Boundary estimates and Green function's expansion for elliptic systems with random coefficients

Abstract: Focused on elliptic operators with stationary random coefficients of integrable correlations, stemming from stochastic homogenization theory, this paper primarily aims to investigate boundary estimates. As practical applications, we establish decay estimates for Green functions in both the quenched and annealed senses, as well as, some useful annealed estimates (including CLT-scaling) for boundary correctors. By extending Bella-Giunti-Otto's lemma in \cite{Bella-Giunti-Otto17} (to the version with a boundary condition), we ultimately obtain an error estimate for two-scale expansions of Green functions at mixed derivatives level, and thereby build connections to other interesting fields.