|
|
Upravlenie Bol'shimi Sistemami, 2009, Issue 26.1, , Pages 235–269
(Mi ubs347)
|
 |
|
 |
Control in Social and Economic Systems
Stable joint venture stochastic model
Nickolay Zenkevicha, Nickolay Kolabutinb, David Yeungc
a School of Management, St. Petersburg State University, Saint Petersburg
b Faculty of Applied Mathematics and Control Processes, St. Petersburg State University, Saint Petersburg
c Center of Game Theory, Hong Kong Baptist University
Abstract:
Dynamic joint venture model is investigated. Through knowledge diffusion participating firms can gain core skills and technology that would be very difficult for them to obtain on their own. The stochastic evolution of the technology level of company under joint venture is known as a multivariate stochastic Ito's process. The profit of the joint venture is the expected sum of the participating firms' profits. The member firms would maximize their joint profit and share their cooperative profits according to the Shapley value. Applying the method of regularization for dynamic cooperation problem, we constructed the control in the form of special payments, paid at each time instant on the optimal trajectory. The dynamic stable solution is obtained for the stochastic joint venture dynamic model.
Keywords:
differential game, cooperative solution, time-consistency of cooperative agreement, payoff distribution procedure (PDP), imputation distribution procedure (IDP), dynamic stability, strategic stability, Shapley value, stable joint venture.
Citation:
Nickolay Zenkevich, Nickolay Kolabutin, David Yeung, “Stable joint venture stochastic model”, UBS, 26.1 (2009), 235–269
Linking options:
https://www.mathnet.ru/eng/ubs347 https://www.mathnet.ru/eng/ubs/v26/i1/p235
|
| Statistics & downloads: |
| Abstract page: | 359 | | Full-text PDF : | 97 | | References: | 48 |
|
Citation in format AMSBIB
Contact us: