有限理性下不确定性模糊博弈强Berge均衡的稳定性及博弈的良定性

doi:10.12677/ORF.2022.124147

期刊菜单

有限理性下不确定性模糊博弈强Berge均衡的稳定性及博弈的良定性
Stability of Strong Berge Equilibrium and Well-Posedness of Uncertain Fuzzy Game under Limited Rationality

DOI: 10.12677/ORF.2022.124147, PDF, 国家自然科学基金支持
作者: 毛浪, 杨彦龙：贵州大学数学与统计学院，贵州贵阳
关键词: 有限理性；不确定性；模糊博弈；良定；Limited Rationality； Uncertainty； Fuzzy Game； Well-Posedness

摘要: 本文不仅考虑了现实经济中经济人的不完全理性以及来自外界环境的不确定参数的变化，而且还通过考虑博弈中的决策者策略集的不确定性，引入了模糊参数。首先，本文建立了有限理性下的不确定性模糊博弈模型，通过构造理性函数，并研究其性质，得到该博弈模型的模糊强Berge均衡的结构稳定性和鲁棒性结果。其次，研究了有限理性下的不确定性模糊博弈的良定性问题。

Abstract: This paper not only considers the imperfect rationality of the economic man in the real economy and the change of uncertain parameters from the external environment, but also introduces fuzzy parameters by considering the uncertainty of the decision maker’s strategy set in the game. First of all, this paper establishes an uncertain fuzzy game model under bounded rationality. By constructing a rational function and studying its properties, we obtain the structural stability and robustness results of the fuzzy strong Berge equilibrium of the game model. Secondly, the well-posedness problem of uncertain fuzzy game under bounded rationality is studied.

文章引用：毛浪, 杨彦龙. 有限理性下不确定性模糊博弈强Berge均衡的稳定性及博弈的良定性[J]. 运筹与模糊学, 2022, 12(4): 1392-1399. https://doi.org/10.12677/ORF.2022.124147

