In selfish bin packing, each item is regarded as a player, who aims to minimize the cost-share by choosing a bin it can fit in. To have a least number of bins used, cost-sharing rules play an important role. The currently best known cost sharing rule has a lower bound on $PoA$ larger than 1.45, while a general lower bound 4/3 on $PoA$ applies to any cost-sharing rule under which no items have incentive unilaterally moving to an empty bin. In this paper, we propose a novel and simple rule with a $PoA$ matching the lower bound, thus completely resolving this game. The new rule always admits a Nash equilibrium and its $PoS$ is one. Furthermore, the well-known bin packing algorithm $BFD$ (Best-Fit Decreasing) is shown to achieve a strong equilibrium, implying that a stable packing with an asymptotic approximation ratio of $11/9$ can be produced in polynomial time.
翻译:在自私的垃圾包装中,每个项目都被视为玩家,目的是通过选择一个可以容纳的垃圾桶来最大限度地减少成本分担。要使用最少数量的垃圾桶,费用分摊规则就起着重要作用。目前最著名的费用分摊规则对$PA$大于1.45的约束力较低,而一般较低的4/3美元对$PA$的约束则适用于任何成本分担规则,根据该规则,没有任何项目有单方面向空垃圾箱移动的动力。在本文中,我们提出了一个新颖而简单的规则,即美元与下限匹配,从而彻底解决这一游戏。新规则总是承认纳什平衡,美元POS$是一美元。此外,众所周知的垃圾包装算法$BFD$(Best-Fit Decreasing)显示了一种强烈的平衡,意味着一个稳定的包装,一个零星近似近似比率为11/9美元的近似比值为11美元,可以在多时制成。