Periodic Homogenization of Local/Nonlocal Systems

TL;DR

This paper investigates the homogenization of elliptic equations combining local and nonlocal operators, revealing different limit behaviors depending on the spatial arrangement of local and nonlocal regions, including cases with vanishing local parts and coupled homogenized systems.

Contribution

It introduces a novel analysis of the homogenization process for systems with mixed local and nonlocal components in periodically structured domains, highlighting new limit behaviors.

Findings

Solutions converge to a system with vanishing local part when confined to small holes.

Homogenized local diffusion coupled with nonlocal equations in certain configurations.

Intermediate regimes show partial survival of local diffusion in the limit.

Abstract

In this paper, we study the homogenization of elliptic equations that combine a local part, given by the Laplacian with Neumann boundary conditions, and its nonlocal version, defined through an integral operator with a smooth kernel. These two components are coupled through an additional nonlocal operator also given by a smooth kernel. We consider a sequence of partitions of a fixed spatial domain into two regions - local and nonlocal - which are periodically distributed in space (with one of the regions consisting of small, periodically arranged holes). Depending on the relative location of the local and nonlocal regions, we obtain qualitatively different limit behaviors. When the local part of the equation is confined to the small periodic holes, the sequence of solutions converges to the unique solution of a limit system in which the local component vanishes, while the nonlocal part persists and splits into two distinct components. On the other hand, when the local part of the problem lies outside the holes, the limit system exhibits a homogenized local diffusion operator coupled with a nonlocal equation. Finally, we analyze an intermediate regime in which only part of the local diffusion survives in the limit, by considering configurations consisting of parallel thin strips instead of holes.