References
- Abujiya, M. R., & Muttlak, H. A. (2004). Quality control chart for the mean using double ranked set sampling. Journal of Applied Statistics, 31, 1185–1201.
- Al-Nasser, A. D., & Al-Rawwash, M. (2007). A control chart based on ranked data. Journal of Applied Sciences, 7, 1936–1941.
- Al-Omari, A. I. (2012). Ratio estimation of the population mean using auxiliary information in simple random sampling and median ranked set sampling. Statistics and Probability Letters, 82, 1883–1890.
- Bai, D. S., & Choi, I. S. (1995). ȳ and R Control charts for skewed populations. Journal Of Quality Technology, 27, 120–131.
- Chan, L. K., & Cui, H. J. (2003). Skewness correction ȳ and R charts for skewed distributions. Naval Research Logistics, 50, 1–19.
- Choobineh, F., & Ballard, J. L. (1987). Control-limits of QC Charts for skewed distributions using weighted variance. IEEE Transactions on Reliability, 36, 473–477.
- Costa, A. F. B., & Machado, M. A. G. (2008). Bivariate control charts with double sampling. Journal Of Applied Statistics, 35, 809–822.
- Jose, K. K., Ristic, M. M., & Joseph, A. (2011). Marshall Olkin bivariate Weibull distributions and processes. Stat Papers, 52, 789–798.
- Karagöz, D., & Hamurkaroğlu, C. (2012). Control charts for skewed distributions: Weibull Gamma, and Lognormal. Metodoloski zvezki - Advances in Methodology and Statistics, 9, 95–106.
- Karagöz, D. (2016). Robust X̄ control chart for monitoring the skewed and contaminated process. Hacettepe Journal of Mathematics and Statistics. doi:10.15672/HJMS.201611815892
- Koyuncu, N. (2015). Ratio estimation of the population mean in extreme ranked set and double robust extreme ranked set sampling. International Journal of Agricultural and Statistical Sciences, 11, 21–28.
- Koyuncu, N. (2016). New difference-cum-ratio and exponential Type estimators in median ranked set sampling. Hacettepe Journal of Mathematics and Statistics, 45, 207–225.
- Marshall, A. W., & Olkin, I. (1997). A multivariate exponential distribution. Journal of the American Statistical Association, 62, 30–41.
- McIntyre, G. A. (1952). A method for unbiased selective sampling using ranked sets. Australian Journal of Agricultural Research, 3, 385–390.
- Montgomery, D. C. (1997). Introduction to Statistical Quality Control. Hoboken, NJ: Wiley.
- Muttlak, H. A., & Al-Sabah, W. S. (2003). Statistical quality control based on ranked set sampling. Journal of Applied Statistics, 30, 1055–1078.
- Pongpullponsak, A., & Sontisamran, P. (2013). Statistical quality control based on ranked set sampling for multiple characteristics. Chiang Mai Journal of Science, 40, 485–498.
- Schoonhoven, M., & Does, R. J. M. M. (2010). The ȳ control chart under non-normality. Quality and Reliability Engineering International, 26, 167–176.
- Yerel, S., & Konuk, A. (2009). Bivariate lognormal distribution model of cut off grade impurities: A case study of magnesite ore deposit. Scientific Research and Essay, 4, 1500–1504.
- You, H. W., Michael, B., Khoo, C., Lee, M. H., & Castagliola, P. (2015). Synthetic double sampling X-bar chart with estimated process parameters. Quality Technology & Quantitative Management, 12, 579–604.
- Mehmood, R., Riaz, M., & Does, R. J. M. M. (2013). Control charts for location based on different samplingschemes. Journal of Applied Statistics, 40, 483–494.
- Zamanzade, E., & Al-Omari, A. I. (2016). New ranked set sampling for estimating the population mean and variance. Hacettepe Journal of Mathematics and Statistics, 45, 1891-1905. doi:10.15672/HJMS.20159213166
- Zhang, L., Dong, X., Xu, X., & Cui, L. (2014). Weighted estimation of quantiles using unbalanced ranked set. Sampling Quality Technology & Quantitative Management, 11, 281–295.