Quenched invariance principles for the random conductance model on a random graph with degenerate ergodic weights

Abstract

We consider a stationary and ergodic random field \ω(e) : e ∈ Ed\ that is parameterized by the edge set of the Euclidean lattice Zd, d ≥ 2. The random variable ω(e), taking values in [0, ∞) and satisfying certain moment bounds, is thought of as the conductance of the edge e. Assuming that the set of edges with positive conductances give rise to a unique infinite cluster C∞(ω), we prove a quenched invariance principle for the continuous-time random walk among random conductances under relatively mild conditions on the structure of the infinite cluster. An essential ingredient of our proof is a new anchored relative isoperimetric inequality.