Steady compressible Navier-Stokes-Fourier system with slip boundary conditions arising from kinetic theory

Abstract

This paper studies the boundary value problem on the steady compressible Navier-Stokes-Fourier system in a channel domain (0,1)×T2 with a class of generalized slip boundary conditions that were systematically derived from the Boltzmann equation by Coron Coron-JSP-1989 and later by Aoki et al Aoki-Baranger-Hattori-Kosuge-Martalo-Mathiaud-Mieussens-JSP-2017. We establish the existence and uniqueness of strong solutions in (L02 H2())× V3()× H3() provided that the wall temperature is near a positive constant. The proof relies on the construction of a new variational formulation for the corresponding linearized problem and employs a fixed point argument. The main difficulty arises from the interplay of velocity and temperature derivatives together with the effect of density dependence on the boundary.