This study considers the stability of time domain BEMs for the wave equation in 2D. We show that the question of stability of time domain BEMs is reduced to a nonlinear eigenvalue problem related to frequency domain integral equations. We propose to solve this non-linear eigenvalue problem numerically with the Sakurai-Sugiura method. After validating this approach numerically in the exterior Dirichlet problem, we proceed to transmission problems in which we find that some time domain counterparts of “resonance-free” integral equations in frequency domain lead to instability. We finally show that the proposed stability analysis helps to reformulate these equations to obtain stable numerical schemes
Wave propagation in natural or man-made bodies is an important problem in civil engineering, electro...
The construction of images of the Earth's interior using methods as reverse time migration (RTM) or ...
International audienceThis work presents a time-truncation scheme, based on the Lagrange interpolati...
Time-dependent problems, that are frequently modelled by hyperbolic partial differential equations, ...
Time-domain Boundary Element Methods (BEM) have been successfully used in acoustics, optics and ela...
The Electric Field Integral Equation (EFIE) is widely used to solve wave scattering problems in elec...
The boundary element method (BEM) in its simple form when solving the exterior acoustic problem in t...
International audienceThe present paper describes a procedure that improves efficiency, stability an...
In the literature there is growing evidence of instabilities in standard time-stepping schemes to so...
The aim of the present contribution is the analysis of one-dimensional wave propagation problems, r...
In the literature there is growing evidence of instabilities in standard time-stepping schemes to so...
The established authority regulating the time domain boundary element method (BEM) suggests that num...
Boundary integral equations (BIEs) are used to model surface waves in a wave tank. Assuming an ideal...
This article considers a coupled finite and boundary element method for an interface problem for the...
International audienceThis work is concerned with the development of a D-BEM approach to the solutio...
Wave propagation in natural or man-made bodies is an important problem in civil engineering, electro...
The construction of images of the Earth's interior using methods as reverse time migration (RTM) or ...
International audienceThis work presents a time-truncation scheme, based on the Lagrange interpolati...
Time-dependent problems, that are frequently modelled by hyperbolic partial differential equations, ...
Time-domain Boundary Element Methods (BEM) have been successfully used in acoustics, optics and ela...
The Electric Field Integral Equation (EFIE) is widely used to solve wave scattering problems in elec...
The boundary element method (BEM) in its simple form when solving the exterior acoustic problem in t...
International audienceThe present paper describes a procedure that improves efficiency, stability an...
In the literature there is growing evidence of instabilities in standard time-stepping schemes to so...
The aim of the present contribution is the analysis of one-dimensional wave propagation problems, r...
In the literature there is growing evidence of instabilities in standard time-stepping schemes to so...
The established authority regulating the time domain boundary element method (BEM) suggests that num...
Boundary integral equations (BIEs) are used to model surface waves in a wave tank. Assuming an ideal...
This article considers a coupled finite and boundary element method for an interface problem for the...
International audienceThis work is concerned with the development of a D-BEM approach to the solutio...
Wave propagation in natural or man-made bodies is an important problem in civil engineering, electro...
The construction of images of the Earth's interior using methods as reverse time migration (RTM) or ...
International audienceThis work presents a time-truncation scheme, based on the Lagrange interpolati...