Quantitative homogenization for the critical long-range random conductance model

Abstract

We consider the long-range random conductance model on Zd at the critical exponent: the jump rate between sites x and y decays as a(x,y) |x-y|-(d+2), where a(x,y) are i.i.d. uniformly elliptic conductances. Below the critical exponent (d+2) the walk converges to a stable process; above it, to Brownian motion with diffusive t scaling. At criticality the second moment of the jump kernel diverges logarithmically. We establish quantitative homogenization of the associated elliptic equation to the Laplacian at the rate 1/||. As a consequence, we deduce quenched convergence of the random walk to Brownian motion under the anomalous t t scaling. Unlike in standard homogenization, the effective diffusivity is determined by the mean conductance alone, with no corrector contribution at leading order.