A non-oscillatory spectral Fourier method is presented for the solution of hyperbolic partial differential equations. The method is based on adding a nonsmooth function to the trigonometric polynomials which are the usual basis functions for the Fourier method. The high accuracy away from the shock is enhanced by using filters. Numerical results confirm that no oscillations develop in the solution. Also, the accuracy of the spectral solution of the inviscid Burgers equation is shown to be higher than a fixed order
Report developments in the application of spectral methods to two dimensional compressible flows are...
In this paper (a third in a series) the construction and the analysis of essentially non-oscillatory...
Spectral methods for compressible flows are introduced in relation to finite difference and finite e...
Recent results concerning numerical simulation of shock waves using spectral methods are reviewed. S...
AbstractWe review the current state of Fourier and Chebyshev collocation methods for the solution of...
We-begin the construction and the analysis of nonoscillatory shock capturing methods for the approxi...
The construction and the analysis of nonoscillatory shock capturing methods for the approximation of...
We review spectral methods for the solution of hyperbolic problems. To keep the discussion concise, ...
The construction and the analysis of nonoscillatory shock capturing methods for the approximation of...
In this paper we study uniform high order spectral methods to solve multi-dimensional Euler equation...
The convergence of the Fourier method for scalar nonlinear conservation laws which exhibit spontaneo...
In the computation of discontinuous solutions of hyperbolic conservation laws, TVD (total-variation-...
We solve two problems on x ~ [- or, ~] for arbitrary order j. The first is to compute shock-like s...
ENO (essentially non-oscillatory) schemes can provide uniformly high order accuracy right up to disc...
The accuracy of adaptively chosen, mapped polynomial approximations is studied for functions with st...
Report developments in the application of spectral methods to two dimensional compressible flows are...
In this paper (a third in a series) the construction and the analysis of essentially non-oscillatory...
Spectral methods for compressible flows are introduced in relation to finite difference and finite e...
Recent results concerning numerical simulation of shock waves using spectral methods are reviewed. S...
AbstractWe review the current state of Fourier and Chebyshev collocation methods for the solution of...
We-begin the construction and the analysis of nonoscillatory shock capturing methods for the approxi...
The construction and the analysis of nonoscillatory shock capturing methods for the approximation of...
We review spectral methods for the solution of hyperbolic problems. To keep the discussion concise, ...
The construction and the analysis of nonoscillatory shock capturing methods for the approximation of...
In this paper we study uniform high order spectral methods to solve multi-dimensional Euler equation...
The convergence of the Fourier method for scalar nonlinear conservation laws which exhibit spontaneo...
In the computation of discontinuous solutions of hyperbolic conservation laws, TVD (total-variation-...
We solve two problems on x ~ [- or, ~] for arbitrary order j. The first is to compute shock-like s...
ENO (essentially non-oscillatory) schemes can provide uniformly high order accuracy right up to disc...
The accuracy of adaptively chosen, mapped polynomial approximations is studied for functions with st...
Report developments in the application of spectral methods to two dimensional compressible flows are...
In this paper (a third in a series) the construction and the analysis of essentially non-oscillatory...
Spectral methods for compressible flows are introduced in relation to finite difference and finite e...