Three brief proofs of Arrow?s Impossibility Theorem
Author(s) -
John Geanakoplos
Publication year - 2004
Publication title -
economic theory
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.572
H-Index - 58
eISSN - 1432-0479
pISSN - 0938-2259
DOI - 10.1007/s00199-004-0556-7
Subject(s) - arrow's impossibility theorem , mathematical proof , arrow , mathematical economics , social choice theory , dictator , condorcet method , impossibility , neutrality , ranking (information retrieval) , mathematics , voting , computer science , law , political science , politics , machine learning , geometry , programming language
Arrow’s original proof of his impossibility theorem proceeded in two steps: showing the existence of a decisive voter, and then showing that a decisive voter is a dictator. Barbera replaced the decisive voter with the weaker notion of a pivotal voter, thereby shortening the first step, but complicating the second step. I give three brief proofs, all of which turn on replacing the decisive/pivotal voter with an extremely pivotal voter (a voter who by unilaterally changing his vote can move some alternative from the bottom of the social ranking to the top), thereby simplifying both steps in Arrow’s proof. My first proof is the most straightforward, and the second uses Condorcet preferences (which are transformed into each other by moving the bottom alternative to the top). The third proof proceeds by reinterpreting Step 1 of the first proof as saying that all social decisions are made the same way (neutrality). Copyright Springer-Verlag Berlin/Heidelberg 2005Arrow Impossibility Theorem, Pivotal, Neutrality.,
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