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Note on compromise axiom

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  • Hatzivelkos, Aleksandar

Abstract

The concept of compromise has been present in the theory of social choice from the very beginning. The result of social choice functions as such is often called a social compromise. In the last two decades, several functions of social choice dedicated to the concept of compromise, such as Fallback bargaining, Majoritarian compromise, Median voting rule or p-measure of compromise rules, have been considered in the literature. Furthermore, compromise axioms were formed in several attempts. However, we believe that the previous formalizations of compromise did not axiomatically describe this feature of the social choice functions. In this paper we will follow the line of thought presented by Chatterji, Sen and Zeng (2016) and form a weak and strong version of a Compromise axiom, one that should capture understanding of compromise based on an ability to elect a winner which is not top-ranked in any preference on a profile. After that we will analyze an interaction of those axioms and established social choice functions. We will show that the division of SCFs in three classes with respect to these axioms fairly reflect relationship between those SCFs and colloquial expectations from notion of compromise. We then compare the defined axioms with the compromise axioms of Börgers and Cailloux. Finally, for SCFs that satisfy the strong compromise axiom, we define a compromise intensity function that numerically expresses the degree of tolerance of the SCF for choosing a compromise candidate.

Suggested Citation

  • Hatzivelkos, Aleksandar, 2024. "Note on compromise axiom," Mathematical Social Sciences, Elsevier, vol. 130(C), pages 38-47.
    • Handle: RePEc:eee:matsoc:v:130:y:2024:i:c:p:38-47
    DOI: 10.1016/j.mathsocsci.2024.06.003
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    References listed on IDEAS

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    1. Steven J. Brams & D. Marc Kilgour, 2001. "Fallback Bargaining," Group Decision and Negotiation, Springer, vol. 10(4), pages 287-316, July.
    2. Chatterji, Shurojit & Sen, Arunava & Zeng, Huaxia, 2016. "A characterization of single-peaked preferences via random social choice functions," Theoretical Economics, Econometric Society, vol. 11(2), May.
    3. Ronan Congar & Vincent Merlin, 2012. "A characterization of the maximin rule in the context of voting," Theory and Decision, Springer, vol. 72(1), pages 131-147, January.
    4. Mukherjee, Saptarshi, 2018. "Implementation in undominated strategies by bounded mechanisms: Some results on compromise alternatives," Research in Economics, Elsevier, vol. 72(3), pages 384-391.
    5. Vincent Merlin & İpek Özkal Sanver & M. Remzi Sanver, 2019. "Compromise Rules Revisited," Group Decision and Negotiation, Springer, vol. 28(1), pages 63-78, February.
    6. Olivier Cailloux & Beatrice Napolitano & M. Remzi Sanver, 2023. "Compromising as an equal loss principle," Review of Economic Design, Springer;Society for Economic Design, vol. 27(3), pages 547-560, September.
    7. Aleksandar Hatzivelkos, 2018. "Borda and Plurality Comparison with Regard to Compromise as a Sorites Paradox," Interdisciplinary Description of Complex Systems - scientific journal, Croatian Interdisciplinary Society Provider Homepage: http://indecs.eu, vol. 16(3-B), pages 465-484.
    8. Kurihara, Takashi, 2018. "A simple characterization of the anti-plurality rule," Economics Letters, Elsevier, vol. 168(C), pages 110-111.
    9. İpek Özkal-Sanver & M. Remzi Sanver, 2004. "Efficiency in the Degree of Compromise: A New Axiom for Social Choice," Group Decision and Negotiation, Springer, vol. 13(4), pages 375-380, July.
    10. Bilge Yilmaz & Murat R. Sertel, 1999. "The majoritarian compromise is majoritarian-optimal and subgame-perfect implementable," Social Choice and Welfare, Springer;The Society for Social Choice and Welfare, vol. 16(4), pages 615-627.
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