Bayesian inference based on partial monitoring of components with applications to preventive system maintenance

Bayesian inference based on partial monitoring of components with applications to preventive system maintenance

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Article ID: iaor20022164
Country: United States
Volume: 48
Issue: 7
Start Page Number: 551
End Page Number: 577
Publication Date: Oct 2001
Journal: Naval Research Logistics
Authors: ,
Abstract:

Consider a binary, monotone system of n components. The assessment of the parameter vector, θ, of the joint distribution of the lifetimes of the components and hence of the reliability of the system is often difficult due to scarcity of data. It is therefore important to make use of all information in an efficient way. For instance, prior knowledge is often of importance and can indeed conveniently be incorporated by the Bayesian approach. It may also be important to continuously extract information from a system currently in operation. This may be useful both for decisions concerning the system in operation as well as for decisions improving the components or changing the design of similar new systems. As in Meilijson, life-monitoring of some components and conditional life-monitoring of some others is considered. In addition to data arising from this monitoring scheme, so-called autopsy data are observed, if not censored. The probabilistic structure underlying this kind of data is described, and basic likelihood formulae are arrived at. A thorough discussion of an important aspect of this probabilistic structure, the inspection strategy, is given. Based on a version of this strategy a procedure for preventive system maintenance is developed and a detailed application to a network system presented. All the way a Bayesian approach to estimation of θ is applied. For the special case where components are conditionally independent given θ with exponentially distributed lifetimes it is shown that the weighted sum of products of generalized gamma distributions, as introduced in Gåsemyr and Natvig, is the conjugate prior for θ.

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