원문정보
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초록
영어
C-B spline can not represent semi-circle and semi-elliptical arcs precisely. This paper will discuss the nature of C-B spline’s and C-Bézier curve’s endpoints. Then, on the basis of the analysis of their characteristics and by means of adding control points to make C-B spline dominate the first and last vertices of the polygon and get tangency with the first and end sides. Thus it has given out the G1 splicing method for C-B spline and C-Bézier curve which can represent the semi-circle arcs and semi-elliptical arcs of C-B spline, hence enhancing the controlling and presenting capacity of C-B spline.
목차
Abstract
1. Introduction
2. Research Actualities
3. The Definition and Properties of C-B Spline
4. The Definition and Properties of C-Bézier Curve
6. The Condition of G1 Splicing Method for C-B Spline and C-Bézier Curve
7. Summaries
Acknowledgement
References
1. Introduction
2. Research Actualities
3. The Definition and Properties of C-B Spline
4. The Definition and Properties of C-Bézier Curve
6. The Condition of G1 Splicing Method for C-B Spline and C-Bézier Curve
7. Summaries
Acknowledgement
References
저자정보
참고문헌
자료제공 : 네이버학술정보