Monotonicity of the probability of correct selection or are bigger samples better?BOFINGER, E.Journal of the Royal Statistical Society. Series B. Methodological. 1985, Vol 47, Num 1, pp 84-89, issn 0035-9246Article

On a strengthening of the indifference zone approach to a generalized selection goalGIANI, G.Communications in statistics. Theory and methods. 1986, Vol 15, Num 10, pp 3163-3171, issn 0361-0926Article

Subset selection for the least probable multinomial cellPINYUEN CHEN.Annals of the Institute of Statistical Mathematics. 1985, Vol 37, Num 2, pp 303-314, issn 0020-3157Article

On selection with restrictionRAVINDRA KHATTREE.Communications in statistics. Simulation and computation. 1987, Vol 16, Num 4, pp 1093-1103, issn 0361-0918Article

A best-choice problem with linear travel costSAMUELS, S. M.Journal of the American Statistical Association. 1985, Vol 80, Num 390, pp 461-464, issn 0162-1459Article

An elimination type two-stage selection procedure for exponential distributionsSEUNG-HO LEE; WOO-CHUL KIM.Communications in statistics. Theory and methods. 1985, Vol 14, Num 10, pp 2563-2571, issn 0361-0926Article

Some theorems, counterexamples, and conjectures in multinomial selection theoryCHEN, R. W; HWANG, F. K.Communications in statistics. Theory and methods. 1984, Vol 13, Num 10, pp 1289-1298, issn 0361-0926Article

Improvement by planned multistage selectionFINNEY, D. J.Journal of the American Statistical Association. 1984, Vol 79, Num 387, pp 501-509, issn 0162-1459Article

On a sequential selection procedure of Bechhofer, Kiefer, and SoebelLEVIN, B.Statistics & probability letters. 1984, Vol 2, Num 2, pp 91-94, issn 0167-7152Article

Some locally optimal subset selection rules for comparison with a controlDENG-YUAN HUANG; PANCHAPAKESAN, S; SHENG-TSAING TSENG et al.Journal of statistical planning and inference. 1984, Vol 9, Num 1, pp 63-72, issn 0378-3758Article

Equal probability of correct selection for Bernouli selection proceduresJENNISON, C.Communications in statistics. Theory and methods. 1983, Vol 12, Num 24, pp 2887-2896, issn 0361-0926Article

An empirical Bayes approach to estimating the probability of correct selectionMCCULLOCH, C. E; DECHTER, A.Communications in statistics. Simulation and computation. 1985, Vol 14, Num 1, pp 173-186, issn 0361-0918Article

Subset selection of superior populations when the number of populations is largeBJORNSTAD, J. F.Journal of statistical planning and inference. 1985, Vol 11, Num 2, pp 207-216, issn 0378-3758Article

A symptotic consistency of procedures for selecting good populationsBJORNSTAD, J. F.Communications in statistics. Theory and methods. 1985, Vol 14, Num 7, pp 1659-1668, issn 0361-0926Article

Monotonicity in selection problems: a unified approachBERGER, R. L; PROSCHAN, F.Annals of statistics. 1984, Vol 12, Num 1, pp 387-391, issn 0090-5364Article

Selecting the best population, provided it is better than a standard: the unequal variance caseWILCOX, R. R.Journal of the American Statistical Association. 1984, Vol 79, Num 388, pp 887-891, issn 0162-1459Article

Interactive variable selection (IVS) for PLS. I: Theory and algorithmsLINDGREN, F; GELADI, P; RÄNNAR, S et al.Journal of chemometrics. 1994, Vol 8, Num 5, pp 349-363, issn 0886-9383Article

An integrated formulation for selecting the most probable multinomial cellPINYUEN CHEN.Annals of the Institute of Statistical Mathematics. 1988, Vol 40, Num 3, pp 615-625, issn 0020-3157Article

An integrated formulatin for selecting the t best of k normal populationsPINYUEN CHEN; SOBEL, M.Communications in statistics. Theory and methods. 1987, Vol 16, Num 1, pp 121-146, issn 0361-0926Article

Two selection problems revisitedKIRSCHENHOFER, P; PRODINGER, H.Journal of combinatorial theory. Series A. 1986, Vol 42, Num 2, pp 310-316, issn 0097-3165Article

Truncation of the Bechhofer-Kiefer-Sobel sequential procedure for selecting the multinomial event which has the largest probabilityBECHHOFER, R. E; GOLDSMAN, D. M.Communications in statistics. Simulation and computation. 1985, Vol 14, Num 2, pp 283-315, issn 0361-0918Article

Least significant spacing for one versus the rest normal populationsBOFINGER, E.Communications in statistics. Theory and methods. 1988, Vol 17, Num 5, pp 1697-1716, issn 0361-0926Article

On a conjecture concerning the least favorable configuration of a two-stage selection procedureSEHR, J.Communications in statistics. Theory and methods. 1988, Vol 17, Num 10, pp 3221-3233, issn 0361-0926Article

Optimal properties of the Bechhofer-Kukarni Bernoulli selection procedureKULKARNI, R. V; JENNISON, C.Annals of statistics. 1986, Vol 14, Num 1, pp 298-314, issn 0090-5364Article

An optimal sequential procedure for selecting the best Bernoulli process ― a reviewBECHHOFER, R. E.Naval research logistics quarterly. 1985, Vol 32, Num 4, pp 665-674, issn 0028-1441Article