Advanced search
Publication Cover
Quality Technology & Quantitative Management Volume 15, 2018 - Issue 1: Advances in the Theory and Application of Statistical Process Control
Submit an article Journal homepage
385
Views
6
CrossRef citations to date
0
Altmetric
Articles

Monitoring multivariate Poisson processes: a review and some new results

Paolo Carmelo CozzucoliDepartment of Economics, Statistics and Finance, University of Calabria, Rende, ItalyCorrespondence[email protected]
&
Marco MarozziDepartment of Environmental Sciences, Informatics and Statistics, University of Venice, Venezia, Italy
Pages 53-68 | Accepted 06 Mar 2017, Published online: 03 Apr 2017

References

  • Bersimis, S., Psarakis, S., & Panaretos, J. (2007). Multivariate statistical process control charts: An overview. Quality and Reliability Engineering International, 23, 517–543.10.1002/(ISSN)1099-1638
  • Bersimis, S., Koutras, M. V., & Maravelakis, P. E. (2014). A compound control chart for monitoring and controlling high quality processes. European Journal of Operational Research, 233, 595–603.10.1016/j.ejor.2013.08.017
  • Bourke, P. D. (1991). Detecting a shift in fraction nonconforming using run-length control charts with 100% inspection. Journal of Quality Technology, 23, 225–238.
  • Calvin, T. W. (1983). Quality control techniques for ‘zero-defects’. IEEE Transactions on Components, Hybrids, and Manufacturing Technology, 6, 323–328.10.1109/TCHMT.1983.1136174
  • Cassady, C., & Nachlas, J. A. (2006). Evaluating and implementing 3-level control charts. Quality Engineering, 18, 285–292.10.1080/08982110600814851
  • Chen, L. H. (2005). A demerit control chart with linguistic weights. Journal of Intelligent Manufacturing, 16, 349–359.10.1007/s10845-005-7028-1
  • Chen, L., Chang, F. M., & Chen, Y. (2011). The application of multinomial control charts for inspection error. International Journal of Industrial Engineering, 18, 244–253.
  • Chimka, J. R., & Cabrera Arispe, P. V. (2006). New demerit control limits for poisson distributed defects. Quality Engineering, 18, 461–467.10.1080/08982110600817235
  • Chimka, J. R., & Cabrera Arispe, P. V. (2007). Type II errors of demerit control charts. Quality Engineering, 19, 207–214.10.1080/08982110701477053
  • Chiu, J. E., & Kuo, T. I. (2007). Attribute control chart for multivariate poisson distribution. Communications in Statistics – Theory and Methods, 37, 146–158.10.1080/03610920701648771
  • Chiu, J. E., & Tsai, C. H. (2015). Monitoring high-quality processes with one-sided conditional cumulative counts of conforming chart. Journal of Industrial and Production Engineering, 32, 559–565.10.1080/21681015.2015.1091389
  • Conway, R. W., & Maxwell, W. L. (1962). A queuing model with state dependent service rates. Journal of Industrial Engineering, 12, 132–136.
  • Cozzucoli, P., & Ingrassia, S. (2008). A control chart to monitor a multivariate binomial process. Proceedings of the XLIV Scientific Meeting of the Italian Statistical Society. Cleup, Padova.
  • Cozzucoli, P. (2009). Process monitoring with multivariate p-control charts. International Journal Quality, Statistics and Reliability, 11 pp. Article ID 707583. doi:10.1155/2009/707583
  • Cozzucoli, P. (2010). Simultaneous confidence intervals on partial means of classes in the two-stage stratified sampling. Statistical Papers, 51, 673–685.
  • Duncan, A. J. (1950). A chi-square chart for controlling a set of percentages. Industrial Quality Control, 7, 11–15.
  • Fuchs, C., & Kenett, R. S. (1998). Multivariate quality control theory and applications. New York, NY: Marcel Dekker.
  • Goh, T. N. (1987). A control chart for very high yield processes. Quality Assurance, 13, 18–22.
