Gespeichert in:
Bibliographische Detailangaben
Hauptverfasser: Wu, Fei, Demeulemeester, Erik, Matuschke, Jannik
Format: Preprint
Veröffentlicht: 2024
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2412.12879
Tags: Tag hinzufügen
Keine Tags, Fügen Sie den ersten Tag hinzu!
_version_ 1866915068997795840
author Wu, Fei
Demeulemeester, Erik
Matuschke, Jannik
author_facet Wu, Fei
Demeulemeester, Erik
Matuschke, Jannik
contents This paper studies the computation of robust deterministic policies for Markov Decision Processes (MDPs) in the Lightning Does Not Strike Twice (LDST) model of Mannor, Mebel and Xu (ICML '12). In this model, designed to provide robustness in the face of uncertain input data while not being overly conservative, transition probabilities and rewards are uncertain and the uncertainty set is constrained by a budget that limits the number of states whose parameters can deviate from their nominal values. Mannor et al. (ICML '12) showed that optimal randomized policies for MDPs in the LDST regime can be efficiently computed when only the rewards are affected by uncertainty. In contrast to these findings, we observe that the computation of optimal deterministic policies is $N\!P$-hard even when only a single terminal reward may deviate from its nominal value and the MDP consists of $2$ time periods. For this hard special case, we then derive a constant-factor approximation algorithm by combining two relaxations based on the Knapsack Cover and Generalized Assignment problem, respectively. For the general problem with possibly a large number of deviations and a longer time horizon, we derive strong inapproximability results for computing robust deterministic policies as well as $Σ_2^p$-hardness, indicating that the general problem does not even admit a compact mixed integer programming formulation.
format Preprint
id arxiv_https___arxiv_org_abs_2412_12879
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Robust Deterministic Policies for Markov Decision Processes under Budgeted Uncertainty
Wu, Fei
Demeulemeester, Erik
Matuschke, Jannik
Optimization and Control
Discrete Mathematics
This paper studies the computation of robust deterministic policies for Markov Decision Processes (MDPs) in the Lightning Does Not Strike Twice (LDST) model of Mannor, Mebel and Xu (ICML '12). In this model, designed to provide robustness in the face of uncertain input data while not being overly conservative, transition probabilities and rewards are uncertain and the uncertainty set is constrained by a budget that limits the number of states whose parameters can deviate from their nominal values. Mannor et al. (ICML '12) showed that optimal randomized policies for MDPs in the LDST regime can be efficiently computed when only the rewards are affected by uncertainty. In contrast to these findings, we observe that the computation of optimal deterministic policies is $N\!P$-hard even when only a single terminal reward may deviate from its nominal value and the MDP consists of $2$ time periods. For this hard special case, we then derive a constant-factor approximation algorithm by combining two relaxations based on the Knapsack Cover and Generalized Assignment problem, respectively. For the general problem with possibly a large number of deviations and a longer time horizon, we derive strong inapproximability results for computing robust deterministic policies as well as $Σ_2^p$-hardness, indicating that the general problem does not even admit a compact mixed integer programming formulation.
title Robust Deterministic Policies for Markov Decision Processes under Budgeted Uncertainty
topic Optimization and Control
Discrete Mathematics
url https://arxiv.org/abs/2412.12879