Nonlinear Barab\'asi-Albert Network
摘要
In recent years there has been considerable interest in the structure and dynamics of complex networks. One of the most studied networks is the linear Barab\'asi-Albert model. Here we investigate the nonlinear Barab\'asi-Albert growing network. In this model, a new node connects to a vertex of degree with a probability proportional to ( real). Each vertex adds new edges to the network. We derive an analytic expression for the degree distribution which is valid for all values of and . In the limit the network is homogeneous. If there is a gel phase with super-connected nodes. It is proposed a formula for the clustering coefficient which is in good agreement with numerical simulations. The assortativity coefficient is determined and it is shown that the nonlinear Barab\'asi-Albert network is assortative (disassortative) if () and no assortative only when . In the limit the assortativity coefficient can be exactly calculated. We find when . Finally, the minimum average shortest path length is numerically evaluated. Increasing the network size, diverges for and it is equal to 1 when .
关键词
引用
@article{arxiv.cond-mat/0402315,
title = {Nonlinear Barab\'asi-Albert Network},
author = {R. N. Onody and P. A. de Castro},
journal= {arXiv preprint arXiv:cond-mat/0402315},
year = {2009}
}
备注
LATEX file, 7 pages, 5 ps figures, to appear in Physica A