The use of multiresolution techniques and wavelets has become increasingly popular in the development of numerical schemes for the solution of partial differential equations (PDEs). Therefore, the use of wavelet scaling functions as a basis in computational analysis holds some promise due to their compact support, orthogonality and localization properties. Daubechies and Deslauriers-Dubuc functions have been successfully used as basis functions in several schemes like the Wavelet- Galerkin Method (WGM) and the Wavelet Finite Element Method (WFEM). Another possible advantage of their use is the fact that the calculation of integrals of inner products of wavelet scaling functions and their derivatives can be made by solving a linear system of...
Wavelet-based methods open a door for numerical solution of differential equations. Stiff systems, a...
AbstractWe present a new numerical method for the solution of partial differential equations in nons...
The boundary element method applied on non-homogenous partial differential equations requires calcul...
International audienceThe use of compactly supported wavelet functions has become increasingly popul...
Dyadic translations of the interpolating scaling function generate a basis that can be used to appro...
International audienceThe discrete orthogonal wavelet-Galerkin method is illustrated as an effective...
In recent years wavelets are given much attention in many branches of science and technology due to ...
AbstractAn important property of wavelet multiresolution analysis is the capability to represent fun...
Wavelet function generates significant interest from both theoretical and applied research given in ...
The objective of this work is to develop a systematic method of implementing the Wavelet-Galerkin me...
A method, based on a multiscale (wavelet) decomposition of the solution is proposed for the analysis...
The multiscale (wavelet) decomposition of the solution is proposed for the analysis of the Poisson ...
Proceedings of The Symposium on Applied Mathematics : Wavelet, Chaos and Nonlinear PDEs / Edited by ...
It is shown how various ideas that are well established for the solution of Poisson's equation using...
Discrete orthogonal wavelets are a family of functions with compact support which form a basis on a ...
Wavelet-based methods open a door for numerical solution of differential equations. Stiff systems, a...
AbstractWe present a new numerical method for the solution of partial differential equations in nons...
The boundary element method applied on non-homogenous partial differential equations requires calcul...
International audienceThe use of compactly supported wavelet functions has become increasingly popul...
Dyadic translations of the interpolating scaling function generate a basis that can be used to appro...
International audienceThe discrete orthogonal wavelet-Galerkin method is illustrated as an effective...
In recent years wavelets are given much attention in many branches of science and technology due to ...
AbstractAn important property of wavelet multiresolution analysis is the capability to represent fun...
Wavelet function generates significant interest from both theoretical and applied research given in ...
The objective of this work is to develop a systematic method of implementing the Wavelet-Galerkin me...
A method, based on a multiscale (wavelet) decomposition of the solution is proposed for the analysis...
The multiscale (wavelet) decomposition of the solution is proposed for the analysis of the Poisson ...
Proceedings of The Symposium on Applied Mathematics : Wavelet, Chaos and Nonlinear PDEs / Edited by ...
It is shown how various ideas that are well established for the solution of Poisson's equation using...
Discrete orthogonal wavelets are a family of functions with compact support which form a basis on a ...
Wavelet-based methods open a door for numerical solution of differential equations. Stiff systems, a...
AbstractWe present a new numerical method for the solution of partial differential equations in nons...
The boundary element method applied on non-homogenous partial differential equations requires calcul...