Peaks Over Random Threshold Methodology for Tail Index and High Quantile Estimation

Paulo Araújo Santos; M. Isabel Fraga Alves; M. Ivette Gomes

doi:10.57805/revstat.v4i3.37

Peaks Over Random Threshold Methodology for Tail Index and High Quantile Estimation

Authors

Paulo Araújo Santos Instituto Politécnico de Santarém
M. Isabel Fraga Alves Universidade de Lisboa
M. Ivette Gomes Universidade de Lisboa

DOI:

https://doi.org/10.57805/revstat.v4i3.37

Keywords:

heavy tails, high quantiles, semi-parametric estimation, linear property, sample of excesses

Abstract

In this paper we present a class of semi-parametric high quantile estimators which enjoy a desirable property in the presence of linear transformations of the data. Such a feature is in accordance with the empirical counterpart of the theoretical linearity of a quantile χp: χp(δX + λ) = δχp(X) + λ, for any real λ and positive δ. This class of estimators is based on the sample of excesses over a random threshold, originating what we denominate PORT (Peaks Over Random Threshold) methodology. We prove consistency and asymptotic normality of two high quantile estimators in this class, associated with the PORT-estimators for the tail index. The exact performance of the new tail index and quantile PORT-estimators is compared with the original semiparametric estimators, through a simulation study.

Downloads

REVSTAT2006v4n3_3

Published

2006-11-30

How to Cite

Araújo Santos , P., Fraga Alves , M. I., & Gomes , M. I. (2006). Peaks Over Random Threshold Methodology for Tail Index and High Quantile Estimation. REVSTAT-Statistical Journal, 4(3), 227–247. https://doi.org/10.57805/revstat.v4i3.37