Simultaneous estimation of Poisson means of the selected subset

Let _π1,_π2,…,_πp${\pi }_1,{\pi }_2,\dots ,{\pi }_p$ be p   independent Poisson populations with means _λ1,…,_λp${\lambda }_1,\dots ,{\lambda }_p$, respectively. Let {X₁,…,X_p} denote the set of observations, where X_i is from _πi${\pi }_i$. Suppose a subset of populations is selected using Gupta and Huang's (1975) selection rule which selects _πi${\pi }_i$ if and only if _Xi+1?_cX(1)$X_i+1?{\mathit{cX}}_{(1)}$, where X₍₁₎=max{X₁,…,X_p}, and 0<c<1$0<c<1$. In this paper, the simultaneous estimation of the Poisson means associated with the selected populations is considered for the k-normalized squared error loss function. It is shown that the natural estimator is positively biased. Also, a class of estimators that are better than the natural estimator is obtained by solving certain difference inequalities over the sample space. A class of estimators which dominate the UMVUE is also obtained. Monte carlo simulations are used to assess the percentage improvements and an application to a real-life example is also discussed.