AbstractA multiresolution analysis for an orthogonal family of wavelets is usually not translation invariant. A concept of weak translation invariance is introduced and shown to hold for a class of Meyer wavelets and in fact characterizes this class. Other operators such as dilation, differentiation, and convolution are shown to have similar invariance properties for the same class
The characterization of orthonormal bases of wavelets by means of convergent series involving only ...
AbstractAn explicit functional called the shiftability value of wavelet basis, which measures a devi...
Because multiresolution analyses and wavelet bases are generated by translating and dilating scaling...
AbstractUsing the theory of basis generators we study various properties of multivariate Riesz and o...
Multiresolution is investigated on the basis of shift-invariant spaces. Given a finitely generated s...
In this paper we present an overview of wavelet based multiresolution analyses. First, we briefly di...
A frame multiresolution (FMRA for short) orthogonal wavelet is a single-function orthogonal wavelet ...
A frame multiresolution (FMRA for short) orthogonal wavelet is a single-function orthogonal wavelet ...
We state a novel construction of theFourier transform on L2(R) based on translation and dilation pro...
. We apply the Lax-Phillips wave equation scattering theory to multiresolutions associated with wave...
AbstractA generalization of Mallat's classical multiresolution analysis, based on the theory of spec...
Abstract — Shift-orthogonal wavelets are a new type of multiresolution wavelet bases that are orthog...
We prove that for any expansive n x n integral matrix A with \ det A \ = 2, there exist A-dilation m...
Spectral representations of the dilation and translation operators on L2(R) are built through approp...
We present an outline of how the ideas of self-similarity can be applied to wavelet theory, especial...
The characterization of orthonormal bases of wavelets by means of convergent series involving only ...
AbstractAn explicit functional called the shiftability value of wavelet basis, which measures a devi...
Because multiresolution analyses and wavelet bases are generated by translating and dilating scaling...
AbstractUsing the theory of basis generators we study various properties of multivariate Riesz and o...
Multiresolution is investigated on the basis of shift-invariant spaces. Given a finitely generated s...
In this paper we present an overview of wavelet based multiresolution analyses. First, we briefly di...
A frame multiresolution (FMRA for short) orthogonal wavelet is a single-function orthogonal wavelet ...
A frame multiresolution (FMRA for short) orthogonal wavelet is a single-function orthogonal wavelet ...
We state a novel construction of theFourier transform on L2(R) based on translation and dilation pro...
. We apply the Lax-Phillips wave equation scattering theory to multiresolutions associated with wave...
AbstractA generalization of Mallat's classical multiresolution analysis, based on the theory of spec...
Abstract — Shift-orthogonal wavelets are a new type of multiresolution wavelet bases that are orthog...
We prove that for any expansive n x n integral matrix A with \ det A \ = 2, there exist A-dilation m...
Spectral representations of the dilation and translation operators on L2(R) are built through approp...
We present an outline of how the ideas of self-similarity can be applied to wavelet theory, especial...
The characterization of orthonormal bases of wavelets by means of convergent series involving only ...
AbstractAn explicit functional called the shiftability value of wavelet basis, which measures a devi...
Because multiresolution analyses and wavelet bases are generated by translating and dilating scaling...
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