References
- Carot, V., J. M. Jabaloyes, and T. Carot. 2002. Combined double sampling and variable sampling interval chart. International Journal of Production Research 40: 2175–86. doi:10.1080/00207540210128260.
- Chiu, W. C. 2015. Economic-statistical design of EWMA control charts based on Taguchi's loss function. Communications in Statistics-Simulation and Computation 44 (1):137–53. doi:10.1080/03610918.2013.773346.
- Costa, A. 2017. The double sampling range chart. Quality and Reliability Engineering International, 33 (8): 2739–45. doi:10.1002/qre.2232.
- Costa, F. B. A. 1994. X-bar charts with variable sampling size. Journal of Quality Technology 26: 155–63. doi:10.1080/00224065.1994.11979523.
- Croasdale, P. 1974. Control charts for a double-sampling scheme based on average production run lengths. International Journal of Production Research 12:585–92. doi:10.1080/00207547408919577.
- Daudin, J. J., C. Duby, and P. Trecourt. 1990. Plans de contrôle double optimaux (maîtrise des proce´de´s et contrôle de re´ception). Revue De Statistique Appliquee´ 34 (4):45–9.
- Daudin, J. J. 1992. Double sampling X-bar charts. Journal of Quality Technology 24:78–87. doi:10.1080/00224065.1992.12015231.
- Graham, M. A., S. Chakraborti and A. Mukherjee. 2014. Design and implementation of CUSUM exceedance control charts for unknown location. International Journal of Production Research, 52 (18):5546–64. doi:10.1080/00207543.2014.917214.
- Haq, A., Brown, J., and E. Moltchanova. 2016. New synthetic EWMA and synthetic CUSUM control charts for monitoring process mean. Quality and Reliability Engineering International 32 (1):269–90. doi:10.1002/qre.1747.
- Haq, A. 2017. New synthetic CUSUM and synthetic EWMA control charts for monitoring the process mean using auxiliary information. Quality and Reliability Engineering International 33 (7):1549–65. doi:10.1002/qre.2124.
- Haq, A., and M. B. C. Khoo. 2018. A new double sampling control chart for monitoring process mean using auxiliary information. Journal of Statistical Computation and Simulation 88 (5):869–99. doi:10.1080/00949655.2017.1408111.
- He, D., A. Grigoryan, and M. Sigh. 2002. Design of double- and triple-sampling X-bar control charts using genetic algorithms. International Journal of Production Research 40 (6):1387–404. doi:10.1080/00207540110118415.
- Irianto, D., and N. Shinozaki. 1998. An optimal double sampling X-bar control chart. International Journal of Industrial Engineering 5:226–34.
- Kackar, R. N. 1989. Taguchi’s quality philosophy: analysis and commentary. In Quality control, robust design, and the Taguchi method, 3–21. Boston, MA: Springer.
- Khoo, M. B. C., H. C. Lee, Z. Wu, C. H. Chen, and P. Castagliola. 2011. A synthetic double sampling control chart for the process mean. IIE Transactions 43:23–38. doi:10.1080/0740817X.2010.491503.
- Klein, M. 2000. Two alternatives to the Shewhart X¯ control chart. Journal of Quality Technology, 32 (4):427–31. doi:10.1080/00224065.2000.11980028.
- Knoth, S. 2016. The case against the use of synthetic control charts. Journal of Quality Technology, 48 (2):178–95. doi:10.1080/00224065.2016.11918158.
- Lee, P. H., C. C. Torng, and L. F. Liao. 2012. An economic design of combined double sampling and variable sampling interval X¯ control chart. International Journal of Production Economics 138:102–6. doi:10.1016/j.ijpe.2012.03.006.
- Machado, M. A. G., and A. F. B. Costa. 2014. A side-sensitive synthetic chart combined with an X¯ chart. International Journal of Production Research 52 (11):3404–16. doi:10.1080/00207543.2013.879221.
- Montgomery, D. C. 2013. Statistical Quality Control: A Modern Introduction, 7th ed. Singapore: Wiley.
- Reynolds, M. R. Jr, and J. Lou. 2010. An evaluation of GLR control chart combined with X¯ chart. Journal of Quality Technology 42 (3):287–310. doi:10.1080/00224065.2010.11917825.
- Ryu, J. H., H. Wan, and S. Kim. 2010. Optimal design of a CUSUM chart for a mean shift of unknown size. Journal of Quality Technology 42 (3):311–26. doi:10.1080/00224065.2010.11917826.
- Scariano, S. M. and M. E. Calzada. 2009. The generalized synthetic chart. Sequential Analysis: Design Methods and Applications 28 (1): 54–68. doi:10.1080/07474940802619261.
- Shongwe, S. C., and M. A. Graham. 2016. On the performance of Shewhart-type synthetic and runs-rules charts combined with an X¯ chart. Quality and Reliability Engineering International, 32 (4):1357–79. doi:10.1002/qre.1836.
- Shongwe, S. C., and M. A. Graham. 2017. Some theoretical comments regarding the run-length properties of the synthetic and runs-rules X¯ monitoring schemes – Part I: Zero-state. Quality Technology and Quantitative Management. doi:10.1080/16843703.2017.13891241.
- Taguchi, G. 1986. Introduction to quality engineering - designing quality into products and processes. Tokyo: Asian Productivity Organization.
- Woodall, W. H. 1986. Weaknesses of the economical design of control charts. Technometrics, 28:408–9. doi:10.2307/1269000.
- You, H. W. 2017. Run length of synthetic double sampling chart. International Journal of Applied Engineering Research 12 (24):14268–72.
- Wu, Z., W. Yang, W. Jiang, and M. B. C. Khoo. 2008. Optimisation designs of the combined Shewhart-CUSUM Control Charts. Computational Statistics & Data Analysis 53 (2):496–506. doi:10.1016/j.csda.2008.08.032.