This edited volume offers a state of the art overview of fast and robust solvers for the Helmholtz equation. The book consists of three parts: new developments and analysis in Helmholtz solvers, practical methods and implementations of Helmholtz solvers, and industrial applications. The Helmholtz equation appears in a wide range of science and engineering disciplines in which wave propagation is modeled. Examples are: seismic inversion, ultrasone medical imaging, sonar detection of submarines, waves in harbours and many more. The partial differential equation looks simple but is hard to solve. In order to approximate the solution of the problem numerical methods are needed. First a discretization is done. Various methods can be used: (high ...
We consider the numerical solution of the Helmholtz equation by different finite element methods. In...
Wave phenomena play an important role in many different applications such as MRI scans, seismology a...
International audienceThe standard boundary element method applied to the time harmonic Helmholtz eq...
The Helmholtz equation is the simplest possible model for the wave propagation. Perhaps this is the ...
AbstractThe Helmholtz Equation (− Δ − K2n2)u = 0 with a variable index of refraction, n, and a suita...
A flexible solver for the Helmholtz equation is presented. The implementation of the solver is done ...
Abstract. A exible solver for the Helmholtz equation is presented. The implemen-tation of the solve...
AbstractNumerical solution of the Helmholtz equation is a challenging computational task, particular...
The Helmholtz Equation (-delta-K(2)n(2))u=0 with a variable index of refraction, n, and a suitable r...
This article is devoted to the efficient numerical solution of the Helmholtz equation in a two‐ or t...
The application of computational modelling to wave propagation problems is hindered by the dispersio...
The Wave Based Method (WBM) is an alternative numerical prediction method for both interior and exte...
The approximation of wave problems, particularly at high frequencies, with the classical finite elem...
The numerical solution of Helmholtz ’ equation at large wavenumber is very expensive if attempted by...
During the last three decades high-frequency approximations or paraxial (one-way) approximations of ...
We consider the numerical solution of the Helmholtz equation by different finite element methods. In...
Wave phenomena play an important role in many different applications such as MRI scans, seismology a...
International audienceThe standard boundary element method applied to the time harmonic Helmholtz eq...
The Helmholtz equation is the simplest possible model for the wave propagation. Perhaps this is the ...
AbstractThe Helmholtz Equation (− Δ − K2n2)u = 0 with a variable index of refraction, n, and a suita...
A flexible solver for the Helmholtz equation is presented. The implementation of the solver is done ...
Abstract. A exible solver for the Helmholtz equation is presented. The implemen-tation of the solve...
AbstractNumerical solution of the Helmholtz equation is a challenging computational task, particular...
The Helmholtz Equation (-delta-K(2)n(2))u=0 with a variable index of refraction, n, and a suitable r...
This article is devoted to the efficient numerical solution of the Helmholtz equation in a two‐ or t...
The application of computational modelling to wave propagation problems is hindered by the dispersio...
The Wave Based Method (WBM) is an alternative numerical prediction method for both interior and exte...
The approximation of wave problems, particularly at high frequencies, with the classical finite elem...
The numerical solution of Helmholtz ’ equation at large wavenumber is very expensive if attempted by...
During the last three decades high-frequency approximations or paraxial (one-way) approximations of ...
We consider the numerical solution of the Helmholtz equation by different finite element methods. In...
Wave phenomena play an important role in many different applications such as MRI scans, seismology a...
International audienceThe standard boundary element method applied to the time harmonic Helmholtz eq...