Title of article
Different Estimation Procedures for the Parameters of the Extended Exponential Geometric Distribution for Medical Dat
Author/Authors
Louzada, Francisco Statistics Department - Institute of Mathematical and Computer Sciences (ICMC) - Sao Paulo University (USP), Brazil , Ramos, Pedro L Statistics Department - Institute of Mathematical and Computer Sciences (ICMC) - Sao Paulo University (USP), Brazil , Perdoná, Gleici S. C Department of Social Medicine - Ribeirao Preto School of Medicine (FMRP) - Sao Paulo University (USP), Brazil
Pages
12
From page
1
To page
12
Abstract
We have considered different estimation procedures for the unknown parameters of the extended exponential geometric
distribution. We introduce different types of estimators such as the maximum likelihood, method of moments, modified moments,
L-moments, ordinary and weighted least squares, percentile, maximum product of spacings, and minimum distance estimators.
The different estimators are compared by using extensive numerical simulations. We discovered that the maximum product of
spacings estimator has the smallest mean square errors and mean relative estimates, nearest to one, for both parameters, proving to
be the most efficient method compared to other methods. Combining these results with the good properties of the method such as
consistency, asymptotic efficiency, normality, and invariance we conclude that the maximum product of spacings estimator is the
best one for estimating the parameters of the extended exponential geometric distribution in comparison with its competitors. For
the sake of illustration, we apply our proposed methodology in two important data sets, demonstrating that the EEG distribution
is a simple alternative to be used for lifetime data.
Keywords
Parameters , Geometric , Gamma
Journal title
Computational and Mathematical Methods in Medicine
Serial Year
2016
Full Text URL
Record number
2606795
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