Advanced search
Publication Cover
Journal of Quality Technology
A Quarterly Journal of Methods, Applications and Related Topics
Volume 49, 2017 - Issue 1
Submit an article Journal homepage
161
Views
32
CrossRef citations to date
0
Altmetric
Articles

Approximate Statistical Limits for a Gamma Distribution

Piao ChenDepartment of Industrial & Systems Engineering NationalUniversity of Singapore, Singapore117576View further author information
&
Zhi-Sheng YeDepartment of Industrial & Systems Engineering NationalUniversity of Singapore, Singapore117576View further author information
Pages 64-77 | Published online: 21 Nov 2017

References

  • Aksoy, H. (2000). “Use of Gamma Distribution in Hydrological Analysis”. Turkish Journal of Engineering and Environmental Sciences 24 (6), pp. 419–428.
  • Aryal, S.; Bhaumik, D.; Mathew, T.; and Gibbons, R. (2007). “Approximate Tolerance Limits and Prediction Limits for the Gamma Distribution”. Journal of Applied Statistical Science 16, pp. 103–111.
  • Ashkar, F. and Ouarda, T. B. M. J. (1998). “Approximate Confidence Intervals for Quantiles of Gamma and Generalized Gamma Distributions”. Journal of Hydrologic Engineering 3 (1), pp. 43–51.
  • Atapattu, S.; Tellambura, C.; and Jiang, H. (2011). “A Mixture Gamma Distribution to Model the SNR of Wireless Channels.” IEEE Transactions on Wireless Communications 10 (12), pp. 4193–4203.
  • Avramidis, A. N.; Deslauriers, A.; and L'Ecuyer, P. (2004). “Modeling Daily Arrivals to a Telephone Call Center.” Management Science 50 (7), pp. 896–908.
  • Bain, L. and Engelhardt, M. (1975). “A Two-Moment Chi-Square Approximation for the Statistic log(x̄/x̄)”. Journal of the American Statistical Association 70 (352), pp. 948–950.
  • Bain, L.; Engelhardt, M.; and Shiue, W.-K. (1984). “Approximate Tolerance Limits and Confidence Limits on Reliability for the Gamma Distribution”. IEEE Transactions on Reliability 33 (2), pp. 184–187.
  • Bhaumik, D. K. and Gibbons, R. D. (2006). “One-Sided Approximate Prediction Intervals for at Least p of m Observations from a Gamma Population at Each of r Locations”. Technometrics 48 (1), pp. 112–119.
  • Birnbaum, Z. and McCarty, R. (1958). “A Distribution-Free Upper Confidence Bound for Pr(Y < X), Based on Independent Samples of X and Y”. The Annals of Mathematical Statistics pp. 558–562.
  • Chee, M.; Yang, R.; Hubbell, E.; Berno, A.; Huang, X. C.; Stern, D., Winkler, J.; Lockhart, D. J.; Morris, M. S.; and Fodor, S. P. (1996). “Accessing Genetic Information with High-Density DNA Arrays”. Science 274 (5287), pp. 610–614.
  • Chen, P. and Ye, Z.-S. (2016). “Estimation of Field Reliability Based on Aggregate Lifetime Data”. Technometrics, to appear.
  • Coit, D. W. and Jin, T. (2000). “Gamma Distribution Parameter Estimation for Field Reliability Data with Missing Failure Times”. IIE Transactions 32 (12), pp. 1161–1166.
  • Davis, C. B. and McNichols, R. J. (1987). “One-Sided Intervals for at Least p of m Observations from a Normal Population on Each of r Future Occasions”. Technometrics 29 (3), pp. 359–370.
  • Fan, T.-H. and Yu, C.-H. (2013). “Statistical Inference on Constant Stress Accelerated Life Tests Under Generalized Gamma Lifetime Distributions”. Quality and Reliability Engineering International 29 (5), pp. 631–638.
  • Fernández, A. J. (2010). “Tolerance Limits for k-out-of-n Systems with Exponentially Distributed Component Lifetimes”. IEEE Transactions on Reliability 59 (2), pp. 331–337.
  • Fisher, R. A. (1930). “Inverse Probability”. In Mathematical Proceedings of the Cambridge Philosophical Society, vol. 26, pp. 528–535. Cambridge, UK: Cambridge University Press.
