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Autori principali: Döring, Michelle, Peters, Jannik
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2408.06873
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author Döring, Michelle
Peters, Jannik
author_facet Döring, Michelle
Peters, Jannik
contents Determining how close a winner of an election is to becoming a loser, or distinguishing between different possible winners of an election, are major problems in computational social choice. We tackle these problems for so-called weighted tournament solutions by generalizing the notion of margin of victory (MoV) for tournament solutions by Brill et. al to weighted tournament solutions. For these, the MoV of a winner (resp. loser) is the total weight that needs to be changed in the tournament to make them a loser (resp. winner). We study three weighted tournament solutions: Borda's rule, the weighted Uncovered Set, and Split Cycle. For all three rules, we determine whether the MoV for winners and non-winners is tractable and give upper and lower bounds on the possible values of the MoV. Further, we axiomatically study and generalize properties from the unweighted tournament setting to weighted tournaments.
format Preprint
id arxiv_https___arxiv_org_abs_2408_06873
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Margin of Victory for Weighted Tournament Solutions
Döring, Michelle
Peters, Jannik
Computer Science and Game Theory
Determining how close a winner of an election is to becoming a loser, or distinguishing between different possible winners of an election, are major problems in computational social choice. We tackle these problems for so-called weighted tournament solutions by generalizing the notion of margin of victory (MoV) for tournament solutions by Brill et. al to weighted tournament solutions. For these, the MoV of a winner (resp. loser) is the total weight that needs to be changed in the tournament to make them a loser (resp. winner). We study three weighted tournament solutions: Borda's rule, the weighted Uncovered Set, and Split Cycle. For all three rules, we determine whether the MoV for winners and non-winners is tractable and give upper and lower bounds on the possible values of the MoV. Further, we axiomatically study and generalize properties from the unweighted tournament setting to weighted tournaments.
title Margin of Victory for Weighted Tournament Solutions
topic Computer Science and Game Theory
url https://arxiv.org/abs/2408.06873