Solving Robust Markov Decision Processes: Generic, Reliable, Efficient

December 13, 2024 Β· Declared Dead Β· πŸ› arXiv.org

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Authors Tobias Meggendorfer, Maximilian Weininger, Patrick WienhΓΆft arXiv ID 2412.10185 Category cs.AI: Artificial Intelligence Cross-listed cs.LG Citations 7 Venue arXiv.org Last Checked 4 months ago
Abstract
Markov decision processes (MDP) are a well-established model for sequential decision-making in the presence of probabilities. In robust MDP (RMDP), every action is associated with an uncertainty set of probability distributions, modelling that transition probabilities are not known precisely. Based on the known theoretical connection to stochastic games, we provide a framework for solving RMDPs that is generic, reliable, and efficient. It is *generic* both with respect to the model, allowing for a wide range of uncertainty sets, including but not limited to intervals, $L^1$- or $L^2$-balls, and polytopes; and with respect to the objective, including long-run average reward, undiscounted total reward, and stochastic shortest path. It is *reliable*, as our approach not only converges in the limit, but provides precision guarantees at any time during the computation. It is *efficient* because -- in contrast to state-of-the-art approaches -- it avoids explicitly constructing the underlying stochastic game. Consequently, our prototype implementation outperforms existing tools by several orders of magnitude and can solve RMDPs with a million states in under a minute.
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