Boundary homogenization of a class of obstacle problems

Abstract

We study homogenization of a boundary obstacle problem on C1,α domain D for some elliptic equations with uniformly elliptic coefficient matrices γ. For any ε∈R+, ∂ D= , = and Sε⊂ with suitable assumptions,\ we prove that as ε tends to zero, the energy minimizer uε of ∫D |γ∇ u|2 dx , subject to u≥ on S , up to a subsequence, converges weakly in H1(D) to u which minimizes the energy functional ∫D|γ∇ u|2+∫ (u-)2-μ(x) dSx, where μ(x) depends on the structure of Sε and is any given function in C∞(D).