Add to ORKGMultiresolution is investigated on the basis of shift-invariant spaces. Given a finitely generated shift-invariant subspace S of L 2 (IR d ), let S k be the 2 k -dilate of S (k 2 ZZ). A necessary and sufficient condition is given for the sequence fS k g k2ZZ to form a multiresolution of L 2 (IR d ). A general construction of orthogonal wavelets is given, but such wavelets might not have certain desirable properties. With the aid of the general theory of vector fields on spheres, it is demonstrated that the intrinsic properties of the scaling function must be used in constructing orthogonal wavelets with a certain decay rate. When the scaling function is skew-symmetric about some point, orthogonal wavelets and prewavelets are construct...
AbstractUsing the theory of basis generators we study various properties of multivariate Riesz and o...
. We apply the Lax-Phillips wave equation scattering theory to multiresolutions associated with wave...
AbstractPeriodic scaling functions and wavelets are constructed directly from non-stationary multire...
\begin{abstract} Multiresolution Approximation subspaces are $\L^2(\RR)$-subspaces defined for each ...
Multiresolution structures are important in applications, but they are also useful for analyzing pro...
. This paper gives an overview of recent achievements of the multiwavelet theory. The construction o...
We prove that for any expansive n x n integral matrix A with \ det A \ = 2, there exist A-dilation m...
Abstract — Shift-orthogonal wavelets are a new type of multiresolution wavelet bases that are orthog...
AbstractMultiresolution analysis plays a major role in wavelet theory. In this paper, multiresolutio...
AbstractMultiresolution analysis plays a major role in wavelet theory. In this paper, multiresolutio...
The paper is concerned with the introduction and study of multiresolution analysis based on the up f...
AbstractA construction of orthogonal wavelet bases in L2(Rd) from a multiresolution analysis is give...
\begin{abstract} A Generalized Multiresolution Analysis (GMRA) associated with a wavelet is a sequen...
Based on a new definition of delation a scale discrete version of spherical multiresolution is descr...
AbstractPeriodic scaling functions and wavelets are constructed directly from non-stationary multire...
AbstractUsing the theory of basis generators we study various properties of multivariate Riesz and o...
. We apply the Lax-Phillips wave equation scattering theory to multiresolutions associated with wave...
AbstractPeriodic scaling functions and wavelets are constructed directly from non-stationary multire...
\begin{abstract} Multiresolution Approximation subspaces are $\L^2(\RR)$-subspaces defined for each ...
Multiresolution structures are important in applications, but they are also useful for analyzing pro...
. This paper gives an overview of recent achievements of the multiwavelet theory. The construction o...
We prove that for any expansive n x n integral matrix A with \ det A \ = 2, there exist A-dilation m...
Abstract — Shift-orthogonal wavelets are a new type of multiresolution wavelet bases that are orthog...
AbstractMultiresolution analysis plays a major role in wavelet theory. In this paper, multiresolutio...
AbstractMultiresolution analysis plays a major role in wavelet theory. In this paper, multiresolutio...
The paper is concerned with the introduction and study of multiresolution analysis based on the up f...
AbstractA construction of orthogonal wavelet bases in L2(Rd) from a multiresolution analysis is give...
\begin{abstract} A Generalized Multiresolution Analysis (GMRA) associated with a wavelet is a sequen...
Based on a new definition of delation a scale discrete version of spherical multiresolution is descr...
AbstractPeriodic scaling functions and wavelets are constructed directly from non-stationary multire...
AbstractUsing the theory of basis generators we study various properties of multivariate Riesz and o...
. We apply the Lax-Phillips wave equation scattering theory to multiresolutions associated with wave...
AbstractPeriodic scaling functions and wavelets are constructed directly from non-stationary multire...