Control Charts for the Shape Parameter of Power Function Distribution under Different Classical Estimators

In practice, the control charts for monitoring of process mean are based on the normality assumption. But the performance of the control charts is seriously affected if the process of quality characteristics departs from normality. For such situations, we have modified the already existing control c...

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Bibliographic Details
Published in:Computer modeling in engineering & sciences 2021-01, Vol.127 (3), p.1201-1223
Main Authors: Zaka, Azam, Akhter, Ahmad Saeed, Jabeen, Riffat, Sanaullah, Aamir
Format: Article
Language:English
Subjects:
Average Run Length
Control Chart
Control charts
Electric power distribution
Maximum likelihood estimators
Monte Carlo simulation
Parameter estimation
Parameter sensitivity
Percentile Estimator
Power Function Distribution
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Summary:In practice, the control charts for monitoring of process mean are based on the normality assumption. But the performance of the control charts is seriously affected if the process of quality characteristics departs from normality. For such situations, we have modified the already existing control charts such as Shewhart control chart, exponentially weighted moving average (EWMA) control chart and hybrid exponentially weighted moving average (HEWMA) control chart by assuming that the distribution of underlying process follows Power function distribution (PFD). By considering the situation that the parameters of PFD are unknown, we estimate them by using three classical estimation methods, i.e., percentile estimator (P. E), maximum likelihood estimator (MLE) and modified maximum likelihood estimator (MMLE). We construct Shewhart, EWMA and HEWMA control charts based on P.E, MLE and MMLE. We have compared all these control charts using Monte Carlo simulation studies and concluded that HEWMA control chart under MLE is more sensitive to detect an early shift in the shape parameter when the distribution of the underlying process follows power function distribution.
ISSN:1526-1492
1526-1506
1526-1506
DOI:10.32604/cmes.2021.014477