English

Statistical inference on random dot product graphs: a survey

Methodology 2018-02-05 v1 Statistics Theory Machine Learning Statistics Theory

Abstract

The random dot product graph (RDPG) is an independent-edge random graph that is analytically tractable and, simultaneously, either encompasses or can successfully approximate a wide range of random graphs, from relatively simple stochastic block models to complex latent position graphs. In this survey paper, we describe a comprehensive paradigm for statistical inference on random dot product graphs, a paradigm centered on spectral embeddings of adjacency and Laplacian matrices. We examine the analogues, in graph inference, of several canonical tenets of classical Euclidean inference: in particular, we summarize a body of existing results on the consistency and asymptotic normality of the adjacency and Laplacian spectral embeddings, and the role these spectral embeddings can play in the construction of single- and multi-sample hypothesis tests for graph data. We investigate several real-world applications, including community detection and classification in large social networks and the determination of functional and biologically relevant network properties from an exploratory data analysis of the Drosophila connectome. We outline requisite background and current open problems in spectral graph inference.

Keywords

Cite

@article{arxiv.1709.05454,
  title  = {Statistical inference on random dot product graphs: a survey},
  author = {Avanti Athreya and Donniell E. Fishkind and Keith Levin and Vince Lyzinski and Youngser Park and Yichen Qin and Daniel L. Sussman and Minh Tang and Joshua T. Vogelstein and Carey E. Priebe},
  journal= {arXiv preprint arXiv:1709.05454},
  year   = {2018}
}

Comments

An expository survey paper on a comprehensive paradigm for inference for random dot product graphs, centered on graph adjacency and Laplacian spectral embeddings. Paper outlines requisite background; summarizes theory, methodology, and applications from previous and ongoing work; and closes with a discussion of several open problems

R2 v1 2026-06-22T21:45:08.159Z