In this note we announce that under general hypotheses, wavelet-type expansions (of functions in L p ; 1 p 1, in one or more dimensions) converge pointwise almost everywhere, and identify the Lebesgue set of a function as a set of full measure on which they converge. It is shown that unlike the Fourier summation kernel, wavelet summation kernels P j are bounded by radial decreasing L 1 convolution kernels. As a corollary it follows that best L 2 spline approximations on uniform meshes converge pointwise almost everywhere. Moreover, summation of wavelet expansions is partially insensitive to order of summation. We also give necessary and sufficient conditions for given rates of convergence of wavelet expansions in the sup norm. Such...
Under the minimal conditions on wavelets convergence almost- everywhere of wavelet transform of Lp f...
In linear approximation by wavelet, we approximate a given function by a finite term from the wavele...
In linear approximation by wavelet, we approximate a given function by a finite term from the wavele...
AbstractWavelets provide a new class of orthogonal expansions in L2(Rd) with good time/frequency loc...
A wavelet basis is an orthonormal basis of smooth functions generated by dilations by 2-m and transl...
AbstractLet ψ be a rapidly decreasing one-dimensional wavelet. We show that the wavelet expansion of...
Several results are proved which characterize the rate at which wavelet and multiresolution expansio...
In this work, we highlight to some methods that can develop the convergence of wavelet expansions un...
We show that the two dimensional wavelet expansion of Lᴾ (R²) function for 1 < p < ∞ converges point...
AbstractThe expansion of a distribution or function in regular orthogonal wavelets is considered. Th...
We announce new conditions for uniform pointwise convergence rates of wavelet expansions in Besov an...
This paper presents an analysis of the Galerkin approximation of a time dependent initial value prob...
Dedicated to Prof. Robert Carroll on the occasion of his 70th birthday. We characterize uniform conv...
Wavelet expansions have been the focus of many research papers in the last few years. The present pa...
We present new quantitative results for the characterization of the $ L _{ 2 } $ -error of wavelet-l...
Under the minimal conditions on wavelets convergence almost- everywhere of wavelet transform of Lp f...
In linear approximation by wavelet, we approximate a given function by a finite term from the wavele...
In linear approximation by wavelet, we approximate a given function by a finite term from the wavele...
AbstractWavelets provide a new class of orthogonal expansions in L2(Rd) with good time/frequency loc...
A wavelet basis is an orthonormal basis of smooth functions generated by dilations by 2-m and transl...
AbstractLet ψ be a rapidly decreasing one-dimensional wavelet. We show that the wavelet expansion of...
Several results are proved which characterize the rate at which wavelet and multiresolution expansio...
In this work, we highlight to some methods that can develop the convergence of wavelet expansions un...
We show that the two dimensional wavelet expansion of Lᴾ (R²) function for 1 < p < ∞ converges point...
AbstractThe expansion of a distribution or function in regular orthogonal wavelets is considered. Th...
We announce new conditions for uniform pointwise convergence rates of wavelet expansions in Besov an...
This paper presents an analysis of the Galerkin approximation of a time dependent initial value prob...
Dedicated to Prof. Robert Carroll on the occasion of his 70th birthday. We characterize uniform conv...
Wavelet expansions have been the focus of many research papers in the last few years. The present pa...
We present new quantitative results for the characterization of the $ L _{ 2 } $ -error of wavelet-l...
Under the minimal conditions on wavelets convergence almost- everywhere of wavelet transform of Lp f...
In linear approximation by wavelet, we approximate a given function by a finite term from the wavele...
In linear approximation by wavelet, we approximate a given function by a finite term from the wavele...