2018
DOI: 10.2139/ssrn.3232784
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Condorcet Winners and Social Acceptability

Abstract: We say that an alternative is socially acceptable if the number of individuals who rank it among their most preferred half of the alternatives is at least as large as the number of individuals who rank it among the least preferred half. A Condorcet winner may not be socially acceptable. However, if preferences are single-peaked or satisfy the single-crossing property, any Condorcet winner is socially acceptable.

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Cited by 2 publications
(3 citation statements)
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“…The proof of statement 1 results from Theorem 1 in Mahajne and Volij (2018b). However, we present a similar proof with some changes, for the use of statement 2.…”
Section: Proof Of Lemmamentioning
confidence: 93%
See 1 more Smart Citation
“…The proof of statement 1 results from Theorem 1 in Mahajne and Volij (2018b). However, we present a similar proof with some changes, for the use of statement 2.…”
Section: Proof Of Lemmamentioning
confidence: 93%
“…Now, by the definition of Condorcet committee à la Gehrlein, and since is a (weak) Condorcet winner, it must be that ∈ ℂ, because if ∉ ℂ, then any ∈ ℂ will not satisfy the requirement: ( ( ≻ ′ )) > ( ( ′ ≻ )), ∀ ′ ∈ \{ )}, just if we take ′ = . By Lemma 1 in Mahajne and Volij (2018b), must be socially acceptable. The next example completes the proof and shows that a Condorcet committee can be socially acceptable and can be partly unacceptable with respect to single-crossing profile.…”
Section: Condorcet Committees Under Single-crossing Preferencesmentioning
confidence: 99%
“…Also, q-majority decisiveness proposed byBaharad and Nitzan (2002) is a particular case of k = 1. A somewhat similar approach but for q-Condorcet consistency is developed byBaharad and Nitzan (2003),Courtin et al (2015), andMahajne and Volij (2018). All these approaches are based on worst-case analysis.…”
mentioning
confidence: 99%