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Multi-Temperature Mixture of Fluids

Tommaso Ruggeri and Masaru Sugiyama
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Tommaso Ruggeri: University of Bologna, Department of Mathematics and Research Center on Applied Mathematics
Masaru Sugiyama: Nagoya Institute of Technology

Chapter Chapter 28 in Classical and Relativistic Rational Extended Thermodynamics of Gases, 2021, pp 547-573 from Springer

Abstract: Abstract We present a survey on the results concerning some different models of mixture of compressible fluids. In particular, we discuss the most realistic case of mixture where each component has its own temperature ( MT). We first compare the solutions of this model to the one with unique common temperature (ST). In the case of Eulerian fluids, it is shown that the corresponding ST differential system is a principal subsystem of the MT system. Global behavior of smooth solutions for large time for both systems is also discussed through the application of the Shizuta-Kawashima K-condition. Then we introduce the concept of the average temperature of a mixture based on the consideration that the internal energy of the mixture is the same as that in the case of single-temperature mixture. As a consequence, it is shown that the entropy of the mixture reaches a local maximum in equilibrium. Through the procedure of the Maxwellian iteration, a new constitutive equation for nonequilibrium temperatures of components is obtained in a classical limit, together with the Fick law for the diffusion flux. In order to justify the Maxwellian iteration, we present, for dissipative fluids, a possible approach to a classical theory of mixtures with the multi-temperature. We prove that the differences of temperatures between the components imply the existence of a new dynamic pressure even if fluids have zero bulk viscosities.

Date: 2021
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Persistent link: https://EconPapers.repec.org/RePEc:spr:sprchp:978-3-030-59144-1_28

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DOI: 10.1007/978-3-030-59144-1_28

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