Projected Tensor Power Method for Hypergraph Community Recovery
Abstract
This paper investigates the problem of exact community recovery in the symmetric -uniform hypergraph stochastic block model (-HSBM). In this model, a -uniform hypergraph with nodes is generated by first partitioning the nodes into equal-sized disjoint communities and then generating hyperedges with a probability that depends on the community memberships of nodes. Despite the non-convex and discrete nature of the maximum likelihood estimation problem, we develop a simple yet efficient iterative method, called the \emph{projected tensor power method}, to tackle it. As long as the initialization satisfies a partial recovery condition in the logarithmic degree regime of the problem, we show that our proposed method can exactly recover the hidden community structure down to the information-theoretic limit with high probability. Moreover, our proposed method exhibits a competitive time complexity of when the aforementioned initialization condition is met. We also conduct numerical experiments to validate our theoretical findings.
Keywords
Cite
@article{arxiv.2307.00210,
title = {Projected Tensor Power Method for Hypergraph Community Recovery},
author = {Jinxin Wang and Yuen-Man Pun and Xiaolu Wang and Peng Wang and Anthony Man-Cho So},
journal= {arXiv preprint arXiv:2307.00210},
year = {2023}
}