In this article we provide the characterization of analysis suitable T-spline spaces (Beirão da Veiga et al., 2013) as the space of piecewise polynomials with appropriate linear constrains on the subdomain interfaces. We describe AST-meshes for which the linear constrains are equivalent to smoothness conditions and provide examples showing that this is not always the case. © 2015 Elsevier B.V. All rights reserved
Abstract. We analyze the space Sr m,m′ (T) of bivariate functions that are piecewise polynomial of b...
We present a completeness characterization of box splines on three-directionaltriangulations, also c...
Recently a new approach to piecewise polynomial spaces generated by B-spline has been presented by T...
T-splines are an important tool in IGA since they allow local refinement. In this paper we define an...
Analysis-suitable T-splines (AS T-splines) are a mildly topological restricted subset of T-splines w...
T-splines are an important tool in IGA since they allow local refinement. In this paper we define an...
In this paper we study the dimension of splines of mixed smoothness on axis-aligned T-meshes. This i...
Analysis-suitable T-splines are a topological-restricted subset of T-splines, which are optimized to...
Univariate generalized splines are smooth piecewise functions with sections in certain extended Tche...
The use of T-splines [30] in Isogeometric Analysis [24] has been proposed in [5] as a tool to enhanc...
International audienceWe analyze the space of bivariate functions that are piecewise polynomial of b...
Polynomial splines are ubiquitous in the fields of computer aided geometric design and computational...
In this paper we define Dual-Compatible (DC) T-splines, and we prove that Analysis-Suitable (AS) T-s...
Polynomial splines are ubiquitous in the fields of computer-aided geometric design and computational...
This paper defines analysis-suitable T-splines for arbitrary degree (including even and mixed degree...
Abstract. We analyze the space Sr m,m′ (T) of bivariate functions that are piecewise polynomial of b...
We present a completeness characterization of box splines on three-directionaltriangulations, also c...
Recently a new approach to piecewise polynomial spaces generated by B-spline has been presented by T...
T-splines are an important tool in IGA since they allow local refinement. In this paper we define an...
Analysis-suitable T-splines (AS T-splines) are a mildly topological restricted subset of T-splines w...
T-splines are an important tool in IGA since they allow local refinement. In this paper we define an...
In this paper we study the dimension of splines of mixed smoothness on axis-aligned T-meshes. This i...
Analysis-suitable T-splines are a topological-restricted subset of T-splines, which are optimized to...
Univariate generalized splines are smooth piecewise functions with sections in certain extended Tche...
The use of T-splines [30] in Isogeometric Analysis [24] has been proposed in [5] as a tool to enhanc...
International audienceWe analyze the space of bivariate functions that are piecewise polynomial of b...
Polynomial splines are ubiquitous in the fields of computer aided geometric design and computational...
In this paper we define Dual-Compatible (DC) T-splines, and we prove that Analysis-Suitable (AS) T-s...
Polynomial splines are ubiquitous in the fields of computer-aided geometric design and computational...
This paper defines analysis-suitable T-splines for arbitrary degree (including even and mixed degree...
Abstract. We analyze the space Sr m,m′ (T) of bivariate functions that are piecewise polynomial of b...
We present a completeness characterization of box splines on three-directionaltriangulations, also c...
Recently a new approach to piecewise polynomial spaces generated by B-spline has been presented by T...