  • Gold, R. Z. (1963). Tests auxiliary χ2 tests in a Markov chain. The Annals of Mathematical Statistics, 34, 56–74.10.1214/aoms/1177704242
  • Goodman, L. A. (1965). On simultaneous confidence intervals for multinomial populations. Technometrics, 7, 247–254.10.1080/00401706.1965.10490252
  • Guiffrida, A. L., & Nagi, R. (1998). Fuzzy set theory applications in production management research: a literature survey. Journal of Intelligent Manufacturing, 9, 39–56.
  • Hamed, M. S. (2014). Generalized variance chart for multivariate quality control process procedure with application. Applied Mathematical Sciences, 8, 8137–8151.10.12988/ams.2014.49734
  • Haridy, S., Wu, Z., Abhary, K., Castagliola, P., & Shamsuzzaman, M. (2014). Development of a multiattribute synthetic-np chart. Journal of Statistical Computation and Simulation, 84, 1884–1903.10.1080/00949655.2013.769541
  • He, Y., Mi, K., & Wu, C. (2012). A new statistical high-quality process monitoring method: The counted number between omega-event control charts. Quality and Reliability Engineering International, 28, 427–436.10.1002/qre.v28.4
  • He, S., He, Z., & Wang, G. A. (2014). CUSUM control charts for multivariate poisson distribution. Communications in Statistics – Theory and Methods, 43, 1192–1208.10.1080/03610926.2012.667484
  • Hsu, J. (1996). Multiple comparisons – Theory and methods. London: Chapman and Hall.10.1007/978-1-4899-7180-7
  • Jiang, W., Au, S. T., Tsui, K. L., & Xie, M. (2002). Process monitoring with univariate and multivariate c-charts. Technical Report, the Logistics Institute, Georgia Tech, and The Logistics Institute–Asia Pacific. National University of Singapore, Singapore.
  • Johnson, N. L., Kotz, S., & Balakrishnan, N. (1997). Discrete multivariate distribution. New York, NY: Wiley.
  • Jones, L. A., Woodall, W. H., & Conerly, M. D. (1999). Exact properties of demerit control chart. Journal of Quality Technology, 31, 207–215.
  • Kaminsky, F. C., Benneyan, J. C., & Davis, R. D. (1992). Statistical control charts based on a geometric distribution. Journal of Quality Technology, 24, 63–69.
  • Karlis, D. (2003). An EM algorithm for multivariate Poisson distribution and related models. Journal of Applied Statistics, 30, 63–77.10.1080/0266476022000018510
  • Kingman, J. F. C. (1993). Poisson processes. Oxford University Press.
  • Krishnamoorthy, A. S. (1951). Multivariate binomial and Poisson distribution. Sankhya, 11, 117–124.
  • Kuo, T. I., & Chiu, J. E. (2008). Regression-based limits for multivariate Poisson control chart. In IEEM International Conference on Industrial Engineering and Engineering Management (pp. 2051–2055). Singapore. Article number 4738232.
  • Laungrungrong, B., Borror, C. M., & Montgomery, D. C. (2014). A one-sided MEWMA control chart for Poisson-distributed data. International Journal of Data Analysis Techniques and Strategies, 6, 15–42.10.1504/IJDATS.2014.059013
  • Lowry, C. A., & Montgomery, D. C. (1995). A review of multivariate control charts. IIE Transactions, 27, 800–810.10.1080/07408179508936797
  • Li, J., Tsung, F., & Zou, C. (2012). Directional control schemes for multivariate categorical processes. Journal of Quality Technology, 44, 136–154.
  • Lu, X. S., Xie, M., & Goh, T. N. (1998). Control chart for multivariate attribute process. International Journal of Production Research, 36, 3477–3489.10.1080/002075498192166
  • Marcucci, M. (1985). Monitoring multinomial process. Journal of Quality Technology, 17, 86–91.
  • Marozzi, M. (2013). Nonparametric simultaneous tests for location and scale testing: A comparison of several methods. Communication in Statistics – Simulation and Computation, 42, 1298–1317.
  • Marozzi, M. (2015). Measuring trust in european public institutions. Social Indicators Research, 123, 879–895.10.1007/s11205-014-0765-9
  • Marozzi, M. (2016). Construction, robustness assessment and application of an index of perceived level of socio-economic threat from immigrants: A study of 47 European countries and regions. Social Indicators Research, 128, 413–437.
