English

Random Networks, Graphical Models, and Exchangeability

Statistics Theory 2017-11-22 v2 Statistics Theory

Abstract

We study conditional independence relationships for random networks and their interplay with exchangeability. We show that, for finitely exchangeable network models, the empirical subgraph densities are maximum likelihood estimates of their theoretical counterparts. We then characterize all possible Markov structures for finitely exchangeable random graphs, thereby identifying a new class of Markov network models corresponding to bidirected Kneser graphs. In particular, we demonstrate that the fundamental property of dissociatedness corresponds to a Markov property for exchangeable networks described by bidirected line graphs. Finally we study those exchangeable models that are also summarized in the sense that the probability of a network only depends onthe degree distribution, and identify a class of models that is dual to the Markov graphs of Frank and Strauss (1986). Particular emphasis is placed on studying consistency properties of network models under the process of forming subnetworks and we show that the only consistent systems of Markov properties correspond to the empty graph, the bidirected line graph of the complete graph, and the complete graph.

Keywords

Cite

@article{arxiv.1701.08420,
  title  = {Random Networks, Graphical Models, and Exchangeability},
  author = {Steffen Lauritzen and Alessandro Rinaldo and Kayvan Sadeghi},
  journal= {arXiv preprint arXiv:1701.08420},
  year   = {2017}
}

Comments

To appear in JRSSB

R2 v1 2026-06-22T18:03:28.202Z