Measure-valued solutions to the complete Euler system revisited

We consider the complete Euler system describing the time evolution of a general inviscid compressible fluid. We introduce a new concept of measure-valued solution based on the total energy balance and entropy inequality for the physical entropy without any renormalization. This class of so-called dissipative measure-valued solutions is large enough to include the vanishing dissipation limits of the Navier–Stokes–Fourier system. Our main result states that any sequence of weak solutions to the Navier–Stokes–Fourier system with vanishing viscosity and heat conductivity coefficients generates a dissipative measure-valued solution of the Euler system under some physically grounded constitutive relations. Finally, we discuss the same asymptotic limit for the bi-velocity fluid model introduced by H.Brenner.

[1]  H. Brenner Navier–Stokes revisited , 2005 .

[2]  Henning Struchtrup,et al.  Inconsistency of a dissipative contribution to the mass flux in hydrodynamics. , 2009, Physical review. E, Statistical, nonlinear, and soft matter physics.

[3]  Eitan Tadmor,et al.  Arbitrarily High-order Accurate Entropy Stable Essentially Nonoscillatory Schemes for Systems of Conservation Laws , 2012, SIAM J. Numer. Anal..

[4]  Mathematisches Forschungsinstitut Oberwolfach,et al.  Hyperbolic Conservation Laws , 2004 .

[5]  Eduard Feireisl,et al.  Measure-valued solutions to the complete Euler system , 2018, Journal of the Mathematical Society of Japan.

[6]  C. Dafermos The second law of thermodynamics and stability , 1979 .

[7]  J. Ball A version of the fundamental theorem for young measures , 1989 .

[8]  Mária Lukácová-Medvid'ová,et al.  Convergence of a Mixed Finite Element–Finite Volume Scheme for the Isentropic Navier–Stokes System via Dissipative Measure-Valued Solutions , 2016, Found. Comput. Math..

[9]  E. Feireisl Vanishing dissipation limit for the Navier-Stokes-Fourier system , 2015, 1506.02251.

[10]  M. Gregory Forest,et al.  Connections Between Stability, Convexity of Internal Energy, and the Second Law for Compressible Newtonian Fluids , 2005 .

[11]  Christian Klingenberg,et al.  On oscillatory solutions to the complete Euler system , 2017, Journal of Differential Equations.

[12]  F. Murat,et al.  Remarks on Chacon’s biting lemma , 1989 .

[13]  E. Feireisl,et al.  Weak–Strong Uniqueness Property for the Full Navier–Stokes–Fourier System , 2011, 1111.4256.

[14]  Elisabetta Chiodaroli,et al.  A counterexample to well-posedness of entropy solutions to the compressible Euler system , 2012, 1201.3470.

[15]  Howard Brenner,et al.  Fluid mechanics revisited , 2006 .

[16]  Sylvie Benzoni-Gavage,et al.  Multidimensional hyperbolic partial differential equations : first-order systems and applications , 2006 .

[17]  Ondrej Kreml,et al.  Global Ill‐Posedness of the Isentropic System of Gas Dynamics , 2013, 1304.0123.

[18]  Shirley Dex,et al.  JR 旅客販売総合システム(マルス)における運用及び管理について , 1991 .

[19]  Eitan Tadmor,et al.  Construction of Approximate Entropy Measure-Valued Solutions for Hyperbolic Systems of Conservation Laws , 2014, Found. Comput. Math..

[20]  Gui-Qiang G. Chen,et al.  Uniqueness and asymptotic stability of Riemann solutions for the compressible Euler equations , 2000 .

[21]  Eitan Tadmor,et al.  On the computation of measure-valued solutions , 2016, Acta Numerica.

[22]  Emil Wiedemann,et al.  Dissipative measure-valued solutions to the compressible Navier–Stokes system , 2015, Calculus of Variations and Partial Differential Equations.

[23]  Measure-valued Solutions of the Euler Equations for Ideal Compressible Polytropic Fluids , 1996 .

[24]  D. Bresch,et al.  Two-velocity hydrodynamics in fluid mechanics: Part II Existence of global κ-entropy solutions to the compressible Navier–Stokes systems with degenerate viscosities , 2015 .

[25]  Emil Wiedemann,et al.  Weak-strong uniqueness for measure-valued solutions of some compressible fluid models , 2015, 1503.05246.

[26]  Yongzhong Sun,et al.  Global Regularity to the Two Dimensional Compressible Navier-Stokes Equations with Mass Diffusion , 2015 .

[27]  D. Bresch,et al.  Two-velocity hydrodynamics in fluid mechanics: Part I Well posedness for zero Mach number systems , 2014, 1411.5482.

[28]  Eduard Feireisl,et al.  New Perspectives in Fluid Dynamics: Mathematical Analysis of a Model Proposed by Howard Brenner , 2009 .

[29]  R. J. Diperna,et al.  Measure-valued solutions to conservation laws , 1985 .

[30]  E. Feireisl,et al.  Time-Periodic Solutions to the Full Navier–Stokes–Fourier System , 2012, Archive for Rational Mechanics and Analysis.

[31]  E. Feireisl,et al.  Singular Limits in Thermodynamics of Viscous Fluids , 2009 .

[32]  Howard Brenner,et al.  Kinematics of volume transport , 2005 .

[33]  J. Málek Weak and Measure-valued Solutions to Evolutionary PDEs , 1996 .