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基于Tsallis熵的复杂网络节点重要性评估方法

杨松青 蒋沅 童天驰 严玉为 淦各升

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基于Tsallis熵的复杂网络节点重要性评估方法

杨松青, 蒋沅, 童天驰, 严玉为, 淦各升

A method of evaluating importance of nodes in complex network based on Tsallis entropy

Yang Song-Qing, Jiang Yuan, Tong Tian-Chi, Yan Yu-Wei, Gan Ge-Sheng
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  • 复杂网络中节点重要性的评估是网络特性研究中的一项重要课题, 相关研究具有广泛的应用. 目前提出了许多方法来评估网络中节点的重要性, 然而大多数方法都存在评估角度片面或者时间复杂度过高的不足. 为了突破现有方法的局限性, 本文提出了一种基于Tsallis熵的复杂网络节点重要性评估方法. 该方法兼顾节点的局部和全局拓扑信息, 综合考察节点的结构洞特征和K壳中心性, 并充分考虑节点及其邻域节点的影响. 为了验证该方法的有效性, 本文采用单调性指标、SIR模型和Kendall相关系数作为评价标准, 在8个来自不同领域的真实网络上与其他方法进行比较. 实验结果表明, 此方法能更有效和准确地评估网络节点的重要性, 可以显著区分不同节点的重要性. 此外, 该方法的时间复杂度仅为$ O({n^2}) $, 适用于大型复杂网络.
    Evaluating the importance of nodes in complex networks is an important topic in the research of network characteristics. Its relevant research has a wide range of applications, such as network supervision and rumor control. At present, many methods have been proposed to evaluate the importance of nodes in complex networks, but most of them have the deficiency of one-sided evaluation or too high time complexity. In order to break through the limitations of existing methods, in this paper a novel method of evaluating the importance of complex network nodes is proposed based on Tsallis entropy. This method takes into account both the local and global topological information of the node. It considers the structural hole characteristics and K-shell centrality of the node and fully takes into account the influence of the node itself and its neighboring nodes. To illustrate the effectiveness and applicability of this method, eight real networks are selected from different fields and five existing methods of evaluating node importance are used as comparison methods. On this basis, the monotonicity index, SIR (susceptible-infectious-recovered) model, and Kendall correlation coefficient are used to illustrate the superiority of this method and the relationship among different methods. Experimental results show that this method can effectively and accurately evaluate the importance of nodes in complex networks, distinguish the importance of different nodes significantly, and can show good accuracy of evaluating the node importance under different proportions of nodes. In addition, the time complexity of this method is $ O({n^2}) $, which is suitable for large-scale complex networks.
      通信作者: 蒋沅, jiangyuan@nchu.edu.cn
    • 基金项目: 国家自然科学基金(批准号: 61663030, 61663032)资助的课题
      Corresponding author: Jiang Yuan, jiangyuan@nchu.edu.cn
    • Funds: Project supported by the National Natural Science Foundation of China (Grant Nos. 61663030, 61663032).
    [1]

    Watts D J, Strogatz S H 1998 Nature 393 440Google Scholar

    [2]

    Barabasi A L, Albert R 1999 Science 286 509Google Scholar

    [3]

    Liu Y Y, Slotine J J, Barabasi A L 2011 Nature 473 167Google Scholar

    [4]

    Wang J W, Rong L L 2009 Safety Sci. 47 1332Google Scholar

    [5]

    Konstantin K, Angeles S M, San M M 2012 Sci. Rep. 2 292Google Scholar

    [6]

    熊熙, 胡勇 2012 物理学报 61 150509Google Scholar

    Xiong X, Hu Y 2012 Acta Phys. Sin. 61 150509Google Scholar

    [7]

    Bonacich P 1972 J. Math. Sociol. 2 113Google Scholar

    [8]

    Freeman L C 1977 Sociometry 40 35Google Scholar

    [9]

