On Skew-Symmetric Splitting and Entropy Conservation Schemes for the Euler Equations

@inproceedings{Sjgreen2009OnSS,
  title={On Skew-Symmetric Splitting and Entropy Conservation Schemes for the Euler Equations},
  author={Bj{\"o}rn Sj{\"o}green and H. C. Yee},
  year={2009}
}
The Tadmor type of entropy conservation formulation for the Euler equations and various skewsymmetric splittings of the inviscid flux derivatives are discussed. Numerical stability of high order central and Padé type (centered compact) spatial discretization is enhanced through the application of these formulations. Numerical test on a 2-D vortex convection problem indicates that the stability and accuracy of these formulations using the same high order central spatial discretization are… CONTINUE READING

References

Publications referenced by this paper.
Showing 1-10 of 20 references

Numerical Aspects of Compressible Turbulence Simulations, Report TF 92, Flow Physics and Computation Division, Department of Mechanical Engineering, Stanford

  • A. E. Honein, P. Moin
  • 2005
1 Excerpt

Higher Entropy Conservation and Numerical Stability of Compressible Turbulence Simulations

  • A. E. Honein, P. Moin
  • J. Comput. Phys.,
  • 2004
1 Excerpt

Mishra Shock Capturing Artificial Dissipation for High - Order Finite Difference Schemes

  • S.
  • J . Sci . Comput .
  • 2004

Grid Convergence of High Order Methods for Multiscale Complex Unsteady Viscous compressible Flows

  • B. Sjögreen, H. C. Yee
  • J. Comput. Phys.,
  • 2003
1 Excerpt

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