We examine preconditioners for the discrete indefinite Helmholtz equation on a three-dimensional box-shaped domain with Sommerfeld-like boundary conditions. The preconditioners are of two types. The first is derived by discretization of a related continuous operator that differs from the original only in its boundary conditions. The second is derived by a block Toeplitz approximation to the discretized problem. The resulting preconditioning matrices allow the use of fast transform methods and differ from the discrete Helmholtz operator by an operator of low rank. We present experimental results demonstrating that when these methods are combined with Krylov subspace iteration, convergence rates depend only mildly on both the wave nu...
We consider high order finite difference approximations to the Helmholtz equation in an exterior dom...
The topic of this PhD thesis is the development of iterative methods for the solution of large spars...
This paper considers finite element discretisations of the Helmholtz equation and its generalisation...
The numerical solution of the Helmholtz equation subject to nonlocal radiation boundary conditions i...
The Helmholtz equation is the simplest possible model for the wave propagation. Perhaps this is the ...
In this thesis, we present a two-level domain decomposition method for the iterative solution of the...
In this work we calculate the eigenvalues obtained by preconditioning the discrete Helmholtz operato...
Using the finite difference method to discretize the Helmholtz equation usually leads to a large spa...
International audienceIn this paper we compare numerically two different coarse space definitions fo...
The finite difference method discretization of Helmholtz equations usually leads to the large spare ...
A parallel solver for the Helmholtz equation in a domain consisting of layers with different materia...
International audienceThe standard boundary element method applied to the time harmonic Helmholtz eq...
Summary In this work we calculate the eigenvalues obtained by preconditioning the discrete Helmholtz...
In this paper we generalize and improve a recently developed domain decomposition preconditioner for...
In this paper two types of local sparse preconditioners are generalized to solve three-dimensional H...
We consider high order finite difference approximations to the Helmholtz equation in an exterior dom...
The topic of this PhD thesis is the development of iterative methods for the solution of large spars...
This paper considers finite element discretisations of the Helmholtz equation and its generalisation...
The numerical solution of the Helmholtz equation subject to nonlocal radiation boundary conditions i...
The Helmholtz equation is the simplest possible model for the wave propagation. Perhaps this is the ...
In this thesis, we present a two-level domain decomposition method for the iterative solution of the...
In this work we calculate the eigenvalues obtained by preconditioning the discrete Helmholtz operato...
Using the finite difference method to discretize the Helmholtz equation usually leads to a large spa...
International audienceIn this paper we compare numerically two different coarse space definitions fo...
The finite difference method discretization of Helmholtz equations usually leads to the large spare ...
A parallel solver for the Helmholtz equation in a domain consisting of layers with different materia...
International audienceThe standard boundary element method applied to the time harmonic Helmholtz eq...
Summary In this work we calculate the eigenvalues obtained by preconditioning the discrete Helmholtz...
In this paper we generalize and improve a recently developed domain decomposition preconditioner for...
In this paper two types of local sparse preconditioners are generalized to solve three-dimensional H...
We consider high order finite difference approximations to the Helmholtz equation in an exterior dom...
The topic of this PhD thesis is the development of iterative methods for the solution of large spars...
This paper considers finite element discretisations of the Helmholtz equation and its generalisation...