Abstract
The necessary and sufficient conditions for various modes of interactions of the upper and lower schemes with headstarts are derived. The expression for the Laplace transform of the run-length distribution (for both interacting and non-interacting schemes) is obtained and used to develop a method of analysis for general two-sided cumulative sum schemes with headstarts. The results are shown to be relevant in the case when the schemes are supplemented by Shewhart’s control limits.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,Statistics and Probability
Reference21 articles.
1. Fast Initial Response for CUSUM Quality-Control Schemes: Give Your CUSUM A Head Start
2. Determination of ARL and a contour nomogram for cusum charts to control normal mean;Goel;Technometrics,1971
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