Add to ORKGAbstract. We define and study the generalized continuous wavelet transform associated with the Riemann-Liouville operator that we use to express the new inversion formulas of the Riemann-Liouville operator and its dual
This chapter discusses various aspects of the wavelet transform when applied to continuous functions...
AbstractUsing the harmonic analysis associated with Laguerre functions on K = [0, +∞[×R, we study tw...
We study the continuous and semi-discrete wavelet transform applied to functions with values in Lebe...
We define and study the generalized continuous wavelet transform associated with the Riemann-Liouvil...
We prove a Calderón reproducing formula for the Dunkl continuous wavelet transform on R. We apply th...
We define Riemann-Liouville transform α and its dual tα associated with two singu-lar partial differ...
AbstractWe study the approximation of the inverse wavelet transform using Riemannian sums. For a lar...
Abstract We consider a singular differential oper-ator ∆ on the half line which generalizes the Bess...
Copyright © 2013 E. A. Al Zahrani, M. A. Mourou. This is an open access article distributed under th...
AbstractUsing the theory of Hankel convolution, continuous and discrete Bessel wavelet transforms ar...
We define and study Dunkl wavelets and the corresponding Dunkl wavelets transforms, and we prove for...
AbstractBy the application of continuous wavelet transforms (or windowed Fourier transform) and empl...
AbstractWe introduce a composite wavelet-like transform generated by the so-called beta-semigroup an...
This is the final report of a three-year, Laboratory Directed Research and Development (LDRD) projec...
The inversion of Riesz potentials for Dunkl transform when G=Z2d is given by using the generalized w...
This chapter discusses various aspects of the wavelet transform when applied to continuous functions...
AbstractUsing the harmonic analysis associated with Laguerre functions on K = [0, +∞[×R, we study tw...
We study the continuous and semi-discrete wavelet transform applied to functions with values in Lebe...
We define and study the generalized continuous wavelet transform associated with the Riemann-Liouvil...
We prove a Calderón reproducing formula for the Dunkl continuous wavelet transform on R. We apply th...
We define Riemann-Liouville transform α and its dual tα associated with two singu-lar partial differ...
AbstractWe study the approximation of the inverse wavelet transform using Riemannian sums. For a lar...
Abstract We consider a singular differential oper-ator ∆ on the half line which generalizes the Bess...
Copyright © 2013 E. A. Al Zahrani, M. A. Mourou. This is an open access article distributed under th...
AbstractUsing the theory of Hankel convolution, continuous and discrete Bessel wavelet transforms ar...
We define and study Dunkl wavelets and the corresponding Dunkl wavelets transforms, and we prove for...
AbstractBy the application of continuous wavelet transforms (or windowed Fourier transform) and empl...
AbstractWe introduce a composite wavelet-like transform generated by the so-called beta-semigroup an...
This is the final report of a three-year, Laboratory Directed Research and Development (LDRD) projec...
The inversion of Riesz potentials for Dunkl transform when G=Z2d is given by using the generalized w...
This chapter discusses various aspects of the wavelet transform when applied to continuous functions...
AbstractUsing the harmonic analysis associated with Laguerre functions on K = [0, +∞[×R, we study tw...
We study the continuous and semi-discrete wavelet transform applied to functions with values in Lebe...