    Opsahl T, Agneessens F, Skvoretz J 2010 Social Networks 32 245Google Scholar

    [10]

    Kitsak M, Gallos L K, Havlin S, Liljeros F, Muchnik L, Stanley H E, Makse H A 2010 Nat. Phys. 6 888Google Scholar

    [11]

    Zeng A, Zhang C J 2013 Phys. Lett. A 377 1031Google Scholar

    [12]

    Bae J, Kim S 2014 Physica A 395 549Google Scholar

    [13]

    Hou B N, Yao Y P, Liao D S 2012 Physica A 391 4012Google Scholar

    [14]

    王凯莉, 邬春学, 艾均, 苏湛 2019 物理学报 68 196402Google Scholar

    Wang K L, Wu C X, Ai J, Su Z 2019 Acta Phys. Sin. 68 196402Google Scholar

    [15]

    Burt R S, Kilduff M, Tasselli S 2013 Ann. Rev. Psychol. 64 527Google Scholar

    [16]

    苏晓萍, 宋玉蓉 2015 物理学报 64 020101Google Scholar

    Su X P, Song R R 2015 Acta Phys. Sin. 64 020101Google Scholar

    [17]

    韩忠明, 吴杨, 谭旭升, 段大高, 杨伟杰 2015 物理学报 64 058902Google Scholar

    Han Z M, Wu Y, Tan X S, Duan D G, Yang W J 2015 Acta Phys. Sin. 64 058902Google Scholar

    [18]

    Chen D, Lu L, Shang M S, Zhang Y C, Zhou T. 2012 Physica A 391 1777Google Scholar

    [19]

    Zhang Q, Li M Z, Deng Y 2016 Int. J. Mod. Phys. C 27 10

    [20]

    黄丽亚, 霍宥良, 王青, 成谢锋 2019 物理学报 68 018901Google Scholar

    Huang L Y, Huo Y L, Wang Q, Cheng X F 2019 Acta Phys. Sin. 68 018901Google Scholar

    [21]

    Wang M, Li W C, Guo Y N, Peng X Y, Li Y X 2020 Physica A 554 124229Google Scholar

    [22]

    Gibbs J W 1902 Elementary Principles in Statistical Mechanics: Developedwith Especial Reference to the Rational Foundation of Thermodynamic (New York: Dover Press) ppA55−A59

    [23]

    Shannon C E 1948 Bell Syst. Tech. J. 27 379Google Scholar

    [24]

    Tsallis C 1988 J. Stat. Phys. 52 479Google Scholar

    [25]

    Zachary W W 1977 J. Anthropol. Res. 33 452Google Scholar

    [26]

    Lusseau D, Schneider K, Boisseau O, Haase P, Slooten E, Dawson S 2003 Behav. Ecol. Sociobiol. 54 396Google Scholar

    [27]

    Girvan M, Newman M E J 2002 Proc. Nati. Acad. Sci. 99 7821Google Scholar

    [28]

    Gleiser P M, Danon L 2003 Complex Syst. 6 565Google Scholar

    [29]

    Colizza V, Pastor-Satorras R, Vespignani A 2007 Nat. Phys. 3 276Google Scholar

    [30]

    DuchJ, ArenasA 2005 Phys. Rev. E 72 027104Google Scholar

    [31]

    Guimera R, Danon L, Diaz-Guilera A, Giralt F, Arenas A 2003 Phys. Rev. E 68 065103Google Scholar

    [32]

    Pastor-Satorras R, Vespignani A 2001 Phys. Rev. Lett. 86 3200Google Scholar

    [33]

    Knight W R 1966 J. Amer. Statist. Associat. 61 436Google Scholar

  • 图 1  Karate网络的拓扑结构

    Fig. 1.  Topological structure of the Karate network.

