Modified One-Parameter Liu Estimator for the Linear Regression Model

Adewale F. Lukman; B. M. Golam Kibria; Kayode Ayinde; Segun L. Jegede

doi:10.1155/2020/9574304

Modelling and Simulation in Engineering (Jan 2020)

Modified One-Parameter Liu Estimator for the Linear Regression Model

Adewale F. Lukman,
B. M. Golam Kibria,
Kayode Ayinde,
Segun L. Jegede

Affiliations

Adewale F. Lukman: Department of Physical Sciences, Landmark University, Omu-Aran, Nigeria
B. M. Golam Kibria: Department of Mathematics and Statistics, Florida International University, USA
Kayode Ayinde: Department of Statistics, Federal University of Technology, Akure, Nigeria
Segun L. Jegede: Department of Physical Sciences, Landmark University, Omu-Aran, Nigeria

DOI: https://doi.org/10.1155/2020/9574304
Journal volume & issue: Vol. 2020

Abstract

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Motivated by the ridge regression (Hoerl and Kennard, 1970) and Liu (1993) estimators, this paper proposes a modified Liu estimator to solve the multicollinearity problem for the linear regression model. This modification places this estimator in the class of the ridge and Liu estimators with a single biasing parameter. Theoretical comparisons, real-life application, and simulation results show that it consistently dominates the usual Liu estimator. Under some conditions, it performs better than the ridge regression estimators in the smaller MSE sense. Two real-life data are analyzed to illustrate the findings of the paper and the performances of the estimators assessed by MSE and the mean squared prediction error. The application result agrees with the theoretical and simulation results.

Published in Modelling and Simulation in Engineering

ISSN: 1687-5591 (Print); 1687-5605 (Online)
Publisher: Hindawi Limited
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics: Instruments and machines: Electronic computers. Computer science
Website: https://onlinelibrary.wiley.com/journal/8203

About the journal