关于随机 OBIC 规则的一些进一步结果

IF 0.5 4区经济学 Q4 ECONOMICS

Mathematical Social Sciences Pub Date : 2024-08-16 DOI:10.1016/j.mathsocsci.2024.08.005

Madhuparna Karmokar , Dipjyoti Majumdar , Souvik Roy

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引用次数: 0

摘要

我们研究了概率投票规则的结构，这些规则在独立分布的先验信念方面是顺序贝叶斯激励兼容（OBIC）的，可被视为通用规则（Majumdar 和 Sen (2004)）。我们首先确定一类先验，对于该类先验中的每个先验，都存在一种概率投票规则，该规则对 "折中 "候选人赋予正概率权重。该类先验包括一般先验。接下来，我们考虑一类具有 "有限范围 "的随机投票规则。对于这一类规则，我们确定了一个关于先验的适当的通用条件，这样，当且仅当该规则是一个随机独裁规则时，这一类规则中的任何规则对于满足通用条件的先验都是 OBIC 的。

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Some further results on random OBIC rules

We study the structure of probabilistic voting rules that are ordinal Bayesian incentive compatible (OBIC) with respect to independently distributed prior beliefs that can be considered generic (Majumdar and Sen (2004)). We first identify a class of priors, such that for each prior in that class there exists a probabilistic voting rule that puts a positive probability weight on “compromise” candidates. The class of priors include generic priors. Next, we consider a class of randomized voting rules that have a “finite range”. For this class of rules, we identify an appropriate generic condition on priors such that, any rule in this class is OBIC with respect to a prior satisfying the generic condition if and only if the rule is a random dictatorship.

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来源期刊

Mathematical Social Sciences 数学-数学跨学科应用

CiteScore

1.30

自引率

0.00%

发文量

审稿时长

59 days

期刊介绍： The international, interdisciplinary journal Mathematical Social Sciences publishes original research articles, survey papers, short notes and book reviews. The journal emphasizes the unity of mathematical modelling in economics, psychology, political sciences, sociology and other social sciences. Topics of particular interest include the fundamental aspects of choice, information, and preferences (decision science) and of interaction (game theory and economic theory), the measurement of utility, welfare and inequality, the formal theories of justice and implementation, voting rules, cooperative games, fair division, cost allocation, bargaining, matching, social networks, and evolutionary and other dynamics models. Papers published by the journal are mathematically rigorous but no bounds, from above or from below, limits their technical level. All mathematical techniques may be used. The articles should be self-contained and readable by social scientists trained in mathematics.