A Low-Rank Approximation for MDPs via Moment Coupling

IF 0.7 4区 管理学 Q3 Engineering Military Operations Research Pub Date : 2022-11-17 DOI:10.1287/opre.2022.2392
Amy Zhang, Itai Gurvich
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Abstract

Markov Decision Process Tayloring for Approximation Design Optimal control problems are difficult to solve for problems on large state spaces, calling for the development of approximate solution methods. In “A Low-rank Approximation for MDPs via Moment Coupling,” Zhang and Gurvich introduce a novel framework to approximate Markov decision processes (MDPs) that stands on two pillars: (i) state aggregation, as the algorithmic infrastructure, and (ii) central-limit-theorem-type approximations, as the mathematical underpinning. The theoretical guarantees are grounded in the approximation of the Bellman equation by a partial differential equation (PDE) where, in the spirit of the central limit theorem, the transition matrix of the controlled Markov chain is reduced to its local first and second moments. Instead of solving the PDE, the algorithm introduced in the paper constructs a “sister”' (controlled) Markov chain whose two local transition moments are approximately identical with those of the focal chain. Because of this moment matching, the original chain and its sister are coupled through the PDE, facilitating optimality guarantees. Embedded into standard soft aggregation, moment matching provides a disciplined mechanism to tune the aggregation and disaggregation probabilities.
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基于矩耦合的mdp低秩近似
对于大状态空间问题,最优控制问题难以求解,需要发展近似求解方法。在“通过矩耦合的mdp的低秩近似”中,Zhang和Gurvich引入了一个新的框架来近似马尔可夫决策过程(mdp),该框架建立在两个支柱上:(i)作为算法基础的状态聚合,以及(ii)作为数学基础的中心极限定理型近似。理论保证是建立在用偏微分方程(PDE)逼近Bellman方程的基础上的,其中,在中心极限定理的精神下,控制马尔可夫链的转移矩阵被简化为它的局部一阶和二阶矩。本文提出的算法不是求解PDE,而是构造一个“姊妹”(受控)马尔可夫链,其两个局部过渡矩与焦点链的过渡矩近似相同。由于这种矩匹配,原始链和姊妹链通过PDE进行耦合,从而促进了最优性保证。矩匹配嵌入到标准的软聚合中,提供了一种规范的机制来调整聚合和分解概率。
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来源期刊
Military Operations Research
Military Operations Research 管理科学-运筹学与管理科学
CiteScore
1.00
自引率
0.00%
发文量
0
审稿时长
>12 weeks
期刊介绍: Military Operations Research is a peer-reviewed journal of high academic quality. The Journal publishes articles that describe operations research (OR) methodologies and theories used in key military and national security applications. Of particular interest are papers that present: Case studies showing innovative OR applications Apply OR to major policy issues Introduce interesting new problems areas Highlight education issues Document the history of military and national security OR.
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