The Dirichlet problem without the maximum principle

Abstract

Consider the Dirichlet problem with respect to an elliptic operator \[ A = - Σk,l=1d ∂k \, akl \, ∂l - Σk=1d ∂k \, bk + Σk=1d ck \, ∂k + c0 \] on a bounded Wiener regular open set ⊂ Rd, where akl, ck ∈ L∞(,R) and bk,c0 ∈ L∞(,C). Suppose that the associated operator on L2() with Dirichlet boundary conditions is invertible. Then we show that for all ∈ C(∂ ) there exists a unique u ∈ C( ) H1 loc() such that u|∂ = and A u = 0. In the case when has a Lipschitz boundary and ∈ C( ) H1/2( ), then we show that u coincides with the variational solution in H1().