Litcius/Paper detail

Decomposition methods for solving Markov decision processes with multiple models of the parameters

Lauren N. Steimle, Vinayak S. Ahluwalia, Charmee Kamdar, Brian T. Denton

2021IISE Transactions15 citationsDOIOpen Access PDF

Abstract

We consider the problem of decision-making in Markov decision processes (MDPs) when the reward or transition probability parameters are not known with certainty. We study an approach in which the decision maker considers multiple models of the parameters for an MDP and wishes to find a policy that optimizes an objective function that considers the performance with respect to each model, such as maximizing the expected performance or maximizing worst-case performance. Existing solution methods rely on mixed-integer program (MIP) formulations, but have previously been limited to small instances, due to the computational complexity. In this article, we present branch-and-cut and policy-based branch-and-bound (PB-B&B) solution methods that leverage the decomposable structure of the problem and allow for the solution of MDPs that consider many models of the parameters. Numerical experiments show that a customized implementation of PB-B&B significantly outperforms the MIP-based solution methods and that the variance among model parameters can be an important factor in the value of solving these problems.

Topics & Concepts

Leverage (statistics)Markov decision processMathematical optimizationComputer scienceVariance (accounting)Markov chainBellman equationDecompositionMarkov modelFunction (biology)Decision problemInteger (computer science)Markov processMathematicsAlgorithmMachine learningStatisticsProgramming languageAccountingBusinessBiologyEvolutionary biologyEcologyReliability and Maintenance OptimizationSoftware Reliability and Analysis ResearchSupply Chain and Inventory Management