Add to ORKGIn this paper we apply the wavelet-Galerkin method to some special types of Sturm-Liouville differential equation. We use a scaling function that allows us to find the numerical solutions of nonhomogeneous differential equation such as Van der Pol equation
The Laplace Equation in three variable can be reduced to three ODEs by means of the Fourier method. ...
Abstract. Although spectral methods such as Galerkin and Tau meth-ods do not work well for solving o...
Discrete orthogonal wavelets are a family of functions with compact support which form a basis on a ...
In this paper we apply the wavelet-Galerkin method to some special types of Sturm-Liouville differe...
Abstract. The Galerkin method is one of the most used methods for finding numerical solutions of ord...
The Galerkin method is one of the most used methods for finding numerical solutions of ordinary and ...
The Galerkin method is one of the most used methods for finding numerical solutions of ordinary and ...
Wavelet Galerkin Method is used to numerically solve an initial differential problem, after adapting...
In harmonic analysis, wavelets are useful and important tools for analyzing problems and equations. ...
The objective of this work is to develop a systematic method of implementing the Wavelet-Galerkin me...
The relative merits of the wavelet-Galerkin solution of hyperbolic partial differential equations, t...
AbstractWe present a new numerical method for the solution of partial differential equations in nons...
. The relative merits of the wavelet-Galerkin solution of hyperbolic partial differential equations,...
We consider the problem $K(x)u_{xx}=u_{t}$ , $0<x<1$, $tgeq 0$, where $K(x)$ is bounded below by a p...
Most of the physical problems including sound waves in a viscous medium, waves in fluid filled visco...
The Laplace Equation in three variable can be reduced to three ODEs by means of the Fourier method. ...
Abstract. Although spectral methods such as Galerkin and Tau meth-ods do not work well for solving o...
Discrete orthogonal wavelets are a family of functions with compact support which form a basis on a ...
In this paper we apply the wavelet-Galerkin method to some special types of Sturm-Liouville differe...
Abstract. The Galerkin method is one of the most used methods for finding numerical solutions of ord...
The Galerkin method is one of the most used methods for finding numerical solutions of ordinary and ...
The Galerkin method is one of the most used methods for finding numerical solutions of ordinary and ...
Wavelet Galerkin Method is used to numerically solve an initial differential problem, after adapting...
In harmonic analysis, wavelets are useful and important tools for analyzing problems and equations. ...
The objective of this work is to develop a systematic method of implementing the Wavelet-Galerkin me...
The relative merits of the wavelet-Galerkin solution of hyperbolic partial differential equations, t...
AbstractWe present a new numerical method for the solution of partial differential equations in nons...
. The relative merits of the wavelet-Galerkin solution of hyperbolic partial differential equations,...
We consider the problem $K(x)u_{xx}=u_{t}$ , $0<x<1$, $tgeq 0$, where $K(x)$ is bounded below by a p...
Most of the physical problems including sound waves in a viscous medium, waves in fluid filled visco...
The Laplace Equation in three variable can be reduced to three ODEs by means of the Fourier method. ...
Abstract. Although spectral methods such as Galerkin and Tau meth-ods do not work well for solving o...
Discrete orthogonal wavelets are a family of functions with compact support which form a basis on a ...
