Topics in Computational Wave Propagation: Direct and Inverse Problems / Edition 1 available in Paperback
- Pub. Date:
- Springer Berlin Heidelberg
These ten detailed and authoritative survey articles on numerical methods for direct and inverse wave propagation problems are written by leading experts. Researchers and practitioners in computational wave propagation, from postgraduate level onwards, will find the breadth and depth of coverage of recent developments a valuable resource. The articles describe a wide range of topics on the application and analysis of methods for time and frequency domain PDE and boundary integral formulations of wave propagation problems. Electromagnetic, seismic and acoustic equations are considered. Recent developments in methods and analysis ranging from finite differences to hp-adaptive finite elements, including high-accuracy and fast methods are described with extensive references.
|Publisher:||Springer Berlin Heidelberg|
|Series:||Lecture Notes in Computational Science and Engineering , #31|
|Edition description:||Softcover reprint of the original 1st ed. 2003|
|Product dimensions:||6.10(w) x 9.25(h) x 0.04(d)|
Table of ContentsNew Results on Absorbing Layers and Radiation Boundary Conditions.- Fast, High-Order, High-Frequency Integral Methods for Computational Acoustics and Electromagnetics.- Galerkin Boundary Element Methods for Electromagnetic Scattering.- Computation of resonance frequencies for Maxwell equations in non-smooth domains.- hp-Adaptive Finite Elements for Time-Harmonic Maxwell Equations.- Variational Methods for Time-Dependent Wave Propagation Problems.- Some Numerical Techniques for Maxwell’s Equations in Different Types of Geometries.- On Retarded Potential Boundary Integral Equations and their Discretisation.- Inverse Scattering Theory for Time-Harmonic Waves.- Herglotz Wave Functions in Inverse Electromagnetic Scattering Theory.- Appendix: Colour Figures.