X‾ control charts with multiple assignable causes under Burr XII shock model
References
- Ahmed, I., I. Sultana, S. K. Paul, and A. Azeem. 2014. Performance evaluation of control chart for multiple assignable causes using genetic algorithm. The International Journal of Advanced Manufacturing Technology Feb 1;70 (9–12):1889–902.
- Al-Hussaini, E. K., and Z. F. Jaheen. 1992. Bayesian estimation of the parameters, reliability and failure rate functions of the Burr type XII failure model. Journal of statistical computation and simulation 41 (1–2):31–40.
- Al-Oraini, H. A., and M. A. Rahim. 2002. Economic statistical design of X‾ control charts for systems with Gamma (λ, 2) in-control times. Computers & industrial engineering 43 (3):645–54.
- Banerjee, P. K., and M. A. Rahim. 1988. Economic design of X‾ control charts under Weibull shock models. Technometrics 30 (4):407–14.
- Ben-Daya, M., and M. A. Rahim. 2000. Effect of maintenance on the economic design of X‾ control charts. European Journal of Operational Research 120 (1):131–43.
- Burr, I. W. 1942. Cumulative Frequency Functions. The Annals of Mathematical Statistics 13 (2):215–32.
- Celano, G. 2011. On the Constrained Economic Design of Control Charts: A Literature Review. Produção 21 (2):223–34.
- Chou, C. Y., C. H. Chen, and H. R. Liu. 2000. Economic-statistical design of X‾ charts for non-normal data by considering quality loss. Journal of Applied Statistics 27 (8):939–51.
- Chen, Y. S., and Y. M. Yang. 2002. Economic design of X‾ control charts with Weibull in-control times when there are multiple assignable causes. International Journal of Production Economics 77 (1):17–23.
- Chiu, W. K. 1975. Economic design of attribute control charts. Technometrics 17 (1):81–7.
- Chiu, W. K. 1976. Economic design of np charts for processes subject to a multiplicity of assignable causes. Management Science 23 (4):404–11.
- Chung, K. J. 1994. An algorithm for computing the economically optimal X‾ control chart for a process with multiple assignable causes. European journal of operational research 72 (2):350–63.
- Duncan, A. J. 1956. The economic design of X charts used to maintain current control of a process. Journal of the American Statistical Association 51 (274):228–42.
- Duncan, A. J. 1971. The economic design of X‾ charts when there is a multiplicity of assignable causes. Journal of the American Statistical Association 66 (333):107–21.
- Faraz, A., C. Heuchenne, E. Saniga, and E. Foster. 2013. Monitoring delivery chains using multivariate control charts. European Journal of Operational Research 228 (1):282–9.
- Gibra, I. N. 1978. Economically optimal determination of the parameters of np-control charts. Journal of Quality Technology 10 (1):12–9.
- Girshick, M. A., and H. Rubin. 1952. A Bayes approach to a quality control model. The Annals of Mathematical Statistics 114–25.
- Hao, Z., and V. P. Singh. 2009. Entropy-based parameter estimation for extended Burr XII distribution. Stochastic Environ. Res. Risk Assess. 23 (8):1113–22.
- Heydari, A. A., M. B. Moghadam, and F. Eskandari. 2017. An extension of Banerjee and Rahim model in economic and economic statistical designs for multivariate quality characteristics under Burr XII distribution. Communications in Statistics-Theory and Methods 46 (16):7855–71.
- Jaraiedi, M., and Z. Zhuang. 1991. Determination of optimal design parameters of X‾ charts when there is a multiplicity of assignable causes. Journal of quality technology 23 (3):253–58.
- Kraleti, S. R., and V. S. Kambagowni. 2010. Optimal design of X‾ control chart with Pareto in-control times. The International Journal of Advanced Manufacturing Technology 48 (9–12):829–37.
- Ladany, S. P. 1973. Optimal use of control charts for controlling current production. Management Science 19 (7):763–72.
- Lorenzen, T. J., and L. C. Vance. 1986. The economic design of control charts: a unified approach. Technometrics 28 (1):3–10.
- Papadopoulos, A. S. 1978. The Burr distribution as a failure model from a Bayesian approach. IEEE Transactions on Reliability 27 (5):369–71.
- Papalexiou, S. M., and D. Koutsoyiannis. 2013. Battle of extreme value distributions: A global survey on extreme daily rainfall. Water Resour. Res. 49 (1):187–201.
- Pascual, F., and H. Zhang. 2011. Monitoring the Weibull shape parameter by control charts for the sample range. Quality and Reliability Engineering International 27 (1):15–25.
- Rahim, M. A., and P. K. Banerjee. 1993. A generalized model for the economic design of X‾ control charts for production systems with increasing failure rate and early replacement. Naval Research Logistics (NRL) 40 (6):787–809.
- Rodriguez, R. N. 1977. A guide to the Burr type XII distributions. Biometrika 64 (1):129–34.
- Ross, S. M. 1970. Applied Probability Models with Optimization Applications, Holden Day. San Francisco, California.
- Saniga, E., D. Davis, A. Faraz, T. McWilliams, and J. Lucas. 2015. Characteristics of Economically Designed CUSUM and/ bar {X} Control Charts. In Frontiers in Statistical Quality Control 11:201–217.
- Saniga, E. M. 1977. Joint economically optimal design of X and R control charts. Management Science 24 (4):420–31.
- Shao, Q., H. Wong, J. Xia, and W. C. Ip. 2004. Models for Extremes Using the Extended Three Parameter Burr XII System with application to flood frequency analysis. Hydrological Sciences Journal des Sciences. Hydrological sciences journal 49 (4):685–702.
- Shewhart, W. A. 1924. Some applications of statistical methods to the analysis of physical and engineering data. Bell Labs Technical Journal 3 (1):43–87.
- Tagaras, G., and H. L. Lee. 1988. Economic design of control charts with different control limits for different assignable causes. Management Science 34 (11):1347–66.
- Usta, I. 2013. Different estimation methods for the parameters of the extended Burr XII distribution. J. Appl. Stat. 40 (2):397–414.
- Wingo, D. R. 1993. Maximum likelihood methods for fitting the Burr type XII distribution to multiply (progressively) censored life test data. Metrika 40 (1):203–10.
- Yang, Y. M., C. Y. Su, and W. L. Pearn. 2010. Economic design of X‾ control charts for continuous flow process with multiple assignable causes. International Journal of Production Economics 128 (1):110–7.
- Zimmer, W. J., and I. W. Burr. 1963. Variables Sampling Plans Based on Non-Normal Populations. Industrial Quality Control 21 (1):18–26.