On multivariate polynomials in Bernstein–Bézier form and tensor algebra

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

A scheme for constructing orthogonal systems of bivariate polynomials in the Bernstein-Bézier form over triangular domains is formulated. The orthogonal basis functions have a hierarchical ordering by degree, facilitating computation of least-squares approximations of increasing degree (with permane