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高阶网络统计指标综述

刘波 曾钰洁 杨荣湄 吕琳媛

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高阶网络统计指标综述

刘波, 曾钰洁, 杨荣湄, 吕琳媛

Fundamental statistics of higher-order networks: a survey

Liu Bo, Zeng Yu-Jie, Yang Rong-Mei, Lü Lin-Yuan
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  • 复杂网络是描述和理解现实世界中复杂系统的有力工具. 近年来, 为了更准确地描述复杂网络中的交互关系, 或者从高阶视角分析成对交互作用网络, 许多学者开始使用高阶网络进行建模, 并在研究其动力学过程中发现了与成对交互作用网络不同的新现象. 然而, 与成对交互作用网络相比, 高阶网络的研究相对较少; 而且, 高阶网络结构相对复杂, 基于结构的统计指标定义较为分散且形式不统一, 这些都给描述高阶网络的拓扑结构特征带来了困难. 鉴于此, 本文综述了两种最常见的高阶网络——超图和单纯形网络——常用的统计指标及其物理意义. 本文有助于加深对高阶网络的理解, 促进对高阶网络结构特征的定量化研究, 也有助于研究者在此基础上开发更多适用于高阶网络的统计指标.
    Complex networks serve as indispensable instruments for characterizing and understanding intricate real-world systems. Recently, researchers have delved into the realm of higher-order networks, seeking to delineate interactions within these networks with greater precision or analyze traditional pairwise networks from a higher-dimensional perspective. This effort has unearthed some new phenomena different from those observed in the traditional pairwise networks. However, despite the importance of higher-order networks, research in this area is still in its infancy. In addition, the complexity of higher-order interactions and the lack of standardized definitions for structure-based statistical indicators, also pose challenges to the investigation of higher-order networks. In recognition of these challenges, this paper presents a comprehensive survey of commonly employed statistics and their underlying physical significance in two prevalent types of higher-order networks: hypergraphs and simplicial complex networks. This paper not only outlines the specific calculation methods and application scenarios of these statistical indicators, but also provides a glimpse into future research trends. This comprehensive overview serves as a valuable resource for beginners or cross-disciplinary researchers interested in higher-order networks, enabling them to swiftly grasp the fundamental statistics pertaining to these advanced structures. By promoting a deeper understanding of higher-order networks, this paper facilitates quantitative analysis of their structural characteristics and provides guidance for researchers who aim to develop new statistical methods for higher-order networks.
      通信作者: 吕琳媛, linyuan.lv@ustc.edu.cn
    • 基金项目: 科技创新2030-“脑科学与类脑研究”重大项目青年科学家项目(批准号: 2022ZD0211400)、国家自然科学基金重大项目(批准号: T2293771)和四川省杰出青年科学基金(批准号: 2023NSFSC1919)资助的课题.
      Corresponding author: Lü Lin-Yuan, linyuan.lv@ustc.edu.cn
    • Funds: Project supported by the STI 2030-Major Projects (Grant No. 2022ZD0211400), the Major Program of the National Natural Science Foundation of China (Grant No. T2293771), and the Science Fund for Distinguished Young Scholars of Sichuan Provincek, China (Grant No. 2023NSFSC1919).
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  • 图 1  两种不同类型超图的简单示例 (a) 一个拥有11个节点的超图; (b) 一个拥有9个节点的3-均匀超图

    Fig. 1.  A simple example of two different types of hypergraphs: (a) Simple hypergraph with 11 nodes; (b) 3-uniform hypergraph with 9 nodes.

    图 2  单纯形网络相关示意图 (a) 一组时序高阶交互数据; (b) 一个11节点的单纯形网络; (c) 基于图(b)中单纯形网络的骨架网络; (d)一个11节点的团复形网络

    Fig. 2.  Correlation diagrams of the simplicial network: (a) A set of temporal higher-order interaction data; (b) a simplicial network with 11 nodes; (c) a skeleton network based on the simplicial network in Fig. 2(b); (d) a clique complex with 11 nodes.

    图 3  一个3条超边的超图和其对应的加权线图[73] (a) 一个3条超边的超图; (b) 图3(a)对应的加权线图

    Fig. 3.  A hypergraph with 3 hyperedges and its corresponding weighted line graph[73]: (a) A hypergraph with 3 hyperedges; (b) a weighted line graph corresponding to Fig. 3(a).

    图 4  不同情形下两个超节点之间的路径示意图[73]

    Fig. 4.  Diagram of the path between two hypernodes in different cases[73].

    图 5  一个具有5条超边的超图的k-核分解示意图[61]

    Fig. 5.  Diagram of a k-core decomposition of a hypergraph with 5 hyperedges[61].

    表 1  基于超图的统计指标总结

    Table 1.  Summary of statistical indicators of the hypergraph

    指标类型 指标名称
    度相关指标 度、超度、超边度、余平均度
    聚集系数 节点的聚集系数、网络的聚集系数
    距离相关指标 路径长度、超节点之间的距离
    密度相关指标 超边密度、超图密度
    曲率相关指标 Forman-Ricci曲率、Ollivier-Ricci曲率
    中心性指标 度中心性、核心度中心性、接近中心性、
    介数中心性、特征向量中心性
    熵相关指标 超图熵、超图的香农熵、加权超图的超图熵
    下载: 导出CSV

