References
- [1] Acton, F.S. (1959). Analysis of Straight-Line Data. New York: John Wiley.
- [2] Carlstein, E. (1986). Simultaneous Confidence Regions for Predictions. The American Statistician, 40, 277–279.
- [3] Eisenhart, C. (1939). The Interpretation of certain regression methods and their use in biological and industrial research. Annals of Mathematical Statistics, 10, 162–186.
- [4] Halperin, M. (1961). Fitting of straight lines and prediction when both variables are subject to error. Journal of the American Statistical Association, 56, 657–669.
- [5] Han, Y., Liu, W., Bretz, F., Wan, F., Yang, P. (2016). Statistical calibration and exact one-sided simultaneous tolerance intervals for polynomial regression. Journal of Statistical Planning and Inference, 168, 90–96.
- [6] Johnson, D., Krishnamoorthy, K. (1996). Combining independent studies in a calibration problem. Journal of the American Statistical Association, 91, 1707–1715.
- [7] Krishnamoorthy, K., Mathew, T. (2009). Statistical Tolerance Regions: Theory, Applications, and Computation. New Jersey: John Wiley&Sons.
- [8] Krishnamoorthy, K., Kulkarni, P.M., Mathew, T. (2001). Multiple use one-sided hypotheses testing in univariate linear calibration. Journal of Statistical Planning and Inference, 93, 211–223.
- [9] Lieberman, G. J. (1961). Prediction regions for several predictions from a single regression line. Technometrics, 3, 21–27.
- [10] Lieberman, G.J., Miller, R.G., Hamilton, M.A. (1967). Unlimited simultaneous discrimination intervals in regression. Biometrika, 54, 133–145.
- [11] Mandel, J. (1958). A note on confidence intervals in regression problems. Annals of Mathematical Statistics, 29, 903–907.
- [12] Mee, R.W., Eberhardt, K.R. (1996). A comparison of uncertainty criteria for calibration. Technometrics, 38, 221–229.
- [13] Mee, R.W., Eberhardt, K.R., Reeve, C.P. (1991). Calibration and simultaneous tolerance intervals for regression. Technometrics, 33, 211–219.
- [14] Odeh, R.E., Mee, R. W. (1990). One-sided simultaneous tolerance limits for regression. Communication in statistics-simulation and computation, 19, 663–68.
- [15] Osborne, C. (1991). Statistical calibration: a review. International Statistical Review, 59, 309–336.
- [16] Scheffé, H. (1973). A statistical theory of calibration. Annals of Statistics, 1, 1–37.
- [17] Witkovský, V. (2014). On the exact two-sided tolerance intervals for univariate normal distribution and linear regression. Austrian Journal of Statistic, 43, 279–292.