https://orcid.org/0000-0002-7448-1172
References
- Agin, M. A, and A. P. Godbole. 1992. A new exact runs test for randomness. in Computing Science and Statistics, eds. C. Page and R. LePage, 281–5. New York, NY: Springer.
- Al-Ghanim, A., and J. Jordan. 1996. Automated process monitoring using statistical pattern recognition techniques on X¯ control charts. Journal of Quality in Maintenance Engineering 2 (1):25–49. doi:10.1108/13552519610113827.
- Antzoulakos, D. L., S. Bersimis, and M. V. Koutras. 2003. On the distribution of the total number of run lengths. Annals of the Institute of Statistical Mathematics 55 (4):865–84. doi:10.1007/BF02523398.
- Balakrishnan, N, and M. V. Koutras. 2002. Runs and scans with applications. New York, USA: John Wiley & Sons, Inc.
- Bersimis, S. M. V. Koutras, and A. C. Rakitzis. 2020. Run and scan rules in statistical process monitoring, in handbook of scan statistics, eds. J. Glaz and M. Koutras, New York, NY: Springer. doi:10.1007/978-1-4614-8414-1_55-1.
- Bersimis, S., A. Sgora, and S. Psarakis. 2018. The application of multivariate statistical process monitoring in non-industrial processes. Quality Technology & Quantitative Management 15 (4):526–49. doi:10.1080/16843703.2016.1226711.
- Chakraborti, S., S. W. Human, and M. A. Graham. 2008. Phase I statistical process control charts: An overview and some results. Quality Engineering 21 (1):52–62. doi:10.1080/08982110802445561.
- Cox, D. R., and A. Stuart. 1955. Some quick sign tests for trend in location and dispersion. Biometrika 42 (1-2):80–95. doi:10.1093/biomet/42.1-2.80.
- Gibbons, J. D, and S. Chakraborti. 2021. Nonparametric statistical inference. 6th ed. Boca Raton, FL: Chapman and Hall/CRC.
- Hachicha, W., and A. Ghorbel. 2012. A survey of control-chart pattern-recognition literature (1991–2010) based on a new conceptual classification scheme. Computers & Industrial Engineering 63 (1):204–22. doi:10.1016/j.cie.2012.03.002.
- Jones-Farmer, L. A., W. H. Woodall, S. H. Steiner, and C. W. Champ. 2014. An overview of phase I analysis for process improvement and monitoring. Journal of Quality Technology 46 (3):265–80. doi:10.1080/00224065.2014.11917969.
- Koutras, M. V., and V. A. Alexandrou. 1997. Non-parametric randomness tests based on success runs of fixed length. Statistics & Probability Letters 13:393–404.
- Levene, H. 1952. On the power function of tests of randomness based on runs up and down. The Annals of Mathematical Statistics 23 (1):34–56. doi:10.1214/aoms/1177729484.
- Ling, K. D. 1988. On binomial distributions of order k. Statistics & Probability Letters 6 (4):247–50. doi:10.1016/0167-7152(88)90069-7.
- Makri, F. S., and Z. M. Psillakis. 2011. On success runs of length exceeded a threshold. Methodology and Computing in Applied Probability 13 (2):269–305. doi:10.1007/s11009-009-9147-1.
- Montgomery, D. C. 2012. Introduction to statistical quality control. 7th Ed. New York: Wiley.
- Mosteller, F. 1941. Note on an application of runs to quality control charts. The Annals of Mathematical Statistics 12 (2):228–32. doi:10.1214/aoms/1177731753.
- Nelson, L. 1984. The Shewhart control chart-Tests for special causes. Journal of Quality Technology 16 (4):237–9. doi:10.1080/00224065.1984.11978921.
- Nieckula, J. 2001. Frequency distribution supporting recognition of unnatural patterns on Shewhart X-bar chart., in Frontiers in Statistical Quality Control 6, eds. H. J. Lenz and P. T. Wilrich, 102–17. Heidelberg: Physica.
- Noskievicova, D. 2013. Complex control chart interpretation. International Journal of Engineering Business Management 5 (13):1–7. doi:10.5772/56441.
- Reynolds, J. H. 1971. The run sum control chart procedure. Journal of Quality Technology 3 (1):23–7. doi:10.1080/00224065.1971.11980455.
- Roes, K. C., and R. J. Does. 1995. Shewhart-type charts in nonstandard situations. Technometrics 37 (1):15–23. doi:10.1080/00401706.1995.10485882.
- Shewhart, W. A. 1939. Statistical method from the viewpoint of quality control, Graduate School of the Department of Agriculture, Washington, D.C. (Republished in 1986 by Dover Publications, Inc., Mineola, NY.).
- Trietsch, D., and F. K. Hwang. 1997. Notes on pattern tests for special causes. Quality Engineering 9 (3):467–77. doi:10.1080/08982119708919066.
- Wang, J., A. K. Kochhar, and R. G. Hannam. 1998. Pattern recognition for statistical process control charts. The International Journal of Advanced Manufacturing Technology 14 (2):99–109. doi:10.1007/BF01322218.
- Western Electric Company. 1956. Statistical quality control handbook. Indianapolis, IN: Western Electric Co.
- Wolfowitz, J. 1943. On the theory of runs with some applications to quality control. The Annals of Mathematical Statistics14 (3):280–8. doi:10.1214/aoms/1177731421.
- Wu, Z., and T. A. Spedding. 2000. A synthetic control chart for detecting small shifts in the process mean. Journal of Quality Technology 32 (1):32–8. doi:10.1080/00224065.2000.11979969.
- Yao, Y., and S. Chakraborti. 2021. Phase I process monitoring: The case of the balanced One-way random effects model. Quality and Reliability Engineering International 37 (3):1244–65. doi:10.1002/qre.2793.