Multidimensional credibility: A new approach based on joint distribution function

Limin Wen, Wei Liu, Yiying Zhang
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Abstract

In the traditional multidimensional credibility models developed by Jewell ((1973) Operations Research Center, pp. 73–77.), the estimation of the hypothetical mean vector involves complex matrix manipulations, which can be challenging to implement in practice. Additionally, the estimation of hyperparameters becomes even more difficult in high-dimensional risk variable scenarios. To address these issues, this paper proposes a new multidimensional credibility model based on the conditional joint distribution function for predicting future premiums. First, we develop an estimator of the joint distribution function of a vector of claims using linear combinations of indicator functions based on past observations. By minimizing the integral of the expected quadratic distance function between the proposed estimator and the true joint distribution function, we obtain the optimal linear Bayesian estimator of the joint distribution function. Using the plug-in method, we obtain an explicit formula for the multidimensional credibility estimator of the hypothetical mean vector. In contrast to the traditional multidimensional credibility approach, our newly proposed estimator does not involve a matrix as the credibility factor, but rather a scalar. This scalar is composed of both population information and sample information, and it still maintains the essential property of increasingness with respect to the sample size. Furthermore, the new estimator based on the joint distribution function can be naturally extended and applied to estimate the process covariance matrix and risk premiums under various premium principles. We further illustrate the performance of the new estimator by comparing it with the traditional multidimensional credibility model using bivariate exponential-gamma and multivariate normal distributions. Finally, we present two real examples to demonstrate the findings of our study.
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多维可信度:基于联合分布函数的新方法
在 Jewell 开发的传统多维可信度模型中((1973 年)《运筹学研究中心》,第 73-77 页),假设均值向量的估计涉及复杂的矩阵操作,在实际操作中具有挑战性。此外,在高维风险变量情况下,超参数估计变得更加困难。为了解决这些问题,本文提出了一种新的基于条件联合分布函数的多维可信度模型,用于预测未来保费。首先,我们根据过去的观察结果,利用指标函数的线性组合,开发了一个索赔向量联合分布函数的估计器。通过最小化所提出的估计器与真实联合分布函数之间的预期二次距离函数的积分,我们得到了联合分布函数的最优线性贝叶斯估计器。利用插入法,我们得到了假设均值向量的多维可信度估计器的明确公式。与传统的多维可信度方法不同,我们新提出的估计器不涉及作为可信度因子的矩阵,而是一个标量。这个标量由人口信息和样本信息组成,它仍然保持了随样本量增加而增加的基本特性。此外,基于联合分布函数的新估计器可以自然扩展并应用于估计各种溢价原则下的过程协方差矩阵和风险溢价。通过与使用双变量指数-伽马分布和多变量正态分布的传统多维可信度模型进行比较,我们进一步说明了新估计器的性能。最后,我们列举了两个实际案例来证明我们的研究结果。
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