Аннотация:
This paper is dealing with the shrinkage estimators of a multivariate normal mean and their
minimaxity properties under the balanced loss function. We present here two different classes of estimators:
the first which generalizes the James-Stein estimator, and show that any estimator of this class dominates the
maximum likelihood estimator (MLE), consequently it is minimax, and the second dominates the James-Stein
estimator and we conclude that any estimator of this class is also minimax.
Ключевые слова и фразы:Balanced loss function, James-Stein estimator, minimax estimator, multivariate Gaussian
random variable, non-central chi-square distribution, shrinkage estimators.