Percolative properties of Brownian interlacements and its vacant set
Abstract
In this article we investigate the percolative properties of Brownian interlacements, a model introduced by Alain-Sol Sznitman in arXiv:1209.4531, and show that: the interlacement set is "well-connected", i.e., any two "sausages" in d-dimensional Brownian interlacements, d≥ 3, can be connected via no more than (d-4)/2 intermediate sausages almost surely; while the vacant set undergoes a non-trivial percolation phase transition when the level parameter varies.
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