具有时间偏差的近期和远期偏好的α-MaxMin效用表示

IF 1 4区 经济学 Q3 ECONOMICS Journal of Mathematical Economics Pub Date : 2023-10-31 DOI:10.1016/j.jmateco.2023.102916
Jean-Pierre Drugeon , Thai Ha-Huy
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引用次数: 0

摘要

本文提供了一个框架,用于理解跨不同时间段的实用程序流的偏好。我们分析了近期偏好、远期偏好以及两者的综合偏好,建立了一个涉及时间段权重的表示。检查两个实用程序流不能健壮地相互比较的场景,我们引入了一个比另一个更有“潜力”的概念,这导致了MaxMin, MaxMax和α-MaxMin表示。最后,我们考虑了违反平稳性形式的时间偏差。对于近未来偏好,我们得到了准双曲折现的推广。对于远期偏好,我们得到了Banach极限,并讨论了与指数折现的关系。
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An α-MaxMin utility representation for close and distant future preferences with temporal biases

This paper provides a framework for understanding preferences over utility streams across different time periods. We analyze preferences for the close future, for the distant future, and a synthesis of both, establishing a representation involving weights over time periods. Examining scenarios where two utility streams cannot be robustly compared to each other, we introduce notions in which one has more “potential” to be preferred over another, which lead to MaxMin, MaxMax, and α-MaxMin representations. Finally, we consider temporal bias in the form of violations of stationarity. For close future preferences, we obtain a generalization of quasi-hyperbolic discounting. For distant future preferences, we obtain Banach limits and discuss the relationship with exponential discounting.

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来源期刊
Journal of Mathematical Economics
Journal of Mathematical Economics 管理科学-数学跨学科应用
CiteScore
1.70
自引率
7.70%
发文量
73
审稿时长
12.5 weeks
期刊介绍: The primary objective of the Journal is to provide a forum for work in economic theory which expresses economic ideas using formal mathematical reasoning. For work to add to this primary objective, it is not sufficient that the mathematical reasoning be new and correct. The work must have real economic content. The economic ideas must be interesting and important. These ideas may pertain to any field of economics or any school of economic thought.
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