High-intensity Voronoi percolation on manifolds
Abstract
We study Voronoi percolation on a large class of d-dimensional Riemannian manifolds, which includes the hyperbolic spaces Hd, d≥ 2. We prove that as the intensity λ of the underlying Poisson point process tends to infinity, both critical parameters pc(M,λ) and pu(M,λ) converge to the Euclidean critical parameter pc(Rd). This extends a recent result of Hansen & M\"uller in the special case M=H2 to a general class of manifolds of arbitrary dimension. A crucial step in our proof, which may be of independent interest, is to show that if M is simply connected and one-ended, then embedded graphs induced by a general class of tessellations on M have connected minimal cutsets. In particular, this result applies to -nets, allowing us to implement a "fine-graining" argument.
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