참고문헌
- 박창순, 이재헌, 김영일(2002), 'VSI와 VSS 관리도의 경제적 효율 비교',품질경영학회지, 30권, 2호, pp. 99-117
- 송서일, 박현규, 정혜진(2004), 'VSI EWMA 관리도의 경제적 통계적 설계',품질경영학회지, 32권, 1호, pp. 92-101
- 이호중, 임태진(2005), '두 개의 이상원인을 고려한 VSSI X 관리도의 경제적-통계적 설계',대한산업공학회지, 31권, 1호, pp. 87-98
- 임태진(2005), '선택적 누적합(S-CUSUM) 관리도', 품질경영학회지, 33권, 3호, pp. 126-134
- Acosta-Mejia, C. A.(2007), 'Two Sets to Runs Rules for the X Chart', Quality Engineering, Vol.19, pp.129-136 https://doi.org/10.1080/17513470701263641
- Bai, D. S. and Lee, K. T.(1998), 'An Economic Design of Variable Sampling Interval X Control Charts', International Journal of Production Economics, Vol.54, pp.57-64 https://doi.org/10.1016/S0925-5273(97)00125-4
- Brook, D. and Evans D. A.(1972), 'An approach to the Probability Distribution of CUSUM Run Lengths', Biometrika, Vol.59, pp.539-549 https://doi.org/10.1093/biomet/59.3.539
- Champ, C. W. and Woodall, W. H.(1987), 'Exact Results for Shewhart Control Charts With Supplementary Runs Rules', Technometrics, Vol.29, No.4, pp.393-399 https://doi.org/10.2307/1269449
- Chen, Y. K., Hsieh, K. L. and Chang, C. C.(2007), 'Economic Design of the VSSI X Control Charts for Correlated Data', International Journal of Production Economics, Vol.107, No.2, pp.528-539 https://doi.org/10.1016/j.ijpe.2006.10.008
- Chung, K. J.(1992), 'Determination of Optimal Design Parameters of an X Control Chart', Journal of Operational Research Society, Vol.43, No.12, pp.1151-1157 https://doi.org/10.2307/2584271
- Costa, A. F. B. and Magalhaes M. S. De. (2005), 'Economic design of two-stage charts: The Markov chain approach', International Journal of Production Economics, Vol.95, No.1, pp.9-20 https://doi.org/10.1016/j.ijpe.2003.10.024
- Fu, J. C., Spiring, F. A. and Xie, H. (2002), 'On the average run lengths of quality control schemes using a Markov chain approach', Statistics & Probability Letters, Vol.56, pp.369-380 https://doi.org/10.1016/S0167-7152(01)00183-3
- Fu, J. C., Shmueli, G. and Chang, Y. M. (2003), 'A unified Markov chain approach for computing the run length distribution in control charts with simple or compound rules', Statistics & Probability Letters, Vol.65, pp.457-466 https://doi.org/10.1016/j.spl.2003.10.004
- Hurwitz A. and Mathur M.(1992), 'A very Simple Set of Process Control Rules', Quality Engineering, Vol. 5, No. 1, pp. 21-29 https://doi.org/10.1080/08982119208918947
- Khoo, M. B. C. and Ariffin, K. N. bt. (2006), 'Two Improved Runs rules for the Shewhart X Control Chart', Quality Engineering, Vol.18, pp.173-178 https://doi.org/10.1080/08982110600567517
- Klein, M. (2000), 'Two Alternatives to the Shewhart X Control Chart', Journal of Quality Technology, Vol.32, pp.427-431 https://doi.org/10.1080/00224065.2000.11980028
- Prabhu, S. S., Montgomery, D. C. and Runger, G. C.(1997), 'Economic-Statistical Design of an Adaptive X Chart', International Journal of Production Economics, Vol.49, pp.1-15 https://doi.org/10.1016/S0925-5273(96)00100-4
- Taylor, H. M. (1968), 'The Economic Design of Cumulative Sum Control Charts, Technometrics', 10(3), 479-488 https://doi.org/10.2307/1267102
- Woodall, W. H.(1985), 'The statistical design of quality control charts', The Statistician, Vol.34, pp.155-160 https://doi.org/10.2307/2988154