Add to ORKGWe consider component-wise estimation of order restricted location/scale parameters of a general bivariate location/scale distribution under the generalized Pitman nearness criterion (GPN). We develop some general results that, in many situations, are useful in finding improvements over location/scale equivariant estimators. In particular, under certain conditions, these general results provide improvements over the unrestricted Pitman nearest location/scale equivariant estimators and restricted maximum likelihood estimators. The usefulness of the obtained results is illustrated through their applications to specific probability models. A simulation study has been considered to compare how well different estimators perform under the GPN cri...
AbstractIn a multiparameter estimation problem, for first-order efficient estimators, second-order P...
Laplace approximations for the Pitman estimators of location or scale parameters, including terms O(...
Pitman's measure of closeness, closest estimator, Stein-type estimator, Brown-type estimator, equiva...
We consider component-wise equivariant estimation of order restricted location/scale parameters of a...
The problem of estimating location (scale) parameters $\theta_1$ and $\theta_2$ of two distributions...
According to Pitman (1937), an estimator X is closer than an estimator Y to a scalar parameter [thet...
In this article, based on generalized order statistics from a family of proportional hazard rate mod...
計畫編號:NSC89-2118-M163-001 研究期間:200008~200107 研究經費:229,000[[abstract]]For estimating a normal variance...
[[abstract]]For estimating a normal variance under squared error loss function it is well known that...
A general method for determining Pitman Nearness is given In the case of univariate estimators. This...
This paper addresses the issue of deriving estimators improving on the best loca-tion equivariant (o...
This paper is concerned with estimation of the restricted parameters in location and/or scale famili...
In a multiparameter estimation problem, for first-order efficient estimators, second-order Pitman ad...
Motivated by the first-order Pitman closeness of best asymptotically normal estimators and some rece...
In a multiparameter estimation problem, for first-order efficient estimators, second-order Pitman ad...
AbstractIn a multiparameter estimation problem, for first-order efficient estimators, second-order P...
Laplace approximations for the Pitman estimators of location or scale parameters, including terms O(...
Pitman's measure of closeness, closest estimator, Stein-type estimator, Brown-type estimator, equiva...
We consider component-wise equivariant estimation of order restricted location/scale parameters of a...
The problem of estimating location (scale) parameters $\theta_1$ and $\theta_2$ of two distributions...
According to Pitman (1937), an estimator X is closer than an estimator Y to a scalar parameter [thet...
In this article, based on generalized order statistics from a family of proportional hazard rate mod...
計畫編號:NSC89-2118-M163-001 研究期間:200008~200107 研究經費:229,000[[abstract]]For estimating a normal variance...
[[abstract]]For estimating a normal variance under squared error loss function it is well known that...
A general method for determining Pitman Nearness is given In the case of univariate estimators. This...
This paper addresses the issue of deriving estimators improving on the best loca-tion equivariant (o...
This paper is concerned with estimation of the restricted parameters in location and/or scale famili...
In a multiparameter estimation problem, for first-order efficient estimators, second-order Pitman ad...
Motivated by the first-order Pitman closeness of best asymptotically normal estimators and some rece...
In a multiparameter estimation problem, for first-order efficient estimators, second-order Pitman ad...
AbstractIn a multiparameter estimation problem, for first-order efficient estimators, second-order P...
Laplace approximations for the Pitman estimators of location or scale parameters, including terms O(...
Pitman's measure of closeness, closest estimator, Stein-type estimator, Brown-type estimator, equiva...