Title :
Good Degree Reduction of Rational Bezie Curves in L=Norm
Author :
Cai Huahui ; Liu Bingxiang
Author_Institution :
Sch. of Inf. Eng., Jingdezhen Ceramic Inst., Jingdezhen, China
Abstract :
Based on homogeneous coordinates, an algorithm for degree reduction of rational Bézier curves with C1-continuity constraints at the boundaries in L∞ norm was presented by extending the degree reduction of polynomial Bézier curves. We firstly reparameterized the rational curves to make the weights more uniform. Then in the space of homogeneous coordinates, we did degree reduction for each component of the polynomial Bézier curves corresponding to rational curves by the constrained Jacobi polynomial. Finally converted the polynomial Bézier curves after degree reduction to the rational Bézier curves. The results of example show that the algorithm is effective and runs simply and rapidly.
Keywords :
Jacobian matrices; curve fitting; polynomials; C1-continuity constraints; L∞ norm; constrained Jacobi polynomial; degree reduction; homogeneous coordinates; polynomial Bézier curves; rational Bézier curves; Ceramics; Computers; Design automation; Educational institutions; Jacobian matrices; Polynomials; Jacobi polynomial; L∞ norm; Möbius transformation; degree reduction; rational bézier curves;
Conference_Titel :
Computational and Information Sciences (ICCIS), 2013 Fifth International Conference on
Conference_Location :
Shiyang
DOI :
10.1109/ICCIS.2013.228
