Large-scale harmonic measures and nontangential maximal functions in periodic homogenization
Abstract
In this paper, we consider the elliptic operators L = -∇· (A(X/) ∇ ) with periodic coefficients in a bounded domain without any local smoothness assumption on A = A(Y), where diam() is a microscopic scale. Due to the irregularity of the coefficients at scale, we introduce the correct forms of the large-scale nontangential maximal functions for the Dirichlet, Neumann and regularity problems that measure the behaviors of solutions at an distance away from the boundary. The Lp estimates uniform in are established for these nontangential maximal functions for the same and optimal ranges of p as the Laplace operator in the Lipschitz or C1 domains. With some additional regularity assumption on the coefficients, the large-scale estimates combined with the small-scale estimates recover the classical full-scale estimates of the nontangential maximal functions. Our proofs are based on the notion of large-scale L-harmonic measures, the periodic structure of operators in the transversal direction to the boundaries, and the homogenization tools, including convergence rates and large-scale regularity.
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