Stochastic Block Models and Reconstruction
Abstract
The planted partition model (also known as the stochastic blockmodel) is a classical cluster-exhibiting random graph model that has been extensively studied in statistics, physics, and computer science. In its simplest form, the planted partition model is a model for random graphs on nodes with two equal-sized clusters, with an between-class edge probability of and a within-class edge probability of . Although most of the literature on this model has focused on the case of increasing degrees (ie.\ as ), the sparse case is interesting both from a mathematical and an applied point of view. A striking conjecture of Decelle, Krzkala, Moore and Zdeborov\'a based on deep, non-rigorous ideas from statistical physics gave a precise prediction for the algorithmic threshold of clustering in the sparse planted partition model. In particular, if and , then Decelle et al.\ conjectured that it is possible to cluster in a way correlated with the true partition if , and impossible if . By comparison, the best-known rigorous result is that of Coja-Oghlan, who showed that clustering is possible if for some sufficiently large . We prove half of their prediction, showing that it is indeed impossible to cluster if . Furthermore we show that it is impossible even to estimate the model parameters from the graph when ; on the other hand, we provide a simple and efficient algorithm for estimating and when . Following Decelle et al, our work establishes a rigorous connection between the clustering problem, spin-glass models on the Bethe lattice and the so called reconstruction problem. This connection points to fascinating applications and open problems.
Cite
@article{arxiv.1202.1499,
title = {Stochastic Block Models and Reconstruction},
author = {Elchanan Mossel and Joe Neeman and Allan Sly},
journal= {arXiv preprint arXiv:1202.1499},
year = {2012}
}