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DY: Dynamik und Statistische Physik
DY 12: Statistical Physics of Complex Networks II
DY 12.1: Vortrag
Montag, 27. März 2006, 11:00–11:15, H\"UL 186
Universal dependence of inter-node distances in complex networks — •Janusz A. Hołyst, Julian Sienkiewicz, Agata Fronczak, Piotr Fronczak, and Krzysztof Suchecki — Faculty of Physics, Warsaw University of Technology, Koszykowa 75, 00-662 Warszawa, Poland
We observe a universal scaling of internode distances in Erdős-Rényi random graphs, scale-free Barabási-Albert models, science collaboration networks, biological networks, Internet Autonomous Systems and public transport networks. The average shortest distance between two nodes of degrees ki and kj is equal to ⟨ lij⟩=A−Blog(ki kj). The scaling holds over several decades. We present a simple theory for the appearance of this scaling where parameters A and B depend on the mean value of a node degree ⟨ k ⟩nn calculated for the nearest neighbors and on network clustering coefficients. Corrections due to node degree-degree correlations are taken into account.