Abstract. Orthogonal polynomials are used to construct families of C 0 and C 1 orthogonal, compactly supported spline multiwavelets. These families are indexed by an integer which represents the order of approximation. We indicate how to obtain from these multiwavelet bases for L 2 [0,1] and present a C 2 example
It is well known that in many areas of computational mathematics, wavelet based algorithms are becom...
This paper deals with multiwavelets and the different properties of approximation and smoothness tha...
AbstractSmooth orthogonal and biorthogonal multiwavelets on the real line with their scaling functio...
Abstract. We develop a general notion of orthogonal wavelets ‘centered ’ on an irregular knot sequen...
In this talk, we present a method to construct orthogonal spline-type wavelet. B-spline functions ha...
AbstractPeriodic scaling functions and wavelets are constructed directly from non-stationary multire...
AbstractPeriodic scaling functions and wavelets are constructed directly from non-stationary multire...
We give a construction, for any n 2, of a space S of spline functions of degree n – 1 with simple kn...
Approximation order is an important feature of all wavelets. It implies that polynomials up to degre...
In this paper, we design differentiable, two dimensional, piecewise polynomial cubic prewavelets of ...
We give a construction, for any n 2, of a space S of spline functions of degree n – 1 with simple kn...
Multiwavelets are wavelets with multiplicity r, that is r scaling functions and r wavelets, which de...
AbstractWe develop the theory of oblique multiwavelet bases, which encompasses the orthogonal, semio...
AbstractWe develop the theory of oblique multiwavelet bases, which encompasses the orthogonal, semio...
AbstractIn this paper we propose an extended family of almost orthogonal spline wavelets with compac...
It is well known that in many areas of computational mathematics, wavelet based algorithms are becom...
This paper deals with multiwavelets and the different properties of approximation and smoothness tha...
AbstractSmooth orthogonal and biorthogonal multiwavelets on the real line with their scaling functio...
Abstract. We develop a general notion of orthogonal wavelets ‘centered ’ on an irregular knot sequen...
In this talk, we present a method to construct orthogonal spline-type wavelet. B-spline functions ha...
AbstractPeriodic scaling functions and wavelets are constructed directly from non-stationary multire...
AbstractPeriodic scaling functions and wavelets are constructed directly from non-stationary multire...
We give a construction, for any n 2, of a space S of spline functions of degree n – 1 with simple kn...
Approximation order is an important feature of all wavelets. It implies that polynomials up to degre...
In this paper, we design differentiable, two dimensional, piecewise polynomial cubic prewavelets of ...
We give a construction, for any n 2, of a space S of spline functions of degree n – 1 with simple kn...
Multiwavelets are wavelets with multiplicity r, that is r scaling functions and r wavelets, which de...
AbstractWe develop the theory of oblique multiwavelet bases, which encompasses the orthogonal, semio...
AbstractWe develop the theory of oblique multiwavelet bases, which encompasses the orthogonal, semio...
AbstractIn this paper we propose an extended family of almost orthogonal spline wavelets with compac...
It is well known that in many areas of computational mathematics, wavelet based algorithms are becom...
This paper deals with multiwavelets and the different properties of approximation and smoothness tha...
AbstractSmooth orthogonal and biorthogonal multiwavelets on the real line with their scaling functio...
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