1. Study on the phase transition of the fractal scale-free networks.
- Author
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Qing-Kuan Meng, Dong-Tai Feng, Yu-Ping Sun, Ai-Ping Zhou, Yan Sun, Shu-Gang Tan, and Xu-Tuan Gao
- Subjects
PHASE transitions ,ISING model ,LOOPS (Group theory) ,FRACTAL dimensions ,FRACTALS - Abstract
Based on the Ising spin, the phase transition on fractal scale-free networks with tree-like skeletons is studied, where the loops are generated by local links. The degree distribution of the tree-like skeleton satisfies the power-law form . It is found that when , the renormalized scale-free network will have the same degree distribution as the original network. For a special case of δ = 4.5, a ferromagnetic to paramagnetic transition is found and the critical temperature is determined by the box-covering renormalization method. By keeping the structure of the fractal scale-free network constant, the numerical relationship between the critical temperature and the network size is found, which is the form of power law. [ABSTRACT FROM AUTHOR]
- Published
- 2018
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