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复杂系统与复杂性科学  2014, Vol. 11 Issue (1): 5-11    DOI: 10.13306/j.1672-3813.2014.01.002
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复杂网络和量子动力系统谱特性的比较研究
叶宾a, 许帅a, 王雪松a, 仇亮b
中国矿业大学a.信息与电气工程学院; b.理学院,江苏 徐州 221116
Comparative Study of Spectral Properties Between Complex Networks and Quantum Dynamical Systems
YE Bina, XU Shuaia, WANG Xue-songa, QIU Liangb
a. School of Information and Electrical Engineering; b. College of Science, China University of Mining and Technology, Xuzhu 221116, China
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摘要 将复杂网络的邻接矩阵映射为量子系统的哈密顿量,使用随机矩阵理论对该哈密顿量的谱特性进行统计分析。针对谱的最近邻能级间隔分布、数目方差和形状因子等特征量的数值分析表明,当小世界网络模型中重连概率很小时,对应哈密顿量的能谱统计与经典可积量子系统的能谱特性一致;当重连概率大于某一阈值时,其能谱特性与随机矩阵理论中高斯正交系综的能谱特性类似。无标度网络的能谱最近邻能级间隔分布和形状因子也表现出与高斯正交系综能谱类似的特性。研究结果显示出复杂网络的空间拓扑结构转变和量子动力系统的时间演化特性之间具有一定的对应性。
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叶宾
许帅
王雪松
仇亮
关键词 复杂网络量子动力系统谱分析随机矩阵理论    
Abstract:By mapping the adjacency matrix of a complex network to Hamiltonian of a quantum system, the statistical properties of the spectra and eigenstates are analyzed. The spectral statistics, i.e. the nearest-neighbor spacing distribution, the number variance and the spectral form factor, are analyzed numerically. The results show that when the rewiring probability of small-world network model is lower, the spectral properties are consistent with those of quantum integrable systems. When the rewiring probability is higher than a certain threshold, its energy spectrum properties are similar to those of the Gaussian orthogonal ensembles in random matrix theory. These results hint that certain analogies may exist between the spatial topology of complex networks and the temporal evolution properties of quantum dynamical systems.
Key wordscomplex network    quantum dynamical system    spectral analysis    random matrix theory
收稿日期: 2013-04-25      出版日期: 2026-06-22
基金资助:国家自然科学基金(61104039);霍英东教育基金会青年教师基金(121066);国家留学基金和中央高校基本科研业务费专项资金(2012QNB31)
作者简介: 叶宾(1980-),男,河南南阳人,博士,副教授,主要研究方向为复杂量子系统和非线性系统控制等。
引用本文:   
叶宾, 许帅, 王雪松, 仇亮. 复杂网络和量子动力系统谱特性的比较研究[J]. 复杂系统与复杂性科学, 2014, 11(1): 5-11.
YE Bin, XU Shuai, WANG Xue-song, QIU Liang. Comparative Study of Spectral Properties Between Complex Networks and Quantum Dynamical Systems[J]. Complex Systems and Complexity Science, 2014, 11(1): 5-11.
链接本文:  
https://fzkx.qdu.edu.cn/CN/10.13306/j.1672-3813.2014.01.002      或      https://fzkx.qdu.edu.cn/CN/Y2014/V11/I1/5
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