Quantitative stochastic homogenization for long-range random walks with critical jump index

Abstract

In this paper, we study the stochastic homogenization for a class of symmetric random walks in random conductance model, whose one-step transition probability from x to y is proportional to |x-y|-d-2. As the associated jumping kernel fails to be L2-integrable yet admits a finite α-th moment for all α∈ (0,2), we refer to the corresponding process (Xt)t0 as a long-range random walk with critical jump index. In this critical regime, the scaled process (k-1Xk2( k)-1t)t 0, whose scaling order is different from the diffusive scaling and the α-stable scaling, converges to a Brownian motion. Besides characterizing the limiting Brownian motion, we will give a convergence rate for associated scaled resolvents, which obeys the order ( k)-12+12(d-2)+ with any >0 for all d>3.