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Renormalization group analysis of the small-world network model

✍ Scribed by M.E.J. Newman; D.J. Watts

Publisher
Elsevier Science
Year
1999
Tongue
English
Weight
102 KB
Volume
263
Category
Article
ISSN
0375-9601

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✦ Synopsis

We study the small-world network model, which mimics the transition between regular-lattice and random-lattice behavior in social networks of increasing size. We contend that the model displays a critical point with a divergent characteristic length as the degree of randomness tends to zero. We propose a real-space renormalization group transformation for the model and demonstrate that the transformation is exact in the limit of large system size. We use this result to calculate the exact value of the single critical exponent for the system, and to derive the scaling form for the average number of 'degrees of separation' between two nodes on the network as a function of the three independent variables. We confirm our results by extensive numerical simulation.

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The critical properties of the d-dimensional Blume-Capel model is studied by using the mean field renormalization group method. The phase diagram and tricritical behaviour of the square lattice and various three-dimensional lattices have been analysed. Results are compared with those of high-tempera