Strategy-proof voting rules on a multidimensional policy space for a continuum of voters with elliptic preferences

H.J.M. Peters; S. Roy; A.J.A. Storcken

doi:10.1007/s13209-011-0048-5

Strategy-proof voting rules on a multidimensional policy space for a continuum of voters with elliptic preferences

H.J.M. Peters^*, S. Roy, A.J.A. Storcken

^*Corresponding author for this work

Research output: Contribution to journal › Article › Academic › peer-review

Abstract

We consider voting rules on a multidimensional policy space for a continuum of voters with elliptic preferences. Assuming continuity, gamma-strategy-proofness-meaning that coalitions of size smaller or equal to a small number gamma cannot manipulate-and unanimity, we show that such rules are decomposable into one-dimensional rules. Requiring, additionally, anonymity leads to an impossibility result. The paper can be seen as an extension of the model of Border and Jordan (1983) to a continuum of voters. Contrary, however, to their finite case where single voters are atoms, in our model with nonatomic voters even a small amount of strategy-proofness leads to an impossibility.

Original language	English
Pages (from-to)	485-496
Number of pages	12
Journal	SERIEs : Journal of the Spanish Economic Association
Volume	2
Issue number	4
DOIs	https://doi.org/10.1007/s13209-011-0048-5
Publication status	Published - Dec 2011

Keywords

Strategy-proof voting
Continuum of voters
Multidimensional policy space
Elliptic preferences
CHOICE

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10.1007/s13209-011-0048-5Licence: CC BY

Cite this

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KW - Strategy-proof voting

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KW - CHOICE

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