中文

Degree-dependent intervertex separation in complex networks

统计力学 2015-06-24 v2

摘要

We study the mean length (k)\ell(k) of the shortest paths between a vertex of degree kk and other vertices in growing networks, where correlations are essential. In a number of deterministic scale-free networks we observe a power-law correction to a logarithmic dependence, (k)=Aln[N/k(γ1)/2]Ckγ1/N+...\ell(k) = A\ln [N/k^{(\gamma-1)/2}] - C k^{\gamma-1}/N + ... in a wide range of network sizes. Here NN is the number of vertices in the network, γ\gamma is the degree distribution exponent, and the coefficients AA and CC depend on a network. We compare this law with a corresponding (k)\ell(k) dependence obtained for random scale-free networks growing through the preferential attachment mechanism. In stochastic and deterministic growing trees with an exponential degree distribution, we observe a linear dependence on degree, (k)AlnNCk\ell(k) \cong A\ln N - C k. We compare our findings for growing networks with those for uncorrelated graphs.

关键词

引用

@article{arxiv.cond-mat/0411526,
  title  = {Degree-dependent intervertex separation in complex networks},
  author = {S. N. Dorogovtsev and J. F. F. Mendes and J. G. Oliveira},
  journal= {arXiv preprint arXiv:cond-mat/0411526},
  year   = {2015}
}

备注

8 pages, 3 figures