    图 3  不同传播率下SIR和各评估方法之间的Kendall相关系数, 图中黑色虚线为传播阈值$ {\beta _{{\text{th}}}} $ (a) Karate网络; (b) Dolphins网络; (c) Polbooks网络; (d) Jazz网络; (e) USAir网络; (f) C.Elegans网络; (g) Email网络; (h) PowerGrid网络

    Fig. 3.  Kendall correlation coefficient between SIR and the evaluation methods under different transmission rates, the black dashed line in the figure is the propagation threshold $ {\beta _{{\text{th}}}} $: (a) Karate network; (b) Dolphins network; (c) Polbooks network; (d) Jazz network; (e) USAir network; (f) C.Elegans network; (g) Email network; (h) PowerGrid network.

    图 2  不同评估方法的单调性指标M (a) Karate网络、Dolphins网络、Polbooks网络和Jazz网络; (b) USAir网络、C.Elegans网络、Email网络和PowerGrid网络

    Fig. 2.  Monotonicity index M of different evaluation methods: (a) Karate network, Dolphins network, Polbooks network and Jazz network; (b) USAir network, C.Elegans network, Email network and PowerGrid network.

    图 4  不同比例节点下各评估方法的Kendall相关系数 (a) Karate网络; (b) Dolphins网络; (c) Polbooks网络; (d) Jazz网络; (e) USAir网络; (f) C.Elegans网络; (g) Email网络; (h) PowerGrid网络

    Fig. 4.  Kendall correlation coefficient of the evaluation methods under different proportion nodes: (a) Karate network; (b) Dolphins network; (c) Polbooks network; (d) Jazz network; (e) USAir network; (f) C.Elegans network; (g) Email network; (h) PowerGrid network.

    图 5  TSM与其他评估方法之间的关系 (a) Karate网络, β = 0.25; (b) Dolphins网络, β = 0.15; (c) Polbooks网络, β = 0.1; (d) Jazz网络, β = 0.04

    Fig. 5.  Relationship between TSM and other evaluation methods (a) Karate network, β = 0.25; (b) Dolphins network, β = 0.15; (c) Polbooksnetwork, β = 0.1; (d) Jazz network, β = 0.04.

    表 1  计算步骤

    Table 1.  Step of the calculation.

    Algorithm 1: TSM algorithm.
    Input: Network $ G(V, E) $
    Output: TSM value for each node
    1. Find neighboring nodes $\varGamma (i)$of node $ {v_i} $
    2. Compute the restraint coefficient ${\rm{RC}}_i$ of node $ {v_i} $
    3. Compute the ${\rm Ks}_i$ value of node $ {v_i} $according to formula $k_i^{\rm m} = k_i^{\rm r} + \lambda k_i^{\rm e}$
    4. Compute $ {q_i} $ for node $ {v_i} $
    5. For node $ {v_j} $ in $\varGamma (i)$ do
    6. ratio = ($1 - {\rm{RC}}_j$)/${\rm{sum}}$($1 - {\rm{RC}}$(all neighbors of $ {v_i} $))
    7. $ T({v_i}) $= (pow(ratio, $ {q_i} $)-ratio)/(1 – $ {q_i} $)
    8. End For
    9. Compute ${\rm{IC} }\left( { {v_i} } \right) = \left( {1 - {\rm{RC} }_i } \right)*T\left( { {v_i} } \right)$
    10. For node $ {v_j} $ in $\varGamma (i)$ do
    11. ${\rm{Cnc}}\left( { {v_i} } \right) = {\rm{sum}}\left( {{\rm{IC}}\left( { {v_j} } \right)} \right)$
    12. End For
    13. For node $ {v_j} $ in $\varGamma (i)$ do
    14. ${\rm{TSM}}\left( { {v_i} } \right) = {\rm{sum}}\left( {{\rm{Cnc}}\left( { {v_j} } \right)} \right)$
    15. End For
    下载: 导出CSV

    表 2  不同方法的时间复杂度

    Table 2.  Time complexity of different methods.

