Topics
Lp(Rd)Anatomical structure
A condition on a scaling function which generates a multiresolution anal-ysis of Lp(Rd) is given. 1. Introduction and results. A family of closed subspaces {Vj}j∈Z of Lp(Rd) is called a multiresolution analysis of Lp(Rd) if (i) Vj ⊂ Vj+1 and f(x) ∈ Vj if and only if f(2−jx) ∈ V0
Scaling functions that generate a multiresolution analysis (MRA) satisfy, among other conditions, th...
AbstractWe characterize the closure of the union of the subspaces of a multiresolution analysis whic...
AbstractWe study minimal conditions under which the function system of dyadic translates and dilates...
A condition on a scaling function which generates a multiresolution analysis of $L^p(ℝ^d)$ is given
AbstractIn this paper we define multiresolution analysis (MRA) in function space Lp(Ω,μ) for p>1, wh...
Abstract. Generalized multiresolution analyses are increasing se-quences of subspaces of a Hilbert s...
AbstractThis paper is concerned with the development of an equivalence relation between two multires...
AbstractThis paper is concerned with the development of an equivalence relation between two multires...
Generalized multiresolution analyses are increasing sequences of subspaces of a Hilbert space H that...
We are interested in the problem of when the density condition in a multiresolution analysis defined...
AbstractMultiresolution analysis plays a major role in wavelet theory. In this paper, multiresolutio...
Scaling functions that generate a multiresolution analysis (MRA) satisfy, among other conditions, th...
AbstractMultiresolution analysis plays a major role in wavelet theory. In this paper, multiresolutio...
Scaling functions that generate a multiresolution analysis (MRA) satisfy, among other conditions, th...
\begin{abstract} Multiresolution Approximation subspaces are $\L^2(\RR)$-subspaces defined for each ...
Scaling functions that generate a multiresolution analysis (MRA) satisfy, among other conditions, th...
AbstractWe characterize the closure of the union of the subspaces of a multiresolution analysis whic...
AbstractWe study minimal conditions under which the function system of dyadic translates and dilates...
A condition on a scaling function which generates a multiresolution analysis of $L^p(ℝ^d)$ is given
AbstractIn this paper we define multiresolution analysis (MRA) in function space Lp(Ω,μ) for p>1, wh...
Abstract. Generalized multiresolution analyses are increasing se-quences of subspaces of a Hilbert s...
AbstractThis paper is concerned with the development of an equivalence relation between two multires...
AbstractThis paper is concerned with the development of an equivalence relation between two multires...
Generalized multiresolution analyses are increasing sequences of subspaces of a Hilbert space H that...
We are interested in the problem of when the density condition in a multiresolution analysis defined...
AbstractMultiresolution analysis plays a major role in wavelet theory. In this paper, multiresolutio...
Scaling functions that generate a multiresolution analysis (MRA) satisfy, among other conditions, th...
AbstractMultiresolution analysis plays a major role in wavelet theory. In this paper, multiresolutio...
Scaling functions that generate a multiresolution analysis (MRA) satisfy, among other conditions, th...
\begin{abstract} Multiresolution Approximation subspaces are $\L^2(\RR)$-subspaces defined for each ...
Scaling functions that generate a multiresolution analysis (MRA) satisfy, among other conditions, th...
AbstractWe characterize the closure of the union of the subspaces of a multiresolution analysis whic...
AbstractWe study minimal conditions under which the function system of dyadic translates and dilates...
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