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桥接POMDP与贝叶斯决策以实现模型不确定性下的稳健维护规划:铁路系统应用

Bridging POMDPs and Bayesian decision making for robust maintenance planning under model uncertainty: An application to railway systems

Reliability Engineering and System Safety · 2023
被引 40
ABS 3

中文导读

针对结构健康监测中的维护规划问题,提出一种结合马尔可夫链蒙特卡洛采样与部分可观测马尔可夫决策过程的框架,直接从监测数据估计模型参数,得到对模型不确定性稳健的维护策略,并在铁路轨道资产上验证。

Abstract

Structural Health Monitoring (SHM) describes a process for inferring quantifiable metrics of structural condition, which can serve as input to support decisions on the operation and maintenance of infrastructure assets. Given the long lifespan of critical structures, this problem can be cast as a sequential decision making problem over prescribed horizons. Partially Observable Markov Decision Processes (POMDPs) offer a formal framework to solve the underlying optimal planning task. However, two issues can undermine the POMDP solutions. Firstly, the need for a model that can adequately describe the evolution of the structural condition under deterioration or corrective actions and, secondly, the non-trivial task of recovery of the observation process parameters from available monitoring data. Despite these potential challenges, the adopted POMDP models do not typically account for uncertainty on model parameters, leading to solutions which can be unrealistically confident. In this work, we address both key issues. We present a framework to estimate POMDP transition and observation model parameters directly from available data, via Markov Chain Monte Carlo (MCMC) sampling of a Hidden Markov Model (HMM) conditioned on actions. The MCMC inference estimates distributions of the involved model parameters. We then form and solve the POMDP problem by exploiting the inferred distributions, to derive solutions that are robust to model uncertainty. We successfully apply our approach on maintenance planning for railway track assets on the basis of a “fractal value” indicator, which is computed from actual railway monitoring data.

结构健康监测维护规划部分可观测马尔可夫决策过程贝叶斯推断铁路系统