采用均值--偏差测量法的最佳保险

IF 1.9 2区 经济学 Q2 ECONOMICS Insurance Mathematics & Economics Pub Date : 2024-05-24 DOI:10.1016/j.insmatheco.2024.05.005
Tim J. Boonen , Xia Han
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引用次数: 0

摘要

本文研究的是一个最优保险缔约问题,在这个问题中,决策者的偏好由预期损失与偏差度量的凸增函数之和给出。关于偏差度量,我们的重点是凸符号 Choquet 积分(如基尼系数和减去预期值的凸扭曲风险度量)和标准偏差。我们发现,如果采用预期值溢价原则,那么止损赔偿是最优的,我们还提供了相应免赔额的精确描述。此外,如果保费原则是基于风险价值或预期亏损,那么一种特殊的分层型赔偿就是最优的,即对限额以内的小额损失进行赔偿,对超出另一个免赔额的损失进行赔偿。如果对保险费预算有限制,这些最优赔偿的结构保持不变。如果无约束解决方案不可行,则提高免赔额,使预算约束具有约束力。我们根据基尼系数和标准差提供了这些结果的几个例子。
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Optimal insurance with mean-deviation measures

This paper studies an optimal insurance contracting problem in which the preferences of the decision maker are given by the sum of the expected loss and a convex, increasing function of a deviation measure. As for the deviation measure, our focus is on convex signed Choquet integrals (such as the Gini coefficient and a convex distortion risk measure minus the expected value) and on the standard deviation. We find that if the expected value premium principle is used, then stop-loss indemnities are optimal, and we provide a precise characterization of the corresponding deductible. Moreover, if the premium principle is based on Value-at-Risk or Expected Shortfall, then a particular layer-type indemnity is optimal, in which there is coverage for small losses up to a limit, and additionally for losses beyond another deductible. The structure of these optimal indemnities remains unchanged if there is a limit on the insurance premium budget. If the unconstrained solution is not feasible, then the deductible is increased to make the budget constraint binding. We provide several examples of these results based on the Gini coefficient and the standard deviation.

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来源期刊
Insurance Mathematics & Economics
Insurance Mathematics & Economics 管理科学-数学跨学科应用
CiteScore
3.40
自引率
15.80%
发文量
90
审稿时长
17.3 weeks
期刊介绍: Insurance: Mathematics and Economics publishes leading research spanning all fields of actuarial science research. It appears six times per year and is the largest journal in actuarial science research around the world. Insurance: Mathematics and Economics is an international academic journal that aims to strengthen the communication between individuals and groups who develop and apply research results in actuarial science. The journal feels a particular obligation to facilitate closer cooperation between those who conduct research in insurance mathematics and quantitative insurance economics, and practicing actuaries who are interested in the implementation of the results. To this purpose, Insurance: Mathematics and Economics publishes high-quality articles of broad international interest, concerned with either the theory of insurance mathematics and quantitative insurance economics or the inventive application of it, including empirical or experimental results. Articles that combine several of these aspects are particularly considered.
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