Abstract
The beta regression is a widely known statistical model when the response (or the dependent) variable has the form of fractions or percentages. In most of the situations in beta regression, the explanatory variables are related to each other which is commonly known as the multicollinearity problem. It is well-known that the multicollinearity problem affects severely the variance of maximum likelihood (ML) estimates. In this article, we developed a new biased estimator (called a two-parameter estimator) for the beta regression model to handle this problem and decrease the variance of the estimation. The properties of the proposed estimator are derived. Furthermore, the performance of the proposed estimator is compared with the ML estimator and other common biased (ridge, Liu, and Liu-type) estimators depending on the mean squared error criterion by making a Monte Carlo simulation study and through two real data applications. The results of the simulation and applications indicated that the proposed estimator outperformed ML, ridge, Liu, and Liu-type estimators.
Highlights
The beta regression model has been common in many areas, primarily economic and medical research, such as income share, unemployment rates in certain nations, the Gini index for each region, graduation rates in major universities, or the percentage of body fat in medical subjects
The beta maximum likelihood (BML) estimator has the worst performance among ridge beta regression (RBR), Liu beta regression (LBR), and two-parameter beta regression (TPBR) estimators which is significantly impacted by the multicollinearity
That our proposed estimator is efficient than other biased estimators suggested in the literature
Summary
The beta regression model has been common in many areas, primarily economic and medical research, such as income share, unemployment rates in certain nations, the Gini index for each region, graduation rates in major universities, or the percentage of body fat in medical subjects. Beta regression model, such as any regression model in the context of generalized linear models (GLMs) is used to examine the effect of certain explanatory variables on a non-normal response variable. Multicollinearity is a popular issue in econometric modeling It indicates that there is a strong association between the explanatory variables.
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