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Journal of Quality Technology
A Quarterly Journal of Methods, Applications and Related Topics
Volume 42, 2010 - Issue 1
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Articles

A Bayesian Model-Averaging Approach for Multiple-Response Optimization

Szu Hui NgNational University of Singapore, SingaporeView further author information
Pages 52-68 | Published online: 21 Nov 2017

References

  • Atkinson, A. C. and Donev, A. N. (1992). Optimum Experimental Designs. Oxford, UK: Oxford University Press.
  • Atkinson, A. C. (1996). “Discussion: Follow-Up Designs to Resolve Confounding in Multifactor Experiments”. Technometrics 38 (4), pp. 314–317.
  • Berger, J. O. (1985). Statistical Decision Theory and Bayesian Analysis. New York, NY: Springer-Verlag.
  • Buckland, S. T.; Burnham, K. P.; and Augustin, N. H. (1997). “Model Selection: An Integral Part of Inference”. Biometrics 53, pp. 275–290.
  • Brown, P. J. (1993). Measurement, Regression, and Calibration. Oxford, UK: Clarendon.
  • Brown, P. J. and Vannucci, M. (1998). “Multivariate Bayesian Variable Selection and Prediction”. Journal of the Royal Statistical Society 60, pp. 627–641.
  • Chiao, C. H. and Hamada, M. (2001). “Analyzing Experiments with Correlated Multiple Responses”. Journal of Quality Technology 33 (4), pp. 451–465.
  • Chipman, H. (1996). “Bayesian Variable Selection with Related Predictors”. Canadian Journal of Statistics 24 (1), pp. 17–36.
  • Chipman, H.; George, E. I.; and McCulloch R. E. (2001). “The Practical Implementation of Bayesian Model Selection”. IMS Lecture Notes–Monograph Series 38, pp. 67–107.
  • Dawid, A. P. (1981). “Some Matrix-Variate Distribution Theory: Notational Considerations and a Bayesian Application”. Biometrika 68, pp. 265–274.
  • DuMouchel, W. and Jones, B. (1994). “A Simple Bayesian Modification of D-Optimal Designs to Reduce Dependence on an Assumed Model”. Technometrics 36, pp. 37–47.
  • Gelfand, A. E. and Smith, A. M. F. (1990). “Sampling-Based Approaches to Calculating Marginal Densities”. Journal of American Statistical Association 85, pp. 398–409.
  • Fernandez, C.; Ley, E.; and Steel, M. F. J. (2001). “Benchmark Priors for Bayesian Model Averaging”. Journal of Econometrics 100, pp. 381–427.
  • Genz, A. and Bretz, F. (2002). “Methods for the Computation of Multivariate t-Probabilities”. Journal of Computational and Graphical Statistics 11, pp. 950–971.
  • George, E. I. and McCulloch, R. E. (1997). “Approaches for Bayesian Variable Selection”. Statistica Sinica 7, pp. 339–373.
  • George, E. I. (1999). “Bayesian Model Selection”. In Encyclopedia of Statistical Sciences, Update vol. 3, pp. 39–46.
  • George, E. I. and Foster, D. P. (2000). “Calibration and Empirical Bayes Variable Selection”. Biometrika 87, pp. 731–747.
  • Hamada, M.; Martz, H. F.; Reese, C. S.; and Wilson, A. G. (2001). “Finding Near-Optimal Bayesian Experimental Designs via Generic Algorithms”. The American Statistician 55 (3), pp. 175–181.
  • Hoeting, J. A.; Madigan, D.; Raftery, A.; and Volinsky, C. T. (1999). “Bayesian Model Averaging: A Tutorial”. Statistical Science 14 (4), pp. 382–417.
  • Kass, R. E. and Raftery, A. E. (1995). “Bayes Factors”. Journal of the American Statistical Association 90, pp. 773–795.
  • Madigan, D. and York, J. (1995). “Bayesian Graphical Models for Discrete Data”. International Statistical Review 63 (2), pp. 215–232.
  • Meyer, R. D. and Box, G. E. P. (1992). “Finding Active Factors in Fractionated Screening Experiments”. CQPI Report No. 80.
