Modified Liu estimator to address the multicollinearity problem in regression models: A new biased estimation class

Modified Liu estimator to address the multicollinearity problem in regression models: A new biased estimation class

The multicollinearity problem occurrence of the explanatory variables affects the least-squares (LS) estimator seriously in the regression models. The multicollinearity adverse effects on the LS estimation are also investigated by lots of authors. Also, many biased estimators with one-parameter or t...

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Bibliographic Details
Published in:Scientific African Vol. 17; p. e01372
Main Authors: Dawoud, Issam, Abonazel, Mohamed R., Awwad, Fuad A.
Format: Journal Article
Language:English
Published: Elsevier B.V 01-09-2022
Elsevier
Subjects:
Kibria-Lukman estimator
Least-squares estimator
Liu estimator
Modified ridge type estimator
Ridge regression
Kibria-Lukman estimator
Ridge regression
Liu estimator
Least-squares estimator
Modified ridge type estimator
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Summary:The multicollinearity problem occurrence of the explanatory variables affects the least-squares (LS) estimator seriously in the regression models. The multicollinearity adverse effects on the LS estimation are also investigated by lots of authors. Also, many biased estimators with one-parameter or two-parameters are developed to overcome this problem. But, the estimators with two-parameter have advantages over that with one-parameter where they have two biasing parameters and at least one of them has the property of handling this problem impact. Therefore, we propose a new modified Liu (MLIU) estimator to handle the multicollinearity of the regression model. Also, we give the necessary and sufficient conditions for the outperforming of the proposed MLIU estimator over the LS, ridge, Liu, Kibria-Lukman (KL), and modified ridge type (MRT) estimators by the known mean squares error criterion. The proposed MLIU estimator biasing parameters are derived by minimizing the known scalar mean square error. Simulations and real data are used to give a good view of the performance of the proposed MLIU estimator. We conclude that the proposed MLIU estimator has the highest performance under almost scenarios using different factors, especially in the cases of severe and high degrees of multicollinearity.
ISSN:2468-2276
2468-2276
DOI:10.1016/j.sciaf.2022.e01372