Graph distances in scale-free percolation: the logarithmic case

Abstract

Scale-free percolation is a stochastic model for complex networks. In this spatial random graph model, vertices x,y∈Zd are linked by an edge with probability depending on i.i.d.\ vertex weights and the Euclidean distance |x-y|. Depending on the various parameters involved, we get a rich phase diagram. We study graph distances and compare it to the Euclidean distance of the vertices. Our main attention is on a regime where graph distances are (poly-)logarithmic in the Euclidean distance. We obtain improved bounds on the logarithmic exponents. In the light tail regime, the correct exponent is identified.