关于混合分数泊松过程的随机死亡率模型:精算估值中长程依赖性的校准和实证分析

IF 1.9 2区 经济学 Q2 ECONOMICS Insurance Mathematics & Economics Pub Date : 2024-08-14 DOI:10.1016/j.insmatheco.2024.08.001
Haoran Jiang, Zhehao Zhang, Xiaojun Zhu
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引用次数: 0

摘要

最近,许多研究都采用了分数随机死亡率过程来描述死亡率动态的长程依赖性(LRD)特征,而合适的非高斯分数模型却仍然较少。我们提出了一种由布朗运动和修正的分数泊松过程混合驱动的随机死亡率过程,以捕捉死亡率的长程依赖性。这种新的随机死亡率模型下的生存概率与现有的仿射形式死亡率模型保持了灵活性和一致性,这使得该模型便于在市场一致性方法下评估与死亡率挂钩的产品。生存概率公式还考虑了生存数据的历史信息,使模型能够捕捉生命的历史健康记录。我们提出的模型在实证分析中体现了 LRD 特性,包括基于日本和英国最近一代数据对生存曲线进行校准和预测。最后,对年金定价的实证分析说明了精算估值中是否涉及这一特征的差异。
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Stochastic mortality model with respect to mixed fractional Poisson process: Calibration and empirical analysis of long-range dependence in actuarial valuation

Recently, many studies have adopted the fractional stochastic mortality process in characterising the long-range dependence (LRD) feature of mortality dynamics, while there are still fewer appropriate non-Gaussian fractional models to describe it. We propose a stochastic mortality process driven by a mixture of Brownian motion and modified fractional Poisson process to capture the LRD of mortality rates. The survival probability under this new stochastic mortality model keeps flexibility and consistency with existing affine-form mortality models, which makes the model convenient in evaluating mortality-linked products under the market-consistent method. The formula of survival probability also considers the historical information from survival data, which enables the model to capture historical health records of lives. The LRD feature is reflected by our proposed model in the empirical analysis, which includes the calibration and prediction of survival curves based on recent generation data in Japan and the UK. Finally, the consequent empirical analysis of annuity pricing illustrates the difference of whether this feature is involved in actuarial valuation.

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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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