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An ARL-Unbiased np-Chart

Author

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  • Morais Manuel Cabral

    (Department of Mathematics & CEMAT (Center for Computational and Stochastic Mathematics), Instituto Superior Técnico, University of Lisbon, Av. Rovisco Pais, 1049-001 Lisboa, Portugal)

Abstract

We usually assume that counts of nonconforming items have a binomial distribution with parameters (n,p), where n and p represent the sample size and the fraction nonconforming, respectively. The non-negative, discrete and usually skewed character and the target mean (np0)${(np_0)}$ of this distribution may prevent the quality control engineer to deal with a chart to monitor p with: a pre-specified in-control average run length (ARL), say α-1${\alpha ^{-1}}$; a positive lower control limit; the ability to control not only increases but also decreases in p in an expedient fashion. Furthermore, as far as we have investigated, the np- and p-charts proposed in the Statistical Process Control literature are ARL-biased, in the sense that they take longer, in average, to detect some shifts in the fraction nonconforming than to trigger a false alarm. Having all this in mind, this paper explores the notions of uniformly most powerful unbiased tests with randomization probabilities to eliminate the bias of the ARL function of the np-chart and to bring its in-control ARL exactly to α-1${\alpha ^{-1}}$.

Suggested Citation

  • Morais Manuel Cabral, 2016. "An ARL-Unbiased np-Chart," Stochastics and Quality Control, De Gruyter, vol. 31(1), pages 11-21, June.
    • Handle: RePEc:bpj:ecqcon:v:31:y:2016:i:1:p:11-21:n:4
    DOI: 10.1515/eqc-2015-0013
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    References listed on IDEAS

    as
    1. Huwang, Longcheen & Huang, Chun-Jung & Wang, Yi-Hua Tina, 2010. "New EWMA control charts for monitoring process dispersion," Computational Statistics & Data Analysis, Elsevier, vol. 54(10), pages 2328-2342, October.
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