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Main Authors: Kresse, Elina, Silins, Emils, Valeinis, Janis
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2409.05631
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author Kresse, Elina
Silins, Emils
Valeinis, Janis
author_facet Kresse, Elina
Silins, Emils
Valeinis, Janis
contents This paper introduces a new version of the smoothly trimmed mean with a more general version of weights, which can be used as an alternative to the classical trimmed mean. We derive its asymptotic variance and to further investigate its properties we establish the empirical likelihood for the new estimator. As expected from previous theoretical investigations we show in our simulations a clear advantage of the proposed estimator over the classical trimmed mean estimator. Moreover, the empirical likelihood method gives an additional advantage for data generated from contaminated models. For the classical trimmed mean it is generally recommended in practice to use symmetrical 10\% or 20\% trimming. However, if the trimming is done close to data gaps, it can even lead to spurious results, as known from the literature and verified by our simulations. Instead, for practical data examples, we choose the smoothing parameters by an optimality criterion that minimises the variance of the proposed estimators.
format Preprint
id arxiv_https___arxiv_org_abs_2409_05631
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Empirical likelihood for generalized smoothly trimmed mean
Kresse, Elina
Silins, Emils
Valeinis, Janis
Statistics Theory
This paper introduces a new version of the smoothly trimmed mean with a more general version of weights, which can be used as an alternative to the classical trimmed mean. We derive its asymptotic variance and to further investigate its properties we establish the empirical likelihood for the new estimator. As expected from previous theoretical investigations we show in our simulations a clear advantage of the proposed estimator over the classical trimmed mean estimator. Moreover, the empirical likelihood method gives an additional advantage for data generated from contaminated models. For the classical trimmed mean it is generally recommended in practice to use symmetrical 10\% or 20\% trimming. However, if the trimming is done close to data gaps, it can even lead to spurious results, as known from the literature and verified by our simulations. Instead, for practical data examples, we choose the smoothing parameters by an optimality criterion that minimises the variance of the proposed estimators.
title Empirical likelihood for generalized smoothly trimmed mean
topic Statistics Theory
url https://arxiv.org/abs/2409.05631