Green's function for elliptic systems: existence and Delmotte-Deuschel bounds

Abstract

We prove that for an open domain D ⊂ Rd with d ≥ 2 , for every (measurable) uniformly elliptic tensor field a and for almost every point y ∈ D , there exists a unique Green's function centred in y associated to the vectorial operator -∇ · a∇ in D. In particular, when d > 2 this result also implies the existence of the fundamental solution for elliptic systems, i.e. the Green function for -∇ · a∇ in Rd . Moreover, introducing an ensemble · over the set of uniformly elliptic tensor fields, under the assumption of stationarity we infer for the fundamental solution G some pointwise bounds for |G(·; x,y)|, |∇x G(·; x,y)| and |∇x∇y G(·; x,y)|. These estimates scale optimally in space and provide a generalization to systems of the bounds obtained by Delmotte and Deuschel for the scalar case.