    MethodCategoryTime complexity
    $ {\text{DC}} $Local$ O(n) $
    $ {\text{BC}} $Global$ O({n^3}) $or$ O(nm) $
    $ {\text{MDD}} $Global$ O(n) $
    ${\text{N-Burt} }$Local$ O({n^2}) $
    $ {\text{Cnc + }} $Hybrid$ O(n) $
    $ {\text{AAD}} $Hybrid$ O({n^3}) $ or $ O(nm) $
    $ {\text{IKS}} $Hybrid$ O(n) $
    $ {\text{TSM}} $Hybrid$ O({n^2}) $
    下载: 导出CSV

    表 3  网络的统计特征

    Table 3.  Statistical characteristics of the networks.

    Network$ n $$ m $$\langle k \rangle$$ c $$\langle d \rangle$${\beta _{\rm th} }$$\beta $
    Karate34784.58800.57062.40820.12870.25
    Dolphins621595.12900.25903.35700.14700.15
    Polbooks1054418.40000.48803.07880.08380.10
    Jazz198274227.69700.61752.23500.02590.04
    USAir332212612.80720.74942.73810.02250.03
    C.Elegans45320258.94040.64652.45530.02490.03
    Email113354519.62220.25403.60600.05350.05
    PowerGrid494165942.66910.080118.98920.25830.25
    下载: 导出CSV

    表 4  Karate网络的节点重要度评估结果

    Table 4.  Node importance evaluation results in the Karate network.

    排名节点DC节点BC节点MDD节点N-Burt节点Cnc+节点AAD节点IKS节点TSM
    1${v_{34}}$17${v_1}$0.4119${v_{34}}$11.9${v_{34}}$0.1682${v_{34}}$1156${v_{34}}$17.4666${v_1}$1.5215${v_{34}}$89.8687
    2${v_1}$16${v_{34}}$0.2862${v_1}$11.2${v_1}$0.1731${v_1}$1024${v_1}$16.4976${v_{34}}$1.4782${v_1}$81.8535
    3${v_{33}}$12${v_{33}}$0.1367${v_{33}}$8.7${v_3}$0.2257${v_{33}}$576${v_{33}}$12.6498${v_3}$1.2610${v_{33}}$72.0759
    4${v_3}$10${v_3}$0.1352${v_3}$7.6${v_{33}}$0.2746${v_3}$400${v_3}$10.7712${v_{33}}$1.2307${v_3}$70.7235
    5${v_2}$9${v_{32}}$0.1301${v_2}$6.9${v_{32}}$0.2793${v_2}$324${v_2}$9.8490${v_2}$1.0208${v_2}$59.4435
    6${v_4}$6${v_9}$0.0526${v_4}$5.1${v_9}$0.3266${v_4}$144${v_4}$7.2111${v_9}$0.9425${v_9}$47.6431
    7${v_{32}}$6${v_2}$0.0508${v_{32}}$5.1${v_2}$0.3357${v_{32}}$108${v_{32}}$6.7095${v_{14}}$0.9411${v_{14}}$46.9374
    8${v_9}$5${v_{14}}$0.0432${v_{14}}$5${v_{14}}$0.3541${v_9}$100${v_9}$6.4033${v_{32}}$0.9004${v_4}$45.5295
    9${v_{14}}$5${v_{20}}$0.0306${v_9}$4.7${v_{28}}$0.3674${v_{14}}$100${v_{14}}$6.4033${v_4}$0.8343${v_{32}}$41.3938
    10${v_{24}}$5${v_6}$0.0282${v_{24}}$4.1${v_{31}}$0.3810${v_{24}}$75${v_{24}}$5.8310${v_{31}}$0.7137${v_{31}}$37.1209
    11${v_6}$4${v_7}$0.0282${v_8}$4${v_{20}}$0.3935${v_8}$64${v_{31}}$5.6569${v_{24}}$0.7027${v_8}$35.7453
    12${v_7}$4${v_{28}}$0.0210${v_{31}}$4${v_{29}}$0.4115${v_{31}}$64${v_8}$5.6569${v_8}$0.6996${v_{24}}$33.3428
    13${v_8}$4${v_{24}}$0.0166${v_{28}}$3.7${v_{24}}$0.4348${v_6}$48${v_6}$5.0001${v_{20}}$0.6397${v_{28}}$29.9028
    14${v_{28}}$4${v_{31}}$0.0136${v_{30}}$3.7${v_4}$0.4684${v_7}$48${v_7}$5.0001${v_{30}}$0.6050${v_{20}}$29.6927
    15${v_{30}}$4${v_4}$0.0112${v_6}$3.4${v_{26}}$0.4845${v_{28}}$48${v_{28}}$5.0000${v_{28}}$0.6039${v_{30}}$29.1552
    下载: 导出CSV

