English

Core-periphery organization of complex networks

Physics and Society 2007-05-23 v1

Abstract

Networks may, or may not, be wired to have a core that is both itself densely connected and central in terms of graph distance. In this study we propose a coefficient to measure if the network has such a clear-cut core-periphery dichotomy. We measure this coefficient for a number of real-world and model networks and find that different classes of networks have their characteristic values. For example do geographical networks have a strong core-periphery structure, while the core-periphery structure of social networks (despite their positive degree-degree correlations) is rather weak. We proceed to study radial statistics of the core, i.e. properties of the n-neighborhoods of the core vertices for increasing n. We find that almost all networks have unexpectedly many edges within n-neighborhoods at a certain distance from the core suggesting an effective radius for non-trivial network processes.

Keywords

Cite

@article{arxiv.physics/0506035,
  title  = {Core-periphery organization of complex networks},
  author = {Petter Holme},
  journal= {arXiv preprint arXiv:physics/0506035},
  year   = {2007}
}