Jun.-Prof. Dr.-Ing. Simon Adrian
Language of Instruction
Goals and Objectives
Students will acquire the basic understanding of finite-difference, finite-difference time-domain, finite element, and integral equation methods used to solve Laplace’s equation, Helmholtz equation, and Maxwell’s equations. They will learn how to implement these methods in 1D, 2D, and 3D.
- Physical basics: Maxwell‘s equations, boundary conditions, energy relations, time revolution, dispersion relation and wave velocities, low-frequency approximation, scattering and radiation problems, eigenvalue problems
- Numerical solvers: Finite difference method, finite-difference time-domain method, finite element method, integral equation method.
- Numerical analysis: Higher-order methods, adaptive methods, numerical integration, convergence, stability analysis, numerical dispersion, absorbing boundary conditions, variational methods
- Programming: Introduction to the programming language Julia, discussion of practical implementation of EM solvers
The final grade is determined by
- Pass/not passed: homework assignments
- 50 %: oral examination (several exam dates during the winter break will be offered)
- 50 %: programming projects
Information concerning the projects will follow in the next weeks.
T. Rylander, P. Ingelström, A. Bondeson: Computational Electromagnetics, Springer, 2. Edition, 2012