Self-organized Model for Modular Complex Networks : Division and Independence
Abstract
We introduce a minimal network model which generates a modular structure in a self-organized way. To this end, we modify the Barabasi-Albert model into the one evolving under the principle of division and independence as well as growth and preferential attachment (PA). A newly added vertex chooses one of the modules composed of existing vertices, and attaches edges to vertices belonging to that module following the PA rule. When the module size reaches a proper size, the module is divided into two, and a new module is created. The karate club network studied by Zachary is a prototypical example. We find that the model can reproduce successfully the behavior of the hierarchical clustering coefficient of a vertex with degree k, C(k), in good agreement with empirical measurements of real world networks.
Keywords
Cite
@article{arxiv.cond-mat/0310233,
title = {Self-organized Model for Modular Complex Networks : Division and Independence},
author = {D. -H. Kim and G. J. Rodgers and B. Kahng and D. Kim},
journal= {arXiv preprint arXiv:cond-mat/0310233},
year = {2007}
}
Comments
4 pages, 5 figures