The geometry of manipulation — A quantitative proof of the Gibbard-Satterthwaite theorem

Marcus Isaksson; Guy Kindler; Elchanan Mossel

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The geometry of manipulation — A quantitative proof of the Gibbard-Satterthwaite theorem

机译：操纵的几何-Gibbard-Satterthwaite定理的定量证明

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We prove a quantitative version of the Gibbard-Satterthwaite theorem. We show that a uniformly chosen voter profile for a neutral social choice function f of q ≥ 4 alternatives and n voters will be manipulable with probability at least 10−4∈2 n −3 q −30, where ∈ is the minimal statistical distance between f and the family of dictator functions.

机译：我们证明了Gibbard-Satterthwaite定理的定量形式。我们表明，对于q≥4个备选方案和n个投票者的中立社会选择函数f，一个统一选择的选民配置文件将具有至少10 −4 ∈ 2 n −3 q −30 ，其中∈是f与独裁者函数族之间的最小统计距离。

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《Combinatorica》 |2012年第2期|p.221-250|共30页
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Marcus Isaksson; Guy Kindler; Elchanan Mossel;
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4. The Geometry of Manipulation: A Quantitative Proof of the Gibbard-Satterthwaite Theorem [C] . Isaksson Marcus, Kindler Guy, Mossel Elchanan IEEE 51st Annual Symposium on Foundations of Computer Science . 2010

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7. The Geometry of Manipulation — A Quantitative Proof of the Gibbard Satterthwaite Theorem [O] . Isaksson, Marcus, Kindler, Guy, Mossel, Elchanan 2012

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8. Quantitative Gibbard-Satterthwaite Theorem Without Neutrality [R] . Mossel, E, Racz, M 2014

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The geometry of manipulation — A quantitative proof of the Gibbard-Satterthwaite theorem

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