A Dirichlet problem for the Laplace operator in a domain with a small hole close to the boundary

Abstract

We take an open regular domain in Rn with n 3. We introduce a pair of positive parameters ε1 and ε2 and we set ε(ε1,ε2). Then we define the perforated domain ε by making in a small hole of size ε1ε2 at distance ε1 from the boundary. When ε→(0, 0), the hole approaches the boundary while its size shrinks at a faster rate. In ε we consider a Dirichlet problem for the Laplace equation and we denote its solution by uε. By an approach based on functional analysis and on the introduction of special layer potentials we show that the map which takes ε to (a restriction of) uε has a real analytic continuation in a neighbourhood of (0, 0).