Abstract
The purpose of this paper is to compare the asymptotic expected sample sizes of two sequential procedures for ranking $k$ normal populations with known variance and unknown means for the cases (i) $\mu_1 \leqq \mu_2 \leqq \cdots \leqq \mu_{k-1} < \mu_k$ and (ii) $\mu_k - \mu_{k-1} = \delta^\ast > 0$. The procedures are: (1) the Bechhofer-Kiefer-Sobel (BKS) sequential procedure [1], and (2) Paulson's (P) sequential procedure [2].
Citation
S. K. Perng. "A Comparison of the Asymptotic Expected Sample Sizes of Two Sequential Procedures for Ranking Problem." Ann. Math. Statist. 40 (6) 2198 - 2202, December, 1969. https://doi.org/10.1214/aoms/1177697299
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