  • Mason, R. L., & Young, J. C. (2002). Multivariate statistical process control with industrial applications. Philadelphia, PA: The American Statistical Association and the Society for Industrial and Applied Mathematics, ASA-SIAM.
  • Miller, R. G. (1981). Simultaneous statistical inference (2nd ed.). New York, NY: Springer-Verlag.10.1007/978-1-4613-8122-8
  • Mittag, H. J., & Rinne, H. (1993). Statistical methods of quality assurance. London: Chapman and Hall.
  • Montgomery, D. C. (2009). Introduction to statistical quality control (6th ed.). New York, NY: Wiley.
  • Montgomery, D. C., & Mastrangelo, C. M. (1991). Some statistical process control methods for autocorrelated data. Journal of Quality Technology, 23, 179–193.
  • Mukherjee, A., & Marozzi, M. (2016a). A distribution-free phase-II CUSUM procedure for monitoring service quality. Total Quality Management & Business Excellence. doi:10.1080/14783363.2015.1134266
  • Mukherjee, A., & Marozzi, M. (2016b). Distribution-free lepage type circular grid charts for joint monitoring of location and scale parameters of a process. Quality and Reliability Engineering International. doi:10.1002/qre.2002
  • Nelson, L. S. (1987). A chi-square control chart for several proportions. Journal of Quality Technology, 19, 229–231.
  • Nembharda, D. A., & Nembharda, H. B. (2000). A demerit control chart for autocorrelated data. Quality Engineering, 13, 179–190.10.1080/08982110108918640
  • Niaki, S. T. A., & Abbasi, B. (2007). On the monitoring of multiattributes high-quality production processes. Metrika, 66, 373–388.10.1007/s00184-006-0117-0
  • Niaki, S. T. A., & Akbari-Nasaji, S. (2011). A hybrid method of artificial neural network and simulated annealing in monitoring autocorrelated multi-attribute processes. The International Journal of Advanced Manufacturing Technology, 56, 777–788.10.1007/s00170-011-3199-4
  • Niaki, S. T. A., & Khedmati, M. (2013). Estimating the change point of the parameter vector of multivariate Poisson processes monitored by a multiattribute T2 control chart. The International Journal of Advanced Manufacturing Technology, 64, 1625–1642.10.1007/s00170-012-4128-x
  • Niaki, S. T. A., Javadi, S., & Fallahnezhad, M. S. (2014). A hybrid root transformation and decision on belief approach to monitor multiattribute Poisson processes. The International Journal of Advanced Manufacturing Technology, 75, 1651–1660.10.1007/s00170-014-6263-z
  • Patel, H. I. (1973). Quality control methods for multivariate binomial and poisson distributions. Technometrics, 15, 103–112.10.1080/00401706.1973.10489014
  • Quesenberry, C. P. (1995). Geometric Q charts for high quality processes. Journal of Quality Technology, 27, 304–315.
  • Rohatgi, V. K. (1976). An introduction to probability theory and mathematical statistics. New York, NY: Wiley.
  • Ryan, A. G., Wells, L. J., & Woodall, W. H. (2011). Methods for monitoring multiple proportions when inspecting continuously. Journal of Quality Technology, 43, 237–248.
  • Saghir, A., & Lin, Z. (2014). Control chart for monitoring multivariate COM-Poisson attributes. Journal of Applied Statistics, 41, 200–214.
  • Saghir, A., & Lin, Z. (2015). Control charts for dispersed count data: An overview. Quality and Reliability Engineering International, 31, 725–739.10.1002/qre.1642
  • Serfling, R. J. (1980). Approximation theorems of mathematical statistics. New York, NY: Wiley.10.1002/SERIES1345
  • Šidàk, Z. (1967). Rectangular confidence regions for the means of multivariate normal distributions. Journal of the American Statistical Association, 62, 626–633.
  • Šidàk, Z. (1968). On multivariate normal probabilities of rectangles: Their dependence on correlations. The Annals of Mathematical Statistics, 39, 1425–1434.
