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CSDA
2006
2006
Optimal confidence interval for the largest normal mean under heteroscedasticity
A two-stage sampling procedure for obtaining an optimal confidence interval for the largest or smallest mean of k independent normal populations is proposed, where the population variances are unknown and possibly unequal. The optimal confidence interval is obtained by maximizing the coverage probability with a fixed width at a least favorable configuration of means. Then, the sample sizes can be determined by this procedure. It has been shown that the optimal interval is globally optimal over all possible choices of symmetric and asymmetric intervals. In situations where the two-stage procedure cannot be completely carried through, a one-stage sampling procedure can be implemented, and their relationship is discussed. A numerical example to demonstrate the use of the two-stage procedure is given. MSC: 62F10; 62F25
Real-time Traffic| Added | 11 Dec 2010 |
| Updated | 11 Dec 2010 |
| Type | Journal |
| Year | 2006 |
| Where | CSDA |
| Authors | Hubert J. Chen, Miin-Jye Wen |
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