Cooperators can invade an incumbent population of defectors when one-shot prisoner's dilemmas occur multiple times within a generation

Q1 Mathematics
Tim Johnson , Oleg Smirnov
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引用次数: 0

Abstract

Researchers have identified numerous mechanisms that make cooperation in the prisoner's dilemma possible, yet recent research has proposed what ranks among the most basic of mechanisms: the presence of time. When organisms in spatial models can interact at multiple points in time within a generation, cooperation can evolve in a wider range of settings than in spatial models in which interaction occurs at a single moment. Here we further explore this mechanism via an analytic model that studies the effect of time on cooperation when no spatial dimension is present. The model shows that the mere presence of two or more points in time at which social interaction can occur creates an opportunity for mutant cooperators to invade a well-mixed population of defectors playing the one-shot prisoner's dilemma under the replicator dynamics. These invasions lead to a nonequilbrium cycling of strategies in which cooperation consistently reemerges at alternating time points.

当一次囚犯困境在一代人时间内多次出现时,合作者可以入侵现有的叛逃者群体
研究人员已经确定了许多使囚徒困境中的合作成为可能的机制,但最近的研究提出了最基本的机制之一:时间的存在。当空间模型中的生物可以在一代人的时间内在多个时间点上相互作用时,合作可以在更广泛的环境中发展,而不是在单一时刻发生相互作用的空间模型中。本文通过一个分析模型进一步探讨了在没有空间维度的情况下,时间对合作的影响。该模型表明,仅仅存在两个或多个可以发生社会互动的时间点,就为突变的合作者创造了一个机会,使其入侵一个混合良好的叛逃者群体,这些叛逃者在复制因子动力学下玩一次囚犯困境。这些入侵导致了策略的非平衡循环,在这种循环中,合作总是在交替的时间点重新出现。
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
Chaos, Solitons and Fractals: X
Chaos, Solitons and Fractals: X Mathematics-Mathematics (all)
CiteScore
5.00
自引率
0.00%
发文量
15
审稿时长
20 weeks
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