On Approximately Strategy-Proof Tournament Rules for Collusions of Size at Least Three

arXiv - CS - Computer Science and Game Theory Pub Date : 2024-07-24 DOI:arxiv-2407.17569

David Mikšaník, Ariel Schvartzman, Jan Soukup

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Abstract

A tournament organizer must select one of $n$ possible teams as the winner of a competition after observing all $\binom{n}{2}$ matches between them. The organizer would like to find a tournament rule that simultaneously satisfies the following desiderata. It must be Condorcet-consistent (henceforth, CC), meaning it selects as the winner the unique team that beats all other teams (if one exists). It must also be strongly non-manipulable for groups of size $k$ at probability $\alpha$ (henceforth, k-SNM-$\alpha$), meaning that no subset of $\leq k$ teams can fix the matches among themselves in order to increase the chances any of it's members being selected by more than $\alpha$. Our contributions are threefold. First, wee consider a natural generalization of the Randomized Single Elimination Bracket rule from [Schneider et al. 2017] to $d$-ary trees and provide upper bounds to its manipulability. Then, we propose a novel tournament rule that is CC and 3-SNM-1/2, a strict improvement upon the concurrent work of [Dinev and Weinberg, 2022] who proposed a CC and 3-SNM-31/60 rule. Finally, we initiate the study of reductions among tournament rules.

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关于规模至少为三的串通的近似策略证明锦标赛规则

比赛组织者必须在观察了 $binom{n}{2}$ 之间的所有比赛后，从 $n$ 可能的队伍中选出一支队伍作为比赛的获胜者。组织者希望找到一种比赛规则，同时满足以下要求。它必须是康德赛特一致的（以下简称 CC），即它能选出击败所有其他队伍（如果存在的话）的唯一一支队伍作为获胜者。对于概率为 $\alpha$ 的大小为 $k$ 的小组来说，它还必须是强不可操纵的（以下简称为 k-SNM-$\alpha$），也就是说，没有任何一个由 $leq k$ 小组组成的子集可以固定它们之间的匹配，以增加其任何一个成员被选中的概率超过 $\alpha$。我们的贡献有三方面。首先，我们考虑将 [Schneider 等人，2017] 中的 "随机单败淘汰赛"（Randomized Single Elimination Bracket）规则自然推广到 $d$-ary 树，并提供其可操作性的上限。然后，我们提出了一个 CC 和 3-SNM-1/2 的新锦标赛规则，这是对 [Dinev and Weinberg, 2022] 目前工作的严格改进，后者提出了一个 CC 和 3-SNM-31/60 规则。最后，我们开始研究锦标赛规则之间的还原。

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arXiv - CS - Computer Science and Game Theory

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