The boundary element method applied on non-homogenous partial differential equations requires calculation of a fully populated matrix of domain integrals. This paper compares two techniques: the fast multipole method and the fast wavelet transform, which are used to reduce the complexity of such domain matrices. The employed fast multipole method utilizes the expansion of integral kernels into series of spherical harmonics. The wavelet transform for vectors of arbitrary length, based on Haar wavelets and variable thresholding limit, is used. Both methods are tested and compared by solving the scalar Poisson equation and the velocity-vorticity vector kinematics equation. The results show comparable accuracy for both methods for a given data ...
It is shown how various ideas that are well established for the solution of Poisson's equation using...
. In this paper we solve the Laplace equation by solving a boundary integral equation in a wavelet b...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
Če metodo robnih elementov uporabimo za rešitev nehomogene parcialne diferencialne enačbe, moramo po...
Summary. This article reviews several fast algorithms for boundary integral equations. After a brief...
This paper presents a wavelet Galerkin scheme for the fast solution of boundary integral equations. ...
For many boundary element methods applied to Laplace's equation in two dimensions, the resultin...
Wavelets for the discretization of boundary integral operators usually have fixed order and are cons...
This paper presents a wavelet Galerkin scheme for the fast solution of boundary integral equations. ...
The use of multiresolution techniques and wavelets has become increasingly popular in the developmen...
(The following contains mathematical formulae and symbols that may become distorted in ASCII text.) ...
A wavelet matrix compression technique was used to solve systems of linear equations resulting from ...
The computation of physical properties in a digital materials laboratory requires significant comput...
Proceedings of The Symposium on Applied Mathematics : Wavelet, Chaos and Nonlinear PDEs / Edited by ...
The implementation of a fast, wavelet-based Galerkin discretization of second kind integral equation...
It is shown how various ideas that are well established for the solution of Poisson's equation using...
. In this paper we solve the Laplace equation by solving a boundary integral equation in a wavelet b...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
Če metodo robnih elementov uporabimo za rešitev nehomogene parcialne diferencialne enačbe, moramo po...
Summary. This article reviews several fast algorithms for boundary integral equations. After a brief...
This paper presents a wavelet Galerkin scheme for the fast solution of boundary integral equations. ...
For many boundary element methods applied to Laplace's equation in two dimensions, the resultin...
Wavelets for the discretization of boundary integral operators usually have fixed order and are cons...
This paper presents a wavelet Galerkin scheme for the fast solution of boundary integral equations. ...
The use of multiresolution techniques and wavelets has become increasingly popular in the developmen...
(The following contains mathematical formulae and symbols that may become distorted in ASCII text.) ...
A wavelet matrix compression technique was used to solve systems of linear equations resulting from ...
The computation of physical properties in a digital materials laboratory requires significant comput...
Proceedings of The Symposium on Applied Mathematics : Wavelet, Chaos and Nonlinear PDEs / Edited by ...
The implementation of a fast, wavelet-based Galerkin discretization of second kind integral equation...
It is shown how various ideas that are well established for the solution of Poisson's equation using...
. In this paper we solve the Laplace equation by solving a boundary integral equation in a wavelet b...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...