Passage from the Boltzmann Equation with Diffuse Boundary to the Incompressible Euler Equation with Heat Convection

We derive the incompressible Euler equations with heat convection with the no-penetration boundary condition from the Boltzmann equation with the diffuse boundary in the hydrodynamic limit for the scale of large Reynold number. Inspired by the recent framework in [30], we consider the NavierStokes-Fourier system with no-slip boundary conditions as an intermediary approximation and develop a Hilbert-type expansion of the Boltzmann equation around the global Maxwellian that allows the nontrivial heat transfer by convection in the limit. To justify our expansion and the limit, a new direct estimate of the heat flux and its derivatives in the Navier-Stokes-Fourier system is established adopting a recent Green’s function approach in the study of the inviscid limit.

[1]  Russel E. Caflisch,et al.  Zero Viscosity Limit for Analytic Solutions of the Navier-Stokes Equation on a Half-Space.¶ II. Construction of the Navier-Stokes Solution , 1998 .

[2]  I. Kukavica,et al.  The Inviscid Limit for the Navier–Stokes Equations with Data Analytic Only Near the Boundary , 2019, Archive for Rational Mechanics and Analysis.

[3]  Yasunori Maekawa,et al.  On the Inviscid Limit Problem of the Vorticity Equations for Viscous Incompressible Flows in the Half‐Plane , 2012 .

[4]  Chanwoo Kim,et al.  Formation and Propagation of Discontinuity for Boltzmann Equation in Non-Convex Domains , 2010, 1007.1997.

[5]  Chanwoo Kim,et al.  Regularity of Stationary Boltzmann Equation in Convex Domains , 2020, Archive for Rational Mechanics and Analysis.

[6]  Raffaele Esposito,et al.  Incompressible Navier-Stokes and Euler Limits of the Boltzmann Equation , 1989 .

[7]  Fei Wang The 3D inviscid limit problem with data analytic near the boundary , 2019, 1910.14449.

[8]  Lei Wu,et al.  Geometric Correction in Diffusive Limit of Neutron Transport Equation in 2D Convex Domains , 2016, 1605.02362.

[9]  Chanwoo Kim,et al.  The Boltzmann Equation Near a Rotational Local Maxwellian , 2011, SIAM J. Math. Anal..

[10]  Chanwoo Kim Boltzmann Equation with a Large Potential in a Periodic Box , 2011, 1102.4002.

[11]  N. Bellomo,et al.  ON THE CAUCHY PROBLEM FOR THE BOLTZMANN EQUATION , 1995 .

[12]  F. Golse,et al.  Fluid dynamic limits of kinetic equations. I. Formal derivations , 1991 .

[13]  Yan Guo,et al.  Decay and Continuity of the Boltzmann Equation in Bounded Domains , 2008, 0801.1121.

[14]  François Golse,et al.  The Navier–Stokes limit of the Boltzmann equation for bounded collision kernels , 2004 .

[15]  Claude Bardos,et al.  The Incompressible Euler Limit of the Boltzmann Equation with Accommodation Boundary Condition , 2011 .

[16]  François Golse,et al.  Fluid dynamic limits of kinetic equations II convergence proofs for the boltzmann equation , 1993 .

[17]  C. Mouhot,et al.  From Boltzmann to incompressible Navier–Stokes in Sobolev spaces with polynomial weight , 2014, Analysis and Applications.

[18]  Yan Guo,et al.  Regularity of the Boltzmann equation in convex domains , 2012, 1212.1694.

[19]  Chanwoo Kim,et al.  On Some Recent Progress in the Vlasov–Poisson–Boltzmann System with Diffuse Reflection Boundary , 2020, Recent Advances in Kinetic Equations and Applications.

[20]  R. Caflisch The fluid dynamic limit of the nonlinear boltzmann equation , 1980 .

[21]  Chanwoo Kim,et al.  A Note on Acoustic Limit for the Boltzmann Equation , 2021, Recent Advances in Kinetic Equations and Applications.

