Higher-order clustering in networks

April 12, 2017 Β· Declared Dead Β· πŸ› Physical Review E

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Authors Hao Yin, Austin R. Benson, Jure Leskovec arXiv ID 1704.03913 Category cs.SI: Social & Info Networks Cross-listed cond-mat.stat-mech, physics.soc-ph, stat.ML Citations 109 Venue Physical Review E Last Checked 4 months ago
Abstract
A fundamental property of complex networks is the tendency for edges to cluster. The extent of the clustering is typically quantified by the clustering coefficient, which is the probability that a length-2 path is closed, i.e., induces a triangle in the network. However, higher-order cliques beyond triangles are crucial to understanding complex networks, and the clustering behavior with respect to such higher-order network structures is not well understood. Here we introduce higher-order clustering coefficients that measure the closure probability of higher-order network cliques and provide a more comprehensive view of how the edges of complex networks cluster. Our higher-order clustering coefficients are a natural generalization of the traditional clustering coefficient. We derive several properties about higher-order clustering coefficients and analyze them under common random graph models. Finally, we use higher-order clustering coefficients to gain new insights into the structure of real-world networks from several domains.
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