Elliptic homogenization with almost translation-invariant coefficients

Abstract

We consider an homogenization problem for the second order elliptic equation -div(a(./) ∇ u )=f when the coefficient a is almost translation-invariant at infinity and models a geometry close to a periodic geometry. This geometry is characterized by a particular discrete gradient of the coefficient a that belongs to a Lebesgue space Lp(Rd) for p∈[1,+∞[. When p<d, we establish a discrete adaptation of the Gagliardo-Nirenberg-Sobolev inequality in order to show that the coefficient a actually belongs to a certain class of periodic coefficients perturbed by a local defect. We next prove the existence of a corrector and we identify the homogenized limit of u. When p≥ d, we exhibit admissible coefficients a such that u possesses different subsequences that converge to different limits in L2.