Motif based hierarchical random graphs: structural properties and critical points of an Ising model

Motif based hierarchical random graphs: structural properties and critical points of an Ising model

A class of random graphs is introduced and studied. The graphs are constructed in an algorithmic way from five motifs which were found in [Milo R., Shen Orr S., Itzkovitz S., Kashtan N., Chklovskii D., Alon U., Science, 2002, vol. 298, 824 – 827]. The construction scheme resembles that used in [Hinc...

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Bibliographic Details
Main Author: M. Kotorowicz
Format: Article
Language:English
Published: Institute for Condensed Matter Physics 2011-03-01
Series:Condensed Matter Physics
Subjects:
amenability
degree distribution
clustering
small-world graph
Ising model
critical point
Online Access:http://dx.doi.org/10.5488/CMP.14.13801
Description
Summary:A class of random graphs is introduced and studied. The graphs are constructed in an algorithmic way from five motifs which were found in [Milo R., Shen Orr S., Itzkovitz S., Kashtan N., Chklovskii D., Alon U., Science, 2002, vol. 298, 824 – 827]. The construction scheme resembles that used in [Hinczewski M., A. Nihat Berker, Phys. Rev. E, 2006, vol. 73, 066126], according to which the short-range bonds are non-random, whereas the long-range bonds appear independently with the same probability. A number of structural properties of the graphs have been described, among which there are degree distributions, clustering, amenability, small-world property. For one of the motifs, the critical point of the Ising model defined on the corresponding graph has been studied.
ISSN:1607-324X

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