    表 2  基于单纯形网络的统计指标总结

    Table 2.  Summary of statistical indicators of the simplicial network

    指标类型 指标名称
    度相关指标 上邻接度、下邻接度、度、上 p 邻接度、下 p 邻接度、严格上 p 邻接度、严格下 p 邻接度、
    上$(h, p)$邻接度、下$(h, p)$邻接度、p 邻接度、最大 p 邻接度、最大单纯形度
    路径和距离相关指标 $s_k$游走、p 游走、最短路径长度、离心率、直径
    中心性指标 度中心性、特征向量中心性、Katz中心性、接近中心性、介数中心性
    聚集系数 聚集系数
    拓扑不变量 贝蒂数、欧拉示性数
    下载: 导出CSV
    Baidu
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    Marin A, Wellman B 2011 Social network analysis: An introduction (London: SAGE publications) pp11−25

    [2]

    Kossinets G, Watts D J 2006 Science 311 88Google Scholar

    [3]

    Alon U 2003 Science 301 1866Google Scholar

    [4]

    Alm E, Arkin A P 2003 Curr. Opin. Struct. Biol. 13 193Google Scholar

    [5]

    Bose A, Clements K A 1987 Proc. IEEE 75 1607Google Scholar

    [6]

    Wu F F, Varaiya P 1999 Int. J. Electr. Power Energy Syst. 21 75Google Scholar

    [7]

    Williams J C, Mahmassani H S, Herman R 1987 Transp. Res. Rec. 1112 78

    [8]

    Verma T, Araújo N A, Herrmann H J 2014 Sci. Rep. 4 5638Google Scholar

    [9]

    Strogatz S H 2001 Nature 410 268Google Scholar

    [10]

    Boccaletti S, Latora V, Moreno Y, Chavez M, Hwang D U 2006 Phys. Rep. 424 175Google Scholar

    [11]

    Costa L D F, Rodrigues F A, Travieso G, Villas Boas P R 2007 Adv. Phys. 56 167Google Scholar

    [12]

    Barabási A L 2013 Philos. Trans. R. Soc. A: Math. Phys. Eng. Sci. 371 20120375Google Scholar

    [13]

    汪小帆, 李翔, 陈关荣 2012 网络科学导论 (高等教育出版社) 第82页

    Wang X F, Li X, Chen G R 2012 Network Science: An Introduction (Higher Education Press) p82

    [14]

    周涛, 柏文洁, 汪秉宏, 刘之景, 严钢 2005 物理 34 31Google Scholar

    Zhou T, Bai W J, Wang B H, Liu Z J, Yan G 2005 Physics 34 31Google Scholar

    [15]

    Courtney O T, Bianconi G 2017 Phys. Rev. E 95 062301Google Scholar

    [16]

    Lung R I, Gaskó N, Suciu M A 2018 Scientometrics 117 1361Google Scholar

    [17]

    Pearcy N, Crofts J J, Chuzhanova N 2014 Int. J. Biol. Vet. Agric. Food Eng. 8 752

    [18]

    Mastrandrea R, Fournet J, Barrat A 2015 PloS One 10 e0136497Google Scholar

    [19]

    Stehlé J, Voirin N, Barrat A, et al. 2011 PloS One 6 e23176Google Scholar

    [20]

    Battiston F, Cencetti G, Iacopini I, Latora V, Lucas M, Patania A, Young J G, Petri G 2020 Phys. Rep. 874 1Google Scholar

    [21]

    Battiston F, Amico E, Barrat A, et al. 2021 Nat. Phys. 17 1093Google Scholar

    [22]

    Bianconi G 2021 Higher-order Networks (Cambridge: Cambridge University Press) pp7–45

    [23]

    Shi D, Chen G 2022 Natl. Sci. Rev. 9 nwac038Google Scholar

    [24]

    Zhao D, Li R, Peng H, Zhong M, Wang W 2022 Chaos Solit. Fractals 155 111701Google Scholar

    [25]

    Wang W, Li W, Lin T, Wu T, Pan L, Liu Y 2022 Appl. Math. Comput. 420 126793Google Scholar

    [26]

    Millán A P, Torres J J, Bianconi G 2020 Phys. Rev. Lett. 124 218301Google Scholar

    [27]

    Lucas M, Cencetti G, Battiston F 2020 Phys. Rev. Res. 2 033410Google Scholar

    [28]

    Iacopini I, Petri G, Barrat A, Latora V 2019 Nat. Commun. 10 1Google Scholar

    [29]

    Chowdhary S, Kumar A, Cencetti G, Iacopini I, Battiston F 2021 J. Phys.: Complex. 2 035019Google Scholar

    [30]

    陈浩宇, 徐涛, 刘闯, 张子柯, 詹秀秀 2024 73 038901Google Scholar

    Chen H Y, Xu T, Liu C, Zhang Z K, Zhan X X 2024 Acta Phys. Sin. 73 038901Google Scholar

    [31]

    Gómez-Gardenes J, Gómez S, Arenas A, Moreno Y 2011 Phys. Rev. Lett. 106 128701Google Scholar

    [32]

    Kovalenko K, Dai X, Alfaro-Bittner K, Raigorodskii A, Perc M, Boccaletti S 2021 Phys. Rev. Lett. 127 258301Google Scholar

    [33]

    Tanaka T, Aoyagi T 2011 Phys. Rev. Lett. 106 224101Google Scholar

    [34]

    Zhang Y, Latora V, Motter A E 2021 Commun. Phys. 4 195Google Scholar

    [35]

    Kundu S, Ghosh D 2022 Phys. Rev. E 105 L042202Google Scholar

    [36]

    Bick C, Ashwin P, Rodrigues A 2016 Chaos 26 094814Google Scholar

    [37]

    Wang W, Wang Z X, Cai S M 2018 Phys. Rev. E 98 052312Google Scholar

    [38]

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出版历程
  • 收稿日期:  2024-02-17
  • 修回日期:  2024-04-10
  • 上网日期:  2024-05-11
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