Pareto Optimality and Nash Equilibrium for Building Stable Systems

被引:0
|
作者
Doufene, Abdelkrim [1 ]
Krob, Daniel [2 ]
机构
[1] MIT, ESD, 77 Massachusetts Ave, Cambridge, MA 02139 USA
[2] Ecole Polytech, Lab Informat LIX, F-91128 Palaiseau, France
来源
2015 9TH ANNUAL IEEE INTERNATIONAL SYSTEMS CONFERENCE (SYSCON) | 2015年
关键词
Architectural equilibrium; Nash equilibrium; Stable systems;
D O I
暂无
中图分类号
T [工业技术];
学科分类号
08 ;
摘要
This paper introduces a design approach based on system analysis and game theory for the identification of architectural equilibrium which guarantees the stability of the system being designed and its environment after the integration. We introduce multi-objective optimization and game theory, and their links with systems engineering through mathematical models. While Pareto optimality is used to select best architectures and to support independent decisions, Nash equilibrium is used to find out architectural equilibrium and to support interdependent decisions. This approach was illustrated previously in a case study.
引用
收藏
页码:542 / 545
页数:4
相关论文
共 50 条
  • [31] Evolutionary Stable Strategy Application of Nash Equilibrium in Biology
    Ray-Mukherjee, Jayanti
    Mukherjee, Shomen
    RESONANCE-JOURNAL OF SCIENCE EDUCATION, 2016, 21 (09): : 803 - 814
  • [32] Pareto-based evolutionary multiobjective approaches and the generalized Nash equilibrium problem
    Lung, Rodica Ioana
    Gasko, Noemi
    Suciu, Mihai Alexandru
    JOURNAL OF HEURISTICS, 2020, 26 (04) : 561 - 584
  • [33] Pareto-optimal Nash equilibrium: Sufficient conditions and existence in mixed strategies
    Zhukovskiy, V. I.
    Kudryavtsev, K. N.
    AUTOMATION AND REMOTE CONTROL, 2016, 77 (08) : 1500 - 1510
  • [34] Generic Stability of the Weakly Pareto-Nash Equilibrium with Strategy Transformational Barriers
    Liu, Luping
    Jia, Wensheng
    Zhou, Li
    JOURNAL OF FUNCTION SPACES, 2022, 2022
  • [35] Pareto-based evolutionary multiobjective approaches and the generalized Nash equilibrium problem
    Rodica Ioana Lung
    Noémi Gaskó
    Mihai Alexandru Suciu
    Journal of Heuristics, 2020, 26 : 561 - 584
  • [36] Constraint Qualifications and Proper Pareto Optimality Conditions for Multiobjective Problems with Equilibrium Constraints
    Zhang, Peng
    Zhang, Jin
    Lin, Gui-Hua
    Yang, Xinmin
    JOURNAL OF OPTIMIZATION THEORY AND APPLICATIONS, 2018, 176 (03) : 763 - 782
  • [37] One Method for Computing the Pareto-Optimal Nash Equilibrium in Bimatrix Game
    Kudryavtsev, Konstantin
    Zhukovskiy, Vladislav
    Stabulit, Irina
    2017 CONSTRUCTIVE NONSMOOTH ANALYSIS AND RELATED TOPICS (DEDICATED TO THE MEMORY OF V.F. DEMYANOV) (CNSA), 2017, : 175 - 177
  • [38] Pareto-optimal Nash equilibrium: Sufficient conditions and existence in mixed strategies
    V. I. Zhukovskiy
    K. N. Kudryavtsev
    Automation and Remote Control, 2016, 77 : 1500 - 1510
  • [39] A foundation for Pareto optimality
    Duddy, Conal
    Piggins, Ashley
    JOURNAL OF MATHEMATICAL ECONOMICS, 2020, 88 : 25 - 30
  • [40] The Pareto optimality distribution
    Nadarajah, Saralees
    QUALITY & QUANTITY, 2009, 43 (06) : 993 - 998