English

Average distance in growing trees

Statistical Mechanics 2007-05-23 v1 Disordered Systems and Neural Networks

Abstract

Two kinds of evolving trees are considered here: the exponential trees, where subsequent nodes are linked to old nodes without any preference, and the Barab\'asi--Albert scale-free networks, where the probability of linking to a node is proportional to the number of its pre-existing links. In both cases, new nodes are linked to m=1m=1 nodes. Average node-node distance dd is calculated numerically in evolving trees as dependent on the number of nodes NN. The results for NN not less than a thousand are averaged over a thousand of growing trees. The results on the mean node-node distance dd for large NN can be approximated by d=2ln(N)+c1d=2\ln(N)+c_1 for the exponential trees, and d=ln(N)+c2d=\ln(N)+c_2 for the scale-free trees, where the cic_i are constant. We derive also iterative equations for dd and its dispersion for the exponential trees. The simulation and the analytical approach give the same results.

Cite

@article{arxiv.cond-mat/0304636,
  title  = {Average distance in growing trees},
  author = {K. Malarz and J. Czaplicki and B. Kawecka-Magiera and K. Kulakowski},
  journal= {arXiv preprint arXiv:cond-mat/0304636},
  year   = {2007}
}

Comments

6 pages, 3 figures, Int. J. Mod. Phys. C14 (2003) - in print