AbstractThe purpose of this paper is the construction of bi- and trivariate prewavelets from box-spline spaces, i.e., piecewise polynomials of fixed degree on a uniform mesh. They have especially small support and form Riesz bases of the wavelet spaces, so they are stable. In particular, the supports achieved are smaller than those of the prewavelets due to Riemenschneider and Shen in a recent, similar construction
AbstractWe give a formula for the duals of the masks associated with trivariate box spline functions...
We study biorthogonal bases of compactly supported wavelets constructed from box splines in ÂN with ...
: This paper presents a general construction of compactly supported biorthogonal wavelets in L 2 (IR...
The purpose of this paper is the construction of bi- and trivariate prewavelets from box-spline spac...
AbstractThe purpose of this paper is the construction of bi- and trivariate prewavelets from box-spl...
In this paper, we design differentiable, two dimensional, piecewise polynomial cubic prewavelets of ...
variate short support Riesz wavelets was constructed from uniform B-splines. A bivariate spline Ries...
In this paper we give an explicit construction of compactly supported wavelets on differentiable, tw...
In this paper we give an explicit construction of com-pactly supported prewavelets on dierentiable, ...
AbstractConstructions of wavelets and prewavelets over triangulations with an emphasis of the contin...
In this paper, biorthogonal wavelets are constructed on non-uniform meshes. Both primal and dual wav...
AbstractIn this paper, we construct stable wavelet bases with piecewise quadratic functions for cert...
Abstract. In this paper we investigate spline wavelets on general triangulations. In particular, we ...
Abstract. Orthogonal polynomials are used to construct families of C 0 and C 1 orthogonal, compactly...
AbstractWe give a new constructive method for finding compactly supported prewavelets in L2 spaces i...
AbstractWe give a formula for the duals of the masks associated with trivariate box spline functions...
We study biorthogonal bases of compactly supported wavelets constructed from box splines in ÂN with ...
: This paper presents a general construction of compactly supported biorthogonal wavelets in L 2 (IR...
The purpose of this paper is the construction of bi- and trivariate prewavelets from box-spline spac...
AbstractThe purpose of this paper is the construction of bi- and trivariate prewavelets from box-spl...
In this paper, we design differentiable, two dimensional, piecewise polynomial cubic prewavelets of ...
variate short support Riesz wavelets was constructed from uniform B-splines. A bivariate spline Ries...
In this paper we give an explicit construction of compactly supported wavelets on differentiable, tw...
In this paper we give an explicit construction of com-pactly supported prewavelets on dierentiable, ...
AbstractConstructions of wavelets and prewavelets over triangulations with an emphasis of the contin...
In this paper, biorthogonal wavelets are constructed on non-uniform meshes. Both primal and dual wav...
AbstractIn this paper, we construct stable wavelet bases with piecewise quadratic functions for cert...
Abstract. In this paper we investigate spline wavelets on general triangulations. In particular, we ...
Abstract. Orthogonal polynomials are used to construct families of C 0 and C 1 orthogonal, compactly...
AbstractWe give a new constructive method for finding compactly supported prewavelets in L2 spaces i...
AbstractWe give a formula for the duals of the masks associated with trivariate box spline functions...
We study biorthogonal bases of compactly supported wavelets constructed from box splines in ÂN with ...
: This paper presents a general construction of compactly supported biorthogonal wavelets in L 2 (IR...
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