Pseudospectral methods are well known to produce superior results for the solution of partial differential equations whose solutions have a certain amount of regularity. Recent advances have made possible the use of spectral methods for the solution of conservation laws whose solutions may contain shocks. We use a recently described Super Spectral Viscosity method to obtain stable approximations of Systems of Nonlinear Hyperbolic Conservation Laws. A recently developed postprocessing method, which is theoretically capable of completely removing the Gibbs phenomenon from the Super Spectral Viscosity approximation, is examined. The postprocessing method has shown great promise when applied in some simple cases. We discuss its application to m...
Pseudospectral collocation is employed for the numerical solution of nonlinear two-point boundary va...
The accuracy of adaptively chosen, mapped polynomial approximations is studied for functions with st...
We review several topics concerning spectral approximations of time-dependent problems, primarily |...
Pseudospectral methods are well known to produce superior results for the solution of partial differ...
AbstractWe review the current state of Fourier and Chebyshev collocation methods for the solution of...
We propose a new spectral viscosity(SV) scheme for the accurate solution of nonlinear conservation ...
Chebyshev pseudospectral methods are used to compute two dimensional smooth compressible flows. Grid...
We review spectral methods for the solution of hyperbolic problems. To keep the discussion concise, ...
A spectral multigrid scheme is described which can solve pseudospectral discretizations of self-adjo...
AbstractWe present an enhanced pseudospectral Chebyshev method based on a postprocess previously int...
The convergence of the Fourier method for scalar nonlinear conservation laws which exhibit spontaneo...
A pseudospectral approach is used to solve non-smooth evolutionary problems using Fourier collocatio...
A mapped Chebyshev pseudospectral method is extended to solve three-dimensional unsteady flow proble...
M. Sc. University of KwaZulu-Natal, Pietermaritzburg 2014.In this dissertation, a modi cation of the...
Recent results concerning numerical simulation of shock waves using spectral methods are reviewed. S...
Pseudospectral collocation is employed for the numerical solution of nonlinear two-point boundary va...
The accuracy of adaptively chosen, mapped polynomial approximations is studied for functions with st...
We review several topics concerning spectral approximations of time-dependent problems, primarily |...
Pseudospectral methods are well known to produce superior results for the solution of partial differ...
AbstractWe review the current state of Fourier and Chebyshev collocation methods for the solution of...
We propose a new spectral viscosity(SV) scheme for the accurate solution of nonlinear conservation ...
Chebyshev pseudospectral methods are used to compute two dimensional smooth compressible flows. Grid...
We review spectral methods for the solution of hyperbolic problems. To keep the discussion concise, ...
A spectral multigrid scheme is described which can solve pseudospectral discretizations of self-adjo...
AbstractWe present an enhanced pseudospectral Chebyshev method based on a postprocess previously int...
The convergence of the Fourier method for scalar nonlinear conservation laws which exhibit spontaneo...
A pseudospectral approach is used to solve non-smooth evolutionary problems using Fourier collocatio...
A mapped Chebyshev pseudospectral method is extended to solve three-dimensional unsteady flow proble...
M. Sc. University of KwaZulu-Natal, Pietermaritzburg 2014.In this dissertation, a modi cation of the...
Recent results concerning numerical simulation of shock waves using spectral methods are reviewed. S...
Pseudospectral collocation is employed for the numerical solution of nonlinear two-point boundary va...
The accuracy of adaptively chosen, mapped polynomial approximations is studied for functions with st...
We review several topics concerning spectral approximations of time-dependent problems, primarily |...