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Characterizations of voting rules based on majority margins

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  • Yifeng Ding
  • Wesley H. Holliday
  • Eric Pacuit

Abstract

In the context of voting with ranked ballots, an important class of voting rules is the class of margin-based rules (also called pairwise rules). A voting rule is margin-based if whenever two elections generate the same head-to-head margins of victory or loss between candidates, then the voting rule yields the same outcome in both elections. Although this is a mathematically natural invariance property to consider, whether it should be regarded as a normative axiom on voting rules is less clear. In this paper, we address this question for voting rules with any kind of output, whether a set of candidates, a ranking, a probability distribution, etc. We prove that a voting rule is margin-based if and only if it satisfies some axioms with clearer normative content. A key axiom is what we call Preferential Equality, stating that if two voters both rank a candidate $x$ immediately above a candidate $y$, then either voter switching to rank $y$ immediately above $x$ will have the same effect on the election outcome as if the other voter made the switch, so each voter's preference for $y$ over $x$ is treated equally.

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  • Yifeng Ding & Wesley H. Holliday & Eric Pacuit, 2025. "Characterizations of voting rules based on majority margins," Papers 2501.08595, arXiv.org.
    • Handle: RePEc:arx:papers:2501.08595
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    References listed on IDEAS

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    1. Wesley H. Holliday, 2024. "An impossibility theorem concerning positive involvement in voting," Papers 2401.05657, arXiv.org, revised Feb 2024.
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