Optimizing Maintenance Decision in Rails: A Markov Decision Process Approach
Publication: ASCE-ASME Journal of Risk and Uncertainty in Engineering Systems, Part A: Civil Engineering
Volume 7, Issue 1
Abstract
The present paper contributes on how to model maintenance decision support for the rail components, namely on grinding and renewal decisions, by developing a framework that provides an optimal decision map. A Markov decision process (MDP) approach is followed to derive an optimal policy that minimizes the total costs over an infinite horizon depending on the different condition states of the rail. A practical example is explored with the estimation of the Markov transition matrices (MTMs) and the corresponding cost/reward vectors. The MDP states are defined in terms of rail width, height, accumulated million gross tons (MGT) and damage occurrence. The optimal policy represents a condition-based maintenance plan with the aim of supporting railway infrastructure managers to take the best maintenance decision among a set of three possible actions depending on the state of the rail. Overall, the optimal policy requires railway infrastructure companies to have a tight control over their assets, in particular railway lines, in order to constantly monitor the actual condition of the rails.
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Data Availability Statement
Some or all data, models, or code that support the findings of this study are available from the corresponding author upon reasonable request:
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Wear records;
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Damage records;
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MATLAB code for Markov transition matrices (MTMs); and
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MATLAB code for reward vectors.
Acknowledgments
The authors would like to thank the support of Infraestruturas de Portugal, the Portuguese railway infrastructure company, namely, Eng. Marco Baldeiras, for the availability and for providing all information that was used for the present research work. This work is supported by the Foundation for Science and Technology (FCT), through IDMEC, under LAETA, project UIDB/50022/2020. The second author thanks the support of both the FCT and the European Social Fund (ESF), of the European Union (EU), through a Ph.D. scholarship SFRH/BD/147638/2019. The third author expresses his gratitude to the FCT through SFRH/BSAB/150396/2019.
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© 2020 American Society of Civil Engineers.
History
Received: Mar 29, 2020
Accepted: Aug 17, 2020
Published online: Nov 23, 2020
Published in print: Mar 1, 2021
Discussion open until: Apr 23, 2021
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