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Modeling Network Populations via Graph Distances

Author

Listed:
  • Simón Lunagómez
  • Sofia C. Olhede
  • Patrick J. Wolfe

Abstract

This article introduces a new class of models for multiple networks. The core idea is to parameterize a distribution on labeled graphs in terms of a Fréchet mean graph (which depends on a user-specified choice of metric or graph distance) and a parameter that controls the concentration of this distribution about its mean. Entropy is the natural parameter for such control, varying from a point mass concentrated on the Fréchet mean itself to a uniform distribution over all graphs on a given vertex set. We provide a hierarchical Bayesian approach for exploiting this construction, along with straightforward strategies for sampling from the resultant posterior distribution. We conclude by demonstrating the efficacy of our approach via simulation studies and two multiple-network data analysis examples: one drawn from systems biology and the other from neuroscience. This article has online supplementary materials.

Suggested Citation

  • Simón Lunagómez & Sofia C. Olhede & Patrick J. Wolfe, 2021. "Modeling Network Populations via Graph Distances," Journal of the American Statistical Association, Taylor & Francis Journals, vol. 116(536), pages 2023-2040, October.
    • Handle: RePEc:taf:jnlasa:v:116:y:2021:i:536:p:2023-2040
    DOI: 10.1080/01621459.2020.1763803
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