On two possible ways to recover Ordinary Thermodynamics from Extended Thermodynamics of Polyatomic gases

Abstract

We consider two possible ways, i.e., the Maxwellian Iteration and the Chapman-Enskog Method, to recover Relativistic Ordinary Thermodynamics from Relativistic Extended Thermodynamics of Polyatomic gases with N moments. Both of these methods give the Eckart equations which are the relativistic version of the Navier-Stokes and Fourier laws as a first iteration. However, these methods do not lead to the same expressions of the heat conductivity , the shear viscosity μ, and the bulk viscosity which appear as coefficients in the Eckart equations. In particular, we prove that the expressions of , μ, and obtained via the Chapman-Enskog method do not depend on N , while those obtained through the Maxwellian Iteration depend on N . Moreover, we also prove that these two methods lead to the same results in the nonrelativistic limit.

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