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Mar 1, 2023 · As an alternative to the ridge and Liu estimators, Kibria and Lukman [16] proposed new ridge–type estimator to resolve the issue of multicollinearity in the linear regression model. This estimator is called the Kibria–Lukman (KL) estimator.
Jul 8, 2021 · In this study, we propose the Modified Kibria-Lukman estimator to handle multicollinearity in PRM. The estimator is a single parameter estimator which makes it less computationally intensive as compared with the two-parameter estimators.
- Benedicta B. Aladeitan, Olukayode Adebimpe, Adewale F. Lukman, Olajumoke Oludoun, Oluwakemi E. Abiod...
- 2021
The Kibria-Lukman (KL) estimator is a recent estimator that has been proposed to solve the multicollinearity problem. In this paper, a generalized version of the KL estimator is proposed, along with the optimal biasing parameter of our proposed estimator derived by minimizing the scalar mean squared error.
Feb 28, 2021 · Recently, Kibria and Lukman developed KL estimator, which was found to outperform the ridge and the Liu estimators in the linear regression model. With this expectation, we developed the KL estimator for the inverse Gaussian regression model.
- Adewale F. Lukman, Zakariya Yahya Algamal, B. M. Golam Kibria, Kayode Ayinde
- 2021
Apr 1, 2022 · The Kibria-Lukman (KL) estimator is a recent estimator that has been proposed to solve the multicollinearity problem. In this paper, a generalized version of the KL estimator is proposed, along...
Nov 26, 2021 · In this paper, we developed a Jackknifed version of the Kibria-Lukman estimator- the estimator is named the Jackknifed KL estimator (JKLE). We derived the statistical properties of the new estimator and compared it theoretically with the KLE and some other existing estimators.
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What is Kibria Lukman (KL) estimator?
What is the Kibria-Lukman estimator?
Can a Kibria-Lukman estimator solve a multicollinearity problem?
What is a jackknife Kibria-Lukman estimator?
How is the performance of the proposed estimator compared with OLS?
Does the compkl estimator outperform ml Ridge & Liu estimators?
Recently, Kibria and Lukman (2020) developed the KL estimator and found it preferable to the ridge estimator. In this study, we modified the KL estimator to propose a new estimator. The new estimator is called the Modified KL estimator.
