November 2021 On variable selection in joint modeling of mean and dispersion
Edmilson Rodrigues Pinto, Leandro Alves Pereira
Author Affiliations +
Braz. J. Probab. Stat. 35(4): 875-894 (November 2021). DOI: 10.1214/21-BJPS512

Abstract

The joint modeling of mean and dispersion (JMMD) provides an efficient method to obtain useful models for the mean and dispersion, especially in problems of robust design experiments. However, in the literature on JMMD there are few works dedicated to variable selection and this theme is still a challenge. In this article, we propose a procedure for selecting variables in JMMD, based on hypothesis testing and the quality of the model’s fit. A criterion for checking the goodness of fit is used, in each iteration of the selection process, as a filter for choosing the terms that will be evaluated by a hypothesis test. Three types of criteria were considered for checking the quality of the model fit in our variable selection procedure. The criteria used were: the extended Akaike information criterion, the corrected Akaike information criterion and a specific criterion for the JMMD, proposed by us, a type of extended adjusted coefficient of determination. Simulation studies were carried out to verify the efficiency of our variable selection procedure. In all situations considered, the proposed procedure proved to be effective and quite satisfactory. The variable selection process was applied to a real example from an industrial experiment.

Funding Statement

This work was supported by Research Support Foundation of the State of Minas Gerais (FAPEMIG) under Grant Number APQ-03365-18. The authors thank FAPEMIG for financial support.

Acknowledgments

The authors would like to thank the anonymous referees and the Editor for their constructive comments that improved the quality of this paper.

Citation

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Edmilson Rodrigues Pinto. Leandro Alves Pereira. "On variable selection in joint modeling of mean and dispersion." Braz. J. Probab. Stat. 35 (4) 875 - 894, November 2021. https://doi.org/10.1214/21-BJPS512

Information

Received: 1 January 2021; Accepted: 1 July 2021; Published: November 2021
First available in Project Euclid: 13 December 2021

MathSciNet: MR4350965
zbMATH: 07477290
Digital Object Identifier: 10.1214/21-BJPS512

Keywords: coefficient of determination , extended quasi-likelihood , generalized linear models , location-dispersion analysis , Model selection , robust design experiment

Rights: Copyright © 2021 Brazilian Statistical Association

Vol.35 • No. 4 • November 2021
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