대한산업공학회지 (Journal of Korean Institute of Industrial Engineers)

  • 제39권5호
  • /
  • Pages.422-428
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  • 2013
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  • 1225-0988(pISSN)
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  • 2234-6457(eISSN)
대한산업공학회 (Korean Institute of Industrial Engineers)
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대용변수를 이용한 가변형 부분군 채취 간격 X 관리도의 경제적 설계

Economic Design of Variable Sampling Interval X Control Chart Using a Surrogate Variable

  • Lee, Tae-Hoon (Korea Atomic Energy Research Institute) ;
  • Lee, Jooho (Department of Information and Statistics, Chungnam National University) ;
  • Lee, Minkoo (Department of Information and Statistics, Chungnam National University)
  • 투고 : 2013.01.14
  • 심사 : 2013.05.14
  • 발행 : 2013.10.15
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초록

In many cases, an $\bar{X}$ control chart which is based on the performance variable is used in industrial fields. However, if the performance variable is too costly or impossible to measure and a less expensive surrogate variable is available, the process may be more efficiently controlled using surrogate variables. In this paper, we propose a model for the economic design of a VSI (Variable Sampling Interval) $\bar{X}$ control chart using a surrogate variable that is linearly correlated with the performance variable. The total average profit model is constructed, which involves the profit per cycle time, the cost of sampling and testing, the cost of detecting and eliminating an assignable cause, and the cost associated with production during out-of-control state. The VSI $\bar{X}$ control charts using surrogate variables are expected to be superior to the Shewhart FSI (Fixed Sampling Interval) $\bar{X}$ control charts using surrogate variables with respect to the expected profit per unit cycle time from economic viewpoint.

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참고문헌

  1. Bai, D. S. and Lee, K. T. (1998), An economic design of variable sampling interval $\bar{X}$ control charts, International Journal of Production Economics, 54, 57-64. https://doi.org/10.1016/S0925-5273(97)00125-4
  2. Champ, C. W. and Woodall, W. H. (1987), Exact results for Shewhart charts with supplementary runs rules, Technometrics, 29, 393-399. https://doi.org/10.1080/00401706.1987.10488266
  3. Costa, A. F. B. and Rahim, M. A. (2001), Economic design of $\bar{X}$ charts with variable parameters : the Markov chain approach, Journal of Applied Statistics, 28, 875-885. https://doi.org/10.1080/02664760120074951
  4. Costa, A. F. B. and De Magalhaes, M. S. (2002), Economic design of two-stage $\bar{X}$ charts : The Markov chain approach, International Journal of Production Economics, 95, 9-20.
  5. De Magalhaes, M. S. and Moura Neto, F. D. (2005), Joint economic model for totally adaptive $\bar{X}$ and R charts, European Journal of Operational Research, 161, 148-161. https://doi.org/10.1016/j.ejor.2003.08.033
  6. Duncan, A. J. (1956), The economic design of $\bar{X}$ charts used to maintain current control of a process, Journal of American Statistical Association, 51, 228-242.
  7. Duncan, A. J. (1971), The economic design of $\bar{X}$ charts when there is a multiplicity of assignable cause, Journal of American Statistical Association, 66, 107-121.
  8. Lee, J. H. and Kwon, W. J. (1999), Economic design of a Two-Stage Control Chart Based on Both Performance and Surrogate Variables, Naval Research Logistics, 46, 954-977.
  9. Lee, T. H., Lee, J. H., Lee, M. K., and Lee. J. H. (2009), An economic of $\bar{X}$ control chart using a surrogate variable, Korean Society for Quality Management, 37, 46-57.
  10. Lucas, J. M. (1982), Combined Shewhart-CUSUM quality control schemes, Journal of Quality Technology, 14, 51-59. https://doi.org/10.1080/00224065.1982.11978790
  11. Lucas, J. M. and Saccucci, M. S. (1990), Exponentially weighted moving average control schemes : properties and enhancements, Technometircs, 32, 1-29. https://doi.org/10.1080/00401706.1990.10484583
  12. Owen, D. B. and Boddie, J. W. (1976), A screening method for increasing acceptable product with some parameters unknown, Technometrics , 18, 195-199. https://doi.org/10.1080/00401706.1976.10489424
  13. Reynolds Jr., M. R., Amin R. W., Arnold J. C., and Nachlas J. A., (1988), $\bar{X}$ charts with variable sampling intervals, Technometrics, 30, 181-192.
  14. Reynolds Jr., M. R. and Arnold, J. C. (1989), Optimal one-sided Shewhart control charts with varialbe sampling intervals, Sequential Analysis, 8, 51-77. https://doi.org/10.1080/07474948908836167
  15. Ross, S. M. (1983), Stochastic Processes, John Wiley and Sons, New York.
  16. Runger, G. C. and Montgomery, D. C. (1993), Adaptive sampling enhancements for Shewhart control charts, IIE Transactions, 25, 41-51. https://doi.org/10.1080/07408179308964289
  17. Ryu, J. P. and Shin, H. J. (2012), Investment strategies for KOSPI200 Index Futeres using VKOSPI and control chart, Journal of the Korean Institute of Industrial Engineers, 38, 237-243. https://doi.org/10.7232/JKIIE.2012.38.4.237
  18. Saccucci, M. S., Amin, R. W. and Lucas, J. M. (1992), Exponentially weighted moving average schemes with variable sampling intervals, Communications is Statistics-Simulation and Computation, 21, 627-657. https://doi.org/10.1080/03610919208813040
  19. Venkataraman, P. (2009), Applied optimization with matlab programming second edition, John wiley and Son, Inc.