Large-scale regularity in stochastic homogenization with divergence-free drift

Abstract

We provide a simple proof of quenched stochastic homogenization for random environments with a mean zero, divergence-free drift under the assumption that the drift admits a stationary Ld-integrable stream matrix in d≥ 3 or an L2+δ-integrable stream matrix in d=2. In addition, we prove that the environment almost surely satisfies a large-scale H\"older regularity estimate and first-order Liouville principle.