Boltzmann boundary layer equation with Maxwell reflection boundary condition and applications to fluid limits

Abstract

This paper investigates the Knudsen layer equation in half-space, arising from the hydrodynamic limit of the Boltzmann equation to fluid dynamics. We consider the Maxwell reflection boundary condition with accommodation coefficient 0<α<1. We restrict our attention to hard sphere collisions with angular cutoff, proving the existence, uniqueness, and asymptotic behavior of the solution in L∞x,v. Additionally, we demonstrate the application of our theorem to the hydrodynamic limit through a specific example. In this expample, we derive the boundary conditions of the fluid equations using our theorem and the symmetric properties of the Knudsen layer equation for α∈(0,1] and α=O(1). These derivations differs significantly from the cases of specular and almost specular reflection. This explicitly characterizes the vanishing sources set defined in jiang2024knudsenboundarylayerequations