An EWMA p Chart Based On Improved Square Root Transformation
Commenced in January 2007
Frequency: Monthly
Edition: International
Paper Count: 33093
An EWMA p Chart Based On Improved Square Root Transformation

Authors: S. Sukparungsee

Abstract:

Generally, the traditional Shewhart p chart has been developed by for charting the binomial data. This chart has been developed using the normal approximation with condition as low defect level and the small to moderate sample size. In real applications, however, are away from these assumptions due to skewness in the exact distribution. In this paper, a modified Exponentially Weighted Moving Average (EWMA) control chat for detecting a change in binomial data by improving square root transformations, namely ISRT p EWMA control chart. The numerical results show that ISRT p EWMA chart is superior to ISRT p chart for small to moderate shifts, otherwise, the latter is better for large shifts.

Keywords: Number of defects, Exponentially Weighted Moving Average, Average Run Length, Square root transformations.

Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1093746

Procedia APA BibTeX Chicago EndNote Harvard JSON MLA RIS XML ISO 690 PDF Downloads 2484

References:


[1] M. Schader, and F. Schmid, Two rules of thumb for the approximation of the binomial distribution by the normal distribution, The American Statistician, vol. 43, pp. 23–24 (1989).
[2] T.P. Ryan, and N. C. Schwertman, Optimal limits for attributes control charts, Journal of Quality Technology, vol. 29, pp.86–98 (1997).
[3] C.P. Quesenberry, SPC Q charts for start-up process and short or long runs, Journal of Quality Technology, vol. 23, pp.213–224 (1991a).
[4] C.P. Quesenberry, SPC Q charts for a binomial parameter: Short or long runs, Journal of Quality Technology 23, pp.239–246 (1991b).
[5] C.P. Quesenberry, SPC Q charts for a Poisson parameter λ: short or long runs, Journal of Quality Technology, vol. 23, pp.296-303 (1991c).
[6] A. Winterbottom, Simple adjustments to improve control limits on attribute charts, Quality and Reliability Engineering International, vol. 9, pp.105-109, (1993).
[7] G. Chen, "An improved p chart through simple adjustments,” Journal of Quality Technology, vol. 30, pp. 142–151 (1998).
[8] T-R. Tsai, C.C. Lin and S-J, Wu, "Alternative attribute control charts based on improved square root transformation”, Tamsui Oxford Journal of Mathematics Sciences, vol. 22, pp. 61–72 (2002).
[9] S.W. Roberts, "Control chart tests based on geometric moving average.” Technometrics, vol. 1, pp. 239–250 (1959).