Quantitative stochastic homogenization for random conductance models with stable-like jumps

Abstract

We consider random conductance models with long range jumps on d, where the one-step transition probability from x to y is proportional to wx,y|x-y|-d-α with α∈ (0,2). Assume that \wx,y\(x,y)∈ E are independent, identically distributed and uniformly bounded non-negative random variables with wx,y=1, where E is the set of all unordered pairs on d. We obtain a quantitative version of stochastic homogenization for these random walks, with explicit polynomial rates up to logarithmic corrections.