Percolation in the vacant set of Poisson cylinders

Abstract

We consider a Poisson point process on the space of lines in Rd, where a multiplicative factor u>0 of the intensity measure determines the density of lines. Each line in the process is taken as the axis of a bi-infinite cylinder of radius 1. We investigate percolative properties of the vacant set, defined as the subset of Rd that is not covered by any such cylinder. We show that in dimensions d >= 4, there is a critical value u*(d) ∈ (0,∞), such that with probability 1, the vacant set has an unbounded component if u<u*(d), and only bounded components if u>u*(d). For d=3, we prove that the vacant set does not percolate for large u and that the vacant set intersected with a two-dimensional subspace of Rd does not even percolate for small u>0.