Ghost Effect from Boltzmann Theory: Expansion with Remainder

Abstract

Consider the limit →0 of the steady Boltzmann problem align v·∇xF=-1Q[F,F], F|v· n<0=Mw∫v'· n>0 F(v')|v'· n|dv', align where Mw(x0,v):=12π(Tw(x0))2 (-|v|22Tw(x0)) for x0∈∂ is the wall Maxwellian in the diffuse-reflection boundary condition. In the natural case of |∇ Tw|=O(1), for any constant P>0, the Hilbert expansion leads to alignexpansion F≈ μ+\μ(1+u1· v+T1|v|2-3T2)-μ12(A·∇xT2T2)\ align where μ(x,v):=(x)(2π T(x))32 (-|v|22T(x)), and (,u1,T) is determined by a Navier-Stokes-Fourier system with "ghost" effect. The goal of this paper is to construct F in the form of alignaa 08 F(x,v)=&μ+μ12( f1+2f2)+μw12( fB1)+αμ12R, align for interior solutions f1, f2 and boundary layer fB1, where μw is μ computed for T=Tw, and derive equation for the remainder R with some constant α≥1. To prove the validity of the expansion suitable bounds on R are needed, which are provided in the companion paper [Esposito-Guo-Rossana-Wu2023].