References
- Bechhofer , R.E. 1954 . A single-sample multiple decision procedure for ranking means of normal populations with known variances . Ann. Math. Statist , 25 : 16 – 39 .
- Bechhofer , R.E. , Kiefer , J. and Sobel , M. 1968 . “ Sequential Identification and Ranking Procedures ” . Chicago : The University of Chicago . with special reference to Koopman-Darmois populations
- Bechhofer , R.E. and Goldsman , D.M. 1987 . Truncation of the Bechhofer-Kiefer-Sobel sequential procedure for selecting the normal population which has the largest mean . Comm. Statist.-Simula. Computa , B16 ( 4 ) : 1067 – 1091 .
- Bechhofer , R.E. and Goldsman , D.M. 1989 . Truncation of the Bechhofer-Kiefer-Sobel sequential procedure for selecting the normal population which has the largest mean III: supplementary truncation numbers and resulting performance characteristics . Comm. Statist.-Simula. Computa , B18 ( 1 ) : 63 – 81 .
- Bechhofer , R. and Turnbull , B.W. 1978 . Two (K + 1) Decision Selection Procedures for Comparing K normal means with aspecified standard . J. Amer. Statist. Assoc , 73 ( 1 ) : 385 – 392 .
- Fabian , V. 1974 . Note on Anderson's sequential procedure with triangular boundary . Annals of Statistics , 2 ( 1 ) : 170 – 175 .
- Hartmann , M. 1988 . An improvement on Paulson's sequential ranking procedure . Sequential Analysis , 7 ( 4 ) : 363 – 372 .
- Hoel , D.G. and Mazumdar , M. 1968 . An extension of Paulson's selection procedure . Ann. Math. Statist , 39 ( 4 ) : 2067 – 2074 .
- Paulson , E. 1964 . A sequential procedure for selecting the population with the largest mean from Knormal populations . Ann. Math. Statist , 35 ( 4 ) : 174 – 180 .