Stochastic homogenization of Gaussian fields on random media

Abstract

In this article, we study stochastic homogenization of non-homogeneous Gaussian free fields g, a and bi-Laplacian fields b, a. They can be characterized as follows: for f=δ the solution u of ∇ · a ∇ u =f, a is a uniformly elliptic random environment, is the covariance of g, a. When f is the white noise, the field b, a can be viewed as the distributional solution of the same elliptic equation. Our results characterize the scaling limit of such fields on both, a sufficiently regular domain D⊂ Rd, or on the discrete torus. Based on stochastic homogenization techniques applied to the eigenfunction basis of the Laplace operator , we will show that such families of fields converge to an appropriate multiple of the GFF resp. bi-Laplacian. The limiting fields are determined by their respective homogenized operator , with constant depending on the law of the environment a. The proofs are based on the results found in Armstrong2019 and gloria2014optimal.