Nonlocal problems in perforated domains

TL;DR

This paper investigates the behavior of nonlocal equations in perforated domains with holes, analyzing their limits as holes become small or dense, and connecting nonlocal models to local PDEs through kernel rescaling.

Contribution

It introduces a framework for analyzing nonlocal equations in perforated domains with weakly converging holes and derives the limit problems, including the critical hole size in periodic arrangements.

Findings

Identifies the limit nonlocal problem as holes vanish or become dense.

Determines the critical radius of holes in periodic configurations.

Shows how rescaling kernels approximates local PDEs.

Abstract

In this paper we analyze nonlocal equations in perforated domains. We consider nonlocal problems of the form $f(x) = \int_{B} J(x-y) (u(y) - u(x)) dy$ with $x$ in a perforated domain $\Omega^\epsilon \subset \Omega$. Here $J$ is a non-singular kernel. We think about $\Omega^\epsilon$ as a fixed set $\Omega$ from where we have removed a subset that we call the holes. We deal both with the Neumann and Dirichlet conditions in the holes and assume a Dirichlet condition outside $\Omega$. In the later case we impose that $u$ vanishes in the holes but integrate in the whole $\mathbb{R}^N$ ($B=\mathbb{R}^N$) and in the former we just consider integrals in $\mathbb{R}^N$ minus the holes ($B=\mathbb{R}^N \setminus (\Omega \setminus \Omega^\epsilon)$). Assuming weak convergence of the holes, specifically, under the assumption that the characteristic function of $\Omega^\epsilon$ has a weak limit, $\chi_{\epsilon} \rightharpoonup \mathcal{X}$ weakly$^*$ in $L^\infty(\Omega)$, we analyze the limit as $\epsilon \to 0$ of the solutions to the nonlocal problems proving that there is a nonlocal limit problem. In the case in which the holes are periodically removed balls we obtain that the critical radius is of order of the size of the typical cell (that gives the period). In addition, in this periodic case, we also study the behavior of these nonlocal problems when we rescale the kernel in order to approximate local PDE problems.