The mixed problem in Lipschitz domains with general decompositions of the boundary

Abstract

This paper continues the study of the mixed problem for the Laplacian. We consider a bounded Lipschitz domain ⊂ n, n≥2, with boundary that is decomposed as ∂=D N, D and N disjoint. We let denote the boundary of D (relative to ∂) and impose conditions on the dimension and shape of and the sets N and D. Under these geometric criteria, we show that there exists p0>1 depending on the domain such that for p in the interval (1,p0), the mixed problem with Neumann data in the space Lp(N) and Dirichlet data in the Sobolev space W 1,p(D) has a unique solution with the non-tangential maximal function of the gradient of the solution in Lp(∂). We also obtain results for p=1 when the Dirichlet and Neumann data comes from Hardy spaces, and a result when the boundary data comes from weighted Sobolev spaces.