计数数据回归模型中的几乎无偏岭估计

IF 0.6 Q4 STATISTICS & PROBABILITY
F. Noeel, Z. Algamal
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引用次数: 6

摘要

脊估计量一直被证明是一种有吸引力的收缩方法,可以减少多重共线性的影响。当响应变量为计数数据时,泊松回归负二项回归模型是应用中众所周知的模型。然而,已知多重共线性对计数回归系数的最大似然估计的方差有负面影响。为了解决这个问题,许多研究人员提出了一种计数数据岭估计器。本文提出并导出了一个几乎无偏回归估计量。我们的蒙特卡罗模拟结果表明,相对于其他现有的估计量,所提出的估计量可以带来显著的改进。此外,实际应用结果表明,所提出的估计量在预测性能方面优于负二项岭回归和最大似然估计量。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Almost unbiased ridge estimator in the count data regression models
The ridge estimator has been consistently demonstrated to be an attractive shrinkage method to reduce the effects of multicollinearity. The Poisson regression negative binomial regression models are well-known model in application when the response variable is count data. However, it is known that multicollinearity negatively affects the variance of maximum likelihood estimator of the count regression coefficients. To address this problem, a count data ridge estimator has been proposed by numerous researchers. In this paper, an almost unbiased regression estimator is proposed and derived. Our Monte Carlo simulation results suggest that the proposed estimator can bring significant improvement relative to other existing estimators. In addition, the real application results demonstrate that the proposed estimator outperforms both negative binomial ridge regression and maximum likelihood estimators in terms of predictive performance.
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CiteScore
1.40
自引率
14.30%
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