Nonparametric or distribution-free charts can be useful in statistical process control problems when there is limited or lack of knowledge about the underlying process distribution. In this paper, a phase II Shewhart-type chart is considered for location, based on reference data from phase I analysis and the well-known Mann-Whitney statistic. Control limits are computed using Lugannani-Rice-saddlepoint, Edgeworth, and other approximations along with Monte Carlo estimation. The derivations take account of estimation and the dependence from the use of a reference sample. An illustrative numerical example is presented. The in-control performance of the proposed chart is shown to be much superior to the classical Shewhart X¯ chart. Further comp...
Shewhart control charts are among the most popular control charts used to monitor process dispersion...
A number of processes to which statistical control is applied are subject to various effects that ca...
Abstract: Shewhart control limits for individual observations are traditionally based on the average...
Nonparametric or distribution-free charts can be useful in statistical process control problems when...
Nonparametric or distribution-free charts can be useful in statistical process control when there is...
Although the Shewhart chart is widely used in practice because of its simplicity, applying this cont...
Control charts are widely used in statistical process control to detect changes in a production proc...
Numerous nonparametric or distribution-free control charts have been proposed and studied in recent...
Distribution-free Shewhart-type control charts are proposed for future sample percentiles based on a...
Control charts that are based on assumption(s) of a specific form for the underlying process distrib...
We present an overview of the literature on nonparametric or distribution-free control charts for un...
An overview of the literature on some nonparametric or distribution-free quality control procedures ...
Control charts for variation play a key role in the overall statistical process control (SPC) regime...
Standard control charts are often based on the assumption that the observations follow a specific pa...
<div><p>Monitoring multivariate quality variables or data streams remains an important and challengi...
Shewhart control charts are among the most popular control charts used to monitor process dispersion...
A number of processes to which statistical control is applied are subject to various effects that ca...
Abstract: Shewhart control limits for individual observations are traditionally based on the average...
Nonparametric or distribution-free charts can be useful in statistical process control problems when...
Nonparametric or distribution-free charts can be useful in statistical process control when there is...
Although the Shewhart chart is widely used in practice because of its simplicity, applying this cont...
Control charts are widely used in statistical process control to detect changes in a production proc...
Numerous nonparametric or distribution-free control charts have been proposed and studied in recent...
Distribution-free Shewhart-type control charts are proposed for future sample percentiles based on a...
Control charts that are based on assumption(s) of a specific form for the underlying process distrib...
We present an overview of the literature on nonparametric or distribution-free control charts for un...
An overview of the literature on some nonparametric or distribution-free quality control procedures ...
Control charts for variation play a key role in the overall statistical process control (SPC) regime...
Standard control charts are often based on the assumption that the observations follow a specific pa...
<div><p>Monitoring multivariate quality variables or data streams remains an important and challengi...
Shewhart control charts are among the most popular control charts used to monitor process dispersion...
A number of processes to which statistical control is applied are subject to various effects that ca...
Abstract: Shewhart control limits for individual observations are traditionally based on the average...