Bias Correction in Generalized Linear Models
本文推导了广义线性模型中最大似然估计的一阶偏差公式,并展示了如何通过加权回归在GLIM程序中轻松实现偏差校正,特别对逻辑斯蒂模型给出了偏差的近似公式。
SUMMARY In this paper we derive general formulae for first-order biases of maximum likelihood estimates of the linear parameters, linear predictors, the dispersion parameter and fitted values in generalized linear models. These formulae may be implemented in the GLIM program to compute bias-corrected maximum likelihood estimates to order n −1, where n is the sample size, with minimal effort by means of a supplementary weighted regression. For linear logistic models it is shown that the asymptotic bias vector of β^ is almost collinear with β. The approximate formula βp/m+ for the bias of β^ in logistic models, where p = dim(β) and m+ = ∑ mi is the sum of the binomial indices, is derived and checked numerically.