参考文献

[1]	Anderlini, L. and Canning, D. (2001) Structural Stability Implies Robustness to Bounded Rationality. Journal of Economic Theory, 101, 395-422. https://ideas.repec.org/a/eee/jetheo/v101y2001i2p395-422.html
[2]	Chao, Y. and Jian, Y. (2006) On Structural Stability and Robustness to Bounded Rationality. Nonlinear Analysis: Theory, Methods & Applications, 65, 583-592. https://www.sciencedirect.com/science/article/abs/pii/S0362546X05008394
[3]	Chao, Y. and Jian, Y. (2007) Bounded Rationality in Multi-Objective Games. Nonlinear Analysis Theory Methods & Applications, 67, 930-937. https://www.sciencedirect.com/science/article/abs/pii/S0362546X0600366X
[4]	俞建. 几类考虑有限理性平衡问题解的稳定性[J]. 系统科学与数学, 2009, 29(7): 999-1008. http://www.cqvip.com/QK/71135X/201107/31185773.html
[5]	Yu, J., Yang, Z. and Wang, N.F. (2016) Further Results on Structural Stability and Robustness to Bounded Rationality. Journal of Mathematical Economics, 67, 49-53. https://ideas.repec.org/a/eee/mateco/v67y2016icp49-53.html
[6]	俞建. 有限理性与博弈论中平衡点集的稳定性[M]. 北京: 科学出版社, 2017.
[7]	Miyazaki, Y. and Azuma, H. (2013) (λ, ϵ)-Stable Model and Essential Equilibria. Mathematical Social Sciences, 65, 85-91. https://www.sciencedirect.com/science/article/pii/S0165489612000807
[8]	Larbani, M. and Lebbah, H. (1999) A Concept of Equilibrium for a Game under Uncertainty. European Journal of Operational Research, 117, 145-156. https://ideas.repec.org/a/eee/ejores/v117y1999i1p145-156.html
[9]	Zhukovskii, V.I. and Chikrii, A.A. (1994) Linear Quadratic Differential Games. Naoukova Doumka, Kiev.
[10]	张会娟, 张强. 不确定性下非合作博弈强 Nash 均衡的存在性[J]. 控制与决策, 2010(8): 1251-1254. http://www.cnki.com.cn/Article/CJFDTotal-KZYC201008027.htm
[11]	张会娟, 张强. 不确定性下非合作博弈简单Berge均衡的存在性[J]. 系统工程理论与实践, 2010, 30(9): 1630-1635. http://www.cnki.com.cn/Article/CJFDTotal-XTLL201009015.htm
[12]	杨哲, 蒲勇健. 广义不确定性下广义博弈中NS均衡的存在性[J]. 中国管理科学, 2013, 21(5): 165-171. http://www.cnki.com.cn/Article/CJFDTotal-ZGGK201305021.htm
[13]	杨哲. 广义不确定性下非合作博弈中Berge-NS均衡的存在性[J]. 系统科学与数学, 2015, 35(9): 1073-1080. http://www.cnki.com.cn/Article/CJFDTotal-STYS201509008.htm
[14]	邓喜才, 向淑文, 左羽. 不确定性下强Berge均衡的存在性[J]. 运筹学学报, 2013, 17(3): 101-107. http://www.cnki.com.cn/Article/CJFDTotal-YCXX201303011.htm
[15]	邓喜才, 向淑文. 不确定下广义博弈强Berge均衡的存在性[J]. 应用数学学报, 2015, 38(2): 200-211. http://www.cnki.com.cn/Article/CJFDTotal-YYSU201502002.htm
[16]	陆辰超, 邬冬华. 不确定性下非合作博弈的有限理性模型及良定性[J]. 应用数学与计算数学学报, 2016, 30(3): 339-348. http://www.cnki.com.cn/Article/CJFDTotal-YONG201603003.htm
[17]	王能发. 有限理性下不确定性博弈均衡的稳定性[J]. 应用数学学报, 2017, 40(4): 562-572. http://www.cnki.com.cn/Article/CJFDTotal-YYSU201704008.htm
[18]	Zadeh, L.A. (1965) Fuzzy Sets. Infor-mation and Control, 8, 338-353. https://www.sciencedirect.com/science/article/pii/S001999586590241X
[19]	Billot, A. (1992) Economic Theory of Fuzzy Equilibria. Springer-Verlag, Heidelberg. https://linkspringer.53yu.com/book/10.1007/978-3-642-79949-5
[20]	Kim, W.K. and Lee, K.H. (2001) General-ized Fuzzy Games and Fuzzy Equilibria. Fuzzy Sets and Systems, 122, 293-301. https://www.sciencedirect.com/science/article/abs/pii/S0165011400000737
[21]	Yang, Z. and Wang, A. (2018) Existence and Stability of the α-Core for Fuzzy Games. Fuzzy Sets and Systems, 341, 59-68. https://www.sciencedirect.com/science/article/pii/S0165011417302300
[22]	Zhe, Y. (2020) A Coalitional Exten-sion of Generalized Fuzzy Games. Fuzzy Sets and Systems, 383, 68-79. https://www.sciencedirect.com/science/article/pii/S0165011418303981
[23]	Van Hung, N., Tam, V.M., O’Regan, D., et al. (2020) A New Class of Generalized Multiobjective Games in Bounded Rationality with Fuzzy Mappings: Structural (λ, ε)-Stability and (λ, ε)-Robustness to ε-Equilibria. Journal of Computational and Applied Mathematics, 372, Article ID: 112735. https://www.sciencedirect.com/science/article/pii/S0377042720300261
[24]	Wang, X. and Teo, K.L. (2022) Generalized Nash Equilibrium Problem over a Fuzzy Strategy Set. Fuzzy Sets and Systems, 434, 172-184. https://www.sciencedirect.com/science/article/pii/S0165011421002323
[25]	Zhou, L., Jia, W. and Liu, L. (2021) Essential Stability of Fuzzy Equilibria for Generalized Multiobjective Games with Fuzzy Constraint Mappings. Fuzzy Sets and Systems, 447, 113-122. https://www.sciencedirect.com/science/article/pii/S0165011421004280
[26]	Liu, J. and Yu, G. (2022) Fuzzy Kakutani-Fan-Glicksberg Fixed Point Theorem and Existence of Nash Equilibria for Fuzzy Games. Fuzzy Sets and Systems, 447, 100-112. https://www.sciencedirect.com/science/article/pii/S0165011422000409
[27]	俞建. 关于良定问题[J]. 应用数学学报, 2011, 34(6): 1007-1022. http://www.cnki.com.cn/Article/CJFDTotal-YYSU201106006.htm
[28]	Aliprantis, C.D. and Border, K.C. (2006) Infinite Dimensional Analysis. Springer-Verlag, New York. https://linkspringer.53yu.com/book/10.1007/3-540-29587-9

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