemsel Bézier e˘grilerinin S(2) denklik ¸sartları, MSU J. of Sci., 5(2) (2018), 471-477.
- [5] İ. Ören, , Equivalence conditions of two Bézier curves in the Euclidean geometry, Iran J Sci Technol Trans Sci., 42 (2018), 1563-1577.
- [6] D. Marsh , Applied geometry for computer graphics and CAD, Springer-Verlag, London,1999.
- [7] M. Berger, Geometry I, Springer-Verlag, Berlin Heidelberg, 1987.
- [8] WK. Wang, H. Zhang, XM. Liu, JC. Paul, Conditions for coincidence of two cubic Bézier curves, J. Comput. Appl. Math.,235 (2011), 5198-5202 .
- [9] J. Sanchez-Reyes, On the conditions for the coincidence of two cubic Bézier curves. J. Comput. Appl. Math.,236 (2011), 1675-1677.
- [10] X.Chen, W. Ma, C. Deng, Conditions for the coincidence of two quartic Bézier curves. Appl Math Comput 225 (2013),731-736 .
- [11] XD. Chen, C. Yang, W. Ma, Coincidence condition of two Bézier curves of an arbitrary degree, Comput. Graph 54 (2016),121-126 .
There are 11 citations in total.
Details
| Primary Language | English |
|---|---|
| Subjects | Engineering |
| Journal Section | Articles |
| Authors | |
| Publication Date | November 25, 2019 |
| Acceptance Date | September 18, 2019 |
| Published in Issue | Year 2019 Volume: 2 Issue: 2 |
