有限理性下不确定性群体博弈弱NS平衡的稳定性

Abstract

Abstract:

For population games with uncertain parameters, a weak NS equilibrium is firstly proposed based on the fact that switching strategies cause corresponding costs. The underlying idea of a weak NS equilibrium is that the agents' new gained payoffs from strategy switch are less than or equal to the increased cost for a given uncertainty parameter; simultaneously, each population can not obtain strictly poor net profits under uncertain parameters, thus each agent in every population has no motivation to unilaterally change the current strategy and then they achieve a weak NS equilibrium. Secondly, the existence of weak NS equilibria is proven by Kakutani's fixed point theorem. Thirdly, by constructing an abstract rational function, a corresponding bounded rational model is established, and it is shown structural stability implying robustness. Therefore, the generic stability of weak NS equilibria for population games with uncertain parameters under bounded rationality is also obtained when the net profit function is perturbed. Finally, an example is illustrated the correctness of the above results.

Key words: Population games, Weak NS equilibria, Bounded rationality, Uncertainty, Structural stability

CLC Number:

O225

Mingting Wang,Guanghui Yang,Hui Yang. Stability of Weak NS Equilibria for Population Games with Uncertain Parameters Under Bounded Rationality[J].Acta mathematica scientia,Series A, 2022, 42(6): 1812-1825.

