The minisymposium covers recent results on theoretical and numerical aspects of wave propagation in unbounded media. Most methods both for the solution of time-dependent and time-harmonic scattering problems rely on a decomposition into an exterior and an interior problem. The minisymposium will focus on the numerical solution of such coupled interior/exterior problems and provide an overview of ideas for the solution of exterior acoustic, electromagnetic, and quantum mechanical problems.
Organizer: Xavier Antoine
<antoine@mip.ups-tlse.fr>
Frank Schmidt
Konrad-Zuse-Zentrum Berlin, Germany
The minisymposium is held in 1 session.
Tuesday, July 22 16:00 - 18:05 Lecture Room
- New Transparent Boundary Conditions for Coupled Interior/Exterior Wave Propagation Problems
(TM117)
Thorsten Hohage
(Germany)
- Domain Decomposition and Additive Schwarz Techniques in the Solution of a TE Model of the Scattering by an Electrically Deep Cavity
(TM063)
Download article as pdf-file, 0.2 MB
Nolwenn Balin
(France)
; A. Bendali
- On the Construction of Approximate Boundary Conditions for Solving the Interior Problem of the Acoustic Scattering Transmission Problem
(TM102)
Download article as pdf-file, 0.2 MB
Xavier Antoine
(United States)
; H. Barucq
- Numerical Methods to Realize the Pole Condition Concept
(TM085)
Frank Schmidt
(Germany)
; Lin Zschiedrich
- Approximation, Stability and Fast Calculation of non-Local Boundary Conditions for the Schrödinger Equation
(TM121)
Download article as pdf-file, 1.4 MB
Matthias Ehrhardt
(Germany)
; Anton Arnold ; Ivan Sofronov
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