The accuracy of the multi-domain Chebyshev pseudospectral method is investigated for wave propagation problems by examining the properties of the method in the wavenumber space theoretically in terms of dispersion and dissipation errors. For a number of (N+1) points in the subdomains used in the literature, with N typically between 8 to 32, significant errors can be obtained for waves discretized by more than p points per wavelength. The dispersion and dissipation errors determined from the analysis in the wavenumber space are found to be in good agreement with those obtained in test cases. Accuracy limits based on arbitrary criteria are proposed, yielding minimum resolutions of 7.7, 5.2 and 4.0 points per wavelength for N=8, 16 and 32 resp...
A Fourier pseudospectral time-domain method is applied to wave propagation problems pertinent to com...
The Fourier pseudospectral time-domain (F-PSTD) method is computationally one of the most cost-effic...
Highly efficient algorithms are needed for full wave modelling in large-scale realistic un-bounded m...
The accuracy of the multi-domain Chebyshev pseudospectral method is investigated for wave propagatio...
In this paper we develop a method for the simulation of wave propagation on artificially bounded dom...
AbstractIn this paper a new Runge–Kutta method with minimal dispersion and dissipation error is deve...
AbstractStability of the pseudospectral Chebychev collocation solution of the two-dimensional acoust...
A mapped Chebyshev pseudospectral method is extended to solve three-dimensional unsteady flow proble...
The elastic wave equation in spherical coordinates is solved by a Chebyshev spectral method. In the ...
A Chebyshev finite spectral method on non-uniform meshes is proposed. An equidistribution scheme for...
Abstract Pseudo Spectral Time Domain method based on Discrete Fourier series has been widely used in...
AbstractWe present an enhanced pseudospectral Chebyshev method based on a postprocess previously int...
We have developed a von Neumann stability and dispersion analysis of two time-integration techniques...
We discuss the numerical solution of the 3-D Maxwell's equations in general curvilinear coordinates ...
In this article, an accurate Chebyshev finite spectral method for the 2-D extended Boussinesq equati...
A Fourier pseudospectral time-domain method is applied to wave propagation problems pertinent to com...
The Fourier pseudospectral time-domain (F-PSTD) method is computationally one of the most cost-effic...
Highly efficient algorithms are needed for full wave modelling in large-scale realistic un-bounded m...
The accuracy of the multi-domain Chebyshev pseudospectral method is investigated for wave propagatio...
In this paper we develop a method for the simulation of wave propagation on artificially bounded dom...
AbstractIn this paper a new Runge–Kutta method with minimal dispersion and dissipation error is deve...
AbstractStability of the pseudospectral Chebychev collocation solution of the two-dimensional acoust...
A mapped Chebyshev pseudospectral method is extended to solve three-dimensional unsteady flow proble...
The elastic wave equation in spherical coordinates is solved by a Chebyshev spectral method. In the ...
A Chebyshev finite spectral method on non-uniform meshes is proposed. An equidistribution scheme for...
Abstract Pseudo Spectral Time Domain method based on Discrete Fourier series has been widely used in...
AbstractWe present an enhanced pseudospectral Chebyshev method based on a postprocess previously int...
We have developed a von Neumann stability and dispersion analysis of two time-integration techniques...
We discuss the numerical solution of the 3-D Maxwell's equations in general curvilinear coordinates ...
In this article, an accurate Chebyshev finite spectral method for the 2-D extended Boussinesq equati...
A Fourier pseudospectral time-domain method is applied to wave propagation problems pertinent to com...
The Fourier pseudospectral time-domain (F-PSTD) method is computationally one of the most cost-effic...
Highly efficient algorithms are needed for full wave modelling in large-scale realistic un-bounded m...