Infinitely exchangeable random graphs generated from a Poisson point process on monotone sets and applications to cluster analysis for networks

Abstract

We construct an infinitely exchangeable process on the set of subsets of the power set of the natural numbers N via a Poisson point process with mean measure on the power set of N. Each E∈ has a least monotone cover in , the collection of monotone subsets of , and every monotone subset maps to an undirected graph G∈, the space of undirected graphs with vertex set N. We show a natural mapping →→ which induces an infinitely exchangeable measure on the projective system of graphs under permutation and restriction mappings given an infinitely exchangeable family of measures on the projective system of subsets with permutation and restriction maps. We show potential connections of this process to applications in cluster analysis, machine learning, classification and Bayesian inference.