Using Jacobi polynomials for degree reduction of Bézier curves with Ck-constraints

The constrained Chebyshev polynomial is the error function of the best degree reduction of polynomial with Cl-continuity. In this paper, we propose the constrained Jacobi polynomial as an alternative error function for good degree reduction. Although the degree reduction is not the best approximatio

Given a triangular Bézier surface of degree n, the problem of multi-degree reduction by a triangular Bézier surface of degree m with boundary constraints is investigated. This paper considers the continuity of triangular Bézier surfaces at the three corners, so that the boundary curves preserve endp

In this paper, we show the degree reduction of Bézier curves in a matrix representation. Most degree reduction algorithms have been described as a set of recursive equations which are based on the inverse problem of degree elevation. However, degree elevation can be easily expressed in terms of matr