    表 5  不同评估方法的单调性指标M

    Table 5.  Monotonicity index M of different evaluation methods.

    Network$ M{\text{(DC)}} $M (BC)M (MDD)$M{\text{(N-Burt)} }$$ M{\text{(Cnc + )}} $M (ADD)$ M{\text{(IKS)}} $$ M{\text{(TSM)}} $
    Karate0.70790.77230.75360.95420.94720.83950.96120.9542
    Dolphins0.83120.96230.90410.96230.98950.96230.99050.9979
    Polbooks0.82520.99740.907710.99710.999611
    Jazz0.96590.98850.98830.99830.99930.99810.99940.9994
    USAir0.85860.69700.88710.94530.99450.90680.99430.9951
    C.Elegans0.79220.87400.87480.99830.99800.93810.99740.9990
    Email0.88740.94000.92290.96500.99910.96290.99950.9999
    PowerGrid0.59270.83130.69280.87700.95680.87480.96670.9999
    下载: 导出CSV

    表 6  选定传播率下SIR和各评估方法之间的Kendall相关系数

    Table 6.  Kendall correlation coefficient between SIR and evaluation methods under a certain transmission rate.

    Network$\tau ({\text{DC, }}\sigma {\text{)}}$$\tau ({\text{BC, }}\sigma {\text{)}}$$\tau ({\text{MDD, }}\sigma {\text{)}}$$\tau ({\text{N-Burt, } }\sigma {\text{)} }$$\tau ({\text{Cnc + , }}\sigma {\text{)}}$$\tau ({\text{AAD, }}\sigma {\text{)}}$$\tau ({\text{IKS, }}\sigma {\text{)}}$$\tau ({\text{TSM, }}\sigma {\text{)}}$
    Karate0.64350.56510.67560.76830.92580.65910.84450.9637
    Dolphins0.77680.56430.81810.72820.86110.75320.85260.9492
    Polbooks0.75280.35790.80290.70370.90980.76910.91650.9436
    Jazz0.81850.46280.85030.82160.91320.82350.88040.9363
    USAir0.69820.47440.71750.79290.90470.69950.90550.9461
    C.Elegans0.63760.47110.65210.62510.81270.6590.82170.8570
    Email0.79110.64670.80150.77350.89800.77970.87580.9250
    PowerGrid0.54690.41670.57860.42980.73410.55630.73990.8207
    下载: 导出CSV
  • [1]

    Watts D J, Strogatz S H 1998 Nature 393 440Google Scholar

    [2]

    Barabasi A L, Albert R 1999 Science 286 509Google Scholar

    [3]

    Liu Y Y, Slotine J J, Barabasi A L 2011 Nature 473 167Google Scholar

    [4]

    Wang J W, Rong L L 2009 Safety Sci. 47 1332Google Scholar

    [5]

    Konstantin K, Angeles S M, San M M 2012 Sci. Rep. 2 292Google Scholar

    [6]

    熊熙, 胡勇 2012 物理学报 61 150509Google Scholar

    Xiong X, Hu Y 2012 Acta Phys. Sin. 61 150509Google Scholar

    [7]

    Bonacich P 1972 J. Math. Sociol. 2 113Google Scholar

    [8]

