We give a simple and explicit construction of primal and dual wavelet filters based on refinable multivariate splines (with respect to dilation matrices M) such that the corresponding wavelet functions generate dual affine frames of arbitrarily high regularity. Furthermore, the number of wavelets does not depend on the regularity. We apply the method also to generalized B-splines
. A characterization of multivariate dual wavelet tight frames for any general dilation matrix is pr...
AbstractWe give a simple formula for the duals of the filters associated with bivariate box spline f...
AbstractA general approach based on polyphase splines, with analysis in the frequency domain, is dev...
We study biorthogonal bases of compactly supported wavelets constructed from box splines in ÂN with ...
AbstractWe give a simple formula for the duals of the filters associated with bivariate box spline f...
AbstractIn this paper, we investigate a new family of refinable functions named pseudo box splines w...
We give a simple formula for the duals of the filters associated with bivariate box spline functions...
AbstractWavelet frames with matrix dilation are studied. We found a necessary condition and a suffic...
Construction of wavelet frames with matrix dilation is studied. We found a necessary condition and a...
AbstractUsing results on syzygy modules over a multivariate polynomial ring, we are able to construc...
AbstractWe give a formula for the duals of the masks associated with trivariate box spline functions...
AbstractThe frame theory has been one of powerful tools for researching into wavelets. In the articl...
An affine subspace is a closed linear subspace of L(2)(R) generated by an affine system {2(n/2)psi (...
AbstractPseudo-splines constitute a new class of refinable functions with B-splines, interpolatory r...
AbstractA characterization of multivariate dual wavelet tight frames for any general dilation matrix...
. A characterization of multivariate dual wavelet tight frames for any general dilation matrix is pr...
AbstractWe give a simple formula for the duals of the filters associated with bivariate box spline f...
AbstractA general approach based on polyphase splines, with analysis in the frequency domain, is dev...
We study biorthogonal bases of compactly supported wavelets constructed from box splines in ÂN with ...
AbstractWe give a simple formula for the duals of the filters associated with bivariate box spline f...
AbstractIn this paper, we investigate a new family of refinable functions named pseudo box splines w...
We give a simple formula for the duals of the filters associated with bivariate box spline functions...
AbstractWavelet frames with matrix dilation are studied. We found a necessary condition and a suffic...
Construction of wavelet frames with matrix dilation is studied. We found a necessary condition and a...
AbstractUsing results on syzygy modules over a multivariate polynomial ring, we are able to construc...
AbstractWe give a formula for the duals of the masks associated with trivariate box spline functions...
AbstractThe frame theory has been one of powerful tools for researching into wavelets. In the articl...
An affine subspace is a closed linear subspace of L(2)(R) generated by an affine system {2(n/2)psi (...
AbstractPseudo-splines constitute a new class of refinable functions with B-splines, interpolatory r...
AbstractA characterization of multivariate dual wavelet tight frames for any general dilation matrix...
. A characterization of multivariate dual wavelet tight frames for any general dilation matrix is pr...
AbstractWe give a simple formula for the duals of the filters associated with bivariate box spline f...
AbstractA general approach based on polyphase splines, with analysis in the frequency domain, is dev...
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