Abstract
AbstractThreshold selection plays a key role in various aspects of statistical inference of rare events. In this work, two new threshold selection methods are introduced. The first approach measures the fit of the exponential approximation above a threshold and achieves good performance in small samples. The second method smoothly estimates the asymptotic mean squared error of the Hill estimator and performs consistently well over a wide range of processes. Both methods are analyzed theoretically, compared to existing procedures in an extensive simulation study and applied to a dataset of financial losses, where the underlying extreme value index is assumed to vary over time.
Publisher
Springer Science and Business Media LLC
Subject
Economics, Econometrics and Finance (miscellaneous),Engineering (miscellaneous),Statistics and Probability
Reference43 articles.
1. Bader, B., Yan, J., Zhang, X.: Automated threshold selection for extreme value analysis via ordered goodness-of-fit tests with adjustment for false discovery rate. Ann. Appl. Stat. 12, 310–329 (2018)
2. Beirlant, J., Dierckx, G., Guillou, A., Stǎricǎ, C.: On exponential representations of log-spacings of extreme order statistics. Extremes 5, 157–180 (2002)
3. Beirlant, J., Kijko, A., Reynkens, T., Einmahl, J.H.J.: Estimating the maximum possible earthquake magnitude using extreme value methodology: the Groningen case. Nat. Hazards 169, 1–23 (2018)
4. Caeiro, F., Gomes, M.I.: A semi-parametric estimator of a shape second-order parameter. In: Studies in Theoretical and Applied Statistics, pp. 137–144. Springer (2014)
5. Carreau, J., Naveau, P., Neppel, L.: Partitioning into hazard subregions for regional peaks-over-threshold modeling of heavy precipitation. Water Resour. Res. 53, 4407–4426 (2017)
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