    Freeman L C 1977 Sociometry 40 35Google Scholar

    [9]

    Opsahl T, Agneessens F, Skvoretz J 2010 Social Networks 32 245Google Scholar

    [10]

    Kitsak M, Gallos L K, Havlin S, Liljeros F, Muchnik L, Stanley H E, Makse H A 2010 Nat. Phys. 6 888Google Scholar

    [11]

    Zeng A, Zhang C J 2013 Phys. Lett. A 377 1031Google Scholar

    [12]

    Bae J, Kim S 2014 Physica A 395 549Google Scholar

    [13]

    Hou B N, Yao Y P, Liao D S 2012 Physica A 391 4012Google Scholar

    [14]

    王凯莉, 邬春学, 艾均, 苏湛 2019 物理学报 68 196402Google Scholar

    Wang K L, Wu C X, Ai J, Su Z 2019 Acta Phys. Sin. 68 196402Google Scholar

    [15]

    Burt R S, Kilduff M, Tasselli S 2013 Ann. Rev. Psychol. 64 527Google Scholar

    [16]

    苏晓萍, 宋玉蓉 2015 物理学报 64 020101Google Scholar

    Su X P, Song R R 2015 Acta Phys. Sin. 64 020101Google Scholar

    [17]

    韩忠明, 吴杨, 谭旭升, 段大高, 杨伟杰 2015 物理学报 64 058902Google Scholar

    Han Z M, Wu Y, Tan X S, Duan D G, Yang W J 2015 Acta Phys. Sin. 64 058902Google Scholar

    [18]

    Chen D, Lu L, Shang M S, Zhang Y C, Zhou T. 2012 Physica A 391 1777Google Scholar

    [19]

    Zhang Q, Li M Z, Deng Y 2016 Int. J. Mod. Phys. C 27 10

    [20]

    黄丽亚, 霍宥良, 王青, 成谢锋 2019 物理学报 68 018901Google Scholar

    Huang L Y, Huo Y L, Wang Q, Cheng X F 2019 Acta Phys. Sin. 68 018901Google Scholar

    [21]

    Wang M, Li W C, Guo Y N, Peng X Y, Li Y X 2020 Physica A 554 124229Google Scholar

    [22]

    Gibbs J W 1902 Elementary Principles in Statistical Mechanics: Developedwith Especial Reference to the Rational Foundation of Thermodynamic (New York: Dover Press) ppA55−A59

    [23]

    Shannon C E 1948 Bell Syst. Tech. J. 27 379Google Scholar

    [24]

    Tsallis C 1988 J. Stat. Phys. 52 479Google Scholar

    [25]

    Zachary W W 1977 J. Anthropol. Res. 33 452Google Scholar

    [26]

    Lusseau D, Schneider K, Boisseau O, Haase P, Slooten E, Dawson S 2003 Behav. Ecol. Sociobiol. 54 396Google Scholar

    [27]

    Girvan M, Newman M E J 2002 Proc. Nati. Acad. Sci. 99 7821Google Scholar

    [28]

    Gleiser P M, Danon L 2003 Complex Syst. 6 565Google Scholar

    [29]

    Colizza V, Pastor-Satorras R, Vespignani A 2007 Nat. Phys. 3 276Google Scholar

    [30]

    DuchJ, ArenasA 2005 Phys. Rev. E 72 027104Google Scholar

    [31]

    Guimera R, Danon L, Diaz-Guilera A, Giralt F, Arenas A 2003 Phys. Rev. E 68 065103Google Scholar

    [32]

    Pastor-Satorras R, Vespignani A 2001 Phys. Rev. Lett. 86 3200Google Scholar

    [33]

    Knight W R 1966 J. Amer. Statist. Associat. 61 436Google Scholar

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出版历程
  • 收稿日期:  2021-05-24
  • 修回日期:  2021-06-29
  • 上网日期:  2021-08-15
  • 刊出日期:  2021-11-05

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