Revealing POMDPs: Qualitative and Quantitative Analysis for Parity Objectives
DOI:
https://doi.org/10.1609/aaai.v40i43.40932Abstract
Partially observable Markov decision processes (POMDPs) are a central model for uncertainty in sequential decision making. The most basic objective is the reachability objective, where a target set must be eventually visited, and the more general parity objectives can model all omega-regular specifications. For such objectives, the computational analysis problems are the following: (a) qualitative analysis that asks whether the objective can be satisfied with probability 1 (almost-sure winning) or probability arbitrarily close to 1 (limit-sure winning); and (b) quantitative analysis that asks for the approximation of the optimal probability of satisfying the objective. For general POMDPs, almost-sure analysis for reachability objectives is EXPTIME-complete, but limit-sure and quantitative analyses for reachability objectives are undecidable; almost-sure, limit-sure, and quantitative analyses for parity objectives are all undecidable. A special class of POMDPs, called revealing POMDPs, has been studied recently in several works, and for this subclass the almost-sure analysis for parity objectives was shown to be EXPTIME-complete. In this work, we show that for revealing POMDPs the limit-sure analysis for parity objectives is EXPTIME-complete, and even the quantitative analysis for parity objectives can be achieved in EXPTIME.
Published
2026-03-14
How to Cite
Asadi, A., Chatterjee, K., Lurie, D., & Saona, R. (2026). Revealing POMDPs: Qualitative and Quantitative Analysis for Parity Objectives. Proceedings of the AAAI Conference on Artificial Intelligence, 40(43), 36146–36154. https://doi.org/10.1609/aaai.v40i43.40932
Issue
Section
AAAI Technical Track on Planning, Routing, and Scheduling
