TY - JOUR
T1 - Robust fitting of the binomial model
AU - Ruckstuhl, A
AU - Welsh, Alan
PY - 2001
Y1 - 2001
N2 - We consider the problem of robust inference for the binomial(m, π) model. The discreteness of the data and the fact that the parameter and sample spaces are bounded mean that standard robustness theory gives surprising results. For example, the maximum likelihood estimator (MLE) is quite robust, it cannot be improved on for m = 1 but can be for m > 1. We discuss four other classes of estimators: M-estimators , minimum disparity estimators, optimal MGP estimators, and a new class of estimators which we call E-estimators. We show that E-estimators have a non-standard asymptotic theory which challenges the accepted relationships between robustness concepts and thereby provides new perspectives on these concepts.
AB - We consider the problem of robust inference for the binomial(m, π) model. The discreteness of the data and the fact that the parameter and sample spaces are bounded mean that standard robustness theory gives surprising results. For example, the maximum likelihood estimator (MLE) is quite robust, it cannot be improved on for m = 1 but can be for m > 1. We discuss four other classes of estimators: M-estimators , minimum disparity estimators, optimal MGP estimators, and a new class of estimators which we call E-estimators. We show that E-estimators have a non-standard asymptotic theory which challenges the accepted relationships between robustness concepts and thereby provides new perspectives on these concepts.
KW - Bias, breakdown point
KW - E-estimation, influence function
KW - Likelihood disparity
KW - M-estimation, minimum disparity estimation, optimal MGP estimation
UR - http://www.scopus.com/inward/record.url?scp=0035730114&partnerID=8YFLogxK
U2 - 10.1214/aos/1013699996
DO - 10.1214/aos/1013699996
M3 - Article
SN - 0090-5364
VL - 29
SP - 1117
EP - 1136
JO - Annals of Statistics
JF - Annals of Statistics
IS - 4
ER -