Open Access
Issue
Int. J. Metrol. Qual. Eng.
Volume 3, Number 3, 2012
Page(s) 169 - 178
DOI https://doi.org/10.1051/ijmqe/2012029
Published online 13 May 2013
  1. G.J. Hahn, W.Q. Meeker, Statistical Intervals: A Guide for Practitioners (Wiley, 1991) [Google Scholar]
  2. JCGM 200:2012, International vocabulary of metrology – Basic and general concepts and associated terms (VIM) (2012), http://www.bipm.org/utils/common/documents/jcgm/JCGM_200_2012.pdf [Google Scholar]
  3. Joint Committee for Guides in Metrology, Evaluation of measurement data – Supplement 1 to the “Guide to the expression of uncertainty in measurement” – Propagation of distributions using a Monte Carlo method (2006) [Google Scholar]
  4. Joint Committee for Guides in Metrology, Evaluation of measurement data – Supplement 2 to the “Guide to the expression of uncertainty in measurement” – Extension to any number of output quantities (2006) [Google Scholar]
  5. Guide to the Expression of Uncertainty in Measurement (International Organization for Standardization, Geneva, 1995) [Google Scholar]
  6. J. Pfanzagl, Estimation: Confidence Intervals and Regions, in International Encyclopedia of Statistics, edited by W.H. Kruskal, J.M. Tanur (The Free Press, Macmillan, 1978), pp. 259–267 [Google Scholar]
  7. G.K. Robinson, Confidence intervals and regions, in Encyclopedia of Statistical Sciences, edited by S. Kotz, N.L. Johnson, C.B. Read (Wiley, 1982), Vol. 2, pp. 120–127 [Google Scholar]
  8. S.S. Wilks, Mathematical Statistics (Wiley, 1962) [Google Scholar]
  9. H.J. Larson, Introduction to Probability Theory and Statistical Inference, 3rd edn. (Wiley, 1982) [Google Scholar]
  10. A.M. Mood, F.A. Graybill, Introduction to the Theory of Statistics, 2nd edn. (McGraw-Hill, 1963) [Google Scholar]
  11. R.E. Walpole, R.H. Myers, Probability and Statistics for Engineers and Scientists, 2nd edn. (Macmillan, 1978) [Google Scholar]
  12. R.G. Miller Jr., Simultaneous Statistical Inference, 2nd edn. (Springer-Verlag, 1980) [Google Scholar]
  13. F.S. Acton, Analysis of Straight-Line Data (Wiley, 1959) [Google Scholar]
  14. B.W. Lindgren, Statistical Theory (Macmillan, 1968) [Google Scholar]
  15. W.G. Howe, Two-sided tolerance limits for normal populations – some improvements, J. Am. Stat. Assoc. 64, 610–620 (1969) [Google Scholar]
  16. NIST/SEMATECH e-Handbook of Statistical Methods (2012), http://www.itl.nist.gov/div898/handbook/ [Google Scholar]
  17. H.A. David, Order Statistics, 2nd edn. (Wiley, 1981) [Google Scholar]
  18. I. Guttman, Tolerance regions, statistical, in Encyclopedia of Statistical Sciences, edited by S. Kotz, N.L. Johnson, C.B. Read (Wiley, 1988), Vol. 9, pp. 272–287 [Google Scholar]
  19. W.F. Guthrie, H. Liu, A.L. Rukhin, B. Toman, J.C.M. Wang, N. Zhang, Three Statistical Paradigms for the Assessment and Interpretation of Measurement Uncertainty, in Data Modeling for Metrology and Testing in Measurement Science, edited by F. Pavese, A.B. Forbes (Birkhäuser, 2009), pp. 71–115 [Google Scholar]
  20. A.W.F. Edwards, Fiducial probability, The Statistician 25, 15–35 (1976) [Google Scholar]
  21. D.V. Lindley, Bayesian inference, in Encyclopedia of Statistical Sciences, edited by S. Kotz, N.L. Johnson, C.B. Read (Wiley, 1982), Vol. 1, pp. 197–204 [Google Scholar]
  22. R. Willink, B.D. Hall, A classical method for uncertainty analysis with multidimensional data, Metrologia 39, 361–369 (2002) [Google Scholar]
  23. A.P. Dawid, Invariant prior distributions, in Encyclopedia of Statistical Sciences, edited by S. Kotz, N.L. Johnson, C.B. Read (Wiley, 1983), Vol. 4, pp. 228–236 [Google Scholar]

Current usage metrics show cumulative count of Article Views (full-text article views including HTML views, PDF and ePub downloads, according to the available data) and Abstracts Views on Vision4Press platform.

Data correspond to usage on the plateform after 2015. The current usage metrics is available 48-96 hours after online publication and is updated daily on week days.

Initial download of the metrics may take a while.