A Generalized Mean Under a Non-Regular Framework and Extreme Value Index Estimation

Loading...
Thumbnail Image

Journal Title

Journal ISSN

Volume Title

Publisher

iSTE and Wiley

Abstract

The Hill estimator, one of the most popular extreme value index (EVI) estimators under a heavy right-tail framework, i.e. for a positive EVI, here denoted by ξ, is an average of the log-excesses. Consequently, it can be regarded as the logarithm of the geometric mean or mean of order p = 0 of an adequate set of systematic statistics. We can thus more generally consider any real p, the mean of order p (MOp) of those same statistics and the associated MOp EVI-estimators, also called harmonic moment EVI-estimators. The normal asymptotic behavior of these estimators has been obtained for p < 1/(2ξ), with consistency achieved for p < 1/ξ. The non-regular framework, i.e. the case p ≥ 1/(2ξ), will be now considered. Consistency is no longer achieved for p > 1/ξ, but an almost degenerate behavior appears for p = 1/ξ. The results are illustrated on the basis of large-scale simulation studies. An algorithm providing an almost degenerate MOp EVI-estimation is suggested.

Description

Keywords

Citation

Gomes, M.I., Henriques-Rodrigues, L. & Pestana, D. (2022). A Generalized Mean Under a Non-Regular Framework and Extreme Value Index Estimation. In K.N. Zafeiris, Y. Dimotikalis, C.H. Skiadas, A. Karagrigoriou and C. Karagrigoriou-Vonta (Eds.), Data Analysis and Related Applications 2, Volume 10—Big Data, Artificial Intelligence and Data Analysis, SET Coordinate by Jacques Janssen, ISBN: 9781786307729, iSTE Wiley, Part 3, Chapter 16, 237-250. https://www.iste.co.uk/book.php?id=1928

Endorsement

Review

Supplemented By

Referenced By