A Couple of Non Reduced Bias Generalized Means in Extreme Value Theory: An Asymptotic Comparison

Helena Penalva; M. Ivette Gomes; Frederico Caeiro; M. Manuela Neves

doi:10.57805/revstat.v18i3.301

A Couple of Non Reduced Bias Generalized Means in Extreme Value Theory

An Asymptotic Comparison

Authors

Helena Penalva Instituto Politécnico de Setúbal
M. Ivette Gomes Universidade de Lisboa
Frederico Caeiro Universidade Nova de Lisboa
M. Manuela Neves Universidade de Lisboa

DOI:

https://doi.org/10.57805/revstat.v18i3.301

Keywords:

heavy tails, optimal tuning parameters, semi-parametric estimation, statistical extreme value theory

Abstract

Lehmer’s mean-of-order p (L_p) generalizes the arithmetic mean, and L_p extreme value index (EVI)-estimators can be easily built, as a generalization of the classical Hill EVI-estimators. Apart from a reference to the asymptotic behaviour of this class of estimators, an asymptotic comparison, at optimal levels, of the members of such a class reveals that for the optimal (p, k) in the sense of minimal mean square error, with k the number of top order statistics involved in the estimation, they are able to overall outperform a recent and promising generalization of the Hill EVI-estimator, related to the power mean, also known as H¨older’s mean-of-order-p. A further comparison with other ‘classical’ non-reduced-bias estimators still reveals the competitiveness of this class of EVI-estimators.

Downloads

REVSTAT2020v18n3_3

Published

2020-08-04

How to Cite

Penalva , H., Gomes , M. I., Caeiro , F., & Neves , M. M. (2020). A Couple of Non Reduced Bias Generalized Means in Extreme Value Theory: An Asymptotic Comparison. REVSTAT-Statistical Journal, 18(3), 281–298. https://doi.org/10.57805/revstat.v18i3.301