Evaluation of difference bounds for computing rational Bézier curves and surfaces

This paper applies inequality skill, degree elevation of triangular Bézier surfaces and difference operators to deduce the bounds on first and second partial derivatives of rational triangular Bézier surfaces. Further more, we prove that the new bounds are tighter and more effective than the known o

We present an efficient and robust method based on the culling approach for computing the minimum distance between two Be ´zier curves or Be ´zier surfaces. Our contribution is a novel dynamic subdivision scheme that enables our method to converge faster than previous methods based on binary subdivi

Conversion methods are required for the exchange of data. First a given rational B-spline surface with curved boundaries will be segmented by curvature oriented arguments, then these patches will be converted into bicubic or biquintic integral B4zier patches with help of geometric continuity conditi