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Tail inference using extreme U-statistics

Author

Listed:
  • Oorschot, Jochem
  • Segers, Johan

    (Université catholique de Louvain, LIDAM/ISBA, Belgium)

  • Zhou, Chen

Abstract

Extreme U-statistics arise when the kernel of a U-statistic has a high degree but depends only on its arguments through a small number of top order statistics. As the kernel degree of the U-statistic grows to infinity with the sample size, estimators built out of such statistics form an intermediate family in between those constructed in the block maxima and peaks-over-threshold frameworks in extreme value analysis. The asymptotic normality of extreme U-statistics based on location-scale invariant kernels is established. Although the asymptotic variance corresponds with the one of the Hájek projection, the proof goes beyond considering the first term in Hoeffding’s variance decomposition; instead, a growing number of terms needs to be incorporated in the proof. To show the usefulness of extreme U-statistics, we propose a kernel depending on the three highest order statistics leading to an unbiased estimator of the shape parameter of the generalized Pareto distribution. When applied to samples in the max-domain of attraction of an extreme value distribution, the extreme U-statistic based on this kernel produces a locationscale invariant estimator of the extreme value index which is asymptotically normal and whose finite-sample performance is competitive with that of the pseudo-maximum likelihood estimator.

Suggested Citation

  • Oorschot, Jochem & Segers, Johan & Zhou, Chen, 2022. "Tail inference using extreme U-statistics," LIDAM Discussion Papers ISBA 2022014, Université catholique de Louvain, Institute of Statistics, Biostatistics and Actuarial Sciences (ISBA).
    • Handle: RePEc:aiz:louvad:2022014
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    References listed on IDEAS

    as
    1. Zhou, Chen, 2009. "Existence and consistency of the maximum likelihood estimator for the extreme value index," Journal of Multivariate Analysis, Elsevier, vol. 100(4), pages 794-815, April.
    2. Seyoon Lee & Joseph H. T. Kim, 2019. "Exponentiated generalized Pareto distribution: Properties and applications towards extreme value theory," Communications in Statistics - Theory and Methods, Taylor & Francis Journals, vol. 48(8), pages 2014-2038, April.
    3. Vaart,A. W. van der, 2000. "Asymptotic Statistics," Cambridge Books, Cambridge University Press, number 9780521784504.
    4. Bucher, Axel & Segers, Johan, 2018. "Inference for heavy tailed stationary time series based on sliding blocks," LIDAM Reprints ISBA 2018007, Université catholique de Louvain, Institute of Statistics, Biostatistics and Actuarial Sciences (ISBA).
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    More about this item

    Keywords

    U-statistic ; Generalized Pareto distribution ; Hájek projection ; Extreme value index;
    All these keywords.

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