Scaling limit of the complex mobility matrix for the random conductance model on TdN
Abstract
We consider a continuous-time random walk on the d-dimensional torus TdN=Zd/N Zd, possibly with long-range, but finite, jumps. The law of the jumps is regulated by a random environment yielding a stationary and ergodic field of random conductances. The complex mobility matrix σN(ω) measures the linear response of the random walk to a (ω t)-type oscillating external field. By investigating the homogenization properties of the medium, and assuming in addition that the conductances have finite second moment, we show that, for almost every realization of the environment , the complex mobility matrix σN(ω) converges as N+∞ to a deterministic limiting matrix σ(ω) and provide different characterizations of σ(ω).
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