On uniform estimates for Laplace equation in balls with small holes

Abstract

In this paper, we consider the Dirichlet problem of the three-dimensional Laplace equation in the unit ball with a shrinking hole. The problem typically arises from homogenization problems in domains perforated with tiny holes. We give an almost complete description concerning the uniform W1,p estimates: for any 3/2<p<3 there hold the uniform W1,p estimates; for any 1<p<3/2 or 3<p<∞ , there are counterexamples indicating that the uniform W1,p estimates do not hold. The results can be generalized to higher dimensions.