Abstract
Consider a process that produces a series of independent identically distributed vectors. A change in an underlying state may become manifest in a modification of one or more of the marginal distributions. Often, the dependence structure between coordinates is unknown, impeding surveillance based on the joint distribution. A popular approach is to construct control charts for each coordinate separately and raise an alarm the first time any (or some) of the control charts signals. The difficulty is obtaining an expression for the overall average run length to false alarm (ARL2FA).
We argue that despite the dependence structure, when the process is in control, for large ARLs to false alarm, run lengths of many types of control charts run in parallel are asymptotically independent. Furthermore, often, in-control run lengths are asymptotically exponentially distributed, enabling uncomplicated asymptotic expressions for the ARL2FA.
We prove this assertion for certain Cusum and Shiryaev–Roberts-type control charts and illustrate it by simulations.
Citation
Moshe Pollak. "A rule of thumb: Run lengths to false alarm of many types of control charts run in parallel on dependent streams are asymptotically independent." Ann. Statist. 49 (1) 557 - 567, February 2021. https://doi.org/10.1214/20-AOS1968
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