On the Nash Equilibria of a Duel with Terminal Payoffs

IF 0.6 Q4 ECONOMICS
Games Pub Date : 2023-09-21 DOI:10.3390/g14050062
Athanasios Kehagias
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引用次数: 0

Abstract

We formulate and study a two-player duel game as a terminal payoffs stochastic game. Players P1,P2 are standing in place and, in every turn, each may shoot at the other (in other words, abstention is allowed). If Pn shoots Pm (m≠n), either they hit and kill them (with probability pn) or they miss and Pm is unaffected (with probability 1−pn). The process continues until at least one player dies; if no player ever dies, the game lasts an infinite number of turns. Each player receives a positive payoff upon killing their opponent and a negative payoff upon being killed. We show that the unique stationary equilibrium is for both players to always shoot at each other. In addition, we show that the game also possesses “cooperative” (i.e., non-shooting) non-stationary equilibria. We also discuss a certain similarity that the duel has to the iterated Prisoner’s Dilemma.
论具有终端收益的决斗的纳什均衡
我们将二人决斗博弈作为一种终端收益随机博弈进行了形式化研究。玩家P1和P2站在原地,在每个回合中,每个人都可以向对方射击(换句话说,弃权是允许的)。如果Pn射击Pm (m≠n),要么击中并杀死Pm(概率为Pn),要么没有击中Pm而不受影响(概率为1 - Pn)。这个过程一直持续到至少一名玩家死亡;如果没有玩家死亡,游戏将持续无限回合。每个玩家在杀死对手时获得正收益,在被杀死时获得负收益。我们证明了唯一的静止平衡是两个玩家总是互相射击。此外,我们还证明了该博弈还具有“合作”(即非射击)非平稳均衡。我们还讨论了决斗与迭代囚徒困境的某种相似性。
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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来源期刊
Games
Games Decision Sciences-Statistics, Probability and Uncertainty
CiteScore
1.60
自引率
11.10%
发文量
65
审稿时长
11 weeks
期刊介绍: Games (ISSN 2073-4336) is an international, peer-reviewed, quick-refereeing open access journal (free for readers), which provides an advanced forum for studies related to strategic interaction, game theory and its applications, and decision making. The aim is to provide an interdisciplinary forum for all behavioral sciences and related fields, including economics, psychology, political science, mathematics, computer science, and biology (including animal behavior). To guarantee a rapid refereeing and editorial process, Games follows standard publication practices in the natural sciences.
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