English

Testing Changes in Communities for the Stochastic Block Model

Information Theory 2019-11-01 v3 Machine Learning Social and Information Networks math.IT Statistics Theory Statistics Theory

Abstract

We propose and analyze the problems of \textit{community goodness-of-fit and two-sample testing} for stochastic block models (SBM), where changes arise due to modification in community memberships of nodes. Motivated by practical applications, we consider the challenging sparse regime, where expected node degrees are constant, and the inter-community mean degree (bb) scales proportionally to intra-community mean degree (aa). Prior work has sharply characterized partial or full community recovery in terms of a "signal-to-noise ratio" (SNR\mathrm{SNR}) based on aa and bb. For both problems, we propose computationally-efficient tests that can succeed far beyond the regime where recovery of community membership is even possible. Overall, for large changes, sns \gg \sqrt{n}, we need only SNR=O(1)\mathrm{SNR}= O(1) whereas a na\"ive test based on community recovery with O(s)O(s) errors requires SNR=Θ(logn)\mathrm{SNR}= \Theta(\log n). Conversely, in the small change regime, sns \ll \sqrt{n}, via an information-theoretic lower bound, we show that, surprisingly, no algorithm can do better than the na\"ive algorithm that first estimates the community up to O(s)O(s) errors and then detects changes. We validate these phenomena numerically on SBMs and on real-world datasets as well as Markov Random Fields where we only observe node data rather than the existence of links.

Keywords

Cite

@article{arxiv.1812.00769,
  title  = {Testing Changes in Communities for the Stochastic Block Model},
  author = {Aditya Gangrade and Praveen Venkatesh and Bobak Nazer and Venkatesh Saligrama},
  journal= {arXiv preprint arXiv:1812.00769},
  year   = {2019}
}

Comments

Version 3 includes material on unbalanced but linearly sized communities. This version is to appear in NeurIPS 2019

R2 v1 2026-06-23T06:29:20.906Z