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Maximum entropy sampling and optimal Bayesian experimental design

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  • P. Sebastiani
  • H. P. Wynn

Abstract

When Shannon entropy is used as a criterion in the optimal design of experiments, advantage can be taken of the classical identity representing the joint entropy of parameters and observations as the sum of the marginal entropy of the observations and the preposterior conditional entropy of the parameters. Following previous work in which this idea was used in spatial sampling, the method is applied to standard parameterized Bayesian optimal experimental design. Under suitable conditions, which include non‐linear as well as linear regression models, it is shown in a few steps that maximizing the marginal entropy of the sample is equivalent to minimizing the preposterior entropy, the usual Bayesian criterion, thus avoiding the use of conditional distributions. It is shown using this marginal formulation that under normality assumptions every standard model which has a two‐point prior distribution on the parameters gives an optimal design supported on a single point. Other results include a new asymptotic formula which applies as the error variance is large and bounds on support size.

Suggested Citation

  • P. Sebastiani & H. P. Wynn, 2000. "Maximum entropy sampling and optimal Bayesian experimental design," Journal of the Royal Statistical Society Series B, Royal Statistical Society, vol. 62(1), pages 145-157.
    • Handle: RePEc:bla:jorssb:v:62:y:2000:i:1:p:145-157
    DOI: 10.1111/1467-9868.00225
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    Cited by:

    1. Han, Cong & Chaloner, Kathryn, 2004. "A note on optimal designs for two or more treatment groups," Statistics & Probability Letters, Elsevier, vol. 69(1), pages 81-89, August.
    2. Hessa Al-Thani & Jon Lee, 2020. "An R Package for Generating Covariance Matrices for Maximum-Entropy Sampling from Precipitation Chemistry Data," SN Operations Research Forum, Springer, vol. 1(3), pages 1-21, September.
    3. Rusin, K. & Wróblewski, W. & Rulik, S., 2021. "Efficiency based optimization of a Tesla turbine," Energy, Elsevier, vol. 236(C).
    4. Kasianova, Ksenia & Kelbert, Mark & Mozgunov, Pavel, 2021. "Response adaptive designs for Phase II trials with binary endpoint based on context-dependent information measures," Computational Statistics & Data Analysis, Elsevier, vol. 158(C).
    5. Belmiro P. M. Duarte & Anthony C. Atkinson & Satya P. Singh & Marco S. Reis, 2023. "Optimal design of experiments for hypothesis testing on ordered treatments via intersection-union tests," Statistical Papers, Springer, vol. 64(2), pages 587-615, April.
    6. Rodriguez, Sergio & Ludkovski, Michael, 2020. "Probabilistic bisection with spatial metamodels," European Journal of Operational Research, Elsevier, vol. 286(2), pages 588-603.
    7. Zhongzhu Chen & Marcia Fampa & Jon Lee, 2023. "On Computing with Some Convex Relaxations for the Maximum-Entropy Sampling Problem," INFORMS Journal on Computing, INFORMS, vol. 35(2), pages 368-385, March.
    8. Kim, Taejin & Lee, Gueseok & Youn, Byeng D., 2019. "PHM experimental design for effective state separation using Jensen–Shannon divergence," Reliability Engineering and System Safety, Elsevier, vol. 190(C), pages 1-1.
    9. Jun Yu & HaiYing Wang, 2022. "Subdata selection algorithm for linear model discrimination," Statistical Papers, Springer, vol. 63(6), pages 1883-1906, December.

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