The solution of the Riemann self-similar problem on the decay of an arbitrary discontinuity in a multivelocity multicomponent mixture is obtained using a model that takes into account the properties of the mixture as a whole.
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V. S. Surov, Hyperbolic model of a multivelocity heterogeneous medium, Inzh.-Fiz. Zh., 85, No. 3, 495–502 (2012).
V. S. Surov, Single-velocity model of a heterogeneous medium with a hyperbolic adiabatic core, Zh. Vych. Mat. Mat. Fiz., 48, No. 6, 1111–1125 (2008).
G. Wallis, One-Dimensional Two-Phase Flows [Russian translation], Mir, Moscow (1972).
V. S. Surov, Shock adiabat of a multivelocity heterogeneous medium, Inzh.-Fiz. Zh., 85, No. 2, 284–287 (2012).
A. G. Kulikovskii, N. V. Pogorelov, and A. Yu. Semenov, Mathematical Problems of the Numerical Solution of Hyperbolic Systems of Equations [in Russian], Fizmatlit, Moscow (2001).
V. S. Surov, On the inflow of a multicomponent mixture in a vacuum, Inzh.-Fiz. Zh., 85, No. 6, 1301–1306 (2012).
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Translated from Inzhenerno-Fizicheskii Zhurnal, Vol. 86, No. 4, pp. 869–876, July–August, 2013.
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Surov, V.S. The Riemann Problem for the Multivelocity Model of a Multicomponent Medium. J Eng Phys Thermophy 86, 926–934 (2013). https://doi.org/10.1007/s10891-013-0913-0
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DOI: https://doi.org/10.1007/s10891-013-0913-0