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A finite volume method for the approximation of Maxwell’s equations in two space dimensions on arbitrary meshes
- Source :
- Journal of Computational Physics. 227:9365-9388
- Publication Year :
- 2008
- Publisher :
- Elsevier BV, 2008.
-
Abstract
- A new finite volume method is presented for discretizing the two-dimensional Maxwell equations. This method may be seen as an extension of the covolume type methods to arbitrary, possibly non-conforming or even non-convex, n-sided polygonal meshes, thanks to an appropriate choice of degrees of freedom. An equivalent formulation of the scheme is given in terms of discrete differential operators obeying discrete duality principles. The main properties of the scheme are its energy conservation, its stability under a CFL-like condition, and the fact that it preserves Gauss' law and divergence free magnetic fields. Second-order convergence is demonstrated numerically on non-conforming and distorted meshes.
- Subjects :
- Numerical Analysis
Finite volume method
Physics and Astronomy (miscellaneous)
Discretization
Applied Mathematics
Mathematical analysis
Gauss
Degrees of freedom (physics and chemistry)
Duality (optimization)
Differential operator
Topology
Computer Science Applications
Computational Mathematics
symbols.namesake
Maxwell's equations
Modeling and Simulation
symbols
Gauss's law
Mathematics
Subjects
Details
- ISSN :
- 00219991
- Volume :
- 227
- Database :
- OpenAIRE
- Journal :
- Journal of Computational Physics
- Accession number :
- edsair.doi...........ca7b2d9ff81d7b7f9ffd818c0b830737
- Full Text :
- https://doi.org/10.1016/j.jcp.2008.05.013