English

Singular behavior for a multi-parameter periodic Dirichlet problem

Analysis of PDEs 2022-11-22 v1

Abstract

We consider a Dirichlet problem for the Poisson equation in a periodically perforated domain. The geometry of the domain is controlled by two parameters: a real number ϵ>0\epsilon>0 proportional to the radius of the holes and a map ϕ\phi, which models the shape of the holes. So, if gg denotes the Dirichlet boundary datum and ff the Poisson datum, we have a solution for each quadruple (ϵ,ϕ,g,f)(\epsilon,\phi,g,f). Our aim is to study how the solution depends on (ϵ,ϕ,g,f)(\epsilon,\phi,g,f), especially when ϵ\epsilon is very small and the holes narrow to points. In contrast with previous works, we don't introduce the assumption that ff has zero integral on the fundamental periodicity cell. This brings in a certain singular behavior for ϵ\epsilon close to 00. We show that, when the dimension nn of the ambient space is greater than or equal to 33, a suitable restriction of the solution can be represented with an analytic map of the quadruple (ϵ,ϕ,g,f)(\epsilon,\phi,g,f) multiplied by the factor 1/ϵn21/\epsilon^{n-2}. In case of dimension n=2n=2, we have to add logϵ\log \epsilon times the integral of f/2πf/2\pi.

Keywords

Cite

@article{arxiv.2211.11631,
  title  = {Singular behavior for a multi-parameter periodic Dirichlet problem},
  author = {Matteo Dalla Riva and Paolo Luzzini and Paolo Musolino},
  journal= {arXiv preprint arXiv:2211.11631},
  year   = {2022}
}
R2 v1 2026-06-28T06:23:32.929Z