Dirichlet Problems in Perforated Domains

Abstract

In this paper we establish W1,p estimates for solutions u to Laplace's equation with the Dirichlet condition in a bounded and perforated, not necessarily periodically, C1 domain , η in Rd. The bounding constants depend explicitly on two small parameters and η, where represents the scale of the minimal distance between holes, and η denotes the ratio between the size of the holes and . The proof relies on a large-scale Lp estimate for ∇ u, whose proof is divided into two parts. In the first part, we show that as , η approach zero, harmonic functions in , η may be approximated by solutions of an intermediate problem for a Schr\"odinger operator in . In the second part, a real-variable method is employed to establish the large-scale Lp estimate for ∇ u by using the approximation at scales above . The results are sharp except in the case d 3 and p=d or d.