Add to ORKGWe construct locally supported, continuous wavelets on manifolds Γ that are given as the closure of a disjoint union of general smooth parametric images of an n-simplex. The wavelets are proven to generate Riesz bases for Sobolev spaces Hs(Γ) when s ∈ (−1, 32), if not limited by the global smoothness of Γ. These results generalize the findings from [DSt99], where it was assumed that each parametrization has a constant Jacobian determinant. The wavelets can be arranged to satisfy the cancellation property of in principal any order, except for wavelets with supports that extend to different patches, which generally satisfy the cancellation property of only order 1. 1
This thesis deals with the application of wavelet bases for the numerical solution of operator equat...
AbstractIn this paper we present a construction principle for locally supported wavelets on manifold...
We investigate Riesz bases of wavelets in Sobolev spaces and their applications to numerical solutio...
We construct locally supported, continuous wavelets on manifolds that are given as the closure of a...
We construct locally supported, continuous wavelets on manifolds Γ that are given as the closure of ...
We construct locally supported, continuous wavelets on manifolds G that are given as the closure of...
In this paper, we construct a class of locally supported wavelet bases for C"0 Lagrange finite ...
In [W. Dahmen, R. Stevenson, Element-by-element construction of wavelets satisfying stability and mo...
In [W. Dahmen, R. Stevenson, Element-by-element construction of wavelets satisfying stability and mo...
AbstractIn [W. Dahmen, R. Stevenson, Element-by-element construction of wavelets satisfying stabilit...
The efficient solution of operator equations using wavelets requires that they generate a Riesz basi...
The potential of wavelets as a discretization tool for the numerical treatment of operator equations...
Abstract. The efficient solution of operator equations using wavelets requires that they generate a ...
In this paper, biorthogonal wavelets are constructed on non-uniform meshes. Both primal and dual wav...
The potential of wavelets as a discretization tool for the numerical treatment of operator equations...
This thesis deals with the application of wavelet bases for the numerical solution of operator equat...
AbstractIn this paper we present a construction principle for locally supported wavelets on manifold...
We investigate Riesz bases of wavelets in Sobolev spaces and their applications to numerical solutio...
We construct locally supported, continuous wavelets on manifolds that are given as the closure of a...
We construct locally supported, continuous wavelets on manifolds Γ that are given as the closure of ...
We construct locally supported, continuous wavelets on manifolds G that are given as the closure of...
In this paper, we construct a class of locally supported wavelet bases for C"0 Lagrange finite ...
In [W. Dahmen, R. Stevenson, Element-by-element construction of wavelets satisfying stability and mo...
In [W. Dahmen, R. Stevenson, Element-by-element construction of wavelets satisfying stability and mo...
AbstractIn [W. Dahmen, R. Stevenson, Element-by-element construction of wavelets satisfying stabilit...
The efficient solution of operator equations using wavelets requires that they generate a Riesz basi...
The potential of wavelets as a discretization tool for the numerical treatment of operator equations...
Abstract. The efficient solution of operator equations using wavelets requires that they generate a ...
In this paper, biorthogonal wavelets are constructed on non-uniform meshes. Both primal and dual wav...
The potential of wavelets as a discretization tool for the numerical treatment of operator equations...
This thesis deals with the application of wavelet bases for the numerical solution of operator equat...
AbstractIn this paper we present a construction principle for locally supported wavelets on manifold...
We investigate Riesz bases of wavelets in Sobolev spaces and their applications to numerical solutio...