  • Skinner, K. R., Montgomery, D. C., & Runger, G. C. (2003). Process monitoring for multiple count data using generalized linear model-based control charts. International Journal of Production Research, 41, 1167–1180.10.1080/00207540210163964
  • Skinner, K. R., Runger, G. C., & Montgomery, D. C. (2006). Process monitoring for multiple count data using a deleted-Y statistic. Quality Technology & Quantitative Management, 3, 247–261.10.1080/16843703.2006.11673113
  • Stoumbos, Z. G., Reynolds, M. R., Ryan, T. P., & Woodall, W. H. (2000). The state of statistical process control as we proceed into the 21st century. Journal of the American Statistical Association, 95, 992–998.10.1080/01621459.2000.10474292
  • Taleb, H., & Limam, M. (2002). On fuzzy and probabilistic control chart. International Journal of Production Research, 40, 2849–2863.10.1080/00207540210137602
  • Taleb, H. (2009). Control charts applications for multivariate attribute processes. Computers and Industrial Engineering, 56, 399–410.10.1016/j.cie.2008.06.015
  • Topalidou, E., & Psarakis, S. (2009). Review of multinomial and multiattribute quality control charts. Quality and Reliability Engineering International, 25, 773–804.10.1002/qre.v25:7
  • Xie, M., & Goh, T. N. (1992). Some procedures for decision making in controlling high yield processes. Quality and Reliability Engineering, 8, 355–360.10.1002/(ISSN)1099-1638
  • Xie, M., & Goh, T. N. (1993). Improvement detection by control charts for high yield processes. International Journal of Quality and Reliability Management, 10, 24–31.
  • Xie, M., & Goh, T. N. (1997). The use of probability limits for process control based on geometric distribution. International Journal of Quality and Reliability Management, 14, 64–73.10.1108/02656719710156789
  • Xie, M., & Goh, T. N. (2006). Some statistical models for the monitoring of high-quality processes. In H. Pham (Ed.), Springer handbook of engineering statistics, (pp. 281–290). London: Springer.
  • Xie, M., Goh, T. N., & Chan, L. Y. (1999). A quality monitoring and decision-making scheme for automated production processes. International Journal of Quality and Reliability Management, 16, 148–157.10.1108/02656719910218238
  • Xie, M., Goh, T. N., & Kuralmani, V. (2000). On optimal setting of control limits for geometric chart. International Journal of Reliability, Quality and Safety Engineering, 7, 17–25.10.1142/S0218539300000031
  • Xie, M., Goh, T. N., & Kuralmani, V. (2002). Statistical models and control charts for high quality processes. Boston, MA: Kluwer Academic Publishers.10.1007/978-1-4615-1015-4
  • Wang, J. H., & Raz, T. (1988). Applying fuzzy set theory in the development of quality control chart. In Proceedings of the International Industrial Engineering Conference (pp. 30–35). Orlando, FL.
  • Wang, J. H., & Raz, T. (1990). On the construction of control charts using linguistic variables. International Journal of Production Research, 28, 477–487.10.1080/00207549008942731
  • Weiss, C. H. (2012). Continuously monitoring categorical processes. Quality Technology & Quantitative Management, 9, 171–188.10.1080/16843703.2012.11673284
  • Westfall, P. H., & Young, S. Y. (1989). p Value adjustments for multiple tests in multivariate binomial models. Journal of the American Statistical Association, 84, 780–786.
  • Westfall, P. H., & Young, S. Y. (1993). Resampling-Based Multiple Testing: Examples and Methods for p-Value Adjustment. New York, NY: Wiley.
  • Woodall, W. H. (1997). Control charts based on attribute data: Bibliography and review. Journal of Quality Technology, 29, 172–183.
  • Woodall, W. H., & Montgomery, D. C. (1999). Research issues and ideas in statistical process control. Journal of Quality Technology, 31, 376–386.
  • Woodall, W. H., & Montgomery, D. C. (2014). Some current directions in the theory and application of statistical process monitoring. Journal of Quality Technology, 46, 78–94.

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.