Add to ORKGWe compare fast black-box boundary element methods on parametric surfaces in $\mathbb{R}^3$. These are the adaptive cross approximation, the multipole method based on interpolation, and the wavelet Galerkin scheme. The surface representation by a piecewise smooth parameterization is in contrast to the common approximation of surfaces by panels. Nonetheless, parametric surface representations are easily accessible from Computer Aided Design (CAD) and are recently topic of the studies in isogeometric analysis. Especially, we can apply two-dimensional interpolation in the multipole method. A main feature of this approach is that the cluster bases and the respective moment matrices are independent of the geometry. This results in a superior com...
This thesis considers issues in surface reconstruction such as identifying approximation methods tha...
The implementation of a fast, wavelet-based Galerkin discretization of second kind integral equation...
The boundary element method applied on non-homogenous partial differential equations requires calcul...
In this article, a black-box higher order fast multipole method for solving boundary integral equati...
This work outlines the use of a black-box fast multipole method to accelerate the far- field comput...
We present an indirect higher order boundary element method utilising NURBS mappings for exact geome...
This work presents two fast isogeometric formulations of the Boundary Element Method (BEM) applied t...
We review recent algorithmic developments in the boundary element method (BEM) for large scale engin...
Weakly singular boundary integral equations $(BIEs)$ of the first kind on polyhedral surfaces $\Gamm...
We investigate the numerical solution of strongly elliptic boundary integral equations on unstructur...
technical reportThe use of B-splines for the approximation of functions and data is well established...
Summary. This article reviews several fast algorithms for boundary integral equations. After a brief...
The Laplace and Helmholtz equations are two of the most important partial differential equations (PD...
This paper presents an Adaptive Cross Approximation (ACA) accelerated Isogeometric Boundary Element ...
The present article is concerned with the numerical solution of boundary integral equations by an ad...
This thesis considers issues in surface reconstruction such as identifying approximation methods tha...
The implementation of a fast, wavelet-based Galerkin discretization of second kind integral equation...
The boundary element method applied on non-homogenous partial differential equations requires calcul...
In this article, a black-box higher order fast multipole method for solving boundary integral equati...
This work outlines the use of a black-box fast multipole method to accelerate the far- field comput...
We present an indirect higher order boundary element method utilising NURBS mappings for exact geome...
This work presents two fast isogeometric formulations of the Boundary Element Method (BEM) applied t...
We review recent algorithmic developments in the boundary element method (BEM) for large scale engin...
Weakly singular boundary integral equations $(BIEs)$ of the first kind on polyhedral surfaces $\Gamm...
We investigate the numerical solution of strongly elliptic boundary integral equations on unstructur...
technical reportThe use of B-splines for the approximation of functions and data is well established...
Summary. This article reviews several fast algorithms for boundary integral equations. After a brief...
The Laplace and Helmholtz equations are two of the most important partial differential equations (PD...
This paper presents an Adaptive Cross Approximation (ACA) accelerated Isogeometric Boundary Element ...
The present article is concerned with the numerical solution of boundary integral equations by an ad...
This thesis considers issues in surface reconstruction such as identifying approximation methods tha...
The implementation of a fast, wavelet-based Galerkin discretization of second kind integral equation...
The boundary element method applied on non-homogenous partial differential equations requires calcul...