zero sum two person game 二人零和对策
zero-sum two-person game 两人零和对策 ; 零和二人博弈
zero sum two-person gam 二人零和对策
non-zero-sum two-person game 非零和二人对策
zero sum two-person continuous game 二人零和连续对策
two person zero sum game 二人零和对策
two-person zero-sum game 双人零和赛局 ; 两人零和对局 ; [数] 两人零和对策
Two-Person Zero-sum Games 人零和博弈
two-person zero-sum 二人零和
In 1928, the year Nash was born, von Neumann outlined a first formal theory of games, showing that in two-person, zero-sum games, there would always be an equilibrium.
1928年,即纳什出生的那一年,冯·诺依曼概述了最早的正式博弈论,表明,在两人的零和博弈中,向来存在一种均衡。
In fact, von Neumann's focus on two-person, zero-sum games left only a very narrow set of applications for his theory.
实际上,冯·诺依曼之于两人零和博弈的强调只给他的理论留下了非常狭窄的应用。
A two-sided search, where the target makes every effort to evade searchers detection, can be regarded as a two-person zero-sum game.
在双边搜索中,被搜索者不希望被搜索到,因此可以将搜索双方的行为看成二人零和博弈问题。
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