Homogenization in perforated domains at the critical scale

Abstract

We describe the asymptotic behaviour of the minimal heterogeneous d-capacity of a small set, which we assume to be a ball for simplicity, in a fixed bounded open set Ω⊆Rd, with d≥2. Two parameters are involved: ɛ, the radius of the ball, and δ, the length scale of the heterogeneity of the medium. We prove that this capacity behaves as C|logɛ|1−d, where C=C(λ) is an explicit constant depending on the parameter λ≔limɛ→0|logδ|/|logɛ|.We determine the Γ-limit of oscillating integral functionals subjected to Dirichlet boundary conditions on periodically perforated domains. Our first result is used to study the behaviour of the functionals near the perforations which, in this instance, are balls of radius ɛ. We prove that an additional strange term arises involving C(λ).