A sharp leading order asymptotic of the diameter of a long range percolation graph
Abstract
Many real-world networks exhibit the so-called small-world phenomenon: their typical distances are much smaller than their sizes. One mathematical model for this phenomenon is a long-range percolation graph on a d-dimensional box \0, 1, ·s, N\d, in which edges are independently added between far-away sites with probability falling off as a power of the Euclidean distance. A natural question is how the resulting diameter of the box of size N, measured in graph-theoretical distance, scales with N. This question has been intensely studied in the past and the answer depends on the exponent s in the connection probabilities. In this work we focus on the critical regime s = d studied earlier in a work by Coppersmith, Gamarnik, and Sviridenko and improve the bounds obtained there to a sharp leading-order asymptotic, by exploiting the high degree of concentration due to the large amount of independence in the model.
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