Solutions H1 of the steady transport equation in a bounded polygon with a fully non-homogeneous velocity

Abstract

This article studies the solutions in H 1 of a steady transport equation with a divergence-free driving velocity that is W 1,∞ , in a two-dimensional bounded polygon. Since the velocity is assumed fully non-homogeneous on the boundary, existence and uniqueness of the solution require a boundary condition on the open part -- where the normal component of u is strictly negative. In a previous article, we studied the solutions in L 2 of this steady transport equation. The methods, developed in this article, can be extended to prove existence and uniqueness of a solution in H 1 with Dirichlet boundary condition on -- only in the case where the normal component of u does not vanish at the boundary of --. In the case where the normal component of u vanishes at the boundary of -- , under appropriate assumptions, we construct local H 1 solutions in the neighborhood of the end-points of -- , which allow us to establish existence and uniqueness of the solution in H 1 for the transport equation with a Dirichlet boundary condition on -- .