Pricing in a Competitive Stochastic Insurance Market

Human Behavior & Game Theory eJournal Pub Date : 2020-09-02 DOI:10.2139/ssrn.3685009

Fotios Mourdoukoutas, T. Boonen, B. Koo, A. Pantelous

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引用次数: 5

Abstract

Abstract This paper studies a one-period stochastic game to determine the optimal premium strategies of non-life insurers in a competitive market. Specifically, the optimal premium strategy is determined by the Nash equilibrium of an n -player game, in which each player is assumed to maximise the expected utility of terminal wealth. The terminal wealth is stochastic, since the number of policies and the size of claims are considered to be random variables. The total loss of each insurer is described by the collective risk model. The expected number of policies is affected by all the premiums in the market and further investigated by two distinct demand functions. Both models have an exponential functional form, that is characterised by market and price sensitivity parameters. The demand in the first model is zero for premiums above a given threshold, whereas the second model does not include such restriction. The pure strategy Nash equilibrium premiums are given as solutions to constrained optimisation problems. For the first model we prove the existence and uniqueness of a pure strategy Nash equilibrium, whereas for the second model we provide a formula when it exists. Two numerical examples are provided to illustrate the applicability of our findings.

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竞争随机保险市场中的定价

摘要研究了竞争市场中非寿险保险公司最优保费策略的单周期随机博弈问题。具体来说，最优溢价策略是由n人博弈的纳什均衡决定的，其中每个参与者都被假设最大化终端财富的预期效用。最终财富是随机的，因为保单的数量和索赔的规模被认为是随机变量。各保险公司的总损失由集体风险模型来描述。保单的预期数量受市场上所有保费的影响，并由两个不同的需求函数进一步研究。这两个模型都具有指数函数形式，其特征是市场和价格敏感性参数。在第一个模型中，超过给定阈值的保费需求为零，而第二个模型不包括这种限制。给出了纯策略纳什均衡溢价作为约束优化问题的解。对于第一个模型，我们证明了纯策略纳什均衡的存在唯一性，而对于第二个模型，我们给出了它存在时的公式。给出了两个数值例子来说明我们的发现的适用性。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Human Behavior & Game Theory eJournal

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