Decomposition and pointwise estimates of periodic Green functions of some elliptic equations with periodic oscillatory coefficients

Abstract

This article is about the Zd-periodic Green function Gn(x,y) of the multiscale elliptic operator Lu=- div( A(n·) · ∇ u ), where A(x) is a Zd-periodic, coercive, and H\"older continuous matrix, and n is a large integer. We prove here pointwise estimates on Gn(x,y), ∇x Gn(x,y), ∇y Gn(x,y) and ∇x ∇y Gn(x,y) in dimensions d ≥ 2. Moreover, we derive an explicit decomposition of this Green function, which is of independent interest. These results also apply for systems.