AbstractWe give explicitly all linear dependence relations for integer translates of a tiling in R associated with (Z, k) with a prime k ⩾ 2. As a tool, we determine linear dependence relations for k-refinable compactly supported distributions in terms of the mask sequence in the corresponding k-refinable refinement equations
AbstractFollowing N. Sivakumar (J. Approx. Theory 64 (1991), 95–118), we study in this note the prob...
AbstractWe present a construction of regular compactly supported wavelets in any Sobolev space of in...
AbstractLetφ1 ,…,φnbe compactly supported distributions inLp(Rs) (0<p⩽∞). We say that the shifts ofφ...
AbstractWe give explicitly all linear dependence relations for integer translates of a tiling in R a...
AbstractThe purpose of this paper is to study the relationships between the support of a refinable d...
AbstractDue to their so-called time-frequency localization properties, wavelets have become a powerf...
AbstractUsing the theory of basis generators we study various properties of multivariate Riesz and o...
AbstractIn this paper, we give a characterization of compactly supported distributions which are bot...
AbstractIn this paper, we consider the asymptotic regularity of Daubechies scaling functions and con...
AbstractIn this paper a refinable and blockwise polynomial with compact support is shown to be a fin...
AbstractWe give preliminary results on the Hölder exponent of wavelets of compact support. In partic...
AbstractIn Riemenschneider and Shen (in “Approximation Theory and Functional Analysis” (C. K. Chui, ...
AbstractLet {Vk} be a nested sequence of closed subspaces that constitute a multiresolution analysis...
The problem of linear independence of the integer translates of ?????where ? ?is a compactly suppor...
AbstractA generalization of the notion of multiresolution analysis, based on the theory of spectral ...
AbstractFollowing N. Sivakumar (J. Approx. Theory 64 (1991), 95–118), we study in this note the prob...
AbstractWe present a construction of regular compactly supported wavelets in any Sobolev space of in...
AbstractLetφ1 ,…,φnbe compactly supported distributions inLp(Rs) (0<p⩽∞). We say that the shifts ofφ...
AbstractWe give explicitly all linear dependence relations for integer translates of a tiling in R a...
AbstractThe purpose of this paper is to study the relationships between the support of a refinable d...
AbstractDue to their so-called time-frequency localization properties, wavelets have become a powerf...
AbstractUsing the theory of basis generators we study various properties of multivariate Riesz and o...
AbstractIn this paper, we give a characterization of compactly supported distributions which are bot...
AbstractIn this paper, we consider the asymptotic regularity of Daubechies scaling functions and con...
AbstractIn this paper a refinable and blockwise polynomial with compact support is shown to be a fin...
AbstractWe give preliminary results on the Hölder exponent of wavelets of compact support. In partic...
AbstractIn Riemenschneider and Shen (in “Approximation Theory and Functional Analysis” (C. K. Chui, ...
AbstractLet {Vk} be a nested sequence of closed subspaces that constitute a multiresolution analysis...
The problem of linear independence of the integer translates of ?????where ? ?is a compactly suppor...
AbstractA generalization of the notion of multiresolution analysis, based on the theory of spectral ...
AbstractFollowing N. Sivakumar (J. Approx. Theory 64 (1991), 95–118), we study in this note the prob...
AbstractWe present a construction of regular compactly supported wavelets in any Sobolev space of in...
AbstractLetφ1 ,…,φnbe compactly supported distributions inLp(Rs) (0<p⩽∞). We say that the shifts ofφ...
DOI
Add to ORKG