Random pseudofractal scale-free networks with small-world effect

L. Wang; F. Du; H. P. Dai; Y. X. Sun

doi:10.1140/epjb/e2006-00389-0

Random pseudofractal scale-free networks with small-world effect

L. Wang^*
, F. Du
, H. P. Dai
, Y. X. Sun

^*Corresponding author for this work

Zhejiang University

Research output: Contribution to journal › Article › peer-review

23 Scopus citations

Abstract

A random pseudofractal network (RPN) is generated by a recursive growing rule. The RPN is of the scale-free feature and small-world effect. We obtain the theoretical results of power-law exponent γ=3, clustering coefficient C=3π²-19≈ 0.74, and a proof that the mean distance increases no faster than ln N, where N is the network size. These results agree with the numerical simulation very well. In particular, we explain the property of growth and preferential attachment in RPNs. And the properties of a class of general RPNs are discussed in the end.

Original language	English
Pages (from-to)	361-366
Number of pages	6
Journal	European Physical Journal B
Volume	53
Issue number	3
DOIs	https://doi.org/10.1140/epjb/e2006-00389-0
State	Published - Oct 2006
Externally published	Yes

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title = "Random pseudofractal scale-free networks with small-world effect",

abstract = "A random pseudofractal network (RPN) is generated by a recursive growing rule. The RPN is of the scale-free feature and small-world effect. We obtain the theoretical results of power-law exponent γ=3, clustering coefficient C=3π2-19≈ 0.74, and a proof that the mean distance increases no faster than ln N, where N is the network size. These results agree with the numerical simulation very well. In particular, we explain the property of growth and preferential attachment in RPNs. And the properties of a class of general RPNs are discussed in the end.",

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AU - Dai, H. P.

AU - Sun, Y. X.

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AB - A random pseudofractal network (RPN) is generated by a recursive growing rule. The RPN is of the scale-free feature and small-world effect. We obtain the theoretical results of power-law exponent γ=3, clustering coefficient C=3π2-19≈ 0.74, and a proof that the mean distance increases no faster than ln N, where N is the network size. These results agree with the numerical simulation very well. In particular, we explain the property of growth and preferential attachment in RPNs. And the properties of a class of general RPNs are discussed in the end.

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VL - 53

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JO - European Physical Journal B

JF - European Physical Journal B

IS - 3

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Random pseudofractal scale-free networks with small-world effect

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