Dirichlet Process Log Skew-Normal Mixture with a Missing-at-Random-Covariate in Insurance Claim Analysis

IF 1.1 Q3 ECONOMICS
Minkun Kim, David Lindberg, Martin Crane, Marija Bezbradica
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引用次数: 0

Abstract

In actuarial practice, the modeling of total losses tied to a certain policy is a nontrivial task due to complex distributional features. In the recent literature, the application of the Dirichlet process mixture for insurance loss has been proposed to eliminate the risk of model misspecification biases. However, the effect of covariates as well as missing covariates in the modeling framework is rarely studied. In this article, we propose novel connections among a covariate-dependent Dirichlet process mixture, log-normal convolution, and missing covariate imputation. As a generative approach, our framework models the joint of outcome and covariates, which allows us to impute missing covariates under the assumption of missingness at random. The performance is assessed by applying our model to several insurance datasets of varying size and data missingness from the literature, and the empirical results demonstrate the benefit of our model compared with the existing actuarial models, such as the Tweedie-based generalized linear model, generalized additive model, or multivariate adaptive regression spline.
保险索赔分析中缺少随机协变量的Dirichlet过程对数偏正态混合物
在精算实践中,由于复杂的分布特征,与某一保单相关的总损失建模是一项艰巨的任务。在最近的文献中,Dirichlet过程混合保险损失的应用已被提出,以消除模型错规范偏差的风险。然而,对协变量和缺失协变量在建模框架中的作用研究较少。在本文中,我们提出了协变量相关的狄利克雷过程混合物,对数正态卷积和缺失协变量插值之间的新联系。作为一种生成方法,我们的框架对结果和协变量的联合进行建模,使我们能够在随机缺失的假设下推算缺失的协变量。通过将我们的模型应用于文献中不同规模和数据缺失的几个保险数据集来评估性能,实证结果表明,与现有的精算模型(如基于tweedie的广义线性模型、广义加性模型或多元自适应回归样条)相比,我们的模型具有优势。
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
Econometrics
Econometrics Economics, Econometrics and Finance-Economics and Econometrics
CiteScore
2.40
自引率
20.00%
发文量
30
审稿时长
11 weeks
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