Add to ORKGAdmissible linear estimators Mx+γ must be pointwise limits of Bayes estimators. Using properties of Bayes estimators preserved by taking limits, the structure of M and γ can be determined. Among M,γ with this structure, a necessary and sufficient condition for admissibility is obtained. This condition is applied to the case of linear (mixture) models. It is shown that only the most trivial such models admit linear estimators of full rank which are admissible or are even limits of Bayes estimators
For estimation problems, an interesting question is whether the maximum likelihood estimator(MLE) is...
In some invariant estimation problems under a group, the Bayes estimator against an invariant prior ...
The linearly sufficient and admissible linear estimators with bounded mean squared error function in...
Admissible linear estimators Mx+γ must be pointwise limits of Bayes estimators. Using properties of ...
Admissible linear estimators Mx+γ must be pointwise limits of Bayes estimators. Using properties of ...
Consider truncated Poisson distributions and their reasonable estimators. Even though the estimators...
Basic decision theory for discrete random variables of the multivariate geometric (power series) typ...
This paper is devoted to the multivariate estimation of a vector of Poisson means. A novel loss func...
For the p-variate Poisson mean, under the sum of weighted squared error losses, weights being recipr...
Basic decision theory for discrete random variables of the multivariate geometric (power series) typ...
Graduation date: 1986We describe a general finite-dimensional inner product space setting for studyi...
AbstractThis paper studies the admissibility of both homogeneous and inhomogeneous linear estimators...
AbstractFor the p-variate Poisson mean, under the sum of weighted squared error losses, weights bein...
Bayes estimates are derived in multivariate linear models with unknown distribution. The prior distr...
[[abstract]]Kubokawa (1991, Journal of Multivariate Analysis) constructed a shrinkage estimator of a...
For estimation problems, an interesting question is whether the maximum likelihood estimator(MLE) is...
In some invariant estimation problems under a group, the Bayes estimator against an invariant prior ...
The linearly sufficient and admissible linear estimators with bounded mean squared error function in...
Admissible linear estimators Mx+γ must be pointwise limits of Bayes estimators. Using properties of ...
Admissible linear estimators Mx+γ must be pointwise limits of Bayes estimators. Using properties of ...
Consider truncated Poisson distributions and their reasonable estimators. Even though the estimators...
Basic decision theory for discrete random variables of the multivariate geometric (power series) typ...
This paper is devoted to the multivariate estimation of a vector of Poisson means. A novel loss func...
For the p-variate Poisson mean, under the sum of weighted squared error losses, weights being recipr...
Basic decision theory for discrete random variables of the multivariate geometric (power series) typ...
Graduation date: 1986We describe a general finite-dimensional inner product space setting for studyi...
AbstractThis paper studies the admissibility of both homogeneous and inhomogeneous linear estimators...
AbstractFor the p-variate Poisson mean, under the sum of weighted squared error losses, weights bein...
Bayes estimates are derived in multivariate linear models with unknown distribution. The prior distr...
[[abstract]]Kubokawa (1991, Journal of Multivariate Analysis) constructed a shrinkage estimator of a...
For estimation problems, an interesting question is whether the maximum likelihood estimator(MLE) is...
In some invariant estimation problems under a group, the Bayes estimator against an invariant prior ...
The linearly sufficient and admissible linear estimators with bounded mean squared error function in...