We introduce here Cartesian splines or, for short, C-splines. C-splines are piecewise polynomials which are defined on adjacent Cartesian coordinate systems and are Cr continuous throughout. The Cr continuity is enforced by constraining the coefficients of the polynomial to lie in the null-space of some smoothness matrix H . The matrix-product of the null-space of the smoothness matrix H and the original polynomial base results in a new base, the so-called Cspline base, which automatically enforces Cr continuity throughout. In this article we give a derivation of this C-spline base as well as an algorithm to construct C-spline models
We construct a suitable normalized B-spline representation for C2-continuous quintic Powell-Sabin sp...
AbstractA B-spline basis function is a piecewise function of polynomials of equal degree on its supp...
The beta-spline provides bias and tension control facilities for creating geometrically continuous c...
Abstract. We introduce here Cartesian splines or, for short, C-splines. C-splines are piecewise poly...
We introduce here Cartesian splines or, for short, C-splines. C-splines are piecewise polynomials wh...
Abstract. We introduce here a direct method to construct multivariate ex-plicit B-spline bases. B-sp...
In this paper, we describe a general class of C1 smooth rational splines that enables, in particular...
In this paper, we describe a general class of C1 smooth rational splines that enables, in particular...
open2noMulti-degree splines are piecewise functions comprised of polynomial segments of different de...
International audienceThe results we present here concern geometrically continuous polynomial spline...
The space of C1 cubic Clough-Tocher splines is a classical finite element approximation space over t...
Powell-Sabin splines are C1-continuous piecewise quadratic polynomials defined on arbitrary triangul...
Piecewise polynomials of some fixed degree and continuously dif-ferentiable up to some order arc kno...
Sensible parameters for polynomials and other splines Frame 1 of 24 Polynomials and other splines I ...
This chapter presents an overview of polynomial spline theory, with special emphasis on the B-spline...
We construct a suitable normalized B-spline representation for C2-continuous quintic Powell-Sabin sp...
AbstractA B-spline basis function is a piecewise function of polynomials of equal degree on its supp...
The beta-spline provides bias and tension control facilities for creating geometrically continuous c...
Abstract. We introduce here Cartesian splines or, for short, C-splines. C-splines are piecewise poly...
We introduce here Cartesian splines or, for short, C-splines. C-splines are piecewise polynomials wh...
Abstract. We introduce here a direct method to construct multivariate ex-plicit B-spline bases. B-sp...
In this paper, we describe a general class of C1 smooth rational splines that enables, in particular...
In this paper, we describe a general class of C1 smooth rational splines that enables, in particular...
open2noMulti-degree splines are piecewise functions comprised of polynomial segments of different de...
International audienceThe results we present here concern geometrically continuous polynomial spline...
The space of C1 cubic Clough-Tocher splines is a classical finite element approximation space over t...
Powell-Sabin splines are C1-continuous piecewise quadratic polynomials defined on arbitrary triangul...
Piecewise polynomials of some fixed degree and continuously dif-ferentiable up to some order arc kno...
Sensible parameters for polynomials and other splines Frame 1 of 24 Polynomials and other splines I ...
This chapter presents an overview of polynomial spline theory, with special emphasis on the B-spline...
We construct a suitable normalized B-spline representation for C2-continuous quintic Powell-Sabin sp...
AbstractA B-spline basis function is a piecewise function of polynomials of equal degree on its supp...
The beta-spline provides bias and tension control facilities for creating geometrically continuous c...