English

Liu-type Shrinkage Estimations in Linear Models

Statistics Theory 2017-09-06 v1 Statistics Theory

Abstract

In this study, we present the preliminary test, Stein-type and positive part Liu estimators in the linear models when the parameter vector β\boldsymbol{\beta} is partitioned into two parts, namely, the main effects β1\boldsymbol{\beta}_1 and the nuisance effects β2\boldsymbol{\beta}_2 such that β=(β1,β2)\boldsymbol{\beta}=\left(\boldsymbol{\beta}_1, \boldsymbol{\beta}_2 \right). We consider the case that a priori known or suspected set of the explanatory variables do not contribute to predict the response so that a sub-model may be enough for this purpose. Thus, the main interest is to estimate β1\boldsymbol{\beta}_1 when β2\boldsymbol{\beta}_2 is close to zero. Therefore, we conduct a Monte Carlo simulation study to evaluate the relative efficiency of the suggested estimators, where we demonstrate the superiority of the proposed estimators.

Cite

@article{arxiv.1709.01131,
  title  = {Liu-type Shrinkage Estimations in Linear Models},
  author = {Bahadır Yüzbaşı and Yasin Asar and S. Ejaz Ahmed},
  journal= {arXiv preprint arXiv:1709.01131},
  year   = {2017}
}
R2 v1 2026-06-22T21:32:52.100Z