Generalized Nash equilibrium problems

被引:404
作者
Facchinei, Francisco [1 ]
Kanzow, Christian [2 ]
机构
[1] Univ Roma La Sapienza, Dept Comp & Syst Sci A Ruberti, I-00185 Rome, Italy
[2] Univ Wurzburg, Inst Math, D-97074 Wurzburg, Germany
来源
4OR-A QUARTERLY JOURNAL OF OPERATIONS RESEARCH | 2007年 / 5卷 / 03期
关键词
Generalized Nash equilibrium problem; equilibrium; jointly convex constraints; Nikaido-Isoda-function; variational inequality; quasi-variational inequality;
D O I
10.1007/s10288-007-0054-4
中图分类号
C93 [管理学]; O22 [运筹学];
学科分类号
070105 ; 12 ; 1201 ; 1202 ; 120202 ;
摘要
The Generalized Nash equilibrium problem is an important model that has its roots in the economic sciences but is being fruitfully used in many different fields. In this survey paper we aim at discussing its main properties and solution algorithms, pointing out what could be useful topics for future research in the field.
引用
收藏
页码:173 / 210
页数:38
相关论文
共 50 条
  • [1] Generalized Nash equilibrium problems
    Francisco Facchinei
    Christian Kanzow
    4OR, 2007, 5 : 173 - 210
  • [2] Equilibrium problems and generalized Nash games
    Nasri, Mostafa
    Sosa, Wilfredo
    OPTIMIZATION, 2011, 60 (8-9) : 1161 - 1170
  • [3] A smoothing method for a class of generalized Nash equilibrium problems
    Lai, Jun-Feng
    Hou, Jian
    Wen, Zong-Chuan
    JOURNAL OF INEQUALITIES AND APPLICATIONS, 2015,
  • [4] A smoothing method for a class of generalized Nash equilibrium problems
    Jun-Feng Lai
    Jian Hou
    Zong-Chuan Wen
    Journal of Inequalities and Applications, 2015
  • [5] On solving generalized Nash equilibrium problems via optimization
    Panicucci, Barbara
    Pappalardo, Massimo
    Passacantando, Mauro
    OPTIMIZATION LETTERS, 2009, 3 (03) : 419 - 435
  • [6] An algorithm for equilibrium selection in generalized Nash equilibrium problems
    Dreves, Axel
    COMPUTATIONAL OPTIMIZATION AND APPLICATIONS, 2019, 73 (03) : 821 - 837
  • [7] An algorithm for equilibrium selection in generalized Nash equilibrium problems
    Axel Dreves
    Computational Optimization and Applications, 2019, 73 : 821 - 837
  • [8] Solving a Class of Generalized Nash Equilibrium Problems
    Peiyu LI
    Guihua LIN
    Journal of Mathematical Research with Applications, 2013, (03) : 372 - 378
  • [9] On differentiability properties of player convex generalized Nash equilibrium problems
    Harms, Nadja
    Kanzow, Christian
    Stein, Oliver
    OPTIMIZATION, 2015, 64 (02) : 365 - 388
  • [10] A decomposition method for a class of convex generalized Nash equilibrium problems
    Tangi Migot
    Monica-G. Cojocaru
    Optimization and Engineering, 2021, 22 : 1653 - 1679
12345