Operations Research Graduate Program, North Carolina State University, Raleigh, NC, 27695-7913, USA.
Google Inc., 1600 Amphitheatre Parkway, Mountain View, CA, 94043, USA.
Health Care Manag Sci. 2019 Mar;22(1):34-52. doi: 10.1007/s10729-017-9420-8. Epub 2017 Oct 27.
Markov models are commonly used for decision-making studies in many application domains; however, there are no widely adopted methods for performing sensitivity analysis on such models with uncertain transition probability matrices (TPMs). This article describes two simulation-based approaches for conducting probabilistic sensitivity analysis on a given discrete-time, finite-horizon, finite-state Markov model using TPMs that are sampled over a specified uncertainty set according to a relevant probability distribution. The first approach assumes no prior knowledge of the probability distribution, and each row of a TPM is independently sampled from the uniform distribution on the row's uncertainty set. The second approach involves random sampling from the (truncated) multivariate normal distribution of the TPM's maximum likelihood estimators for its rows subject to the condition that each row has nonnegative elements and sums to one. The two sampling methods are easily implemented and have reasonable computation times. A case study illustrates the application of these methods to a medical decision-making problem involving the evaluation of treatment guidelines for glycemic control of patients with type 2 diabetes, where natural variation in a patient's glycated hemoglobin (HbA1c) is modeled as a Markov chain, and the associated TPMs are subject to uncertainty.
马尔可夫模型常用于许多应用领域的决策研究;然而,对于具有不确定转移概率矩阵 (TPM) 的此类模型,尚无广泛采用的方法来进行敏感性分析。本文描述了两种基于模拟的方法,用于对给定的离散时间、有限期限、有限状态马尔可夫模型进行概率敏感性分析,该模型的 TPM 根据相关概率分布在指定的不确定性集中进行抽样。第一种方法假设对概率分布没有先验知识,并且 TPM 的每一行都根据其不确定性集上的均匀分布独立抽样。第二种方法涉及对 TPM 的最大似然估计的(截断)多元正态分布进行随机抽样,前提是每行都具有非负元素且总和为一。这两种抽样方法易于实现,且计算时间合理。一个案例研究说明了这些方法在涉及评估 2 型糖尿病患者血糖控制治疗指南的医学决策问题中的应用,其中患者糖化血红蛋白 (HbA1c) 的自然变化被建模为马尔可夫链,并且相关 TPM 存在不确定性。
