Algorithm for Calculating the Initial Sample Size in a Fully Sequential Ranking and Selection Procedure
From MaRDI portal
Publication:5149555
DOI10.1142/S0217595920500153zbMath1460.62133OpenAlexW3005828886MaRDI QIDQ5149555
Shaoxuan Liu, Zhenyang Shi, Ruijing Wu
Publication date: 11 February 2021
Published in: Asia-Pacific Journal of Operational Research (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s0217595920500153
Related Items
Cites Work
- Unnamed Item
- Unnamed Item
- Simulation budget allocation for further enhancing the efficiency of ordinal optimization
- An efficient simulation procedure for ranking the top simulated designs in the presence of stochastic constraints
- Note on Anderson's sequential procedures with triangular boundary
- Fully Sequential Procedures for Large-Scale Ranking-and-Selection Problems in Parallel Computing Environments
- Indifference-Zone-Free Selection of the Best
- Fully sequential procedures for comparing constrained systems via simulation
- The first-passage density of a continuous gaussian process to a general boundary
- A comparison of the performances of procedures for selecting the normal population having the largest mean when the populations have a common unknown variance
- A fully sequential procedure for indifference-zone selection in simulation
- Combined variance reduction techniques in fully sequential selection procedures
- Ranking and Selection as Stochastic Control
- Gradient-Based Myopic Allocation Policy: An Efficient Sampling Procedure in a Low-Confidence Scenario
- An improvement on paulson's procedure for selecting the poprlation with the largest mean from k normal populations with a common unknown variance
- Myopic Allocation Policy With Asymptotically Optimal Sampling Rate
- Reducing the Conservativeness of Fully Sequential Indifference-Zone Procedures
- Fully sequential indifference‐zone selection procedures with variance‐dependent sampling
- A Sequential Procedure for Selecting the Population with the Largest Mean from $k$ Normal Populations
- A Comparison of the Asymptotic Expected Sample Sizes of Two Sequential Procedures for Ranking Problem
- A Single-Sample Multiple Decision Procedure for Ranking Means of Normal Populations with known Variances
