Condorcet-Consistent and Approximately Strategyproof Tournament Rules
Abstract
We consider the manipulability of tournament rules for round-robin tournaments of competitors. Specifically, competitors are competing for a prize, and a tournament rule maps the result of all pairwise matches (called a tournament, ) to a distribution over winners. Rule is Condorcet-consistent if whenever wins all of her matches, selects with probability . We consider strategic manipulation of tournaments where player might throw their match to player in order to increase the likelihood that one of them wins the tournament. Regardless of the reason why chooses to do this, the potential for manipulation exists as long as increases by more than decreases. Unfortunately, it is known that every Condorcet-consistent rule is manipulable (Altman and Kleinberg). In this work, we address the question of how manipulable Condorcet-consistent rules must necessarily be - by trying to minimize the difference between the increase in and decrease in for any potential manipulating pair. We show that every Condorcet-consistent rule is in fact -manipulable, and that selecting a winner according to a random single elimination bracket is not -manipulable for any . We also show that many previously studied tournament formats are all -manipulable, and the popular class of Copeland rules (any rule that selects a player with the most wins) are all in fact -manipulable, the worst possible. Finally, we consider extensions to match-fixing among sets of more than two players.
Keywords
Cite
@article{arxiv.1605.09733,
title = {Condorcet-Consistent and Approximately Strategyproof Tournament Rules},
author = {Jon Schneider and Ariel Schvartzman and S. Matthew Weinberg},
journal= {arXiv preprint arXiv:1605.09733},
year = {2016}
}
Comments
20 pages