A convergent second-order Cartesian grid finite difference scheme for the solution of Maxwell's equations is presented. The scheme employs a staggered grid in space and represents the physical location of the material and metallic boundaries correctly, hence eliminating problems caused by staircasing, and, contrary to the popular Yee scheme, enforces the correct jump-conditions on the field components across material interfaces. A detailed analysis of the accuracy of the new embedding scheme is presented, confirming its second-order global accuracy. Furthermore, the scheme is proven to be a bounded error scheme and thus convergent. Conditions for fully discrete stability is furthermore established. This enables the derivation of bounds for ...
A Discontinuous Galerkin method is used for to the numerical solution of the time-domain Maxwell equ...
A mathematical formulation suitable for the application of a novel Hermite finite element method, to...
Computational Electromagnetics is a young and growing discipline, expanding as a result of the stead...
A convergent second-order Cartesian grid finite difference scheme for the solution of Maxwell’s equa...
International audienceIn this paper, a new type of staggered discontinuous Galerkin methods for the ...
The principle of coordinate invariance states that all physical laws must be formulated in a mathema...
This thesis introduces polyhedral cell shapes into the formalism of the Finite Integration Technique...
The Yee scheme is the principle finite difference method used in computing time domain solutions of ...
Graduation date: 2016In this thesis we construct compatible discretizations of Maxwell's equations. ...
Maxwell's equations are a system of partial differential equations of vector fields. Imposing the co...
Simulating electromagnetic waves is of increasing importance, for example, due to the rapidly growin...
Second order accurate Cartesian grid methods have been well developed for interface problems in the ...
methods, non-conforming grid The use of the prominent FDTD method for the time domain solution of el...
Abstract. In this paper, we present a new fourth-order upwinding embedded boundary method (UEBM) ove...
Numerical integration of Maxwell’s equations is often based on explicit methods accepting a stabilit...
A Discontinuous Galerkin method is used for to the numerical solution of the time-domain Maxwell equ...
A mathematical formulation suitable for the application of a novel Hermite finite element method, to...
Computational Electromagnetics is a young and growing discipline, expanding as a result of the stead...
A convergent second-order Cartesian grid finite difference scheme for the solution of Maxwell’s equa...
International audienceIn this paper, a new type of staggered discontinuous Galerkin methods for the ...
The principle of coordinate invariance states that all physical laws must be formulated in a mathema...
This thesis introduces polyhedral cell shapes into the formalism of the Finite Integration Technique...
The Yee scheme is the principle finite difference method used in computing time domain solutions of ...
Graduation date: 2016In this thesis we construct compatible discretizations of Maxwell's equations. ...
Maxwell's equations are a system of partial differential equations of vector fields. Imposing the co...
Simulating electromagnetic waves is of increasing importance, for example, due to the rapidly growin...
Second order accurate Cartesian grid methods have been well developed for interface problems in the ...
methods, non-conforming grid The use of the prominent FDTD method for the time domain solution of el...
Abstract. In this paper, we present a new fourth-order upwinding embedded boundary method (UEBM) ove...
Numerical integration of Maxwell’s equations is often based on explicit methods accepting a stabilit...
A Discontinuous Galerkin method is used for to the numerical solution of the time-domain Maxwell equ...
A mathematical formulation suitable for the application of a novel Hermite finite element method, to...
Computational Electromagnetics is a young and growing discipline, expanding as a result of the stead...