中文

A Fractal Space-filling Complex Network

统计力学 2007-05-23 v1

摘要

We study in this work the properties of the QmfQ_{mf} network which is constructed from an anisotropic partition of the square, the multifractal tiling. This tiling is build using a single parameter ρ\rho, in the limit of ρ1\rho \to 1 the tiling degenerates into the square lattice that is associated with a regular network. The QmfQ_{mf} network is a space-filling network with the following characteristics: it shows a power-law distribution of connectivity for k>7k>7 and it has an high clustering coefficient when compared with a random network associated. In addition the QmfQ_{mf} network satisfy the relation NdfN \propto \ell^{d_f} where \ell is a typical length of the network (the average minimal distance) and NN the network size. We call dfd_f the fractal dimension of the network. In tne limit case ρ1\rho \to 1 we have df2d_{f} \to 2.

关键词

引用

@article{arxiv.cond-mat/0508359,
  title  = {A Fractal Space-filling Complex Network},
  author = {D. J. B. Soares and J. Ribeiro Filho and A. A. Moreira and D. A. Moreira and G. Corso},
  journal= {arXiv preprint arXiv:cond-mat/0508359},
  year   = {2007}
}

备注

10 pages, 5 figures and 1 table