制度切换型保险公司的最佳投资和再保险策略

IF 0.9 3区 经济学 Q3 BUSINESS, FINANCE
Weiwei Shen
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引用次数: 0

摘要

本文探讨了具有制度转换的保险公司的最优投资和再保险策略问题。在我们的数学模型中,无风险资产和风险资产被假定依赖于一个连续的时间同构、有限状态、观测马尔可夫链,而后者的价格动态则由一个一般的制度切换跳跃扩散过程来描述。我们将经典的索赔过程扩展为马尔可夫调制复合泊松过程。保险人面临的决策问题是选择将其盈余投资于金融市场并购买再保险,从而使其最终财富的预期功率效用最大化。我们运用动态程序设计原理,推导出制度转换的汉密尔顿-雅各比-贝尔曼(HJB)方程。然后,通过分析 HJB 方程的解,得到最优投资和再保险策略,并在验证定理中给出。最后,基于双状态马尔可夫链进行数值分析,以说明我们的结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Optimal investment and reinsurance strategies for an insurer with regime-switching

Optimal investment and reinsurance strategies for an insurer with regime-switching

This paper considers the issue of optimal investment and reinsurance strategies for an insurer with regime-switching. In our mathematical model, a risk-free asset and a risky asset are assumed to rely on a continuous time-homogeneous, finite-state, observed Markov chain, and the latter’s price dynamics is described by a general regime-switching jump-diffusion process. We are extending the classical claim process to a Markov-modulated compound Poisson process. The insurer faces the decision-making problem of choosing to invest his/her surplus in the financial market and purchase reinsurance such that the expected power utility of his/her terminal wealth is maximized. We apply dynamic programming principle to derive the regime-switching Hamilton–Jacobi–Bellman (HJB) equation. Then, by analysing the solutions of the HJB equation, the optimal investment and reinsurance strategies are obtained and given in the verification theorem. Finally, the numerical analysis based on a two-state Markov chain is presented to illustrate our results.

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来源期刊
Mathematics and Financial Economics
Mathematics and Financial Economics MATHEMATICS, INTERDISCIPLINARY APPLICATIONS -
CiteScore
2.80
自引率
6.20%
发文量
17
期刊介绍: The primary objective of the journal is to provide a forum for work in finance which expresses economic ideas using formal mathematical reasoning. The work should have real economic content and the mathematical reasoning should be new and correct.
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