Non-Linear Maximum Entropy Principle for a Polyatomic Gas subject to the Dynamic Pressure
From MaRDI portal
Publication:2798032
zbMath1339.35248arXiv1504.05857MaRDI QIDQ2798032
Publication date: 1 April 2016
Full work available at URL: https://arxiv.org/abs/1504.05857
PDEs in connection with fluid mechanics (35Q35) Rarefied gas flows, Boltzmann equation in fluid mechanics (76P05) Gas dynamics (general theory) (76N15) Maximum principles in context of PDEs (35B50) First-order nonlinear hyperbolic equations (35L60) Euler equations (35Q31) Boltzmann equations (35Q20)
Related Items (15)
A second-order constitutive theory for polyatomic gases: theory and applications ⋮ Godunov variables and convex entropy for relativistic fluid dynamics with bulk viscosity ⋮ Polytropic gas modelling at kinetic and macroscopic levels ⋮ Recent results on nonlinear extended thermodynamics of real gases with six fields. I: General theory ⋮ Recent results on nonlinear extended thermodynamics of real gases with six fields. II: Shock wave structure ⋮ Molecular extended thermodynamics: comparison between rarefied polyatomic and monatomic gas closures ⋮ Dynamical pressure in a polyatomic gas: interplay between kinetic theory and extended thermodynamics ⋮ A two-temperature six-moment approach to the shock wave problem in a polyatomic gas ⋮ Extended thermodynamics of dense polyatomic gases: modeling of molecular energy exchange ⋮ Nonequilibrium pressure and temperatures in extended thermodynamics of gases with six fields ⋮ Monatomic gas as a singular limit of polyatomic gas in molecular extended thermodynamics with many moments ⋮ Effect of the dynamic pressure on the similarity solution of cylindrical shock waves in a rarefied polyatomic gas ⋮ Maximum entropy principle closure for 14-moment system for a non-polytropic gas ⋮ Shock wave structure for polyatomic gases with large bulk viscosities ⋮ A kinetic model for a polyatomic gas with temperature-dependent specific heats and its application to Shock-wave structure
This page was built for publication: Non-Linear Maximum Entropy Principle for a Polyatomic Gas subject to the Dynamic Pressure
