Wave phenomena appear in many fields of science such as acoustics, geophysics, and quantum mechanics. They can often be described by partial differential equations (PDEs). As PDEs typically are too difficult to solve by hand, the only option is to compute approximate solutions by implementing numerical methods on computers. Ideally, the numerical methods should produce accurate solutions at low computational cost. For wave propagation problems, high-order finite difference methods are known to be computationally cheap, but historically it has been difficult to construct stable methods. Thus, they have not been guaranteed to produce reasonable results. In this thesis we consider finite difference methods on summation-by-parts (SBP) form. To ...
High-order accurate finite difference methods have been applied to the acoustic wave equation in dis...
Curvilinear, multiblock summation-by-parts finite difference methods with the simultaneous approxim...
We construct fully discrete stable and accurate numerical schemes for solving partial differential e...
Wave phenomena appear in many fields of science such as acoustics, geophysics, and quantum mechanics...
Wave propagation models are essential in many fields of physics, such as acoustics, electromagnetics...
We develop a new finite difference method for the wave equation in second order form. The finite dif...
We construct stable, accurate and efficient numerical schemes for wave propagation and flow problems...
High order accurate finite difference methods for hyperbolic and parabolic initial boundary value pr...
In this thesis we consider errors arising from finite difference operators on summation-by-parts (SB...
Many physical phenomena can be described mathematically by means of partial differential equations. ...
Wave propagation problems can be modeled by partial differential equations. In this thesis, we study...
Partial differential equations (PDEs) are used to model various phenomena in nature and society, ran...
A stable and accurate finite-difference discretization of first-order elastic wave equations is deri...
We develop a new high order accurate time-integration technique for initial value problems. We focus...
A strictly stable high order finite difference (HOFD) scheme for the scalar wave equation with disco...
High-order accurate finite difference methods have been applied to the acoustic wave equation in dis...
Curvilinear, multiblock summation-by-parts finite difference methods with the simultaneous approxim...
We construct fully discrete stable and accurate numerical schemes for solving partial differential e...
Wave phenomena appear in many fields of science such as acoustics, geophysics, and quantum mechanics...
Wave propagation models are essential in many fields of physics, such as acoustics, electromagnetics...
We develop a new finite difference method for the wave equation in second order form. The finite dif...
We construct stable, accurate and efficient numerical schemes for wave propagation and flow problems...
High order accurate finite difference methods for hyperbolic and parabolic initial boundary value pr...
In this thesis we consider errors arising from finite difference operators on summation-by-parts (SB...
Many physical phenomena can be described mathematically by means of partial differential equations. ...
Wave propagation problems can be modeled by partial differential equations. In this thesis, we study...
Partial differential equations (PDEs) are used to model various phenomena in nature and society, ran...
A stable and accurate finite-difference discretization of first-order elastic wave equations is deri...
We develop a new high order accurate time-integration technique for initial value problems. We focus...
A strictly stable high order finite difference (HOFD) scheme for the scalar wave equation with disco...
High-order accurate finite difference methods have been applied to the acoustic wave equation in dis...
Curvilinear, multiblock summation-by-parts finite difference methods with the simultaneous approxim...
We construct fully discrete stable and accurate numerical schemes for solving partial differential e...