Mack’s estimator motivated by large exposure asymptotics in a compound poisson setting

Nils Engler, Filip Lindskog
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Abstract

The distribution-free chain ladder of Mack justified the use of the chain ladder predictor and enabled Mack to derive an estimator of conditional mean squared error of prediction for the chain ladder predictor. Classical insurance loss models, that is of compound Poisson type, are not consistent with Mack’s distribution-free chain ladder. However, for a sequence of compound Poisson loss models indexed by exposure (e.g., number of contracts), we show that the chain ladder predictor and Mack’s estimator of conditional mean squared error of prediction can be derived by considering large exposure asymptotics. Hence, quantifying chain ladder prediction uncertainty can be done with Mack’s estimator without relying on the validity of the model assumptions of the distribution-free chain ladder.
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复合泊松背景下以大暴露渐近为动机的马克估计器
Mack 的无分布链梯证明了使用链梯预测器的合理性,并使 Mack 能够推导出链梯预测器的条件均方误差估计值。经典的保险损失模型,即复合泊松类型,与 Mack 的无分布链梯不一致。然而,对于一连串以风险敞口(如合同数量)为指标的复合泊松损失模型,我们证明链梯预测器和 Mack 的预测条件均方误差估计值可以通过考虑大风险敞口渐近线而得出。因此,量化链梯预测的不确定性可以使用 Mack 估计器,而无需依赖无分布链梯模型假设的有效性。
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