Abstract
Quantiles of probability distributions play a central role in the definition of risk measures (e.g., value-at-risk, conditional tail expectation) which in turn are used to capture the riskiness of the distribution tail. Estimates of risk measures are needed in many practical situations such as in pricing of extreme events, developing reserve estimates, designing risk transfer strategies, and allocating capital. In this paper, we present the empirical nonparametric and two types of parametric estimators of quantiles at various levels. For parametric estimation, we employ the maximum likelihood and percentile-matching approaches. Asymptotic distributions of all the estimators under consideration are derived when data are left-truncated and right-censored, which is a typical loss variable modification in insurance. Then, we construct relative efficiency curves (REC) for all the parametric estimators. Specific examples of such curves are provided for exponential and single-parameter Pareto distributions for a few data truncation and censoring cases. Additionally, using simulated data we examine how wrong quantile estimates can be when one makes incorrect modeling assumptions. The numerical analysis is also supplemented with standard model diagnostics and validation (e.g., quantile-quantile plots, goodness-of-fit tests, information criteria) and presents an example of when those methods can mislead the decision maker. These findings pave the way for further work on RECs with potential for them being developed into an effective diagnostic tool in this context.
Highlights
Quantiles of probability distributions play a central role in the definition of risk measures which in turn are used to capture the riskiness of the distribution tail
The appendix provides two asymptotic theorems of mathematical statistics and a detailed description of how to contruct relative efficiency curves (REC). These results are essential to analytic derivations in the paper, and we recommend the reader to review them first
We specify the estimators of quantiles of the ground-up distribution and derive their asymptotic distributions when the loss variable is affected by left truncation and right censoring
Summary
Quantiles of probability distributions play a central role in the definition of risk measures (e.g., value-at-risk, conditional tail expectation) which in turn are used to capture the riskiness of the distribution tail. What was discovered by these authors, is that fitting multiple models and using extensive model validation for each of them may not be sufficient if data are left-truncated That is, they used quantile-quantile plots, Kolmogorov-Smirnov (KS) and Anderson-Darling (AD) tests, Akaike and Bayesian information criteria (AIC and BIC) and had concluded that six different models are acceptable for each of the 12 data sets analyzed. Due to the presence of deductibles and policy limits in insurance contracts, data truncation and censoring are unavoidable modifications of the loss severity variable This suggests that quantile and, more generally, risk measure estimation requires careful thinking and analysis. We present the empirical nonparametric, maximum likelihood, and percentile-matching estimators of ground-up loss distribution quantiles (at various levels) Asymptotic distributions of these estimators are derived when data are left-truncated and right-censored. These results are essential to analytic derivations in the paper, and we recommend the reader to review them first
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