T-splines are an important tool in IGA since they allow local refinement. In this paper we define analysis-suitable T-splines of arbitrary degree and prove fundamental properties: Linear independence of the blending functions and optimal approximation properties of the associated T-spline space. These are corollaries of our main result: A T-mesh is analysis-suitable if and only if it is dual-compatible
Abstract. The T-spline functions, first introduced in [6] and in [7], are nowa-days a relevant tool ...
This paper introduces S-spline curves and surfaces. Local refinement of S-spline surfaces is much si...
In this paper hierarchical analysis-suitable T-splines (HASTS) are developed. The re-sulting spaces ...
T-splines are an important tool in IGA since they allow local refinement. In this paper we define an...
T-splines are an important tool in IGA since they allow local refinement. In this paper we define an...
Analysis-suitable T-splines are a topological-restricted subset of T-splines, which are optimized to...
Analysis-suitable T-splines (AS T-splines) are a mildly topological restricted subset of T-splines w...
Based on the local refinement algorithm addressed in [18], we analyze the linear independence of the...
In this paper we define Dual-Compatible (DC) T-splines, and we prove that Analysis-Suitable (AS) T-s...
This paper defines analysis-suitable T-splines for arbitrary degree (including even and mixed degree...
Linear independence of the blending functions is a necessary requirement for T-spline in isogeometri...
In this article we provide the characterization of analysis suitable T-spline spaces (Beirão da Veig...
This paper shows that, for any given T-spline, the linear independence of its blending functions can...
The use of T-splines [30] in Isogeometric Analysis [24] has been proposed in [5] as a tool to enhanc...
We develop an optimized local refinement algorithm for analysis-suitable++ T-splines (AS++ T-splines...
Abstract. The T-spline functions, first introduced in [6] and in [7], are nowa-days a relevant tool ...
This paper introduces S-spline curves and surfaces. Local refinement of S-spline surfaces is much si...
In this paper hierarchical analysis-suitable T-splines (HASTS) are developed. The re-sulting spaces ...
T-splines are an important tool in IGA since they allow local refinement. In this paper we define an...
T-splines are an important tool in IGA since they allow local refinement. In this paper we define an...
Analysis-suitable T-splines are a topological-restricted subset of T-splines, which are optimized to...
Analysis-suitable T-splines (AS T-splines) are a mildly topological restricted subset of T-splines w...
Based on the local refinement algorithm addressed in [18], we analyze the linear independence of the...
In this paper we define Dual-Compatible (DC) T-splines, and we prove that Analysis-Suitable (AS) T-s...
This paper defines analysis-suitable T-splines for arbitrary degree (including even and mixed degree...
Linear independence of the blending functions is a necessary requirement for T-spline in isogeometri...
In this article we provide the characterization of analysis suitable T-spline spaces (Beirão da Veig...
This paper shows that, for any given T-spline, the linear independence of its blending functions can...
The use of T-splines [30] in Isogeometric Analysis [24] has been proposed in [5] as a tool to enhanc...
We develop an optimized local refinement algorithm for analysis-suitable++ T-splines (AS++ T-splines...
Abstract. The T-spline functions, first introduced in [6] and in [7], are nowa-days a relevant tool ...
This paper introduces S-spline curves and surfaces. Local refinement of S-spline surfaces is much si...
In this paper hierarchical analysis-suitable T-splines (HASTS) are developed. The re-sulting spaces ...