Regularity of random elliptic operators with degenerate coefficients and applications to stochastic homogenization

Abstract

We consider degenerate elliptic equations of second order in divergence form with a symmetric random coefficient field a. Extending the work of the first author, Fehrman, and Otto [Ann. Appl. Probab. 28 (2018), no. 3, 1379-1422], who established the large-scale C1,α regularity of a-harmonic functions in a degenerate situation, we provide stretched exponential moments for the minimal radius r* describing the minimal scale for this C1,α regularity. As an application to stochastic homogenization, we partially generalize results by Gloria, Neukamm, and Otto [Anal. PDE 14 (2021), no. 8, 2497-2537] on the growth of the corrector, the decay of its gradient, and a quantitative two-scale expansion to the degenerate setting. On a technical level, we demand the ensemble of coefficient fields to be stationary and subject to a spectral gap inequality, and we impose moment bounds on a and a-1. We also introduce the ellipticity radius re which encodes the minimal scale where these moments are close to their positive expectation value.