Multiple Mean-Payoff Optimization under Local Stability Constraints
Abstract
The long-run average payoff per transition (mean payoff) is the main tool for specifying the performance and dependability properties of discrete systems. The problem of constructing a controller (strategy) simultaneously optimizing several mean payoffs has been deeply studied for stochastic and game-theoretic models. One common issue of the constructed controllers is the instability of the mean payoffs, measured by the deviations of the average rewards per transition computed in a finite "window" sliding along a run. Unfortunately, the problem of simultaneously optimizing the mean payoffs under local stability constraints is computationally hard, and the existing works do not provide a practically usable algorithm even for non-stochastic models such as two-player games. In this paper, we design and evaluate the first efficient and scalable solution to this problem applicable to Markov decision processes.
Cite
@article{arxiv.2412.13369,
title = {Multiple Mean-Payoff Optimization under Local Stability Constraints},
author = {David Klaška and Antonín Kučera and Vojtěch Kůr and Vít Musil and Vojtěch Řehák},
journal= {arXiv preprint arXiv:2412.13369},
year = {2024}
}
Comments
Accepted to AAAI 2025