Numerical evaluation of the upper critical dimension of percolation in   scale-free networks

Zhenhua Wu; Cecilia Lagorio; Lidia A. Braunstein; Reuven Cohen; Shlomo; Havlin; H. Eugene Stanley

arXiv:0705.1547·cond-mat.dis-nn·October 8, 2007

Numerical evaluation of the upper critical dimension of percolation in scale-free networks

Zhenhua Wu, Cecilia Lagorio, Lidia A. Braunstein, Reuven Cohen, Shlomo, Havlin, H. Eugene Stanley

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Abstract

We propose a numerical method to evaluate the upper critical dimension $d_{c}$ of random percolation clusters in Erd\H{o}s-R\'{e}nyi networks and in scale-free networks with degree distribution $P (k) \sim k^{- λ}$ , where $k$ is the degree of a node and $λ$ is the broadness of the degree distribution. Our results report the theoretical prediction, $d_{c} = 2 (λ - 1) / (λ - 3)$ for scale-free networks with $3 < λ < 4$ and $d_{c} = 6$ for Erd\H{o}s-R\'{e}nyi networks and scale-free networks with $λ > 4$ . When the removal of nodes is not random but targeted on removing the highest degree nodes we obtain $d_{c} = 6$ for all $λ > 2$ . Our method also yields a better numerical evaluation of the critical percolation threshold, $p_{c}$ , for scale-free networks. Our results suggest that the finite size effects increases when $λ$ approaches 3 from above.

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