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References 35

1	Nash J . Equilibrium points in n-person games. P Natl Acad Sci, 1950, 36 (1): 48- 49 doi: 10.1073/pnas.36.1.48
2	Sandholm W H . Population Games and Evolutionary Dynamics. London: MIT Press, 2011
3	Lahkar R . Large population aggregative potential games. Dyn Games Appl, 2017, 7 (3): 443- 467 doi: 10.1007/s13235-016-0190-6
4	Cheung M W , Lahkar R . Nonatomic potential games: the continuous strategy case. Games Econ Behav, 2018, 108, 341- 362 doi: 10.1016/j.geb.2017.12.004
5	Chow S N , Li W , Lu J , et al. Population games and discrete optimal transport. J Nonlinear Sci, 2019, 29, 871- 896 doi: 10.1007/s00332-018-9507-5
6	杨光惠, 杨辉. 有限理性下群体博弈Nash平衡的稳定性. 贵州大学学报(自然科学版), 2019, 36 (5): 1- 3 1-3, 17
	Yang G H , Yang H . Stability of Nash equilibria of population games under bounded rationality. Journal of Guizhou University (Natural Sciences), 2019, 36 (5): 1- 3 1-3, 17
7	Yang G H , Yang H , Song Q Q . Stability of weighted Nash equilibria for multiobjective population games. J Nonlinear Sci Appl, 2016, 9, 4167- 4176 doi: 10.22436/jnsa.009.06.59
8	Yang G H , Yang H . Stability of weakly Pareto-Nash equilibria and Pareto-Nash equilibria for multiobjective population games. Set-Valued Var Anal, 2017, 25, 427- 439 doi: 10.1007/s11228-016-0391-6
9	Yang Z , Zhang H . Essential stability of cooperative equilibria for population games. Optim Lett, 2019, 13 (7): 1573- 1582 doi: 10.1007/s11590-018-1303-5
10	Yang Z , Zhang H . NTU core, TU core and strong equilibria of coalitional population games with infinitely many pure strategies. Theory Decis, 2019, 87, 155- 170 doi: 10.1007/s11238-019-09701-y
11	陈华鑫, 贾文生. 群体博弈的逼近定理及通有收敛性. 数学物理学报, 2021, 41A (5): 1566- 1573 doi: 10.3969/j.issn.1003-3998.2021.05.025
	Chen H X , Jia W S . Approximation theorem and general convergence of population games. Acta Math Sci, 2021, 41A (5): 1566- 1573 doi: 10.3969/j.issn.1003-3998.2021.05.025
12	Zhukovskii V I. Linear Quadratic Differential Games. Naoukova Doumka: Kiev, 1994
13	Larbani M , Lebbah H . A concept of equilibrium for a game under uncertainty. Eur J Oper Res, 1999, 117 (1): 145- 156 doi: 10.1016/S0377-2217(98)00079-4
14	张会娟, 张强. 不确定性下非合作博弈强Nash均衡的存在性. 控制与决策, 2010, 25 (8): 1251- 1254 1251-1254, 1260 doi: 10.13195/j.cd.2010.08.134.zhangkj.029
	Zhang H J , Zhang Q . Existence of strong Nash equilibrium for non-cooperative games under uncertainty. Control and Decision, 2010, 25 (8): 1251- 1254 1251-1254, 1260 doi: 10.13195/j.cd.2010.08.134.zhangkj.029
15	张会娟, 张强. 不确定性下非合作博弈简单Berge均衡的存在性. 系统工程理论与实践, 2010, 30 (9): 1630- 1635
	Zhang H J , Zhang Q . Existence of simple Berge equilibrium for non-cooperative games under uncertainty. Systems Engineering Theory & Practice, 2010, 30 (9): 1630- 1635
16	高静, 邬冬华, 张广. 不确定条件下n-人非合作博弈均衡点集的通有稳定性. 应用数学与计算数学学报, 2014, 28 (3): 336- 342 doi: 10.3969/j.issn.1006-6330.2014.03.010
	Gao J , Wu D H , Zhang G . Generic stability of equilibrium for n-person non-cooperative games under uncertainty. Communications on Applied Mathematics and Computation, 2014, 28 (3): 336- 342 doi: 10.3969/j.issn.1006-6330.2014.03.010
17	邓喜才, 向淑文, 左羽. 不确定性下强Berge均衡的存在性. 运筹学学报, 2013, 17 (3): 101- 107
	Deng X C , Xiang S W , Zuo Y . Existence of strong Berge equilibrium under uncertainty. OR Transactions, 2013, 17 (3): 101- 107
18	杨哲. 广义不确定性下非合作博弈中Berge-NS均衡的存在性. 系统科学与数学, 2015, 35 (9): 1073- 1080
	Yang Z . The existence theorems of Berge-NS equilibria in non-cooperative games under generized uncertainty. J Sys Sci & Math Scis, 2015, 35 (9): 1073- 1080
19	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. 应用数学与计算数学学报, 2016, 30 (3): 339- 348 doi: 10.3969/j.issn.1006-6330.2016.03.003
	Lu C C , Wu D H . Bounded rationality and well-posedness in non-cooperative games under uncertainty. Communications on Applied Mathematics and Computation, 2016, 30 (3): 339- 348 doi: 10.3969/j.issn.1006-6330.2016.03.003
20	杨哲, 蒲勇健, 郭心毅. 不确定性下多目标博弈中弱Pareto-NS均衡的存在性. 系统工程理论与实践, 2013, 33 (3): 660- 665
	Yang Z , Pu Y J , Guo X Y . On the existence of weakly Pareto-NS equilibrium points in multi-objective games under uncertainty. Systems Engineering Theory&Practice, 2013, 33 (3): 660- 665
21	赵薇, 杨辉, 吴隽永. 不确定参数下群体博弈均衡的存在性与通有稳定性. 应用数学学报, 2020, 43 (4): 627- 638
	Zhao W , Yang H , Wu J Y . Existence and generic stability of equilibria for population games with uncertain parameters. Acta Math Appl Sin, 2020, 43 (4): 627- 638
22	Zhao W, Yang H, Deng X C, et al. Stability of equilibria for population games with uncertain parameters under bounded rationality. J Inequal Appl, 2021, 2021(1): Article number 15
23	Anderlini L , Canning D . Structural stability implies robustness to bounded rationality. J Econ Theory, 2001, 101 (2): 395- 422
24	Yu C , Yu J . On structural stability and robustness to bounded rationality. Nonlinear Anal-TMA, 2006, 65 (3): 583- 592
25	Yu J , Yang H , Yu C . Structural stability and robustness to bounded rationality for non-compactcases. J Glob Optim, 2009, 44, 149- 157
26	Yu C , Yu J . Bounded rationality in multiobjective games. Nonlinear Anal-TMA, 2007, 67 (3): 930- 937
27	王红蕾, 俞建. 有限理性与多目标最优化问题弱有效解集的稳定性. 中国管理科学, 2008, 16 (4): 155- 158
	Wang H L , Yu J . Bounded rationality and stability of weakly efficient solution set of multiobjective optimization problems. Chinese Journal of Management Science, 2008, 16 (4): 155- 158
28	王红蕾, 俞建. 有限理性与多目标问题解的稳定性. 运筹学学报, 2008, 12 (1): 104- 108
	Wang H L , Yu J . Bounded rationality and stability of solution of multiobjective optimization problems. OR Transactions, 2008, 12 (1): 104- 108
29	俞建. 几类考虑有限理性平衡问题解的稳定性. 系统科学与数学, 2009, 29 (7): 999- 1008
	Yu J . Bounded rationality and stability of solution of some equilibrium problems. J Sys Sci & Math Scis, 2009, 29 (7): 999- 1008
30	俞建. 博弈论与非线性分析. 北京: 科学出版社, 2008
	Yu J . Game Theory and Nonlinear Analysis. Beijing: Science Press, 2008
31	俞建. 有限理性与博弈论中平衡点集的稳定性. 北京: 科学出版社, 2017
	Yu J . Bounded Rationality and Stability of Equilibrium Set in Game Theory. Beijing: Science Press, 2017
32	俞建, 贾文生. 有限理性研究的博弈论模型. 中国科学: 数学, 2020, 50 (9): 1375- 1386
	Yu J , Jia W S . Game model in the study of bounded rationality. Scientia Sinica Mathematica, 2020, 50 (9): 1375- 1386
33	王能发. 有限理性下不确定性博弈均衡的稳定性. 应用数学学报, 2017, 40 (4): 562- 572
	Wang N F . The stability of equilibrium point for uncertain game under bounded rationality. Acta Math Appl Sin, 2017, 40 (4): 562- 572
34	蔡阳洋, 向淑文. n人非合作博弈弱Nash均衡点的存在性. 重庆工商大学学报(自然科学版), 2020, 37 (1): 54- 58
	Cai Y Y , Xiang S W . The existence of weak Nash equilibria in n-person non-cooperative game. J Chongqing Technol & Business Univ (Nat Sci Ed), 2020, 37 (1): 54- 58
35	Klein E, Thompson A C. Theory of Correspondences. New York: Wiley, 1984

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Stability of Weak NS Equilibria for Population Games with Uncertain Parameters Under Bounded Rationality

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