Kriging interpolation of a Bézier curve

A method of using Bernstein--Bdzier curves for data interpolation is proposed. The curves obtained satisfy the required conditions for 'visual content'. A numerical example is executed not only on data points in a plane but also on the data points of a 3D object. The proposed curves are assessed for

Using the Walsh coincidence theorem, we show in this paper that the shape of the control polygon of a Bézier curve is closely related to the location of the complex roots of the corresponding polynomial. This explains why a convex polynomial over an interval does not necessarily produce a convex con

In this paper, a new basis, to be called C-Bézier basis, is constructed for the space Γ n = span{1, t, t 2 , . . . , t n-2 , sin t, cos t} by an integral approach. Based on this basis, we define C-Bézier curves. We then show that such basis and curves share the same properties as the Bernstein basis