[KSCI] Korea Science Citation Index Service

Constructing $G^1$ Quadratic B $\acute{e}$ zier Curves with Arbitrary Endpoint Tangent Vectors

Gu, He-Jin (Wuhan University of Technology)
Yong, Jun-Hai (School of Software, Tsinghua University)
Paul, Jean-Claude (School of Software, Tsinghua University)
Cheng, Fuhua (Frank) (Department of Computer Science, University of Kentucky)

Publication Information

International Journal of CAD/CAM / v.9, no.1, 2010 , pp. 55-60 More about this Journal

Abstract

Quadratic B $\acute{e}$ zier curves are important geometric entities in many applications. However, it was often ignored by the literature the fact that a single segment of a quadratic B $\acute{e}$ zier curve may fail to fit arbitrary endpoint unit tangent vectors. The purpose of this paper is to provide a solution to this problem, i.e., constructing $G^1$ quadratic B $\acute{e}$ zier curves satisfying given endpoint (positions and arbitrary unit tangent vectors) conditions. Examples are given to illustrate the new solution and to perform comparison between the $G^1$ quadratic B $\acute{e}$ zier cures and other curve schemes such as the composite geometric Hermite curves and the biarcs.

Keywords

Quadratic B $\acute{e}$ zier curve; geometric continuity; endpoint condition; smoothness; tangent vector;

Citations & Related Records

Reference

1	Jun-Hai Yong, Shi-Min Hu, and Jia-Guang Sun. Bisection algorithms for approximating quadratic Bezier curves by $G^{1}$ arc splines. Computer-Aided Design, 32(4):253-260, 2000. DOI ScienceOn
2	Jun-Hai Yong, Shi-Min Hu, and Jia-Guang Sun. A note on approximation of discrete data by $G^{1}$ arc splines. Computer-Aided Design, 31(14):911-915, 1999. DOI ScienceOn
3	Jun-Hai Yong, Xiao Chen, and Jean-Claude Paul. An example on approximation by fat arcs and fat biarcs. Computer-Aided Design, 38(5):515-517, 2006. DOI ScienceOn
4	Jun-Hai Yong and Fuhua (Frank) Cheng. Geometric Hermite curves with minimum strain energy. Computer Aided Geometric Design, 21(3):281-301, 2004. DOI ScienceOn
5	Zhi Guan and Jingliang Chen. Numerical Computaion Method. Tsinghua University Press, Beijing, 2005 (in Chinese).
6	Xuzheng Liu, Jun-Hai Yong, Guoqin Zheng, and Jiaguang Sun. Constrained interpolation with biarcs. Journal of Computer-Aided Design & Computer Graphics, 19(1):1-7 (in Chinese), 2007.
7	Yongweil Miao, Changbo Wang, Jianguo Jin, and Qunsheng Peng. Fairing interpolation by quadratic Bezier splines. Journal of Computer-Aided Design & Computer Graphics, 16(6): 795-798 (in Chinese), 2004.
8	Nickolas S Sapidis and William H Frey. Controlling the curvature of a quadratic Bezier curve. Computer Aided Geometric Design, 9(2):85-91, 1992. DOI ScienceOn
9	Yu Yu Feng and Jernej Kozak. On G2 continuous interpolatory composite quadratic Bézier curves. Journal of Computational and Applied Mathematics, 72(1):141-159, 1996. DOI ScienceOn
10	He-Jin Gu, Jun-Hai Yong, Jean-Claude Paul, and Fuhua (Frank) Cheng. Constructing $G^{1}$ quadratic Bezier curves with arbitrary endpoint tangent vectors. In The 11th IEEE International Conference on CAD/Graphics, pages 263-267, 2009
11	Xiao-Diao Chen, Jun-Hai Yong, Guo-Qin Zheng, and Jia- Guang Sun. Automatic $G^{1}$ arc spline interpolation for closed point set. Computer-Aided Design, 36(12):1205-1218, 2004. DOI ScienceOn
12	Young Joon Ahn. Helix approximations with conic and quadratic Bezier curves. Computer Aided Geometric Design, 22(6):551-565, 2005. DOI ScienceOn

KSCI

Constructing Quadratic Bzier Curves with Arbitrary Endpoint Tangent Vectors

Constructing $G^1$ Quadratic B $\acute{e}$ zier Curves with Arbitrary Endpoint Tangent Vectors