Shape criteria of Bernstein-Bézier polynomials over simplexes

In this paper we show that the orthogonal complement of a subspace in the polynomial space of degree n over d-dimensional simplex domain with respect to the L 2 -inner product and the weighted Euclidean inner product of BB (Bézier-Bernstein) coefficients are equal. Using it we also prove that the be

Kim and Ahn proved that the best constrained degree reduction of a polynomial over d-dimensional simplex domain in L 2 -norm equals the best approximation of weighted Euclidean norm of the Bernstein-Bézier coefficients of the given polynomial. In this paper, we presented a counterexample to show tha

The umbral calculus is used to generalize Bernstein polynomials and Bézier curves. This adds great geometric flexibility to these fundamental objects of computer aided geometric design while retaining their basic properties.