Wave propagation is described by the wave equation, or in the time-periodic case, by the Helmholtz equation. For problems with small wavelengths, high order discretizations must be used to resolve the solution. Two different techniques for finding compact finite difference schemes of high order are studied and compared. The first approach is Numerov's idea of using the equation to transfer higher derivatives to lower order ones for the Helmholtz equation, or, for the wave equation, from time to space. The second principle is the method of deferred correction, where a lower order approximation is used for error correction. For the time-independent Helmholtz problem, sharp estimates for the error are derived, in order to compare the arithmeti...
The scope of this doctoral thesis is the development and implementation of novel, higher order finit...
AbstractFor wave propagation in a slowly varying waveguide, it is necessary to solve the Helmholtz e...
We investigate higher order SBP-SAT discretizations of the wave equation for T-junction domains. We ...
Wave propagation is described by the wave equation, or in the time-periodic case, by the Helmholtz e...
Several studies have presented compact fourth order accurate finite difference approximation for the...
In this thesis, high order accurate discretization schemes for partial differential equations are in...
We construct modified forward, backward, and central finite difference schemes, specifically for the...
We consider compact finite-difference schemes of the 4th approximation order for an initial-boundary...
Wave propagation models are essential in many fields of physics, such as acoustics, electromagnetics...
International audienceSolving efficiently the wave equations involved in modeling acoustic, elastic ...
In this paper, third and fourth order compact finite difference schemes are proposed for solving Hel...
This dissertation explores the numerical stabilities of decomposed compact finite difference methods...
The application of computational modelling to wave propagation problems is hindered by the dispersio...
We introduce a new technique to reduce the dispersion error in general Finite Difference (FD) scheme...
AbstractSecond-, fourth- and sixth-order one-step methods have been constructed for the solution of ...
The scope of this doctoral thesis is the development and implementation of novel, higher order finit...
AbstractFor wave propagation in a slowly varying waveguide, it is necessary to solve the Helmholtz e...
We investigate higher order SBP-SAT discretizations of the wave equation for T-junction domains. We ...
Wave propagation is described by the wave equation, or in the time-periodic case, by the Helmholtz e...
Several studies have presented compact fourth order accurate finite difference approximation for the...
In this thesis, high order accurate discretization schemes for partial differential equations are in...
We construct modified forward, backward, and central finite difference schemes, specifically for the...
We consider compact finite-difference schemes of the 4th approximation order for an initial-boundary...
Wave propagation models are essential in many fields of physics, such as acoustics, electromagnetics...
International audienceSolving efficiently the wave equations involved in modeling acoustic, elastic ...
In this paper, third and fourth order compact finite difference schemes are proposed for solving Hel...
This dissertation explores the numerical stabilities of decomposed compact finite difference methods...
The application of computational modelling to wave propagation problems is hindered by the dispersio...
We introduce a new technique to reduce the dispersion error in general Finite Difference (FD) scheme...
AbstractSecond-, fourth- and sixth-order one-step methods have been constructed for the solution of ...
The scope of this doctoral thesis is the development and implementation of novel, higher order finit...
AbstractFor wave propagation in a slowly varying waveguide, it is necessary to solve the Helmholtz e...
We investigate higher order SBP-SAT discretizations of the wave equation for T-junction domains. We ...