The Helmholtz equation is the simplest possible model for the wave propagation. Perhaps this is the reason, despite denying traditional iterative methods like Krylov sub-space methods, Multigrids, etcetera, numerical solution of the Helmholtz equation has been an interesting and abundant problem to researchers since years. The work in this dissertation is also classified as an attempt to develop fast and robust iterative methods for the solution of the Helmholtz equation. This works is specified for applications in seismic imaging-Geophysics, where usually high frequency are used. Thus we will be targeting large wavenumber Helmholtz problems. The finite difference discretization of the Helmholtz equation with typically given Absorbing (Somm...
In this paper we solve the Helmholtz equation with multigrid preconditioned Krylov subspace methods....
Wave phenomena play an important role in many different applications such as MRI scans, seismology a...
Finding fast yet accurate numerical solutions to the Helmholtz equation remains a challenging task. ...
The Helmholtz equation is the simplest possible model for the wave propagation. Perhaps this is the ...
An iterative solution method, in the form of a preconditioner for a Krylov subspace method, is prese...
A Helmholtz solver whose convergence is parameter independent can be obtained by combining the shift...
A Long time deflation preconditioner is used to speed up the convergence of the Krylov subspace meth...
Recent research efforts aimed at iteratively solving the Helmholtz equation have focused on incorpo...
The topic of this PhD thesis is the development of iterative methods for the solution of large spars...
Recent research efforts aimed at iteratively solving the Helmholtz equation have focused on incorpor...
This edited volume offers a state of the art overview of fast and robust solvers for the Helmholtz e...
Abstract. In this paper we develop a robust multigrid preconditioned Krylov subspace method for the ...
Using the finite difference method to discretize the Helmholtz equation usually leads to a large spa...
Recent research efforts aimed at iteratively solving time-harmonic waves have focused on a broad ran...
The numerical solution of the Helmholtz equation subject to nonlocal radiation boundary conditions i...
In this paper we solve the Helmholtz equation with multigrid preconditioned Krylov subspace methods....
Wave phenomena play an important role in many different applications such as MRI scans, seismology a...
Finding fast yet accurate numerical solutions to the Helmholtz equation remains a challenging task. ...
The Helmholtz equation is the simplest possible model for the wave propagation. Perhaps this is the ...
An iterative solution method, in the form of a preconditioner for a Krylov subspace method, is prese...
A Helmholtz solver whose convergence is parameter independent can be obtained by combining the shift...
A Long time deflation preconditioner is used to speed up the convergence of the Krylov subspace meth...
Recent research efforts aimed at iteratively solving the Helmholtz equation have focused on incorpo...
The topic of this PhD thesis is the development of iterative methods for the solution of large spars...
Recent research efforts aimed at iteratively solving the Helmholtz equation have focused on incorpor...
This edited volume offers a state of the art overview of fast and robust solvers for the Helmholtz e...
Abstract. In this paper we develop a robust multigrid preconditioned Krylov subspace method for the ...
Using the finite difference method to discretize the Helmholtz equation usually leads to a large spa...
Recent research efforts aimed at iteratively solving time-harmonic waves have focused on a broad ran...
The numerical solution of the Helmholtz equation subject to nonlocal radiation boundary conditions i...
In this paper we solve the Helmholtz equation with multigrid preconditioned Krylov subspace methods....
Wave phenomena play an important role in many different applications such as MRI scans, seismology a...
Finding fast yet accurate numerical solutions to the Helmholtz equation remains a challenging task. ...