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Optimal fixed size confidence procedures for a restricted parameter space. (English) Zbl 0562.62032

Suppose Z is a single observation from \(N(\theta,1),\theta \in \Omega =[- d, d]\). Let A be the action space of the statistician and define a loss function L on \(A\times \Omega\) by \(L(a,\theta)=0\) if \(| a-\theta | \leq e\) and 1 if \(| a-\theta | >e\) where \(e>0\) is given. Minimax admissible Bayes estimators \(\delta^*(Z)\) for \(\theta\) with respect to L are determined. The results are extended to include the case where the sampling distribution has a density function which is unimodal and symmetric about the location parameter.
The connection between the minimax rule \(\delta^*\) and an optimal fixed size confidence procedure is obtained by noting that \(C^*(Z) = [\delta^*(Z)-e, \delta^*(Z)+e]\) can be interpreted as a confidence procedure of size 2e which has the highest confidence coefficient equal to \(\inf_{\theta} P_{\theta} \{\theta\in C^*(Z)\}\).
Reviewer: H.Iyer

MSC:

62F25 Parametric tolerance and confidence regions
62C20 Minimax procedures in statistical decision theory
62C10 Bayesian problems; characterization of Bayes procedures
62C15 Admissibility in statistical decision theory
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