Application of the Haar wavelet approach for solving stiff differential equations is discussed. Solution of singular perturbation problems is also considered. Efficiency of the recommended method is demonstrated by means of four numerical examples, mostly taken from well‐known textbooks. First published online: 14 Oct 201
International audienceHaar wavelets are applied for solution of three-dimensional partial differenti...
AbstractTwo-dimensional Haar wavelets are applied for solution of the partial differential equations...
International audienceHaar wavelets are applied for solution of three-dimensional partial differenti...
Application of the Haar wavelet approach for solving stiff differential equations is discussed. Solu...
In general, there are countless types of problems encountered from different disciplines that can be ...
In general, there are countless types of problems encountered from different disciplines that can be ...
Wavelet-based methods open a door for numerical solution of differential equations. Stiff systems, a...
This is the first book to present a systematic review of applications of the Haar wavelet method for...
AbstractTwo-dimensional Haar wavelets are applied for solution of the partial differential equations...
In this paper, we present an approximate numerical solution of system of linear differential equatio...
Haar Wavelets has become important tool for solving number of problems of science and engineering. I...
In this contest of study, problems regarding differential equations are studied when the differentia...
In this paper, we proposed an efficient numerical method based on uniform Haar wavelet for the numer...
An efficient algorithm based on the Haar wavelet approach for numerical solution of linear integral ...
This thesis explains and tests a wavelet based implicit numerical method for the solving of partial ...
International audienceHaar wavelets are applied for solution of three-dimensional partial differenti...
AbstractTwo-dimensional Haar wavelets are applied for solution of the partial differential equations...
International audienceHaar wavelets are applied for solution of three-dimensional partial differenti...
Application of the Haar wavelet approach for solving stiff differential equations is discussed. Solu...
In general, there are countless types of problems encountered from different disciplines that can be ...
In general, there are countless types of problems encountered from different disciplines that can be ...
Wavelet-based methods open a door for numerical solution of differential equations. Stiff systems, a...
This is the first book to present a systematic review of applications of the Haar wavelet method for...
AbstractTwo-dimensional Haar wavelets are applied for solution of the partial differential equations...
In this paper, we present an approximate numerical solution of system of linear differential equatio...
Haar Wavelets has become important tool for solving number of problems of science and engineering. I...
In this contest of study, problems regarding differential equations are studied when the differentia...
In this paper, we proposed an efficient numerical method based on uniform Haar wavelet for the numer...
An efficient algorithm based on the Haar wavelet approach for numerical solution of linear integral ...
This thesis explains and tests a wavelet based implicit numerical method for the solving of partial ...
International audienceHaar wavelets are applied for solution of three-dimensional partial differenti...
AbstractTwo-dimensional Haar wavelets are applied for solution of the partial differential equations...
International audienceHaar wavelets are applied for solution of three-dimensional partial differenti...
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