Boundary value problems in Lipschitz domains for equations with drifts

Abstract

In this work we establish solvability and uniqueness for the D2 Dirichlet problem and the R2 Regularity problem for second order elliptic operators L=- div(A∇·)+b∇· in bounded Lipschitz domains, where b is bounded, as well as their adjoint operators Lt=- div(At∇·)- div(b\,·). The methods that we use are estimates on harmonic measure, and the method of layer potentials. The nature of our techniques applied to D2 for L and R2 for Lt leads us to impose a specific size condition on divb in order to obtain solvability. On the other hand, we show that R2 for L and D2 for Lt are uniquely solvable, assuming only that A is Lipschitz continuous (and not necessarily symmetric) and b is bounded.