Add to ORKGIn this paper, we obtain some special types of integrals of Daubechies Wavelets which are used as Galerkin basis functions for numerical solu-tion of partial differential equations of one dimension. Galerkin bases are constructed by integrating Daubechies functions which are com-pactly supported and which constitute an orthonormal basis of L2(R). Theoretical and numerical results are obtained for elliptic problems of second order with different types of boundary conditions. Optimal error estimates are also obtained. Comparison of solutions with simple finite difference method suggests that for this class of problems, the present method will provide a better alternative to other classical methods. The methodology can be generalized to multid...
. In this paper we solve the Laplace equation by solving a boundary integral equation in a wavelet b...
As shown by Dahmen, Harbrecht and Schneider, the fully discrete wavelet Galerkin scheme for boundary...
As shown by Dahmen, Harbrecht and Schneider [7, 23, 32], the fully discrete wavelet Galerkin scheme ...
Anti-derivatives of wavelets are used for the numerical solution of differential equations. Optimal ...
AbstractWe present a new numerical method for the solution of partial differential equations in nons...
Wavelet Galerkin Method is used to numerically solve an initial differential problem, after adapting...
In recent years wavelets are given much attention in many branches of science and technology due to ...
Daubechies wavelet basis functions have many properties that make them desirable as a basis for a Ga...
Daubechies wavelet basis functions have many properties that make them desirable as a basis for a Ga...
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 ...
In the last years, applying wavelets analysis has called the attention in a wide variety of practica...
AbstractWe present a new numerical method for the solution of partial differential equations in nons...
As shown by Dahmen, Harbrecht and Schneider, the fully discrete wavelet Galerkin scheme for boundary...
. In this paper we solve the Laplace equation by solving a boundary integral equation in a wavelet b...
As shown by Dahmen, Harbrecht and Schneider, the fully discrete wavelet Galerkin scheme for boundary...
As shown by Dahmen, Harbrecht and Schneider [7, 23, 32], the fully discrete wavelet Galerkin scheme ...
Anti-derivatives of wavelets are used for the numerical solution of differential equations. Optimal ...
AbstractWe present a new numerical method for the solution of partial differential equations in nons...
Wavelet Galerkin Method is used to numerically solve an initial differential problem, after adapting...
In recent years wavelets are given much attention in many branches of science and technology due to ...
Daubechies wavelet basis functions have many properties that make them desirable as a basis for a Ga...
Daubechies wavelet basis functions have many properties that make them desirable as a basis for a Ga...
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 ...
In the last years, applying wavelets analysis has called the attention in a wide variety of practica...
AbstractWe present a new numerical method for the solution of partial differential equations in nons...
As shown by Dahmen, Harbrecht and Schneider, the fully discrete wavelet Galerkin scheme for boundary...
. In this paper we solve the Laplace equation by solving a boundary integral equation in a wavelet b...
As shown by Dahmen, Harbrecht and Schneider, the fully discrete wavelet Galerkin scheme for boundary...
As shown by Dahmen, Harbrecht and Schneider [7, 23, 32], the fully discrete wavelet Galerkin scheme ...