A singularly perturbed Dirichlet problem for the Laplace operator in a periodically perforated domain. A functional analytic approach

Abstract

Let be a sufficiently regular bounded open connected subset of Rn such that 0 ∈ and that Rn cl is connected. Then we take q11,..., qnn∈ ]0,+∞[ and p ∈ Q Πj=1n]0,qjj[. If ε is a small positive number, then we define the periodically perforated domain S[ε]- Rn z ∈ Zncl(p+ε +Σj=1n (qjjzj)ej), where \e1,...,en\ is the canonical basis of Rn. For ε small and positive, we introduce a particular Dirichlet problem for the Laplace operator in the set S[ε]-. Namely, we consider a Dirichlet condition on the boundary of the set p+ε , together with a periodicity condition. Then we show real analytic continuation properties of the solution and of the corresponding energy integral as functionals of the pair of ε and of the Dirichlet datum on p+ε ∂ , around a degenerate pair with ε=0.