A minimax approach to consistency and efficiency for estimating equations
成果类型:
Article
署名作者:
Li, B
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
发表日期:
1996
页码:
1283-1297
关键词:
quasi-likelihood functions
generalized linear-models
摘要:
The consistency of estimating equations has been studied, in the main, along the lines of Cramer's classical argument, which only asserts the existence of consistent solutions. The statement similar to that of Doob and Weld, which identifies the consistent solutions, has not yet been established. The obstacle is that the solutions of estimating equations cannot in general be defined as the maximum of likelihood functions. In this paper we demonstrate that the consistent solutions can be identified as the minimax of a function R, whose properties resemble those of a log likelihood ratio, but which exists in a much wider context. Furthermore, since we do not need R to be differentiable, the minimax is consistent even when the estimating equation does not exist. In this respect, the minimax is a new estimator. We first convey the idea by focusing on the quasi-likelihood estimate, and then indicate its full generality by providing a set of sufficient conditions for consistency and studying a number of important cases. Efficiency will also be verified.