| 1. | Governance structure for ceo of listed companies : perspectives from a 3 - person game
一个三方博弈视觉的思考 |
| 2. | Fpp first person game
第一人称游戏 |
| 3. | Fpp first person game
第一人称游戏 |
| 4. | Fpg first person game
第一人称游戏 |
| 5. | The relaxed game chromatic number of a graph is defined through a two person game
一个图的松弛竞赛色数是通过两个人的竞赛来定义的。 |
| 6. | Controls better than any console first - person game before it , features great pacing and a fun mix of puzzles and shooting
操纵性胜过任何一款第一人称射击游戏,有着优秀的游戏节奏与射击结合解谜的趣味。 |
| 7. | Also remembers that when he was played in a two - person game squirrels fc major combat mody , to escape their powerful than the wicked squirrels must be careful to use the boxes as their weapons , four escape
还记得小时候玩过的双人fc游戏松鼠大作战麽,为了躲避比自己强大的恶人,松鼠必须小心谨慎,用箱子作为自己的武器,四处逃跑。 |
| 8. | Introduction : also remembers that when he was played in a two - person game squirrels fc major combat mody , to escape their powerful than the wicked squirrels must be careful to use the boxes as their weapons , four escape
还记得小时候玩过的双人fc游戏松鼠大作战麽,为了躲避比自己强大的恶人,松鼠必须小心谨慎,用箱子作为自己的武器,四处逃跑。 |
| 9. | In the present paper , a max - min theorem and a max theorem are proved on local convex topological linear spaces , as an application , it is obtained that there exists optimal mixed strategies in a two - person game with an infinite pure strategy set
摘要证明了局部凸线性拓扑空间上实值连续泛函的极大极小定理与极大定理,并由此证明了一类具有无限纯策略集的二人对策中最优混合策略的存在性。 |
| 10. | We think that the main contributions of the book is in two aspects : one is the revolution of some concepts such as utility theory , aximatization of game , extended game ; the other is the breaking through in zero - sum two - person games centered on minimax and corporation game centered on characteristic function . this was , in fact , the development and extension of von neumann ' s classic game paper of 1928 . our research shows that these contributions were a pure new theoretical creation , rather than an
认为《博弈论与经济行为》的主要贡献有二个方面:一个方面是在效用理论、博弈的公理化、博弈的扩展形式等等概念上的创新,另一方面是在以极小极大值定理为中心的三人零和博弈理论和以特征函数为中心的合作博弈理论上的创新,这些实际上主要是冯?诺伊曼对其1928年的经典博弈论文章的理论框架的发展和延伸 |
