Static Nuel Games with Terminal Payoff
引用次数: 0
Abstract
In this paper we study a variant of the Nuel game (a generalization of the duel) which is played in turns by $N$ players. In each turn a single player must fire at one of the other players and has a certain probability of hitting and killing his target. The players shoot in a fixed sequence and when a player is eliminated, the ``move'' passes to the next surviving player. The winner is the last surviving player. We prove that, for every $N\geq2$, the Nuel has a stationary Nash equilibrium and provide algorithms for its computation.有终端回报的静态努埃尔游戏
在本文中,我们研究的是努埃尔博弈(the Nuel game)的一种变体(the generalization of theduel),它由 $N$ 玩家轮流玩。在每个回合中,一个玩家必须向其他玩家开火,并有一定概率击中并杀死目标。玩家按照固定的顺序射击,当一名玩家被淘汰后,"棋局 "就会转移到下一名存活的玩家。获胜者是最后一个存活的玩家。我们证明,对于每一个 $N\geq2$,Nuel 都有静态纳什均衡,并提供了计算它的算法。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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