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European Actuarial Journal

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01.07.2015 | Original Research Paper

Goodness-of-fit tests and applications for left-truncated Weibull distributions to non-life insurance

verfasst von: Markus Kreer, Ayşe Kızılersü, Anthony W. Thomas, Alfredo D. Egídio dos Reis

Erschienen in: European Actuarial Journal | Ausgabe 1/2015

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Abstract

In risk theory with application to insurance, the identification of the relevant distributions for both the counting and the claim size processes from given observations is of major importance. In some situations left-truncated distributions can be used to model, not only the single claim severity, but also the inter-arrival times between two consecutive claims. We show that left-truncated Weibull distributions are particularly relevant, especially for the claim severity distribution. For that, we first demonstrate how the parameters can be estimated consistently from the data, and then show how a Kolmogorov-Smirnov goodness-of-fit test can be set up using modified critical values. These critical values are universal to all left-truncated Weibull distributions, independent of the actual Weibull parameters. To illustrate our findings we analyse three applications using real insurance data, one from a Swiss excess of loss treaty over automobile insurance, another from an American private passenger automobile insurance and a third from earthquake inter-arrival times in California.

Vorheriger Artikel Catastrophe risk bonds with applications to earthquakes

Nächster Artikel Is it optimal to group policyholders by age, gender, and seniority for BEL computations based on model points?

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In our study the left-truncation parameter \(x_L>0\) is known and not to be confused with the unknown location parameter \(x_0\) of the 3-parameter Weibull distribution. Here, we only consider 2-parameter Weibull distributions.

Due to a scaling property of the Weibull distribution, first noted for the complete Weibull sample by [32], the modified critical values are independent of various parameter combinations of \(\alpha\) and \(\beta\). Our results show that although the CVs depend predominantly on the sample size, there is also a slight dependence on the truncation value. This dependence leads us to two sets of critical values: one anti-conservative and one conservative test. The difference between using conservative and anti-conservative CVs leads to an error of the first kind less than 2%.

Statements 1. and 3. actually follow for MLE from statement 2. but we have kept them in the theorem to be consistent with Lehmann & Casella [20]).

From this point onwards we will drop the index \(n\) and use \(\hat{\alpha }\) and \(\hat{\beta }\).

In the table, the theoretical truncated percentage is estimated as \(\approx 90\%\) using the relation \(\rho =1-e^{-\eta }\) by assuming that the untruncated data set is Weibull. Since we do not have the complete data set and the sample size is small this value should be considered a very rough approximation.

Note that \(\xi =\hat{\beta }/\beta ^0\) is the unique solution to the MLE equation Eq. (22) which is equivalent to the original MLE Eq. (6). For the existence of the unique solution Lemma 1 requires the inequality Eq. (8) to be satisfied. In our notation using Eq. (20) this means \(2 \cdot \left( \frac{1}{n} \sum _{i=1}^{n} \log {(1+\eta ^{-1}y_i )} \right) ^{2} > \frac{1}{n} \sum _{i=1}^{n} \log ^{2}{(1+\eta ^{-1}y_i )}\), which depends only on sample size \(n\), parameter \(\eta\) and some sample of standard exponential random variables \(y_1,...,y_n\).

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Titel: Goodness-of-fit tests and applications for left-truncated Weibull distributions to non-life insurance
verfasst von: Markus Kreer
Ayşe Kızılersü
Anthony W. Thomas
Alfredo D. Egídio dos Reis
Publikationsdatum: 01.07.2015
Verlag: Springer Berlin Heidelberg
Erschienen in: European Actuarial Journal / Ausgabe 1/2015
Print ISSN: 2190-9733
Elektronische ISSN: 2190-9741
DOI: https://doi.org/10.1007/s13385-015-0105-8

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