Homogenization for non-local elliptic operators in both perforated and non-perforated domains

Abstract

In this paper, we focus on the homogenization process of the non-local elliptic boundary value problem Ls u =(-∇· (A(x)∇))su=f in O, with 0<s<1, considering non-homogeneous Dirichlet type condition outside of the bounded domain O⊂eq Rn. We find the homogenized problem by using the H-convergence method, as 0, under standard uniform ellipticity, boundedness and symmetry assumptions on coefficients A(x), with the homogenized coefficients as the standard H-limit (cf. MT1) of the sequence \A\>0. We also prove that the commonly referred to as the strange term in the literature (see [Chapter 4]MT) does not appear in the homogenized problem associated with the fractional Laplace operator (-)s in a perforated domain. Both of these results have been obtained in the class of general microstructures. Consequently, we could certify that the homogenization process, as 0, is stable under s 1- in the non-perforated domains, but not necessarily in the case of perforated domains.