Homogenization of a Boundary Obstacle Problem

Abstract

We prove the existence of a homogenization limit for solutions of appropriately formulated sequences of boundary obstacle problems for the Laplacian on C1,α domains. Specifically, we prove that the energy minimizers uε of ∫ |∇ uε|2 dx, subject to u ≥ φ on a subset Sε, converges weakly in H1 to a limit u which minimizes the energy ∫ |∇ u|2 dx + ∫ (u-φ)-2 μ(x) dSx, ⊂ ∂ D, if the obstacle set Sε shrinks in an appropriate way with the scaling parameter ε. This is an extension of a result by Caffarelli and Mellet, which in turn was an extension of a result of Cioranescu and Murat.