Asymptotic adaptive threshold for connectivity in a random geometric social network

Abstract

Consider a dynamic random geometric social network identified by st independent points xt1,…,xtst in the unit square [0,1]2 that interact in continuous time t≥ 0. The generative model of the random points is a Poisson point measures. Each point xti can be active or not in the network with a Bernoulli probability p. Each pair being connected by affinity thanks to a step connection function if the interpoint distance \|xti-xtj\|≤ af for any i≠ j. We prove that when af=(st)l-1pπ for l∈(0,1), the number of isolated points is governed by a Poisson approximation as st∞. This offers a natural threshold for the construction of a af-neighborhood procedure tailored to the dynamic clustering of the network adaptively from the data.