60. Continuous generalized games
Invited abstract in session TB-2: Strategic games, stream Game theory.
Thursday, 10:00 - 11:30Room: C 103
Authors (first author is the speaker)
| 1. | Imre Balog
|
| CUB | |
| 2. | Miklós Pintér
|
| Corvinus Center for Operational Research, Corvinus University of Budapest |
Abstract
In our presentation, we examine the existence of equilibrium for finite stochastic games. For this purpose, we introduce a new concept – continuous generalized game – in order to provide a fixed point theorem based proof of the existence for equilibrium of a special class of finite stochastic games (generalized discounted). In our proof, we show that all mentioned stochastic games are so-called continuous generalized game. Regarding continuous generalized games, we show that they have an equilibrium.
Keywords
- SS - Optimal and stochastic optimal control and games
Status: accepted
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