Stable locally supported bases are constructed for the spaces \cal S d r (\triangle) of polynomial splines of degree d≥ 3r+2 and smoothness r defined on triangulations \triangle , as well as for various superspline subspaces. In addition, we show that for r≥ 1 , in general, it is impossible to construct bases which are simultaneously stable and locally linearly independent
We consider a cubic spline space defined over a triangulation with Powell-Sabin refinement. The spac...
We develop stable splitting of the minimal determining sets for the spaces of bivariate C1 splines o...
This article describes an elementary construction of a dual basis for non-uniform B-splines that is ...
We present an algorithm for constructing stable local bases for the spaces ${\cal S}_d^r(\triangle)$...
AbstractWe present an algorithm for constructing stable local bases for the spaces Srd(Δ) of multiva...
We construct a locally linearly independent basis for the space S 1 q (\Delta) (q 5). Bases with ...
: We consider the spaces of bivariate C ¯ -splines of degree k defined over arbitrary triangulatio...
AbstractLet S denote the space of bivariate piecewise polynomial functions of degree ⩽ k and smoothn...
AbstractBases for a class of splines consisting piecewise of elements in the null space of a linear ...
AbstractWe consider spaces of splines in k variables of smoothness r and degree d defined on a polyt...
We construct a suitable B-spline representation for a family of bivariate spline functions with smoo...
For the space of \(C^3\) quintics on the Powell–Sabin 12-split of a triangle, we determine explicitl...
Let S31(?) be the bivariate C1-cubic spline space over a triangulated quadrangulation ?. In this pap...
AbstractLet S31() be the bivariate C1-cubic spline space over a triangulated quadrangulation . In th...
Let S1 3 ( ) be the bivariate C1-cubic spline space over a triangulated quadrangulation .In this pap...
We consider a cubic spline space defined over a triangulation with Powell-Sabin refinement. The spac...
We develop stable splitting of the minimal determining sets for the spaces of bivariate C1 splines o...
This article describes an elementary construction of a dual basis for non-uniform B-splines that is ...
We present an algorithm for constructing stable local bases for the spaces ${\cal S}_d^r(\triangle)$...
AbstractWe present an algorithm for constructing stable local bases for the spaces Srd(Δ) of multiva...
We construct a locally linearly independent basis for the space S 1 q (\Delta) (q 5). Bases with ...
: We consider the spaces of bivariate C ¯ -splines of degree k defined over arbitrary triangulatio...
AbstractLet S denote the space of bivariate piecewise polynomial functions of degree ⩽ k and smoothn...
AbstractBases for a class of splines consisting piecewise of elements in the null space of a linear ...
AbstractWe consider spaces of splines in k variables of smoothness r and degree d defined on a polyt...
We construct a suitable B-spline representation for a family of bivariate spline functions with smoo...
For the space of \(C^3\) quintics on the Powell–Sabin 12-split of a triangle, we determine explicitl...
Let S31(?) be the bivariate C1-cubic spline space over a triangulated quadrangulation ?. In this pap...
AbstractLet S31() be the bivariate C1-cubic spline space over a triangulated quadrangulation . In th...
Let S1 3 ( ) be the bivariate C1-cubic spline space over a triangulated quadrangulation .In this pap...
We consider a cubic spline space defined over a triangulation with Powell-Sabin refinement. The spac...
We develop stable splitting of the minimal determining sets for the spaces of bivariate C1 splines o...
This article describes an elementary construction of a dual basis for non-uniform B-splines that is ...
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