二部图
中心性
特征向量
群落结构
拉普拉斯矩阵
最大化
集团渗流法
模块化(生物学)
理论计算机科学
度量(数据仓库)
计算机科学
拉普拉斯算子
复杂网络
图形
网络科学
邻接矩阵
数学
组合数学
数学优化
数据挖掘
数学分析
物理
生物
量子力学
遗传学
出处
期刊:Physical Review E
[American Physical Society]
日期:2006-09-11
卷期号:74 (3): 036104-036104
被引量:4900
标识
DOI:10.1103/physreve.74.036104
摘要
We consider the problem of detecting communities or modules in networks, groups of vertices with a higher-than-average density of edges connecting them. Previous work indicates that a robust approach to this problem is the maximization of the benefit function known as "modularity" over possible divisions of a network. Here we show that this maximization process can be written in terms of the eigenspectrum of a matrix we call the modularity matrix, which plays a role in community detection similar to that played by the graph Laplacian in graph partitioning calculations. This result leads us to a number of possible algorithms for detecting community structure, as well as several other results, including a spectral measure of bipartite structure in networks and a centrality measure that identifies vertices that occupy central positions within the communities to which they belong. The algorithms and measures proposed are illustrated with applications to a variety of real-world complex networks.
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