Tolerance Intervals With Improved Coverage Probabilities for Binomial and Poisson Variables

The construction of tolerance intervals (TIs) for discrete variables, such as binomial and Poisson variables, has been critical in industrial applications in various sectors, including manufacturing and pharmaceuticals. Inaccurate estimation of coverage probabilities leads to improper construction of tolerance intervals and may lead to serious financial losses for the manufacturers. This article proposes procedures to compute the exact minimum and average coverage probabilities of the tolerance intervals for Poisson and binomial variables. These procedures are illustrated with examples and real data applications. Based on these procedures, improved tolerance intervals are proposed that can ensure that the true minimum or average coverage probabilities are very close to the nominal levels.

[1]  J. Wolfowitz,et al.  Tolerance Limits for a Normal Distribution , 1946 .

[2]  Russell D. Wolfinger,et al.  Tolerance Intervals for Variance Component Models Using Bayesian Simulation , 1998 .

[3]  K. Krishnamoorthy,et al.  One-Sided Tolerance Limits in Balanced and Unbalanced One-Way Random Models Based on Generalized Confidence Intervals , 2004, Technometrics.

[4]  Tsai-Yu Lin,et al.  One- and Two-Sided Tolerance Intervals for General Balanced Mixed Models and Unbalanced One-Way Random Models , 2005, Technometrics.

[5]  S. Zacks Uniformly Most Accurate Upper Tolerance Limits for Monotone Likelihood Ratio Families of Discrete Distributions , 1970 .

[6]  Donald B. Owen,et al.  Tables for normal tolerance limits, sampling plans, and screening , 1981 .

[7]  Luis A. Escobar,et al.  Statistical Intervals: A Guide for Practitioners , 1991 .

[8]  EXACT CONFIDENCE COEFFICIENTS OF CONFIDENCE INTERVALS FOR A BINOMIAL PROPORTION , 2007 .

[9]  Gerald J. Hahn,et al.  Tolerance Intervals for Poisson and Binomial Variables , 1981 .

[10]  C. Ming Wang,et al.  Tolerance Intervals for the Distribution of True Values in the Presence of Measurement Errors , 1994 .

[11]  Michael S. Hamada,et al.  Bayesian Prediction Intervals and Their Relationship to Tolerance Intervals , 2004, Technometrics.

[12]  A. Agresti,et al.  Approximate is Better than “Exact” for Interval Estimation of Binomial Proportions , 1998 .

[13]  L. Brown,et al.  Interval Estimation for a Binomial Proportion , 2001 .

[14]  Luisa T. Fernholz,et al.  Content-Corrected Tolerance Limits Based on the Bootstrap , 2001, Technometrics.

[15]  Douglas C. Montgomery,et al.  Introduction to Statistical Quality Control , 1986 .

[16]  Gerald J. Hahn,et al.  Tables for Normal Tolerance Limits, Sampling Plans and Screening , 1981 .

[17]  A. L. Pretorius,et al.  Bayesian Tolerance Intervals for the Unbalanced One-Way Random Effects Model , 2006 .