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Main Authors: Contet, Clément, Grandi, Umberto, Mengin, Jérôme
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2509.09312
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author Contet, Clément
Grandi, Umberto
Mengin, Jérôme
author_facet Contet, Clément
Grandi, Umberto
Mengin, Jérôme
contents Tournaments are widely used models to represent pairwise dominance between candidates, alternatives, or teams. We study the problem of providing certified explanations for why a candidate appears among the winners under various tournament rules. To this end, we identify minimal supports, minimal sub-tournaments in which the candidate is guaranteed to win regardless of how the rest of the tournament is completed (that is, the candidate is a necessary winner of the sub-tournament). This notion corresponds to an abductive explanation for the question,"Why does the winner win the tournament?", a central concept in formal explainable AI. We focus on common tournament solutions: the top cycle, the uncovered set, the Copeland rule, the Borda rule, the maximin rule, and the weighted uncovered set. For each rule we determine the size of the smallest minimal supports, and we present polynomial-time algorithms to compute them for all solutions except for the weighted uncovered set, for which the problem is NP-complete. Finally, we show how minimal supports can serve to produce compact, certified, and intuitive explanations for tournament solutions.
format Preprint
id arxiv_https___arxiv_org_abs_2509_09312
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Explaining Tournament Solutions with Minimal Supports
Contet, Clément
Grandi, Umberto
Mengin, Jérôme
Artificial Intelligence
Tournaments are widely used models to represent pairwise dominance between candidates, alternatives, or teams. We study the problem of providing certified explanations for why a candidate appears among the winners under various tournament rules. To this end, we identify minimal supports, minimal sub-tournaments in which the candidate is guaranteed to win regardless of how the rest of the tournament is completed (that is, the candidate is a necessary winner of the sub-tournament). This notion corresponds to an abductive explanation for the question,"Why does the winner win the tournament?", a central concept in formal explainable AI. We focus on common tournament solutions: the top cycle, the uncovered set, the Copeland rule, the Borda rule, the maximin rule, and the weighted uncovered set. For each rule we determine the size of the smallest minimal supports, and we present polynomial-time algorithms to compute them for all solutions except for the weighted uncovered set, for which the problem is NP-complete. Finally, we show how minimal supports can serve to produce compact, certified, and intuitive explanations for tournament solutions.
title Explaining Tournament Solutions with Minimal Supports
topic Artificial Intelligence
url https://arxiv.org/abs/2509.09312