Arbeitspapier

Condorcet domains, median graphs and the single-crossing property

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Condorcet domains are sets of linear orders with the property that, whenever the preferences of all voters of a society belong to this set, their majority relation has no cycles. We observe that, without loss of generality, every such domain can be assumed to be closed in the sense that it contains the majority relation of every profile with an odd number of voters whose preferences belong to this domain. We show that every closed Condorcet domain can be endowed with the structure of a median graph and that, conversely, every median graph is associated with a closed Condorcet domain (in general, not uniquely). Condorcet domains that have linear graphs (chains) associated with them are exactly the preference domains with the classical single-crossing property. As a corollary, we obtain that a domain with the so-called 'representative voter property' is either a single-crossing domain or a very special domain containing exactly four different preference orders whose associated median graph is a 4-cycle. Maximality of a Condorcet domain imposes additional restrictions on the associated median graph. We prove that among all trees only (some) chains can be associated graphs of maximal Condorcet domains, and we characterize those single-crossing domains which are maximal Condorcet domains. Finally, using the characterization of Nehring and Puppe [2007] of monotone Arrovian aggregation, our analysis yields a rich class of strategy-proof social choice functions on any closed Condorcet domain.

Sprache
Englisch

Erschienen in
Series: KIT Working Paper Series in Economics ; No. 92

Klassifikation
Wirtschaft
Social Choice; Clubs; Committees; Associations
Noncooperative Games
Thema
social choice
Condorcet domains
acyclic sets of linear orders
median graphs
single-crossing property
distributive lattice
Arrovian aggregation
strategy-proofness
intermediate preferences

Ereignis
Geistige Schöpfung
(wer)
Puppe, Clemens
Slinko, Arkadii
Ereignis
Veröffentlichung
(wer)
Karlsruher Institut für Technologie (KIT), Institut für Volkswirtschaftslehre (ECON)
(wo)
Karlsruhe
(wann)
2016

DOI
doi:10.5445/IR/1000061997
Handle
URN
urn:nbn:de:swb:90-619975
Letzte Aktualisierung
10.03.2025, 11:44 MEZ

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Objekttyp

  • Arbeitspapier

Beteiligte

  • Puppe, Clemens
  • Slinko, Arkadii
  • Karlsruher Institut für Technologie (KIT), Institut für Volkswirtschaftslehre (ECON)

Entstanden

  • 2016

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