A New Biased Estimation Class to Combat the Multicollinearity in Regression Models: Modified Two--Parameter Liu Estimator | ||||
Computational Journal of Mathematical and Statistical Sciences | ||||
Volume 4, Issue 1, April 2025, Page 316-347 PDF (1017.4 K) | ||||
Document Type: Original Article | ||||
DOI: 10.21608/cjmss.2025.347818.1096 | ||||
![]() | ||||
Author | ||||
Mohamed Reda Abonazel ![]() ![]() | ||||
Department of applied statistics and Econometrics, Faculty of Graduate Studies for Statistical Research, Cairo Uniersity, Giza 12613, Egypt | ||||
Abstract | ||||
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 many authors. Instead of the LS estimator, we propose a new modified two–parameter Liu (MTPL) estimator to handle the multicollinearity for the regression model based on two shrinkage parameters (k, d). Also, we give the necessary and sufficient conditions for the outperforming of the proposed MTPL estimator over the LS, ridge, Liu, Kibria-Lukman (KL), modified ridge type (MRT), and modified one–parameter Liu (MOPL) estimators by the scalar mean squared error (MSE) criterion. Optimal biasing parameters of the proposed MTPL estimator are derived. Simulation and real data are used to study the efficiency of the MTPL estimator. The results of the simulation study and two real-life applications show the superiority of the proposed estimator because the MSE of the proposed estimator is smaller than the other estimators. | ||||
Keywords | ||||
Company Efficiency; Kibria-Lukman estimator; Liu estimator; Modified ridge type estimator; Monte Carlo simulation | ||||
Statistics Article View: 361 PDF Download: 358 |
||||