Journal of Industrial and Management Optimization (JIMO)

Solutions for bargaining games with incomplete information: General type space and action space
Page number are going to be assigned later 2017

doi:10.3934/jimo.2017084      Abstract        References        Full text (341.3K)      

Feimin Zhong - School of Business Administration, Hunan University, Changsha 410082, China (email)
Jinxing Xie - Department of Mathematical Sciences, Tsinghua University, Beijing, 100084, China (email)
Jing Jiao - School of Economics and Management, Northwest University, Xi'an 710127, China (email)

1 X. Brusset and P. J. Agrell, Intrinsic impediments to category captainship collaboration, Journal of Industrial and Management Optimization, 13 (2017), 113-133.
2 W. S. Chang, B. Chen and T. C. Salmon, An investigation of the average bid mechanism for procurement auctions, Management Science, 61 (2015), 1237-1254.
3 J. C. Harsanyi and R. Selten, A generalized Nash solution for two-person bargaining games with incomplete information, Management Science, 18 (1972), 80-106.
4 B. Holmström and R. B. Myerson, Efficient and durable decision rules with incomplete information, Econometrica, 51 (1983), 1799-1819.
5 M. Huang, X. Qian, S. C. Fang and X. Wang, Winner determination for risk aversion buyers in multi-attribute reverse auction, Omega, 59 (2016), 184-200.
6 E. Kalai and M. Smorodinsky, Other solutions to Nash's bargaining problem, Econometrica, 43 (1975), 513-518.
7 T. Kruse and P. Strack, Optimal stopping with private information, Journal of Economic Theory, 159 (2015), 702-727.
8 R. B. Myerson, Incentive compatibility and the bargaining problem, Econometrica, 47 (1979), 61-73.
9 R. B. Myerson, Cooperative games with imcomplete information, International Journal of Game Theory, 13 (1984), 69-96.
10 R. B. Myerson, Two-person bargaining problems with incomplete information, Econometrica, 52 (1984), 461-487.
11 J. F. Nash, The bargaining problem, Econometrica, 18 (1950), 155-162.
12 Ö. Özer and W. Wei, Strategic commitments for an optimal capacity decision under asymmetric forecast information, Management Science, 52 (2006), 1238-1257.
13 M. A. Perles and M. Maschler, The super-additive solution for the Nash bargaining game, International Journal of Game Theory, 10 (1981), 163-193.
14 H. L. Royden and P. Fitzpatrick, Real Analysis, $3^{ed}$ edition, Macmillan, New York, 1988.
15 F. Weidner, The generalized Nash bargaining solution and incentive compatible mechanisms, International Journal of Game Theory, 21 (1992), 109-129.

Go to top