Spectral methods for the Euler equations

Spectral methods for compressible flows are introduced in relation to finite difference and finite element techniques within the framework of the method of weighted residuals. Current spectral collocation methods are put in historical context. The basic concepts of both Fourier and Chebyshev spectral collocation methods are provided. Filtering strategies for both shock-fitting and shock-capturing approaches are also presented. Fourier shock capturing techniques are evaluated using a one-dimensional, periodic astrophysical 'nozzle' problem. Examples of shock-fitting approaches include a shock/acoustic wave interaction, shock/vortex interaction, and the classical blunt body problem. While the shock capturing spectral method does not yet show a clear advantage over second-order finite differences, equivalent accuracy can be obtained using shock fitting with far fewer grid points.

[1]  Steven A. Orszag,et al.  Comparison of Pseudospectral and Spectral Approximation , 1972 .

[2]  C. W. Clenshaw The numerical solution of linear differential equations in Chebyshev series , 1957, Mathematical Proceedings of the Cambridge Philosophical Society.

[3]  P. Woodward On the nonlinear time development of gas flow in spiral density waves , 1975 .

[4]  Eli Turkel,et al.  On Numerical Boundary Treatment of Hyperbolic Systems for Finite Difference and Finite Element Methods , 1982 .

[5]  P. Cornille A Pseudospectral Scheme for the Numerical Calculation of Shocks , 1982 .

[6]  Steven A. Orszag,et al.  Spectral Calculations of One-Dimensional Inviscid Compressible Flows , 1981 .

[7]  Anthony T. Patera,et al.  Secondary instability of wall-bounded shear flows , 1983, Journal of Fluid Mechanics.

[8]  C. Lanczos,et al.  Trigonometric Interpolation of Empirical and Analytical Functions , 1938 .

[9]  John C. Slater,et al.  Electronic Energy Bands in Metals , 1934 .

[10]  Thomas A. Zang,et al.  Pseudospectral calculation of shock turbulence interactions , 1983 .

[11]  Heinz-Otto Kreiss,et al.  Methods for the approximate solution of time dependent problems , 1973 .

[12]  Andrew J. Majda,et al.  The Fourier method for nonsmooth initial data , 1978 .

[13]  Steven A. Orszag,et al.  CBMS-NSF REGIONAL CONFERENCE SERIES IN APPLIED MATHEMATICS , 1978 .

[14]  Joseph Oliger,et al.  Stability of the Fourier method , 1977 .

[15]  M. Hussaini,et al.  SHOCK-PITTED PULER SOLUTIONS TO SHOCK-VORTEX INTERACTIONS , 2010 .

[16]  M. Hussaini,et al.  Mixed spectral/finite difference approximations for slightly viscous flows , 1981 .