On the homogenization of random stationary elliptic operators in divergence form

Abstract

In this note we comment on the homogenization of a random elliptic operator in divergence form -∇ · a∇, where the coefficient field a is distributed according to a stationary, but not necessarily ergodic, probability measure P. We generalize the well-known case for P stationary and ergodic by showing that the operator -∇ · a(·)∇ almost surely homogenizes to a constant-coefficient, random operator -∇ · Ah∇. Furthermore, we use a disintegration formula for P with respect to a family of ergodic and stationary probability measures to show that the law of Ah may be obtained by using the standard homogenization results on each probability measure of the previous family. We finally provide a more explicit formula for Ah in the case of coefficient fields which are a function of a stationary Gaussian field.