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Measuring directed triadic closure with closure coefficients

Hao Yin, Austin R. Benson, Johan Ugander

2020Network Science15 citationsDOIOpen Access PDF

Abstract

Abstract Recent work studying triadic closure in undirected graphs has drawn attention to the distinction between measures that focus on the “center” node of a wedge (i.e., length-2 path) versus measures that focus on the “initiator,” a distinction with considerable consequences. Existing measures in directed graphs, meanwhile, have all been center-focused. In this work, we propose a family of eight directed closure coefficients that measure the frequency of triadic closure in directed graphs from the perspective of the node initiating closure. The eight coefficients correspond to different labeled wedges, where the initiator and center nodes are labeled, and we observe dramatic empirical variation in these coefficients on real-world networks, even in cases when the induced directed triangles are isomorphic. To understand this phenomenon, we examine the theoretical behavior of our closure coefficients under a directed configuration model. Our analysis illustrates an underlying connection between the closure coefficients and moments of the joint in- and out-degree distributions of the network, offering an explanation of the observed asymmetries. We also use our directed closure coefficients as predictors in two machine learning tasks. We find interpretable models with AUC scores above 0.92 in class-balanced binary prediction, substantially outperforming models that use traditional center-focused measures.

Topics & Concepts

Closure (psychology)MathematicsFocus (optics)Node (physics)Directed graphBinary numberClosure problemMeasure (data warehouse)Perspective (graphical)Wedge (geometry)CombinatoricsUndirected graphVariation (astronomy)AlgorithmCalculus (dental)Discrete mathematicsClass (philosophy)Applied mathematicsBinary relationClosure operatorComputer scienceConstant (computer programming)Transitive closureArtificial intelligenceConnection (principal bundle)Base (topology)Advanced Graph Neural NetworksComplex Network Analysis TechniquesMental Health Research Topics
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