Shewhart control charts for the scale parameter of a Weibull control variable with fixed and variable sampling intervals

Ramalhoto, M. F.; Morais, Manuel Cabral

doi:10.1080/02664769922700

Cited by 44 publications

(42 citation statements)

References 30 publications

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“…We treat this step as a minimax problem wherein we search for a combination of p AU and p AL that minimize the maximum value (overall ρ) of the ARL under the constraint of Equation (9). That minimax ARL value in our results is equal to L 0 .…”

Section: Control Schemementioning

confidence: 91%

Monitoring the Weibull Shape Parameter with Type II Censored Data

Chan

Han

Pascual

2014

Qual. Reliab. Engng. Int.

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In this article, we introduce a method for monitoring the Weibull shape parameter β with type II (failure) censored data. The control limits depend on the sample size, the number of censored observations, the target average run length, and the stable value of β. The method assumes that the scale parameter α is constant during each sampling period, which is true under rational subgrouping. The proposed method utilizes the relationship between Weibull and smallest extreme value distribution. We propose an unbiased estimator of σ = 1/β as the monitoring statistic. We derive the control limits for one-sided and two-sided charts for several stable process average run lengths. We discuss two schemes, namely, the control-limits-only scheme and the control-limits-with-warning-lines scheme. The stable process average run length performance of the proposed charts is studied and compared with those of other charts for monitoring β under similar assumptions.

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Section: Control Schemementioning

confidence: 91%

Monitoring the Weibull Shape Parameter with Type II Censored Data

Chan

Han

Pascual

2014

Qual. Reliab. Engng. Int.

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“…Furthermore, taking into account that ARL.ı/ D 1= .ı/, we can add the incontrol ARL is never smaller than any out-of-control ARL. Such a behavior of the ARL function means that: the chart satisfies what Ramalhoto and Morais (1995) and Ramalhoto and Morais (1999) called the primordial criterion; and we are dealing with what Pignatiello et al (1995) and Acosta-Mejía and Pignatiello (2000) expertly termed an ARL-unbiased chart. Moreover,…”

Section: Introductionmentioning

confidence: 92%

On ARL-Unbiased Control Charts

Knoth

Morais²

2015

Frontiers in Statistical Quality Control 11

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Manufacturing processes are usually monitored by making use of control charts for variables or attributes. Controlling both increases and decreases in a parameter, by using a control statistic with an asymmetrical distribution, frequently leads to an ARL-biased chart, in the sense that some out-of-control average run length (ARL) values are larger than the in-control ARL, i.e., it takes longer to detect some shifts in the parameter than to trigger a false alarm. In this paper, we are going to:

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“…A bibliography of control charts based on attribute (or count) data is given by Woodall (1997). Padgett and Spurrier (1990) and Ramalhoto and Morais (1999) construct Shewhart type methods suitable for the Weibull distributions. Padgett and Spurrier (1990) give the Shewhart limits for the lognormal distribution.…”

Section: Methods Designed/or Other Specified Distributions Than the Nmentioning

confidence: 99%