Volume 4 Issue 4
Aug.  2011
Turn off MathJax
Article Contents
BAI Yu-hong, WANG Yan-zhang, WANG Xue-hua, Michael A Fiddy. Evaluation of independent innovation capability of institutes based on hawk-dove quantum games[J]. Chinese Optics, 2011, 4(4): 340-354.
Citation: BAI Yu-hong, WANG Yan-zhang, WANG Xue-hua, Michael A Fiddy. Evaluation of independent innovation capability of institutes based on hawk-dove quantum games[J]. Chinese Optics, 2011, 4(4): 340-354.

Evaluation of independent innovation capability of institutes based on hawk-dove quantum games

More Information
  • Author Bio:

    BAI Yu-hong(1964-), female, born in Hanyang in Hubei Province, professor. Her main research interests are optical intelligence analysis and research.

  • Received Date: 12 Mar 2011
  • Rev Recd Date: 15 Jul 2011
  • Publish Date: 25 Aug 2011
  • Innovation capability is the major driving force for the technology and economic development of a country. Establishment of a scientific evaluation method for innovation capability can be helpful to enhance such a capability for those institutes in a country and can provide references for government to make policies in science and technology development. In this paper, a new evaluation method is created based on the hawk-dove game theory. Corresponding to basic factors of quantum game theory, the physical meanings in an innovation system are introduced and a evaluation model of technology innovation capability is established based on the hawk-dove game theory. Then, the relation between entanglement and benefits matrix is analyzed and a method is established in which the entanglement from various participants in hawk-dove quantum game theory is used to indicate innovation capability. Furthermore, the capacity of independent innovation of research institutes is explained with hawk-dove quantum game theory, an index system for independent innovation capability is constructed and a combinational calculation method, namely, the calculation of quantum entanglement, is also set up. Finally, institutes of Chinese Academy of Sciences are chosen as the evaluation examples and evaluation data from this method and the simple statistical method of China Academy of Engineering Physics are compared. The result shows that this new method is rational and operable.

     

  • loading
  • [1] AXELROD R. The Complexity of Cooperation:Agent-based Models of Conflict and Cooperation[M]. Princeton:Princeton University Press,1997. [2] BENJAMIN S C,HAYDEN P M. Multi-player quantum games[J]. Phys. Rev. A,2001,64(3):030301. [3] DOPFER K. Evolutionary Economics:Program and Scope[M]. Boston:Kluwer Academic Publishers,2001. [4] DOSI G,NELSON R R. An introduction to evolutionary theories in economics[J]. J. Evolutionary Economics,1994(4):153-172. [5] SQW. Economic analysis of scientific research publishing[R]. Cambridgeshire:Wellcome Trust,2003. [6] HODGSON G M. Economics and Evolution:Bringing Life Back into Economics[M]. Ann Arbor:University of Michigan Press,1993. [7] KNIELSEN K,JOHNSON B. Institutions and Economic Change[M]. Cheltenham:Edward Elgar Publishing Limited,1998. [8] FRIEDMAN D. On economic applications of evolutionary game theory[J]. J. Evolutionary Economics,1998(8):15-43. [9] GUEVARA E. Quantum replicator dynamics[J]. Physica A,2006,369(2):393-407. [10] GUEVARA E. Quantum games and the relationships between quantum mechanics and game theory[EB/OL].(2008-05-12)[2011-03-11].http://www.citeulike.org/user/Scis0000002/article/4890869. [11] IQBAL A,TOOR A H. Equilibria of replicator dynamics in quantum games[EB/OL].(2001-01-09)[2011-03-11].http://arxiv.org/abs/quant-ph/0106135. [12] GOLDENBERG L,VAIDMAN L,WEISNER S. Quantum gambling[J]. Phys. Rev. Lett.,1999,82(16):3356-3359. [13] MEYER D A. Quantum strategies[J]. Phys. Rev. Lett.,1999,82(5):1052-1055. [14] NAWAZ A,TOOR A H. Evolutionarily stable strategies in quantum hawk-dove game[J]. Phys. Lett. A,2001,280(5-6):249-256. [15] EISERT J,WILKENS M,LEWENSTEIN M. Quantum games and quantum strategies[J]. Phys. Rev. Lett.,83(15):3077-3080. [16] MARINATTO L,WEBER T. A quantum approach to static games of complete information[J]. Phys. Lett. A.,2000,272(5-6):291-303. [17] PIOTROWSKI E W,SLADKOWSKI J. Quantum market games[J]. Physica A,2002,312(1-2):208-217. [18] SALLY D. On sympathy and games[J]. J. Economic Behavior and Organization,2001,44(1):1-30. [19] SMITH J M. Evolution and the Theory of Games[M]. Cambridge:Cambridge University Press,1982. [20] SMITH J M. Evolutionary game theory[J]. Physica D,1986,22:43-49. [21] ZHA X W. Entanglement of quantum pure states[J]. J. Xi'an University Post and Telecommunications,2003,8(1):56-58.
  • 加载中

Catalog

    通讯作者: 陈斌, bchen63@163.com
    • 1. 

      沈阳化工大学材料科学与工程学院 沈阳 110142

    1. 本站搜索
    2. 百度学术搜索
    3. 万方数据库搜索
    4. CNKI搜索
    Article views(3368) PDF downloads(1012) Cited by()
    Proportional views

    /

    DownLoad:  Full-Size Img  PowerPoint
    Return
    Return