Please use this identifier to cite or link to this item: http://archives.univ-biskra.dz/handle/123456789/2346
Title: Asymptotic normality of the adapted Hill estimator to censored data
Authors: Brahimi Brahim
Meraghni Djamel
Necir Abdelhakim
Keywords: Brownian bridges; Extreme value index; Hill estimator; Random censoring; Regularly varying distributions.
Issue Date: 18-Apr-2013
Abstract: The classical Hill estimator is the most popular estimator of the extreme value index of Pareto-type distributions in the case of complete data. Einmahl, Fils-Villetard and Guillou (2008, Bernoulli 14, no. 1, 207-227) adjusted this estimator (amongst others) to the case where the data are subject to random censorship. They established its asymptotic normality under three restrictive conditions, which produce an additional bias to the usual one. Making use of the empirical processes theory, we relax these conditions to only one and represent the adapted estimator in terms of Brownian bridges without the aforementioned bias. Link http://arxiv-web3.library.cornell.edu/abs/1302.1666v2
URI: http://archives.univ-biskra.dz/handle/123456789/2346
Appears in Collections:Publications Internationales

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