Pressure Linearization Method for the Computation of Real Fluids

Abstract : We present a method for the numerical solution of the Euler equations for fluids governed by a general equation of state, in the framework of finite volume schemes. In the evolution step, the idea is to replace the original pressure law with a locally-parameterized linear one. Then, the original EOS is used in the projection step to update the cell values of the pressure. A validation of the proposed scheme is provided by its interpretation as a relaxation method for the Euler equations. In the present paper we specialize our approach to a Roe-type method, and some two-dimensional numerical results are presented. Finally, we propose a modification of our scheme that allows us to ensure the invariance of the pressure and the velocity across contact discontinuities, for those cases in which difficulties arise in updating the pressure through the original nonlinear equation of state, as a consequence of the cell-based discretization of finite volume methods.
Type de document :
Communication dans un congrès
T. Y. Hou and E. Tadmor. Proceedings of the Ninth International Conference on Hyperbolic Problems, 2002, Pasadena, United States. Springer-Verlag, pp.797-806, 2003
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Contributeur : Marica Pelanti <>
Soumis le : jeudi 7 juillet 2016 - 10:43:10
Dernière modification le : lundi 6 novembre 2017 - 11:12:10

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  • HAL Id : hal-01342945, version 1

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Marica Pelanti. Pressure Linearization Method for the Computation of Real Fluids. T. Y. Hou and E. Tadmor. Proceedings of the Ninth International Conference on Hyperbolic Problems, 2002, Pasadena, United States. Springer-Verlag, pp.797-806, 2003. 〈hal-01342945〉

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