Add to ORKGWe establish multiresolution norm equivalences in weighted spaces L2w((0,1)) with possibly singular weight functions w(x)≥0 in (0,1). Our analysis exploits the locality of the biorthogonal wavelet basis and its dual basis functions. The discrete norms are sums of wavelet coefficients which are weighted with respect to the collocated weight function w(x) within each scale. Since norm equivalences for Sobolev norms are by now well-known, our result can also be applied to weighted Sobolev norms. We apply our theory to the problem of preconditioning p-Version FEM and wavelet discretizations of degenerate elliptic problems
We treat a number of topics related to wavelets and the description of local regularity properties o...
The goal of this paper is to define local weighted variable Sobolev spaces of fractional and negativ...
The potential of wavelets as a discretization tool for the numerical treatment of operator equations...
We establish multiresolution norm equivalences in weighted spaces L2w((0,1)) with possibly singula...
We establish multiresolution norm equivalences in weighted spaces <i>L<sup>2</sup><sub>w</sub></i>(...
We establish multiresolution norm equivalences in weighted spaces $L^2_w$ ((0,1)) with possibly sing...
Summary.: We establish multiresolution norm equivalences in weighted spaces L 2 w ((0,1)) with possi...
We prove that suitable wavelets and scaling functions give characterizations and unconditional bases...
We prove that suitable wavelets and scaling functions give characterizations and unconditional bases...
We study boundedness and convergence on Lp(ℝn, dμ) of the projection operators Pj given by MRA struc...
In this paper, we have characterized a weighted function space $ B_{\omega,\psi}^{p,q}, ~ 1\leq p,q<...
The multiresolution analysis is applied into the space of square integrable Wiener functionals for e...
The notion of multiresolution analysis (MRA) is a familiar concept to the approximation theorist. In...
. This paper gives an overview of recent achievements of the multiwavelet theory. The construction o...
We describe a recent, one-parameter family of characterizations of Sobolev and BV functions on Rn, u...
We treat a number of topics related to wavelets and the description of local regularity properties o...
The goal of this paper is to define local weighted variable Sobolev spaces of fractional and negativ...
The potential of wavelets as a discretization tool for the numerical treatment of operator equations...
We establish multiresolution norm equivalences in weighted spaces L2w((0,1)) with possibly singula...
We establish multiresolution norm equivalences in weighted spaces <i>L<sup>2</sup><sub>w</sub></i>(...
We establish multiresolution norm equivalences in weighted spaces $L^2_w$ ((0,1)) with possibly sing...
Summary.: We establish multiresolution norm equivalences in weighted spaces L 2 w ((0,1)) with possi...
We prove that suitable wavelets and scaling functions give characterizations and unconditional bases...
We prove that suitable wavelets and scaling functions give characterizations and unconditional bases...
We study boundedness and convergence on Lp(ℝn, dμ) of the projection operators Pj given by MRA struc...
In this paper, we have characterized a weighted function space $ B_{\omega,\psi}^{p,q}, ~ 1\leq p,q<...
The multiresolution analysis is applied into the space of square integrable Wiener functionals for e...
The notion of multiresolution analysis (MRA) is a familiar concept to the approximation theorist. In...
. This paper gives an overview of recent achievements of the multiwavelet theory. The construction o...
We describe a recent, one-parameter family of characterizations of Sobolev and BV functions on Rn, u...
We treat a number of topics related to wavelets and the description of local regularity properties o...
The goal of this paper is to define local weighted variable Sobolev spaces of fractional and negativ...
The potential of wavelets as a discretization tool for the numerical treatment of operator equations...