References
- Aytaçoğlu, B., and W. H. Woodall. 2020. Dynamic probability control limits for CUSUM charts for monitoring proportions with time-varying sample sizes. Quality and Reliability Engineering International 36 (2):592–603. doi: 10.1002/qre.2593.
- Bersimis, S., S. Psarakis, and J. Panaretos. 2007. Multivariate statistical process control charts: An overview. Quality and Reliability Engineering International 23 (5):517–43. doi: 10.1002/qre.829.
- Bodden, K. M., and S. E. Rigdon. 1999. A program for approximating the in-control ARL for the MEWMA control chart. Journal of Quality Technology 31 (1):120–3. doi: 10.1080/00224065.1999.11979902.
- Driscoll, A. R., W. H. Woodall, and C. Zou. 2021. Use of the conditional false alarm metric in statistical process monitoring. In Frontiers in statistical quality control 13, ed. S. Knoth and W. Schmid, 3–12. Cham, Switzerland: Springer.
- Gandy, A., and J. T. Kvaløy. 2013. Guaranteed conditional performance of control charts via bootstrap methods. Scandinavian Journal of Statistics 40 (4):647–68. doi: 10.1002/sjos.12006.
- Hawkins, D. M., P. Qiu, and C. W. Kang. 2003. The changepoint model for statistical process control. Journal of Quality Technology 35 (4):355–66. doi: 10.1080/00224065.2003.11980233.
- Hotelling, H. 1947. Multivariate quality control—illustrated by the air testing of sample bombsights. In Techniques of statistical analysis, ed. C. Eisenhart, M. W. Hastay, and W. A. Wallis, 111–84. New York: McGraw-Hill.
- Huang, W., L. Shu, W. H. Woodall, and K. L. Tsui. 2016. CUSUM procedures with probability control limits for monitoring processes with variable sample sizes. IIE Transactions 48 (8):759–71. doi: 10.1080/0740817X.2016.1146422.
- Huh, I., R. Viveros-Aguilera, and N. Balakrishnan. 2013. Differential smoothing in the bivariate exponentially weighted moving average chart. Journal of Quality Technology 45 (4):377–93. doi: 10.1080/00224065.2013.11917945.
- Jones, M. A., and S. H. Steiner. 2012. Assessing the effect of estimation error on the risk-adjusted CUSUM chart performance. International Journal for Quality in Health Care 24 (2):176–81. doi: 10.1093/intqhc/mzr082.
- Knoth, S. 2017. ARL numerics for MEWMA charts. Journal of Quality Technology 49 (1):78–89. doi: 10.1080/00224065.2017.11918186.
- Lowry, C. A., and D. C. Montgomery. 1995. A review of multivariate control charts. IIE Transactions 27 (6):800–10. doi: 10.1080/07408179508936797.
- Lowry, C. A., W. H. Woodall, C. W. Champ, and S. E. Rigdon. 1992. A multivariate exponentially weighted moving average control chart. Technometrics 34 (1):46–53. doi: 10.1080/00401706.1992.10485232.
- Margavio, T. M., M. D. Conerly, W. H. Woodall, and L. G. Drake. 1995. Alarm rates for quality control charts. Statistics & Probability Letters 24 (3):219–24. doi: 10.1016/0167-7152(94)00174-7.
- Mason, R. L., Y. M. Chou, and J. C. Young. 2001. Applying Hotelling’s T2 statistics to batch processes. Journal of Quality Technology 33 (4):466–79. doi: 10.1080/00224065.2001.11980105.
- Molnau, W. E., G. C. Runger, D. C. Montgomery, K. R. Skinner, E. N. Loredo, and S. S. Prabhu. 2001. A program for ARL calculations for multivariate EWMA charts. Journal of Quality Technology 33 (4):515–21. doi: 10.1080/00224065.2001.11980109.
- Prabhu, S. S., and G. C. Runger. 1997. Designing a multivariate EWMA control chart. Journal of Quality Technology 29 (1):8–15. doi: 10.1080/00224065.1997.11979720.
- Rigdon, S. E. 1995a. An integral equation for the in-control average run length of a multivariate exponentially weighted moving average control chart. Journal of Statistical Computation and Simulation 52 (4):351–65. doi: 10.1080/00949659508811685.
- Rigdon, S. E. 1995b. A double integral equation for the average run length of a multivariate exponentially weighted moving average control chart. Statistics & Probability Letters 24 (4):365–73. doi: 10.1016/0167-7152(94)00196-F.
- Roberts, S. W. 1959. Control chart tests based on geometric moving averages. Technometrics 1 (3):239–50. doi: 10.1080/00401706.1959.10489860.
- Runger, G. C., and S. S. Prabhu. 1996. A Markov chain model for the multivariate exponentially weighted moving averages chart. Journal of the American Statistical Association 91 (436):1701–6. doi: 10.1080/01621459.1996.10476741.
- Saleh, N. A., and M. A. Mahmoud. 2017. Accounting for phase I sampling variability in the performance of the MEWMA control chart with estimated parameters. Communications in Statistics - Simulation and Computation 46 (6):4333–47. doi: 10.1080/03610918.2015.1116570.
- Saleh, N. A., M. A. Mahmoud, L. A. Jones-Farmer, I. Zwetsloot, and W. H. Woodall. 2015. Another look at the EWMA control chart with estimated parameters. Journal of Quality Technology 47 (4):363–82. doi: 10.1080/00224065.2015.11918140.
- Shen, X., K.-L. Tsui, W. H. Woodall, and C. Zou. 2016. Self-starting monitoring scheme for Poisson count data with varying population sizes. Technometrics 58 (4):460–71. doi: 10.1080/00401706.2015.1075423.
- Shen, X., F. Tsung, C. Zou, and W. Jiang. 2013. Monitoring Poisson count data with probability control limits when sample sizes are time-varying. Naval Research Logistics (NRL) 60 (8):625–36. doi: 10.1002/nav.21557.
- Shepherd, D. K., L. A. Jones-Farmer, S. E. Rigdon, and K. M. Bodden. 2018. To shrink or not to shrink: Hotelling’s T2 chart based on shrunken covariance estimates. Quality and Reliability Engineering International 34 (6):1211–127. doi: 10.1002/qre.2319.
- Steiner, S. H., R. J. Cook, V. T. Farewell, and T. Treasure. 2000. Monitoring surgical performance using risk-adjusted cumulative sum charts. Biostatistics 1 (4):441–52. doi: 10.1093/biostatistics/1.4.441.
- Zhang, X., and W. H. Woodall. 2015. Dynamic probability control limits for risk-adjusted Bernoulli CUSUM charts. Statistics in Medicine 34 (25):3336–48. doi: 10.1002/sim.6547.
- Zhang, X., and W. H. Woodall. 2017. Reduction of the effect of estimation error on the in-control performance of risk-adjusted Bernoulli CUSUM chart with dynamic probability control limits. Quality and Reliability Engineering International 33 (2):381–6. doi: 10.1002/qre.2014.