Staggered high-order compact (HOC) finite difference schemes are developed for modelling electromagnetic wave propagation in dispersive media. The main advantage of HOC schemes is their very low dispersion error, which is dominant in low-order methods. The high accuracy of HOC schemes is demonstrated by examples of wave propagation through first-order Debye and Lorentz media in one dimension
A family of finite difference schemes for the acoustic wave equation in heterogeneous media is intro...
A class of high-order compact (HOC) finite difference schemes is developed that exhibits higher-orde...
Abstract. Finite difference approximation, in addition to Taylor truncation errors, introduces nu-me...
Staggered high-order compact (HOC) finite difference schemes are developed for modelling electromagn...
We study the stability properties of, and the phase error present in, several higher order (in space...
The dispersive properties of high order finite element schemes are analyzed in the setting of the He...
The stability properties, and the phase error present in higher order (in space) staggered finite di...
Wave propagation is described by the wave equation, or in the time-periodic case, by the Helmholtz e...
Graduation date: 2009In this thesis, we investigate the problem of simulating Maxwell's equations in...
A framework for the construction of a hierarchy of explicit low-dispersion, low anisotropy FDTD algo...
Abstract Modal analysis of the flux reconstruction (FR) formulation is performed to obtain the semi-...
A class of higher-order compact upwind biased finite difference (FD) schemes based on the Taylor Ser...
The scope of this doctoral thesis is the development and implementation of novel, higher order finit...
We introduce a new technique to reduce the dispersion error in general Finite Difference (FD) scheme...
Abstract—This paper discusses the enhancement of numerical dispersion characteristics in the context...
A family of finite difference schemes for the acoustic wave equation in heterogeneous media is intro...
A class of high-order compact (HOC) finite difference schemes is developed that exhibits higher-orde...
Abstract. Finite difference approximation, in addition to Taylor truncation errors, introduces nu-me...
Staggered high-order compact (HOC) finite difference schemes are developed for modelling electromagn...
We study the stability properties of, and the phase error present in, several higher order (in space...
The dispersive properties of high order finite element schemes are analyzed in the setting of the He...
The stability properties, and the phase error present in higher order (in space) staggered finite di...
Wave propagation is described by the wave equation, or in the time-periodic case, by the Helmholtz e...
Graduation date: 2009In this thesis, we investigate the problem of simulating Maxwell's equations in...
A framework for the construction of a hierarchy of explicit low-dispersion, low anisotropy FDTD algo...
Abstract Modal analysis of the flux reconstruction (FR) formulation is performed to obtain the semi-...
A class of higher-order compact upwind biased finite difference (FD) schemes based on the Taylor Ser...
The scope of this doctoral thesis is the development and implementation of novel, higher order finit...
We introduce a new technique to reduce the dispersion error in general Finite Difference (FD) scheme...
Abstract—This paper discusses the enhancement of numerical dispersion characteristics in the context...
A family of finite difference schemes for the acoustic wave equation in heterogeneous media is intro...
A class of high-order compact (HOC) finite difference schemes is developed that exhibits higher-orde...
Abstract. Finite difference approximation, in addition to Taylor truncation errors, introduces nu-me...