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Numerical Solution of the Boltzmann Kinetic Equation for the Binary Gas Mixture

  • A. A. Raines

Abstract

The process of energy and momentum exchange in binary space-homogeneous gas mixture with different molecular masses and collision cross sections is investigated on the basis of the Boltzmann kinetic equation.

Keywords

Hard Sphere Collision Cross Section Variable Diameter Boltzmann Kinetic Equation Relaxation Stage 
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References

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    Aristov V.V., Tcheremissine F.G. The conservative splitting method for the solution of Boltzmann equation, USSR Comp. Math, and Math. Phys., 20:191 (1980) — in Russian.MATHCrossRefGoogle Scholar
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    Rykov V.A.,Chukanova T.I. The solution of Boltzmann kinetic equations for the binary gas mixture relaxation, Numerical methods in the theory of rarefied gases, Moscow Comp. Center of the USSR Academy of Sciences, 36 (1969) — In Russian.Google Scholar
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    Denisik S.A., Lebedev S.N., Malama Yu.G. On a control of a non-linear scheme of Monte-Carlo method, USSR Comp. Math, and Math. Phys., 11:783 (1971) — In Russian.MATHCrossRefGoogle Scholar
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    Bird G.A. Monte-Carlo simulation in an engineering context, Rarefied Gas Dynamics. Proc. of the 12th Intern. Sympos., 1: 239 (1981).Google Scholar

Copyright information

© Springer Science+Business Media New York 1985

Authors and Affiliations

  • A. A. Raines
    • 1
  1. 1.The Leningrad State UniversityUSSR

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