Improved shrinkage estimators in the beta regression model with application in econometric and educational data

Abstract

Although beta regression is a very useful tool to model the continuous bounded outcome variable with some explanatory variables, however, in the presence of multicollinearity, the performance of the maximum likelihood estimates for the estimation of the parameters is poor. In this paper, we propose improved shrinkage estimators via Liu estimator to obtain more efficient estimates. Therefore, we defined linear shrinkage, pretest, shrinkage pretest, Stein and positive part Stein estimators to estimate of the parameters in the beta regression model, when some of them have not a significant effect to predict the outcome variable so that a sub-model may be sufficient. We derived the asymptotic distributional biases, variances, and then we conducted extensive Monte Carlo simulation study to obtain the performance of the proposed estimation strategy. Our results showed a great benefit of the new methodologies for practitioners specifically in the applied sciences. We concluded the paper with two real data analysis from economics and education.

Keywords

Asymptotic distributional bias; Asymptotic distributional variances; Beta regression model; Monte Carlo simulation; Multicollinearity; Shrinkage Liu estimators

Published in

Statistical Papers
2023, volume: 64, number: 6, pages: 1891-1912
Publisher: SPRINGER

SLU Authors

• Belaghi, Reza

  • University of Tabriz
  • Uppsala University

UKÄ Subject classification

Probability Theory and Statistics

Publication identifier

• DOI: https://doi.org/10.1007/s00362-022-01355-3

Permanent link to this page (URI)

https://res.slu.se/id/publ/126949