Strong local uniqueness for the vacant set of random interlacements

Abstract

We consider the the vacant set Vu of random interlacements on Zd in dimensions d 3. For varying intensity u > 0, the connectivity properties of Vu undergo a percolation phase transition across a critical parameter u* ∈ (0,∞). In this article, we prove that this phase transition is sharp in the supercritical phase u < u*. This follows from a certain strong local uniqueness property (SLU) introduced in the present work, which we prove Vu satisfies. In itself, this property furnishes the missing ingredient needed to deduce a number of desirable quenched results characterizing the large-scale geometry of the infinite cluster. Moreover, SLU entails a sought-after local and monotone criterion amenable to renormalization arguments below u*.

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