Homogenization of Elliptic Boundary Value Problems in Lipschitz Domains

Abstract

In this paper we study the Lp boundary value problems for L(u)=0 in Rd+1+, where L=-div(A∇) is a second order elliptic operator with real and symmetric coefficients. Assume that A is periodic in xd+1 and satisfies some minimal smoothness condition in the xd+1 variable, we show that the Lp Neumann and regularity problems are uniquely solvable for 1<p<2+δ. We also present a new proof of Dahlberg's theorem on the Lp Dirichlet problem for 2-δ<p< ∞ (Dahlberg's original unpublished proof is given in the Appendix). As the periodic and smoothness conditions are imposed only on the xd+1 variable, these results extend directly from Rd+1+ to regions above Lipschitz graphs. Consequently, by localization techniques, we obtain uniform Lp estimates for the Dirichlet, Neumann and regularity problems on bounded Lipschitz domains for a family of second order elliptic operators arising in the theory of homogenization. The results on the Neumann and regularity problems are new even for smooth domains.