AbstractThe paper addresses the question of convergence of Chebyshevian spline subdivision algorithms. This study suggests some ideas about the general treatment of non-interpolatory irregular (non-uniform/non-stationary) subdivision schemes
Subdivision schemes are efficient tools for generating smooth curves and surfaces as limit of an ite...
Thesis (MSc)--University of Stellenbosch, 2000.ENGLISH ABSTRACT: In this thesis we study the underly...
After a brief introduction in Chapter 1, in Chapter 2 we introduce and discuss a new basis for C2 sp...
AbstractThe paper addresses the question of convergence of Chebyshevian spline subdivision algorithm...
Les algorithmes utilisés en design géométrique permettent de construire des courbes paramétrées dans...
Geometric design algorithms are well suited to derive polynomial or piecewise polynomial parametric ...
Journal ArticleThe relevant theory of discrete 5-sphnes with associated new algorithms is extended t...
The original theory of splines grew out of the study of simple variational problems. A spline was a ...
. For a wide class of stationary subdivision methods, we derive necessary and sufficient conditions...
International audienceWe study in this paper nonlinear subdivision schemes in a multivariate setting...
AbstractWe present a new bivariate subdivision scheme based on two generators of a four-directional ...
The relevant theory of discrete B-splines with associated new algorithms is extended to provide a fr...
It is an important fact that general families of Chebyshev and L-splines can be locally represented,...
AbstractIn this paper, we study the ability of convergent subdivision schemes to reproduce polynomia...
The original theory of splines grew out of the study of simple variational problems. A spline was a ...
Subdivision schemes are efficient tools for generating smooth curves and surfaces as limit of an ite...
Thesis (MSc)--University of Stellenbosch, 2000.ENGLISH ABSTRACT: In this thesis we study the underly...
After a brief introduction in Chapter 1, in Chapter 2 we introduce and discuss a new basis for C2 sp...
AbstractThe paper addresses the question of convergence of Chebyshevian spline subdivision algorithm...
Les algorithmes utilisés en design géométrique permettent de construire des courbes paramétrées dans...
Geometric design algorithms are well suited to derive polynomial or piecewise polynomial parametric ...
Journal ArticleThe relevant theory of discrete 5-sphnes with associated new algorithms is extended t...
The original theory of splines grew out of the study of simple variational problems. A spline was a ...
. For a wide class of stationary subdivision methods, we derive necessary and sufficient conditions...
International audienceWe study in this paper nonlinear subdivision schemes in a multivariate setting...
AbstractWe present a new bivariate subdivision scheme based on two generators of a four-directional ...
The relevant theory of discrete B-splines with associated new algorithms is extended to provide a fr...
It is an important fact that general families of Chebyshev and L-splines can be locally represented,...
AbstractIn this paper, we study the ability of convergent subdivision schemes to reproduce polynomia...
The original theory of splines grew out of the study of simple variational problems. A spline was a ...
Subdivision schemes are efficient tools for generating smooth curves and surfaces as limit of an ite...
Thesis (MSc)--University of Stellenbosch, 2000.ENGLISH ABSTRACT: In this thesis we study the underly...
After a brief introduction in Chapter 1, in Chapter 2 we introduce and discuss a new basis for C2 sp...