International audienceWe study in this paper nonlinear subdivision schemes in a multivariate setting allowing arbitrary dilation matrix. We investigate the convergence of such iterative process to some limit function. Our analysis is based on some conditions on the contractivity of the associated scheme for the differences. In particular, we show the regularity of the limit function, in $L^p$ and Sobolev spaces
In this paper, we study scalar multivariate non-stationary subdivision schemes with integer dilation...
AbstractLinear interpolatory subdivision schemes of Cr smoothness have approximation order at least ...
Subdivision schemes are efficient tools for generating smooth curves and surfaces as limit of an ite...
International audienceWe study in this paper nonlinear subdivision schemes in a multivariate setting...
AbstractWe establish results on convergence and smoothness of subdivision rules operating on manifol...
International audienceThe aim of the paper is the construction and the analysis of nonlinear and non...
International audienceThis paper presents a new nonlinear dyadic subdivision scheme eliminating the ...
AbstractThe paper addresses the question of convergence of Chebyshevian spline subdivision algorithm...
AbstractStarting with vector λ=(λ(k))k∈Z∈ℓp(Z), the subdivision scheme generates a sequence {Sanλ}n=...
Abstract. Nonlinear subdivision schemes arise from, among other applications, non-linear multiscale ...
In this paper, we present a new formalism for nonlinear and non-separable multi-scale representation...
Abstract. In this paper we discuss methods for investigating the convergence of multivariate vector ...
This paper is devoted to the presentation and the analysis of a new nonlinear subdivision scheme eli...
Subdivision schemes were initially introduced for the iterative construction of curves or surfaces s...
AbstractThis paper proves approximation order properties of various nonlinear subdivision schemes. B...
In this paper, we study scalar multivariate non-stationary subdivision schemes with integer dilation...
AbstractLinear interpolatory subdivision schemes of Cr smoothness have approximation order at least ...
Subdivision schemes are efficient tools for generating smooth curves and surfaces as limit of an ite...
International audienceWe study in this paper nonlinear subdivision schemes in a multivariate setting...
AbstractWe establish results on convergence and smoothness of subdivision rules operating on manifol...
International audienceThe aim of the paper is the construction and the analysis of nonlinear and non...
International audienceThis paper presents a new nonlinear dyadic subdivision scheme eliminating the ...
AbstractThe paper addresses the question of convergence of Chebyshevian spline subdivision algorithm...
AbstractStarting with vector λ=(λ(k))k∈Z∈ℓp(Z), the subdivision scheme generates a sequence {Sanλ}n=...
Abstract. Nonlinear subdivision schemes arise from, among other applications, non-linear multiscale ...
In this paper, we present a new formalism for nonlinear and non-separable multi-scale representation...
Abstract. In this paper we discuss methods for investigating the convergence of multivariate vector ...
This paper is devoted to the presentation and the analysis of a new nonlinear subdivision scheme eli...
Subdivision schemes were initially introduced for the iterative construction of curves or surfaces s...
AbstractThis paper proves approximation order properties of various nonlinear subdivision schemes. B...
In this paper, we study scalar multivariate non-stationary subdivision schemes with integer dilation...
AbstractLinear interpolatory subdivision schemes of Cr smoothness have approximation order at least ...
Subdivision schemes are efficient tools for generating smooth curves and surfaces as limit of an ite...