Graph distances of continuum long-range percolation
Abstract
We consider a version of continuum long-range percolation on finite boxes of Rd in which the vertex set is given by the points of a Poisson point process and each pair of two vertices at distance r is connected with probability proportional to r-s for a certain constant s. We explore the graph-theoretical distance in this model. The aim of this paper is to show that this random graph model undergoes phase transitions at values s=d and s=2d in analogy to classical long-range percolation on Zd, by using techniques which are based on an analysis of the underlying Poisson point process.
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