A higher-order large-scale regularity theory for random elliptic operators

TL;DR

This paper develops a deterministic higher-order regularity theory for divergence-form elliptic equations with heterogeneous coefficients, establishing Liouville principles and excess decay estimates that extend classical regularity results to stochastic homogenization contexts.

Contribution

It introduces a large-scale $C^{k,eta}$ regularity framework for elliptic operators with random coefficients, including the construction of higher-order correctors and Liouville principles.

Findings

Established large-scale Liouville principles for $a$-harmonic functions.

Developed $C^{k,eta}$ excess decay estimates.

Constructed higher-order correctors under sublinear growth conditions.

Abstract

We develop a large-scale regularity theory of higher order for divergence-form elliptic equations with heterogeneous coefficient fields $a$ in the context of stochastic homogenization. The large-scale regularity of $a$-harmonic functions is encoded by Liouville principles: The space of $a$-harmonic functions that grow at most like a polynomial of degree $k$ has the same dimension as in the constant-coefficient case. This result can be seen as the qualitative side of a large-scale $C^{k,\alpha}$-regularity theory, which in the present work is developed in the form of a corresponding $C^{k,\alpha}$-"excess decay" estimate: For a given $a$-harmonic function $u$ on a ball $B_R$, its energy distance on some ball $B_r$ to the above space of $a$-harmonic functions that grow at most like a polynomial of degree $k$ has the natural decay in the radius $r$ above some minimal radius $r_0$. Though motivated by stochastic homogenization, the contribution of this paper is of purely deterministic nature: We work under the assumption that for the given realization $a$ of the coefficient field, the couple $(\phi,\sigma)$ of scalar and vector potentials of the harmonic coordinates, where $\phi$ is the usual corrector, grows sublinearly in a mildly quantified way. We then construct "$k$th-order correctors" and thereby the space of $a$-harmonic functions that grow at most like a polynomial of degree $k$, establish the above excess decay and then the corresponding Liouville principle.