On Chemical Distance and Local Uniqueness of a Sufficiently Supercritical Finitary Random Interlacement

Abstract

In this paper, we study geometric properties of the unique infinite cluster in a sufficiently supercritical Finitary Random Interlacements FIu,T in Zd, \ d 3. We prove that the chemical distance in is, with stretched exponentially high probability, of the same order as the Euclidean distance in Zd. This also implies a shape theorem parallel to those for Bernoulli percolation and random interlacements. We also prove local uniqueness of FIu,T, which says any two large clusters in FIu,T "close to each other" will with stretched exponentially high probability be connected to each other within the same order of the distance between them.