Advanced search
Publication Cover
Quality Technology & Quantitative Management Volume 16, 2019 - Issue 1
Submit an article Journal homepage
290
Views
5
CrossRef citations to date
0
Altmetric
Articles

A robust multivariate sign control chart for detecting shifts in covariance matrix under the elliptical directions distributions

Wenjuan LiangSchool of Mathematics and Statistics, Huangshan University, Huangshan, China.;School of Statistics, East China Normal University, Shanghai, China.View further author information
,
Dongdong XiangSchool of Statistics, East China Normal University, Shanghai, China.Correspondence[email protected]
View further author information
,
Xiaolong PuSchool of Statistics, East China Normal University, Shanghai, China.View further author information
,
Yan LiSchool of Statistics, East China Normal University, Shanghai, China.View further author information
&
Lingzhu JinSchool of Statistics, East China Normal University, Shanghai, China.;Department of Financial Data Technology, Shanghai DZH Limited, Shanghai, China.View further author information
Pages 113-127 | Accepted 17 Aug 2017, Published online: 12 Sep 2017

References

  • Batsidis, A., & Zografos, K. (2013). A necessary test of fit of specific elliptical distributions based on an estimator of Song’s measure. Journal of Multivariate Analysis, 113, 91–105.
  • Cortez, P., Cerdeira, A., Almeida, F., Matos, T., & Reis, J. (2009). Modeling wine preferences by data mining from physicochemical properties. Decision Support Systems, 47, 547–553.
  • Crosier, R. B. (1988). Multivariate generations of cumulative sum quality control schemes. Technometrics, 30, 219–303.
  • Hallin, M., & Paindaveine, D. (2006). Semiparametrically efficient rank-based inference for shape I: Optimal rank-based tests for sphericity. The Annals of Statistics, 34, 2707–2756.
  • Hawkins, D. M., & Masoudou-Tchao, E. M. (2008). Multivariate exponentially weighted moving covariance matrix. Technometrics, 50, 155–166.
  • Healy, J. D. (1987). A note on multivariate CUSUM procedures. Technometrics, 29, 409–412.
  • Hettmansperger, T. P., & Randles, R. H. (2002). A practical affine equivariant multivariate median. Biometrika, 89, 851–860.
  • Huwang, L., Yeh, A. B., & Hung, Y. (2007). Monitoring mulitvariate process variability for individual observations. Journal of Quality Technology, 39, 258–278.
  • Jones, L. A., Champ, C. W., & Rigdon, S. E. (2001). The performance of exponentially weighted moving average charts with estimated parameters. Technometrics, 43, 156–167.
  • Li, B., Wang, K., & Yeh, A. B. (2013). Monitoring the covariance matrix via penalized likelihood estimation. IIE Transactions on Quality and Reliability Engineering, 45, 132–146.
  • Li, J., Zhang, X., & Jeske, D. R. (2013). Nonparametric multivariate CUSUM control charts for location and scale changes. Journal of Nonparametric Statistics, 25, 1–20.
  • Li, Z., Zou, C., & Wang, Z. (2013). A multivariate sign chart for monitoring process shape parameters. Journal of Quality Technology, 45, 149–165.
  • Li, W., Dou, W., Pu, X., & Xiang, D. (2017). Monitoring individuals with irregular semiparametric longitudinal behaviour,. doi:10.1080/16843703.2017.1304045
  • Li, W., Pu, X., Tsung, F., & Xiang, D. (2017). A robust self-starting spatial rank multivariate EWMA chart based on forward variable selection. Computers & Industrial Engineering, 130, 116–130.
  • Liang, W., Xiang, D., & Pu, X. (2016). A robust multivariate EWMA control chart for detecting sparse mean shifts. Journal of Quality Technology, 48, 265–283.
  • Lowry, C. A., Woodall, W. H., Champ, C. W., & Rigdon, S. E. (1992). A multivariate exponentially weighted moving average control chart. Technometrics, 34, 46–53.
  • Oja, H. (2010). Multivariate nonparametric methods with R. New York: Springer Science & Business Media.
  • Qiu, P., & Xiang, D. (2014). Univariate dynamic screening system: an approach for identifying individuals with irregular longitudinal behavior. Technometrics, 56, 248–260.
  • Qiu, P., & Xiang, D. (2015). Surveillance of cardiovascular diseases using a multivariate dynamic screening system. Statistics in Medicine, 34, 2204–2221.
  • Randles, R. H. (2000). A simpler, affine invariant, multivariate, distribution-free sign test. Journal of the American Statistical Association, 95, 1263–1268.
  • Schott, J. R. (2002). Testing for elliptical symmetry in covariance-matrix-based analyses. Statistics & Probability Letters, 60, 395–404.
  • Shen, X., Tsung, F., & Zou, C. (2014). A new multivariate EWMA scheme for monitoring covariance matrices. International Journal of Production Research, 52, 2834–2850.
  • Sirkiä, S., Taskinen, S., Oja, H., & Tyler, D. E. (2009). Tests and estimates of shape based on spatial signs and ranks. Journal of Nonparametric Statistics, 21, 155–176.
  • Tyler, D. E. (1987). A distribution-free M-estimator of multivariate scatter. The Annals of Statistics, 15, 234–251.
  • Yeh, A. B., Huwang, L., & Wu, C. W. (2005). A multivariate EWMA control chart for monitoring process variability with individual observations. IIE Transactions, 37, 1023–1035.
  • Yeh, A. B., Li, B., & Wang, K. (2012). Monitoring multivariate process variability with individual observations via penalised likelihood estimation. International Journal of Production Research, 50, 6624–6638.
  • Zou, C., & Tsung, F. (2011). A multivariate sign EWMA control chart. Technometrics, 53, 84–97.
  • Zi, X., Zou, C., Zhou, Q., & Wang, J. (2013). A direction multivariate sign EWMA control chart. Quality Technology and Quantitative Management, 10, 115–132.

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.