Hsx regularity of solutions to the stationary Boltzmann equation with the incoming boundary condition

Abstract

We consider the stationary Boltzmann equation with the angular cutoff cross section in a bounded convex domain under the incoming boundary condition. In this article, we discuss the fractional Sobolev regularity of the solution without assuming the positivity of the Gaussian curvature on the boundary. For a boundary data sufficiently smooth and close to the standard Maxwellian, the solution has H1-x regularity for hard potentials and soft potentials (-2 ≤ γ ≤ 1), while H((4 + γ)/2)-x regularity is obtained for very soft potentials (-3 < γ < -2). We first show the well-posedness of the linearized problem on a weighted L2 space and develop the L2-L∞ estimate without the stochastic cycle. We next investigate Hsx regularity of the solution to the linearized problem. The idea of the celebrated velocity averaging lemma plays a key role in our analysis. We finally derive a bilinear estimate to extend the result on the linearized problem to the weakly nonlinear problem.