[22]  Luis Vega,et al.  A real space method for averaging lemmas , 2004 .

[23]  F. Golse Hydrodynamic Limits , 2005 .

[24]  Yasunori Maekawa Solution formula for the vorticity equations in the half plane with application to high vorticity creation at zero viscosity limit , 2011, Advances in Differential Equations.

[25]  Qin Li,et al.  Local Well-Posedness of Vlasov–Poisson–Boltzmann Equation with Generalized Diffuse Boundary Condition , 2020, 2103.14665.

[26]  Yan Guo,et al.  Boltzmann diffusive limit beyond the Navier‐Stokes approximation , 2006 .

[27]  J. Ginibre,et al.  Smoothing properties and retarded estimates for some dispersive evolution equations , 1992 .

[28]  Toan T. Nguyen,et al.  The Inviscid Limit of Navier–Stokes Equations for Analytic Data on the Half-Space , 2017, Archive for Rational Mechanics and Analysis.

[29]  N. Masmoudi,et al.  Boundary Layers and Incompressible Navier‐Stokes‐Fourier Limit of the Boltzmann Equation in Bounded Domain I , 2015, 1510.02977.

[30]  Russel E. Caflisch,et al.  Zero Viscosity Limit for Analytic Solutions, of the Navier-Stokes Equation on a Half-Space.¶I. Existence for Euler and Prandtl Equations , 1998 .

[31]  R. Temam On the Euler equations of incompressible perfect fluids , 1975 .

[32]  Wu Lei HYDRODYNAMIC LIMIT WITH GEOMETRIC CORRECTION OF STATIONARY BOLTZMANN EQUATION , 2015 .

[33]  Chanwoo Kim,et al.  Decay of the Boltzmann Equation with the Specular Boundary Condition in Non-convex Cylindrical Domains , 2017, 1702.03475.

[34]  Kiyoshi Asano,et al.  The Euler limit and initial layer of the nonlinear Boltzmann equation , 1983 .

[35]  Chanwoo Kim,et al.  The Boltzmann Equation with Specular Boundary Condition in Convex Domains , 2016, 1604.04342.

[37]  Yan Guo,et al.  BV-Regularity of the Boltzmann Equation in Non-Convex Domains , 2014, 1409.0160.

[38]  D. Hilbert,et al.  Begründung der kinetischen Gastheorie , 1912 .

[39]  Mirosław Lachowicz,et al.  On the initial layer and the existence theorem for the nonlinear Boltzmann equation , 1986 .

[40]  Yan Guo,et al.  Stationary Solutions to the Boltzmann Equation in the Hydrodynamic Limit , 2015, 1502.05324.

[41]  Hydrodynamic Limit of a Kinetic Gas Flow Past an Obstacle , 2017, Communications in Mathematical Physics.

[42]  Juhi Jang,et al.  Incompressible Euler Limit from Boltzmann Equation with Diffuse Boundary Condition for Analytic Data , 2020, Annals of PDE.

[43]  Pierre-Louis Lions,et al.  From the Boltzmann Equations¶to the Equations of¶Incompressible Fluid Mechanics, I , 2001 .

[44]  Jiaxin Jin,et al.  Damping of Kinetic Transport Equation with Diffuse Boundary Condition , 2020, SIAM Journal on Mathematical Analysis.

[45]  Yan Guo,et al.  Global Hilbert Expansion for the Vlasov-Poisson-Boltzmann System , 2009, 0910.5512.

[46]  Yan Guo,et al.  Local Hilbert expansion for the Boltzmann equation , 2009 .

[47]  Yan Guo,et al.  Acoustic limit for the Boltzmann equation in optimal scaling , 2009, 0901.2290.

[48]  Yan Guo,et al.  Non-Isothermal Boundary in the Boltzmann Theory and Fourier Law , 2013 .