  • Gibbons, R. D.; Bhaumik, D. K.; and Aryal, S. (2009). Statistical Methods for Groundwater Monitoring, vol. 59. Hoboken, NJ: John Wiley # Sons.
  • Gibbons, R. D.; Bhaumik, D. K.; Cox, D. R.; Grayson, D. R.; Davis, J. M.; and Sharma, R. P. (2005). “Sequential Prediction Bounds for Identifying Differentially Expressed Genes in Replicated Microarray Experiments”. Journal of Statistical Planning and Inference 129 (1), pp. 19–37.
  • Guo, H. and Krishnamoorthy, K. (2004). “New Approximate Inferential Methods for the Reliability Parameter in a Stress-Strength Model: The Normal Case”. Communications in Statistics–Theory and Methods 33 (7), pp. 1715–1731.
  • Hannig, J. (2009). “On Generalized Fiducial Inference”. Statistica Sinica 19 (2), pp. 491–554.
  • Hannig, J.; Iyer, H.; and Patterson, P. (2006). “Fiducial Generalized Confidence Intervals”. Journal of the American Statistical Association 101 (473), pp. 254–269.
  • Husak, G. J.; Michaelsen, J.; and Funk, C. (2007). “Use of the Gamma Distribution to Represent Monthly Rainfall in Africa for Drought Monitoring Applications”. International Journal of Climatology 27 (7), pp. 935–944.
  • Krishnamoorthy, K. and Mathew, T. (2004). “One-Sided Tolerance Limits in Balanced and Unbalanced One-Way Random Models Based on Generalized Confidence Intervals”. Technometrics 46 (1), pp. 44–52.
  • Krishnamoorthy, K.; Mathew, T.; and Mukherjee, S. (2008). “Normal-Based Methods for a Gamma Distribution”. Technometrics 50 (1), pp. 69–78.
  • Lawless, J. F. (2002). Statistical Models and Methods for Lifetime Data. Hoboken, NJ: John Wiley # Sons.
  • Lee, H.-I. and Liao, C.-T. (2012). “Estimation for Conformance Proportions in a Normal Variance Components Model.” Journal of Quality Technology 44 (1), pp. 63–79.
  • Liu, C.; Martin, R.; and Syring, N. (2013). “Simulating from a Gamma Distribution with Small Shape Parameter”. arXiv preprint arXiv:1302.1884.
  • Reiser, B. (2000). “Measuring the Effectiveness of Diagnostic Markers in the Presence of Measurement Error Through the Use of ROC Curves”. Statistics in Medicine 19 (16), pp. 2115–2129.
  • Reiser, B. and Guttman, I. (1986). “Statistical Inference for Pr(Y < X): The Normal Case”. Technometrics 28 (3), pp. 253–257.
  • Ryan, T. P. (2011). Statistical Methods for Quality Improvement. Hoboken, NJ: John Wiley # Sons.
  • Stephenson, D.; Kumar, K. R.; Doblas-Reyes, F.; Royer, J.; Chauvin, F.; and Pezzulli, S. (1999). “Extreme Daily Rainfall Events and Their Impact on Ensemble Forecasts of the Indian Monsoon”. Monthly Weather Review 127 (9), pp. 1954–1966.
  • Wang, B. X. and Ye, Z.-S. (2015). “Inference on the Weibull Distribution Based on Record Values”. Computational Statistics # Data Analysis 83, pp. 26–36.
  • Wang, C.; Hannig, J.; and Iyer, H. K. (2012). “Fiducial Prediction Intervals”. Journal of Statistical Planning and Inference 142 (7), pp. 1980–1990.
  • Weerahandi, S. (1993). “Generalized Confidence Intervals”. Journal of the American Statistical Association 88 (423), 899.
  • Weerahandi, S. and Johnson, R. A. (1992). “Testing Reliability in a Stress-Strength Model when X and Y Are Normally Distributed”. Technometrics 34 (1), pp. 83–91.
  • Ye, Z.-S. and Chen, N. (2016). “Closed-Form Estimators for the Gamma Distribution Derived from Likelihood Equations”. The American Statistician, to appear.
  • Zabell, S. L. (1992). “RA Fisher and Fiducial Argument”. Statistical Science 7 (3), pp. 369–387.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.