  • Meyer, R. D.; Steinberg, D. M.; and Box, G. E. P. (1996). “Follow-Up Designs to Resolve Confounding in Multifactor Experiments (with Discussion)”. Technometrics 38 (4), pp. 303–332.
  • Miró-Quesada, G.; Del Castillo, E.; and Peterson, J. (2004). “A Bayesian Approach for Multiple Response Surface Optimization in the Presence of Noise Variables”. Journal of Applied Statistics 31 (3), pp. 251–270.
  • Moala, F. M. and O'Hagan, A. (2009). “Elicitation of Multivariate Prior Distributions: A Nonparametric Bayesian Approach”. Submitted.
  • Muller, P. and Parmigiani, G. (1995). “Optimal Design via Curve Fitting of Monte Carlo Experiments”. Journal of the American Statistical Association 90, pp. 1322–1330.
  • Muller, P. (2000). “Simulation Based Optimal Design”. Bayesian Statistics 6, pp. 1–13.
  • Ng, S. H. and Chick, S. E. (2004). “Design of Follow-Up Experiments for Improving Model Discrimination and Parameter Estimation”. Navel Research Logistics 51, pp. 1129–1148.
  • O'Hagan, A.; Buck, C. E.; Daneshkhah, A.; Eiser, J. R.; Garthwaite, P. H.; Jenkinson, D. J.; Oakley, J. E.; and Rakow, T. (2006). Uncertain Judgements. New York, NY: John Wiley & Sons.
  • Peterson, J. J. (2004). “A Posterior Predictive Approach to Multiple Response Surface Optimization”. Journal of Quality Technology 36 (2), pp. 139–153.
  • Peterson, J. J. (2007). “A Review of Bayesian Reliability Approaches to Multiple Response Surface Optimization”. In Bayesian Process Monitoring, Control and Optimization, Colosimo, B. M. and E. E. Del Castillo, (eds.), pp. 269–290. New York, NY: Chapman & Hall.
  • Pignatello, J. J. (1993). “Strategies for Robust Multiresponse Quality Engineering”. IIE Transactions 25 (3), pp. 5–15.
  • Press, S. J. (1986). Applied Multivariate Analysis: Using Bayesian and Frequentist Methods of Inference. New York, NY: R. E. Krieger.
  • Raftery, A. E.; Madigan, D.; and Hoeting, J. A. (1997). “Bayesian Model Averaging for Linear Regression Models”. Journal of the American Statistical Association 92 (437), pp. 179–191.
  • Rajagopal, R. and Del Castillo, E. (2005). “Model-Robust Process Optimization using Bayesian Model Averaging”. Technometrics 47 (2), pp. 152–163.
  • Rajagopal, R.; Del Castillo, E.; and Peterson, J. J. (2005). “Model and Distribution Robust Process Optimization with Noise Factors”. Journal of Quality Technology 37 (3), pp. 210–222.
  • Smith, M. and Kohn, R. (1996). “Nonparametric Regression Using Bayesian Variable Selection”. Journal of Econometrics 75, pp. 317–343.
  • Taguchi, G. (1986). “Introduction to Quality Engineering: Designing Quality into Products and Processes”. White Plains, NY: Asian Productivity Organization, UNIPUB/Kraus International.
  • Vining, G. G. (1998). “A Compromise Approach to Multiresponse Optimization”. Journal of Quality Technology 30, pp. 309–313.
  • Wold, S.; Carlson, R.; and Skagerberg, B. (1989). “Statistical Optimization as a Means to Reduce Risks in Industrial Processes”. The Environmental Professional 11, pp. 127–131.
  • Wu, C. F. J. and Hamada, M. (2000). Experiments: Planning, Analysis and Parameter Design Optimization. New York, NY: John Wiley & Sons.
  • Zellner, A. (1986). “On Assessing Prior Distributions and Bayesian Regression Analysis with g-Prior Distributions”. In Bayesian Inference and Decision Techniques–Essays in Honour of Bruno de Finetti, Goel, P. K., and Zellner, A. (eds.), pp. 233–243. Amsterdam, The Netherlands: North-Holland.

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