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arxiv: 1910.04320 · v2 · pith:TOF6GVEZnew · submitted 2019-10-10 · 🧮 math.PR · cs.DS

Exact Recovery of Community Detection in k-partite Graph Models

classification 🧮 math.PR cs.DS
keywords communitiesadjacencygaussiannumbersigmaverticesweightedclassification
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We study the vertex classification problem on a graph whose vertices are in $k\ (k\geq 2)$ different communities, edges are only allowed between distinct communities, and the number of vertices in different communities are not necessarily equal. The observation is a weighted adjacency matrix, perturbed by a scalar multiple of the Gaussian Orthogonal Ensemble (GOE), or Gaussian Unitary Ensemble (GUE) matrix. For the exact recovery of the maximum likelihood estimation (MLE) with various weighted adjacency matrices, we prove sharp thresholds of the intensity $\sigma$ of the Gaussian perturbation. These weighted adjacency matrices may be considered as natural models for the electric network. Surprisingly, these thresholds of $\sigma$ do not depend on whether the sample space for MLE is restricted to such classifications that the number of vertices in each group is equal to the true value. In contrast to the $\ZZ_2$-synchronization, a new complex version of the semi-definite programming (SDP) is designed to efficiently implement the community detection problem when the number of communities $k$ is greater than 2, and a common region (independent of $k$) for $\sigma$ such that SDP exactly recovers the true classification is obtained.

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Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Exact Recovery of Community Detection in dependent Gaussian Mixture Models

    math.ST 2022-09 unverdicted novelty 7.0

    Sufficient conditions and sharp thresholds are given for exact recovery via MLE in dependent Gaussian mixture models for community detection, including singular covariances.