In this paper we consider a piecewise bilinear collocation method for the solution of a singular integral equation over a smooth surface. Using a fixed set of parametrizations, we introduce special wavelet bases for the spaces of test and trial functions. The trial wavelets have two vanishing moments only if their supports do not intersect the lines belonging to the common boundary of two subsurfaces defined by different parameter representations. Nevertheless, analogously to wellknown results on wavelet algorithms, the stiffness matrices with respect to these bases can be compressed to sparse matrices such that the interative solution of the matrix equations becomes fast. Finally, we present a fast quadrature algorithm for the computation ...
In the present paper we give an overview on multiscale algorithms for the solution of boundary integ...
© 2019 IOP Publishing Ltd. We propose a method of wavelet-quadratures for the solution of a singular...
The potential of wavelets as a discretization tool for the numerical treatment of operator equations...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
In this paper we consider a piecewise linear wavelet collocation method for the solut...
In this paper we consider a piecewise linear collocation method for the solution of a pseudo-differe...
In this paper we consider a piecewise linear collocation method for the solution of a pseudo-differe...
In this paper we consider a piecewise linear collocation method for the solution of the double layer...
This thesis deals with the application of wavelet bases for the numerical solution of operator equat...
The implementation of a fast, wavelet-based Galerkin discretization of second kind integral equation...
In this paper we consider a piecewise linear collocation method for the solution of strongly ellipti...
In this paper, we show how to use wavelet to discretize the boundary integral equations which are bo...
In the present paper we give an overview on multiscale algorithms for the solution of boundary integ...
© 2019 IOP Publishing Ltd. We propose a method of wavelet-quadratures for the solution of a singular...
The potential of wavelets as a discretization tool for the numerical treatment of operator equations...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
In this paper we consider a piecewise bilinear collocation method for the solution of a singular int...
In this paper we consider a piecewise linear wavelet collocation method for the solut...
In this paper we consider a piecewise linear collocation method for the solution of a pseudo-differe...
In this paper we consider a piecewise linear collocation method for the solution of a pseudo-differe...
In this paper we consider a piecewise linear collocation method for the solution of the double layer...
This thesis deals with the application of wavelet bases for the numerical solution of operator equat...
The implementation of a fast, wavelet-based Galerkin discretization of second kind integral equation...
In this paper we consider a piecewise linear collocation method for the solution of strongly ellipti...
In this paper, we show how to use wavelet to discretize the boundary integral equations which are bo...
In the present paper we give an overview on multiscale algorithms for the solution of boundary integ...
© 2019 IOP Publishing Ltd. We propose a method of wavelet-quadratures for the solution of a singular...
The potential of wavelets as a discretization tool for the numerical treatment of operator equations...