OPTIMUM ROBUST ESTIMATION OF LINEAR ASPECTS IN CONDITIONALLY CONTAMINATED LINEAR-MODELS
成果类型:
Article
署名作者:
KUROTSCHKA, V; MULLER, C
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/aos/1176348525
发表日期:
1992
页码:
331-350
关键词:
bounded-influence regression
摘要:
P. J. Bickel's approach to and results on estimating the parameter vector beta of a conditionally contaminated linear regression model by asymptotically linear (AL) estimators beta* which have minimum trace of the asymptotic covariance matrix among all AL estimators with a given bound b on their asymptotic bias (MT-AL estimators with bias bound b) is here extended to conditionally contaminated general linear models and in particular for estimating arbitrary linear aspects phi(beta) = C-beta of beta which are of actual interest in applications. Admitting that beta itself is not identifiable in the model (also a practically important situation), a complete characterization of MT-AL estimators with bias bound b including the case where b is smallest possible is presented here, which extends and sharpens H. Rieder's characterization of all AL estimators with minimum asymptotic bias. These characterizations (Theorem 1) represent generalizations (in different directions) of those which define Hampel-Krasker estimators for beta in linear regression models and admit (Theorem 2) explicit constructions of MT-AL estimators under generally applicable model assumption. Obviously, even in linear regression models, phi* = C-beta* is not an MT-AL estimator for phi if beta* is one for beta (there does not even exist an AL estimator nor an M estimator for beta, if beta is not identifiable in the model). Examples such as quadratic regression illustrate the not at all obvious relation between beta* and phi*, demonstrate the applicability of the general results and show explicitly the influence of the parametrization and the underlying design of the linear model.