Uniqueness of communities in regular stochastic block models

Abstract

This paper studies the regular stochastic block model comprising several communities: each of the k non-overlapping communities, for k ≥slant 3, possesses n vertices, each of which has total degree d. The values of the intra-cluster degrees (i.e.\ the number of neighbours of a vertex inside the cluster it belongs to) and the inter-cluster degrees (i.e.\ the number of neighbours of a vertex inside a cluster different from its own) are allowed to vary across clusters. We discuss two main results: the first compares the probability measure induced by our model with the uniform measure on the space of d-regular graphs on kn vertices, and the second establishes that the clusters, under rather weak assumptions, are unique asymptotically almost surely as n → ∞.