AbstractFor any subdivision scheme, we define its de Rham transform, which generalizes the de Rham and Chaikin corner cutting. The main property of the de Rham transform is that it preserves a sum rule. This allows comparison of the Hölder regularity of a given subdivision scheme with that of its de Rham transform. A graphical comparison is made for three different families of subdivision schemes, the last one being the generalized four-point scheme
The four-point subdivision scheme is well known as an interpolating subdivision scheme, but it has r...
AbstractWe establish results on convergence and smoothness of subdivision rules operating on manifol...
Subdivision schemes were initially introduced for the iterative construction of curves or surfaces s...
AbstractFor any subdivision scheme, we define its de Rham transform, which generalizes the de Rham a...
In this paper, we present an algebraic perspective of the de Rham transform of a binary subdivision ...
Though a Hermite subdivision scheme is non-stationary by nature, its non-stationarity can be of two ...
International audienceThough a Hermite subdivision scheme is non-stationary by nature, its non-stati...
Subdivision is the process of generating smooth curves or surfaces from a finite set of initial cont...
In this thesis, the author studies recursIve subdivision algorithms for curves and surfaces. Several...
Abstract. It is well-known that the smoothness of 4-point interpolatory Deslauriers-Dubuc(DD) subdiv...
Since subdivision schemes featured by high smoothness and conic precision are strongly required in m...
We use subdivision schemes with general dilation to efficiently evaluate shape preserving approximat...
Abstract. In this paper, we introduce two generalizations of midpoint subdivision and analyze the sm...
AbstractA binary 4-point approximating subdivision scheme, presented by Siddiqi and Ahmad (2006) [9]...
In this article, we present a new method to construct a family of 2N+2-point binary subdivision sche...
The four-point subdivision scheme is well known as an interpolating subdivision scheme, but it has r...
AbstractWe establish results on convergence and smoothness of subdivision rules operating on manifol...
Subdivision schemes were initially introduced for the iterative construction of curves or surfaces s...
AbstractFor any subdivision scheme, we define its de Rham transform, which generalizes the de Rham a...
In this paper, we present an algebraic perspective of the de Rham transform of a binary subdivision ...
Though a Hermite subdivision scheme is non-stationary by nature, its non-stationarity can be of two ...
International audienceThough a Hermite subdivision scheme is non-stationary by nature, its non-stati...
Subdivision is the process of generating smooth curves or surfaces from a finite set of initial cont...
In this thesis, the author studies recursIve subdivision algorithms for curves and surfaces. Several...
Abstract. It is well-known that the smoothness of 4-point interpolatory Deslauriers-Dubuc(DD) subdiv...
Since subdivision schemes featured by high smoothness and conic precision are strongly required in m...
We use subdivision schemes with general dilation to efficiently evaluate shape preserving approximat...
Abstract. In this paper, we introduce two generalizations of midpoint subdivision and analyze the sm...
AbstractA binary 4-point approximating subdivision scheme, presented by Siddiqi and Ahmad (2006) [9]...
In this article, we present a new method to construct a family of 2N+2-point binary subdivision sche...
The four-point subdivision scheme is well known as an interpolating subdivision scheme, but it has r...
AbstractWe establish results on convergence and smoothness of subdivision rules operating on manifol...
Subdivision schemes were initially introduced for the iterative construction of curves or surfaces s...
DOI
Add to ORKG