中文

Self-avoiding walks on scale-free networks

无序系统与神经网络 2009-11-10 v1

摘要

Several kinds of walks on complex networks are currently used to analyze search and navigation in different systems. Many analytical and computational results are known for random walks on such networks. Self-avoiding walks (SAWs) are expected to be more suitable than unrestricted random walks to explore various kinds of real-life networks. Here we study long-range properties of random SAWs on scale-free networks, characterized by a degree distribution P(k)kγP(k) \sim k^{-\gamma}. In the limit of large networks (system size NN \to \infty), the average number sns_n of SAWs starting from a generic site increases as μn\mu^n, with μ=<k2>/<k>1\mu = < k^2 > / < k > - 1. For finite NN, sns_n is reduced due to the presence of loops in the network, which causes the emergence of attrition of the paths. For kinetic growth walks, the average maximum length, <L>< L >, increases as a power of the system size: <L>Nα< L > \sim N^{\alpha}, with an exponent α\alpha increasing as the parameter γ\gamma is raised. We discuss the dependence of α\alpha on the minimum allowed degree in the network. A similar power-law dependence is found for the mean self-intersection length of non-reversal random walks. Simulation results support our approximate analytical calculations.

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引用

@article{arxiv.cond-mat/0412658,
  title  = {Self-avoiding walks on scale-free networks},
  author = {Carlos P. Herrero},
  journal= {arXiv preprint arXiv:cond-mat/0412658},
  year   = {2009}
}

备注

9 pages, 7 figures