Add to ORKG[[abstract]]Assume i.i.d. observations are available from a p-dimensional multivariate normal distribution with an unknown mean vector μ and an unknown p .d. diaper- . sion matrix ∑. Here we address the problem of mean estimation in a decision theoretic setup. It is well known that the unbiased as well as the maximum likelihood estimator of μ is inadmissible when p ≤ 3 and is dominated by the famous James-Stein estimator (JSE). There are a few estimators which are better than the JSE reported in the literature, but in this paper we derive wide classes of estimators uniformly better than the JSE. We use some of these estimators for further risk study.[[notice]]本書目待補
AbstractIt is well known that the uniformly minimum variance unbiased (UMVU) estimators of the risk ...
Let X be an m - p matrix normally distributed with matrix of means B and covariance matrix Im [circl...
We consider the estimation of the mean of a multivariate normal distribution with known variance. Mo...
AbstractIn this article, we consider the problem of estimating a p-variate (p ≥ 3) normal mean vecto...
This paper considers the estimation of the mean vector [theta] of a p-variate normal distribution wi...
AbstractThis paper considers the estimation of the mean vector θ of a p-variate normal distribution ...
This paper is concerned with the problem of estimating a matrix of means in multivariate normal dist...
Stein’s result has transformed common belief in statistical world that the maximum likelihood estima...
AbstractThis paper is concerned with the problem of estimating a matrix of means in multivariate nor...
AbstractFor the mean vector of a p-variate normal distribution (p ≧ 3), the generalized Bayes estima...
It is well known that the uniformly minimum variance unbiased (UMVU) estimators of the risk and the ...
253 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1985.Much work on the James-Stein ...
We consider estimation of a heteroscedastic multivariate normal mean. Under heteroscedasticity, esti...
[[abstract]]Kubokawa (1991, Journal of Multivariate Analysis) constructed a shrinkage estimator of a...
This thesis derives natural and efficient solutions of three high-dimensional statistical problems b...
AbstractIt is well known that the uniformly minimum variance unbiased (UMVU) estimators of the risk ...
Let X be an m - p matrix normally distributed with matrix of means B and covariance matrix Im [circl...
We consider the estimation of the mean of a multivariate normal distribution with known variance. Mo...
AbstractIn this article, we consider the problem of estimating a p-variate (p ≥ 3) normal mean vecto...
This paper considers the estimation of the mean vector [theta] of a p-variate normal distribution wi...
AbstractThis paper considers the estimation of the mean vector θ of a p-variate normal distribution ...
This paper is concerned with the problem of estimating a matrix of means in multivariate normal dist...
Stein’s result has transformed common belief in statistical world that the maximum likelihood estima...
AbstractThis paper is concerned with the problem of estimating a matrix of means in multivariate nor...
AbstractFor the mean vector of a p-variate normal distribution (p ≧ 3), the generalized Bayes estima...
It is well known that the uniformly minimum variance unbiased (UMVU) estimators of the risk and the ...
253 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1985.Much work on the James-Stein ...
We consider estimation of a heteroscedastic multivariate normal mean. Under heteroscedasticity, esti...
[[abstract]]Kubokawa (1991, Journal of Multivariate Analysis) constructed a shrinkage estimator of a...
This thesis derives natural and efficient solutions of three high-dimensional statistical problems b...
AbstractIt is well known that the uniformly minimum variance unbiased (UMVU) estimators of the risk ...
Let X be an m - p matrix normally distributed with matrix of means B and covariance matrix Im [circl...
We consider the estimation of the mean of a multivariate normal distribution with known variance. Mo...