Perfect Clustering for Sparse Directed Stochastic Block Models

TL;DR

This paper introduces a novel non-spectral community detection method for sparse directed stochastic block models, achieving exact recovery under mild conditions and outperforming existing spectral approaches in challenging regimes.

Contribution

It proposes a new neighborhood-smoothing based approach with theoretical guarantees for exact community recovery in sparse, directed SBMs with many communities.

Findings

Method achieves exact recovery with high probability.

Performs reliably in highly directed, sparse, non-symmetric networks.

First non-spectral guarantee for this class of models.

Abstract

Exact recovery in stochastic block models (SBMs) is well understood in undirected settings, but remains considerably less developed for directed and sparse networks, particularly when the number of communities diverges. Spectral methods for directed SBMs often lack stability in asymmetric, low-degree regimes, and existing non-spectral approaches focus primarily on undirected or dense settings. We propose a fully non-spectral, two-stage procedure for community detection in sparse directed SBMs with potentially growing numbers of communities. The method first estimates the directed probability matrix using a neighborhood-smoothing scheme tailored to the asymmetric setting, and then applies $K$-means clustering to the estimated rows, thereby avoiding the limitations of eigen- or singular value decompositions in sparse, asymmetric networks. Our main theoretical contribution is a uniform row-wise concentration bound for the smoothed estimator, obtained through new arguments that control asymmetric neighborhoods and separate in- and out-degree effects. These results imply the exact recovery of all community labels with probability tending to one, under mild sparsity and separation conditions that allow both $\gamma_n \to 0$ and $K_n \to \infty$. Simulation studies, including highly directed, sparse, and non-symmetric block structures, demonstrate that the proposed procedure performs reliably in regimes where directed spectral and score-based methods deteriorate. To the best of our knowledge, this provides the first exact recovery guarantee for this class of non-spectral, neighborhood-smoothing methods in the sparse, directed setting.