Multiscale analysis and homogenization of nonlocal thin films

Abstract

In this paper, we introduce a nonlocal, variational model for thin films. We consider convolution-type functionals defined on a thin domain whose thickness is of order γ, where the effective interactions range between points is of order . We study the -convergence of these energies, as both parameters vanish, to a local integral functional defined on a lower-dimensional domain. In the periodic homogenization setting, the limit energy density is characterized by an asymptotic formula that depends on the interplay between and γ. Under suitable assumptions, this formula exhibits a separation of scales effect, namely, the limit energy can be obtained by performing two successive -limits, first letting one parameter tend to zero while keeping the other fixed.