A Distribution-Free Control Chart Based on Order Statistics |
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| Authors: | N. Balakrishnan I. S. Triantafyllou |
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| Affiliation: | 1. Department of Mathematics and Statistics , McMaster University , Hamilton, Ontario, Canada;2. Statistics and Insurance Science, University of Piraeus , Piraeus, Greece |
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| Abstract: | In this article, we introduce a new distribution-free Shewhart-type control chart that takes into account the location of a single order statistic of the test sample (such as the median) as well as the number of observations in that test sample that lie between the control limits. Exact formulae for the alarm rate, the run length distribution, and the average run length (ARL) are all derived. A key advantage of the chart is that, due to its nonparametric nature, the false alarm rate and in-control run length distribution are the same for all continuous process distributions, and so will be naturally robust. Tables are provided for the implementation of the chart for some typical ARL values and false alarm rates. The empirical study carried out reveals that the new chart is preferable from a robustness point of view in comparison to a classical Shewhart-type chart and also the nonparametric chart of Chakraborti et al. (2004 Chakraborti , S. , van der Laan , P. , van de Wiel , M. A. ( 2004 ). A class of distribution-free control charts . J. Roy. Statist. Soc. Ser. C-Appl. Statist. 53 ( 3 ): 443 – 462 .[Web of Science ®] , [Google Scholar]). |
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| Keywords: | Average run length Distribution-free control charts False alarm rate Nonparametric methods Order statistics Shewhart X?-chart Statistical process control |
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