A Bayesian Approach to Weibull Distribution with Application to Insurance Claims Data

IF 0.9 Q3 STATISTICS & PROBABILITY
H. Abubakar, Shamsul Rijal Muhammad Sabri
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引用次数: 3

Abstract

Statistical distributions are of great interest for actuaries in modelling and fitting the distribution of various data sets. It can be used to present a description of risk exposure on the investment, where the level of exposure to the risk can be determined by “key risk indicators” that usually are functions of the statistical model. Financial mathematicians and actuarial scientists often use such key risk indicators to determine the degree to which a particular company is subject to certain aspects of risk, which arise from changes in underlying variables such as prices of equity, interest rates fluctuations, or exchange rates. Weibull distribution is one of the most popular statistical distribution models employed by the actuarial and financial risk management problems in fitting and or in modelling the behaviours of financial data or lifetime event data to forecast stock pricing movement or uncertainly prediction. In this study, a Bayesian approach to the Weibull distribution model on the assumption of gamma prior to Weibull distribution parameters has been proposed. A computational study based on the actuarial measures is conducted, proving the proposed distribution of the claim amount. Along this line, in assessing the performance of the proposed method, the results of the simulations study have been conducted to explore the efficiency of the proposed estimators is compared to a maximum likelihood (MLE) and simulated annealing algorithm (SA). Finally, an actuarial real data set is analyzed, proving that the proposed model can be used effectively to model insurance claim data.
威布尔分布的贝叶斯方法及其在保险索赔数据中的应用
精算师对统计分布进行建模和拟合各种数据集的分布非常感兴趣。它可用于描述投资的风险敞口,其中风险敞口水平可由“关键风险指标”确定,这些指标通常是统计模型的函数。金融数学家和精算学家经常使用这些关键风险指标来确定特定公司在多大程度上受到某些方面的风险,这些风险源于股票价格、利率波动或汇率等基本变量的变化。威布尔分布是精算和金融风险管理问题中最流行的统计分布模型之一,用于拟合和/或建模金融数据或终身事件数据的行为,以预测股票定价变动或不确定性预测。在这项研究中,在假设伽马先于威布尔分布参数的情况下,提出了一种威布尔分布模型的贝叶斯方法。根据精算计量进行了计算研究,证明了索赔额的拟议分布。沿着这条线,在评估所提出的方法的性能时,已经进行了模拟研究的结果,以探索所提出的估计量的效率与最大似然(MLE)和模拟退火算法(SA)进行了比较。最后,对精算真实数据集进行了分析,证明了所提出的模型可以有效地用于保险索赔数据的建模。
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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来源期刊
CiteScore
1.60
自引率
12.50%
发文量
24
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