Title of article
Minimizing the maximal ratio of weights of rational Bézier curves and surfaces Original Research Article
Author/Authors
Hong-Jie Cai، نويسنده , , Guojin Wang، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2010
Pages
10
From page
746
To page
755
Abstract
Applying the Möbius transformation to rational Bézier curves and surfaces, the weights can be modified whereas the control points remain unchanged. With appropriate transformation parameters, the maximal ratio of the weights of rational Bézier curves and surfaces can be minimized, which have applications in improving the bounds of derivatives, optimizing degree reduction of rational Bézier curves. In the surface case, there has not yet been a solution for the problem of finding transformation parameters such that the maximal ratio of the weights reaches its minimum. In this paper, a new method for the problem in the curve case is presented, and the uniqueness of the solution can be easily proved; then the method is generalized to the surface case with geometric perception. Some numerical examples are given for showing our results in improving the bounds of derivatives of rational Bézier curves and surfaces.
Keywords
Rational Bézier surface , derivative , Bound , invariant , Rational Bézier curve
Journal title
Computer Aided Geometric Design
Serial Year
2010
Journal title
Computer Aided Geometric Design
Record number
1147673
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