References
- Chow , Y. S. and Robbins , H. 1965 . On the theory of fixed-width sequential confidence intervals for the mean . Ann. Math. Statist. , 36 : 457 – 462 .
- Finney , D. J. 1941 . The joint distribution of variance ratios based on a common error mean square . Ann. Eugenics , 11 : 136 – 140 .
- Ghosh , M. and Mukhopadhyay , N. 1979 . Sequential estimation of the mean when the distribution is unspecified . Commun. Statist. , 8 : 637 – 652 . Ser. A.
- Ghosh , M. and Mukhopadhyay , N. 1981 . Consistency and asymptotic efficiency of two-stage and sequential estimation procedures . Sankhya , 43 : 220 – 227 . Ser. A.
- Ghurye , S. G. 1958 . Note on sufficient statistics and two-stage procedures . Ann. Math. Statist. , 29 : 155 – 166 .
- Gupta , S. S. and Panchapakesan , S. 1979 . Multiple Decision Procedures: Theory and MethodoZogy of Selection and Ranking Populations , New York : John Wiley and Sons .
- Gupta , S. S. and Sobel , M. 1962 . On the smallest of several correlated F-statistics . Biometrika , 49 : 509 – 523 .
- Hall , P. 1981 . Asymptotic theory of triple sampling for sequential estimation of a mean . Ann. Statist. , 9 : 1229 – 1238 .
- Kimball , A. W. 1951 . On dependent tests of significance in the analysis of variance . Ann. Math. Statist. , 22 : 600 – 602 .
- Krishnaiah P. R. Armitage J. V. Distribution of the studentized smallest chi-square with tables and applications Wright Patterson Air Force Base Ohio, Dayton 1964 ARL 64-218
- Krishnaiah , P. R. and Armitage , J. V. 1970 . “ On a multivariate F-distribution ” . In Essays in Probability and Statist Edited by: Roy , S. N. and Bose , R. C. 439 – 468 .
- Lal Saxena , K. M. and Tong , Y. L. 1969 . Interval estimation of the largest mean of k normal populations with known variances . J. Amer. Statist. Assoc. , 64 : 296 – 299 .
- Lombard , F. and Swanepoel , J. W. H. 1978 . On finite and infinite confidence sequences . South Afr. Statist. J. , 12 : 1 – 24 .
- Mukhopadhyay , N. 1974 . Sequential estimation of location parameter in exponential distribution . calcutta Statist. Assoc. Bull. , 23 : 85 – 95 .
- Mukhopadhyay , N. 1980 . A consistant and asymptotically efficient two-stage procedure to construct fixed-width confidence intervals for the mean . Metrika , 27 : 281 – 284 .
- Mukhopadhyay , N. 1982 . On the asymptotic regret while estimating the location of an exponential distribution . Calcutta. Statist. Assoc. Bull. , 31 : 207 – 213 .
- Mukhopadhyay , N. 1982 . Stein's two-stage procedure and exact consitency . Scand. Actuarial J. , 31 : 110 – 122 .
- Mukhopadhyay , N. 1987 . Three-stage procedures for selecting the best exponential population . J. Statist. Plan. and Inf. , 16 : 345 – 352 .
- Mukhopadhyay , N. 1988 . Sequential estimation problems for negative exponential populations . Comn. Statist. , 27 : 2471 – 2506 . Ser. A
- Mukhopadhyay , N. and Hamdy , H. I. 1984 . Two-stage procedure for selecting the best exponential population when the scale parameters are unknown and unequal . J. Sequential Anal. , 3 : 51 – 74 .
- Mukhopadhyay , N. and Hamdy , H. I. 1985 . Simultaneous sequential estimation of 1ocation parameters of negative exponential distributions Unpublished manuscript
- Mukhopadhyay , N. and Mauromoustakos , A. 1987 . Three-stage estimation procedures for the negative exponential distributions . Metrika , 34 : 83 – 93 .
- Stein , C. 1945 . A two-sample test for a linear hypothesis whose power is independent of the variance . Ann. Math. Statist. , 16 : 243 – 258 .
- Stein , C. 1949 . Some problems in sequential estimation . Econometrica , 17 : 77 – 78 . (Abstract)
- Swanepoel , J. W. H. and van Wyk , J. W. J. 1982 . Fixed-width confidence intervals for the location parameter of an exponential distribution . Comun. Statist. , 11 : 1279 – 1289 . Ser. A
- Tong , Y. L. 1970 . Multi-stage interval estimations of the largest mean of k normal populations . J. ROY. Statist. Soc. , 32 : 272 – 277 . Ser. B
- Woodroofe , M. 1977 . Second-order approximations for sequential point and interval estimation . Ann. Statist. , 5 : 984 – 995 .