References
- Aryal, S., D. K. Bhaumik, T. Mathew, and R. D. Gibbons. 2008. Approximate tolerance limits and prediction limits for the gamma distribution. Journal of Applied Statistical Science 16 (2):253–61.
- Ashkar, F., and T. B. Ouarda. 1998. Approximate confidence intervals for quantiles of gamma and generalized gamma distributions. Journal of Hydrologic Engineering 3 (1):43–51. doi: 10.1061/(ASCE)1084-0699(1998)3:1(43).
- Bain, L. J., and M. Engelhardt. 1981. Simple approximate distributional results for confidence and tolerance limits for the Weibull distribution based on maximum likelihood estimators. Technometrics 23 (1):15–20. doi: 10.1080/00401706.1981.10486231.
- Bain, L. J., M. Engelhardt, and W. K. Shiue. 1984. Approximate tolerance limits and confidence limits on reliability for the gamma distribution. IEEE Transactions on Reliability 33 (2):184–7.
- Canavos, G. C., and I. A. Koutrouvelis. 1984. The robustness of two-sided tolerance limits for normal distributions. Journal of Quality Technology 16 (3):144–9. doi: 10.1080/00224065.1984.11978906.
- Chakraborti, S., M. A. Graham, and S. W. Human. 2008. Phase I statistical process control charts: An overview and some results. Quality Engineering 21 (1):52–62. doi: 10.1080/08982110802445561.
- Chen, P., and Z. S. Ye. 2017. Approximate statistical limits for a gamma distribution. Journal of Quality Technology 49 (1):64–77. doi: 10.1080/00224065.2017.11918185.
- Fernandez, A. J. 2010. Tolerance limits for k-out-of-n systems with exponentially distributed component lifetimes. IEEE Transactions on Reliability 59 (2):331–7. doi: 10.1109/TR.2010.2048661.
- Fraser, D. A. S. 2011. Is Bayes posterior just quick and dirty confidence? Statistical Science 26 (3):299–316. doi: 10.1214/11-STS352.
- Gibbons, R. D., D. K. Bhaumik, and S. Aryal. 2009. Statistical methods for groundwater monitoring, vol. 59. New York, NY: John Wiley & Sons.
- Gibbons, R. D., D. E. Coleman, and D. D. Coleman. 2001. Statistical methods for detection and quantification of environmental contamination. New York, NY: John Wiley & Sons.
- Hahn, G. J. 1970a. Statistical intervals for a normal population part I. Tables, examples and applications. Journal of Quality Technology 2 (3):115–25. doi: 10.1080/00224065.1970.11980426.
- Hahn, G. J. 1970b. Statistical intervals for a normal population, Part II. Formulas, assumptions, some derivations. Journal of Quality Technology 2 (4):195–206. doi: 10.1080/00224065.1970.11980438.
- Howe, W. G. 1969. Two-sided tolerance limits for normal populations-some improvements. Journal of the American Statistical Association 64(326):610–20. doi: 10.2307/2283644.
- Jensen, W. A. 2009. Approximations of tolerance intervals for normally distributed data. Quality and Reliability Engineering International 25 (5):571–80. doi: 10.1002/qre.989.
- Jílek, M., and H. Ackermann. 1989. A bibliography of statistical tolerance regions, II. Statistics: A Journal of Theoretical and Applied Statistics 20 (1):165–72. doi: 10.1080/02331888908802157.
- 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.
- Krishnamoorthy, K., and T. Mathew. 1999. Comparison of approximation methods for computing tolerance factors for a multivariate normal population. Technometrics 41 (3):234–49. doi: 10.1080/00401706.1999.10485672.
- Krishnamoorthy, K., and T. Mathew. 2009. Statistical tolerance regions: Theory, applications, and computation, vol. 744. New York, NY: John Wiley & Sons.
- Krishnamoorthy, K., T. Mathew, and S. Mukherjee. 2008. Normal-based methods for a gamma distribution: Prediction and tolerance intervals and stress-strength reliability. Technometrics 50 (1):69–78. doi: 10.1198/004017007000000353.
- Krishnamoorthy, K., and S. Mondal. 2006. Improved tolerance factors for multivariate normal distributions. Communications in Statistics-Simulation and Computation 35 (2):461–78. doi: 10.1080/03610910600591883.
- Krishnamoorthy, K., Y. Xia, and F. Xie. 2011. A simple approximate procedure for constructing binomial and Poisson tolerance intervals. Communications in Statistics-Theory and Methods 40(12):2243–58. doi: 10.1080/03610921003786848.
- Lee, H. I., and C. T. Liao. 2012. Estimation for conformance proportions in a normal variance components model. Journal of Quality Technology 44 (1):63–79. doi: 10.1080/00224065.2012.11917882.
- Meeker, W. Q., G. J. Hahn, and L. A. Escobar. 2017. Statistical intervals: A guide for practitioners and researchers, vol. 541. New York, NY: John Wiley & Sons.
- Millard, S. P., and N. K. Neerchal. 2000. Environmental statistics with S-Plus. New York, NY: CRC Press.
- Montgomery, D. C. 2009. Introduction to statistical quality control, 6th ed. Hoboken, NJ: John Wiley & Sons.
- Patel, J. K. 1986. Tolerance limits–A review. Communications in Statistics-Theory and Methods 15 (9):2719–62. doi: 10.1080/03610928608829278.
- Perry, M. B. 2018. Approximate prediction intervals in the original units when fitting models using data transformations. Quality and Reliability Engineering International 34 (1):53–65. doi: 10.1002/qre.2235.
- Rinne, H. 2008. The Weibull distribution. New York, NY: Chapman and Hall/CRC.
- Ryan, T. P. 2007. Modern engineering statistics. New York, NY: John Wiley & Sons.
- Sarmiento, M. G. C., S. Chakraborti, and E. K. Epprecht. 2018. Exact two-sided statistical tolerance limits for sample variances. Quality and Reliability Engineering International 34 (6):1238–53. doi: 10.1002/qre.2321.
- Tietjen, G. L., and M. E. Johnson. 1979. Exact statistical tolerance limits for sample variances. Technometrics 21 (1):107–10. doi: 10.1080/00401706.1979.10489728.
- Vardeman, S. B. 1992. What about the other intervals? The American Statistician 46 (3):193–7. doi: 10.2307/2685212.
- Wilks, S. S. 1941. Determination of sample sizes for setting tolerance limits. The Annals of Mathematical Statistics 12 (1):91–6. doi: 10.1214/aoms/1177731788.
- Wilks, S. S. 1942. Statistical prediction with special reference to the problem of tolerance limits. The Annals of Mathematical Statistics 13 (4):400–9. doi: 10.1214/aoms/1177731537.
- Wilson, E. B., and M. M. Hilferty. 1931. The distribution of chi-square. Proceedings of the National Academy of Sciences of the United States of America 17(12):684–8.
- Young, D. S. 2010. Tolerance: An R package for estimating tolerance intervals. Journal of Statistical Software 36 (5):1–39.
- Young, D. S. 2014a. A procedure for approximate negative binomial tolerance intervals. Journal of Statistical Computation and Simulation 84 (2):438–50. doi: 10.1080/00949655.2012.715649.
- Young, D. S. 2014b. Computing tolerance intervals and regions using R. In Handbook of statistics, ed. M. B. Rao and C. R. Rao, vol. 32, 309–38. Amsterdam: Elsevier.