状态空间模型在随机索赔保留中的应用

IF 1.7 3区 经济学 Q2 ECONOMICS
ASTIN Bulletin Pub Date : 2020-11-24 DOI:10.1017/asb.2020.38
R. Hendrych, T. Cipra
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引用次数: 4

摘要

摘要本文利用卡尔曼递归解决了线性状态空间模型中的损失保留问题。特别是,如果一个命令从径流三角形中声明数据到缺少观测值的时间序列,那么状态空间公式可以应用于IBNR(已发生但未报告)储量的预测或插值。也就是说,相应的卡尔曼递推算法对缺失或未来观测的输出可以作为IBNR预测。特别是,通过这种递归程序,人们可以进行有效的模拟,以便在数字上估计IBNR索赔的分布,这在设定和(或)监测损失准备金的审慎水平方面可能非常有用。此外,可以将这种方法推广到相关业务线的几个依赖的径流三角形的多变量情况,并且索赔数据中的异常值也可以用这种方式有效地处理。对几组索赔数据(单变量和多变量)进行了数值研究。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
APPLYING STATE SPACE MODELS TO STOCHASTIC CLAIMS RESERVING
Abstract The paper solves the loss reserving problem using Kalman recursions in linear statespace models. In particular, if one orders claims data from run-off triangles to time series with missing observations, then state space formulation can be applied for projections or interpolations of IBNR (Incurred But Not Reported) reserves. Namely, outputs of the corresponding Kalman recursion algorithms for missing or future observations can be taken as the IBNR projections. In particular, by means of such recursive procedures one can perform effectively simulations in order to estimate numerically the distribution of IBNR claims which may be very useful in terms of setting and/or monitoring of prudency level of loss reserves. Moreover, one can generalize this approach to the multivariate case of several dependent run-off triangles for correlated business lines and the outliers in claims data can be also treated effectively in this way. Results of a numerical study for several sets of claims data (univariate and multivariate ones) are presented.
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来源期刊
ASTIN Bulletin
ASTIN Bulletin 数学-数学跨学科应用
CiteScore
3.20
自引率
5.30%
发文量
24
审稿时长
>12 weeks
期刊介绍: ASTIN Bulletin publishes papers that are relevant to any branch of actuarial science and insurance mathematics. Its papers are quantitative and scientific in nature, and draw on theory and methods developed in any branch of the mathematical sciences including actuarial mathematics, statistics, probability, financial mathematics and econometrics.
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