This work addresses the question of the efficient numerical solution of time-domain boundary integral equations with retarded potentials arising in the problems of acoustic and electromagnetic scattering. The convolutional form of the time-domain boundary operators allows to discretize them with the help of Runge-Kutta convolution quadrature. This method combines Laplace-transform and time-stepping approaches and requires the explicit form of the fundamental solution only in the Laplace domain to be known. Recent numerical and analytical studies revealed excellent properties of Runge-Kutta convolution quadrature, e.g. high convergence order, stability, low dissipation and dispersion. As a model problem, we consider the wave scattering in...
In this article we review recent progress on the design, analysis and implementation of numerical-as...
International audienceThe standard boundary element method applied to the time harmonic Helmholtz eq...
Abstract. Wave propagation phenomena occur in reality often in semi-infinite regions. It is well kno...
This work addresses the question of the efficient numerical solution of time-domain boundary integra...
Abstract. In this talk we will discuss the efficient numerical solution of time dependent acoustic s...
AbstractLinear hyperbolic partial differential equations in a homogeneous medium, e.g., the wave equ...
Many important physical applications are governed by the wave equation. The formulation as time doma...
International audienceThis paper presents a class of boundary integral equation methods for...
We consider the wave equation in a time domain boundary integral formulation. To obtain a stable tim...
We consider the efficient numerical solution of the three-dimensional wave equation with Neumann bou...
The present research study mainly involves a survey of diverse time-domain boundary element methods ...
Summary. This article reviews several fast algorithms for boundary integral equations. After a brief...
International audienceTime-Domain Integral Equations discretized by the Time-Domain Boundary Element...
Time-domain Boundary Element Methods (BEM) have been successfully used in acoustics, optics and ela...
We investigate high-order Convolution Quadratures methods for the solution of the wave equation in u...
In this article we review recent progress on the design, analysis and implementation of numerical-as...
International audienceThe standard boundary element method applied to the time harmonic Helmholtz eq...
Abstract. Wave propagation phenomena occur in reality often in semi-infinite regions. It is well kno...
This work addresses the question of the efficient numerical solution of time-domain boundary integra...
Abstract. In this talk we will discuss the efficient numerical solution of time dependent acoustic s...
AbstractLinear hyperbolic partial differential equations in a homogeneous medium, e.g., the wave equ...
Many important physical applications are governed by the wave equation. The formulation as time doma...
International audienceThis paper presents a class of boundary integral equation methods for...
We consider the wave equation in a time domain boundary integral formulation. To obtain a stable tim...
We consider the efficient numerical solution of the three-dimensional wave equation with Neumann bou...
The present research study mainly involves a survey of diverse time-domain boundary element methods ...
Summary. This article reviews several fast algorithms for boundary integral equations. After a brief...
International audienceTime-Domain Integral Equations discretized by the Time-Domain Boundary Element...
Time-domain Boundary Element Methods (BEM) have been successfully used in acoustics, optics and ela...
We investigate high-order Convolution Quadratures methods for the solution of the wave equation in u...
In this article we review recent progress on the design, analysis and implementation of numerical-as...
International audienceThe standard boundary element method applied to the time harmonic Helmholtz eq...
Abstract. Wave propagation phenomena occur in reality often in semi-infinite regions. It is well kno...