基于MMSE矩阵的社区检测几何

G. Reeves, Vaishakhi Mayya, A. Volfovsky
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引用次数: 13

摘要

对于具有高度对称性或同质性的网络模型,社区检测的信息论极限已经得到了广泛的研究。本文的贡献在于研究了更广泛的网络模型,这些模型允许不同社区的规模和行为的可变性,从而更好地反映了在现实世界网络中观察到的行为。我们的研究结果表明,检测群体的能力可以用有效信噪比矩阵来简洁地描述,该矩阵提供了不同群体之间关系的几何表示。这种表征遵循I-MMSE关系的矩阵版本,并推广了之前工作中引入的有效标量信噪比的概念。我们给出了渐近每节点互信息和最小均方误差上界的显式公式。理论结果得到了数值模拟的支持。
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The Geometry of Community Detection via the MMSE Matrix
The information-theoretic limits of community detection have been studied extensively for network models with high levels of symmetry or homogeneity. The contribution of this paper is to study a broader class of network models that allow for variability in the sizes and behaviors of the different communities, and thus better reflect the behaviors observed in real-world networks. Our results show that the ability to detect communities can be described succinctly in terms of a matrix of effective signal-to-noise ratios that provides a geometrical representation of the relationships between the different communities. This characterization follows from a matrix version of the I-MMSE relationship and generalizes the concept of an effective scalar signal-to-noise ratio introduced in previous work. We provide explicit formulas for the asymptotic per-node mutual information and upper bounds on the minimum mean-squared error. The theoretical results are supported by numerical simulations.
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