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eCommons@Cornell >
Browsing by Author Bechhofer, R.
Showing results 10 to 29 of 29
| Preview | Issue Date | Title | Author(s) | | Dec-1974 | A (k+1)-decision Single-Stage Selection Procedure for Comparing k Normal Means with a Fixed Known Standard: The Case of Common Known Variance | Bechhofer, R.; Turnbull, B. |
| May-1975 | A (k+1)-decision Single-Stage Selection Procedure for Comparing k Normal Means with a Fixed Known Standard: The Case of Common Unknown Variance | Bechhofer, R.; Turnbull, B. |
| Nov-1984 | On the Ramey-Alam Sequential Procedure for Selecting the Multinomial Event which has the Largest Probability | Bechhofer, R.; Goldsman, D. |
| Jun-1987 | Optimal Allocation of Observations in Subset Selection and Multiple Comparisons with a Control, and Associated Tables (With Application to Drug Screening) | Bechhofer, R.; Dunnett, C.; Tamhane, A. |
| May-1971 | Optimal Allocation of Observations when Comparing Several Treatments with a Control, III: Globally Best One-Sided Intervals for Unequal Variances | Bechhofer, R.; Turnbull, B. |
| Feb-1984 | An Optimal Sequential Procedure for Selecting the Best Bernoulli Process | Bechhofer, R. |
| Jun-1986 | Percentage Points of Multivariate Student t Distributions | Bechhofer, R.; Dunnett, C. |
| Jul-1986 | Sequential Selection Procedures for Multi-factor Experiments Involving Koopman-Darmois Populations with Additivity | Bechhofer, R.; Goldsman, D. |
| Jul-1988 | A Single-Stage Selection Procedure for Multi-Factor Multinomial Experiments with Multiplicativity | Bechhofer, R.; Goldsman, D.; Jennison, C. |
| May-1991 | Study of the performance of a generalized Paulson sequential selection procedure for two-factor experiments involving normal populations with common known variance and no factor-level interaction | Bechhofer, R.; Goldsman, D.; Hartmann, M. |
| Nov-1986 | Subset Selection for Normal Means in Multi-Factor Experiments | Bechhofer, R.; Dunnett, C. |
| Jan-1984 | A Survey of Literature on Estimation Methods for Quantal Response Curves with a View Toward Applying them to the... | Tamhane, A.; Bechhofer, R. |
| Jan-1985 | Truncation of the Bechhofer-Kiefer-Sobel Sequential Procedure for Selecting the Multinomial Event which has the Largest Probability | Bechhofer, R.; Goldsman, D. |
| Feb-1986 | Truncation of the Bechhofer-Kiefer-Sobel Sequential Procedure for Selecting the Multinomial Event which has the Largest Probability (II): Extended Tables and an Improved Procedure | Bechhofer, R.; Goldsman, D. |
| Jul-1987 | Truncation of the Bechhofer-Kiefer-Sobel Sequential Procedure for Selecting the Normal Population which ahs the Largest Mean | Bechhofer, R.; Goldsman, D. |
| Sep-1987 | Truncation of the Bechhofer-Kiefer-Sobel Sequential Procedure for Selecting the Normal Population which has the Largest Mean (II): 2-Factor Experiments With Additivity | Bechhofer, R.; Goldsman, D. |
| Sep-1988 | 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 | Bechhofer, R.; Goldsman, D. |
| Feb-1977 | A Two-Stage Minimax Procedure with Screeming for Selecting the Largest Normal Mean | Tamhane, A.; Bechhofer, R. |
| May-1988 | Two-Stage Procedures for Comparing Treatments with a Control Elimination at the First Stage and Estimation at the Second Stage | Bechhofer, R.; Dunnett, C.; Tamhane, A. |
| Jan-1986 | Two-Stage Selection of the Best Factor Level Combination in Multi-Factor Experiments: Common Unknown Variance | Bechhofer, R.; Dunnett, C. |
Showing results 10 to 29 of 29
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