Stochastic Timed Games Revisited
Abstract
Stochastic timed games (STGs), introduced by Bouyer and Forejt, naturally generalize both continuous-time Markov chains and timed automata by providing a partition of the locations between those controlled by two players (Player Box and Player Diamond) with competing objectives and those governed by stochastic laws. Depending on the number of players---, , or ---subclasses of stochastic timed games are often classified as -player, -player, and -player games where the symbolizes the presence of the stochastic "nature" player. For STGs with reachability objectives it is known that -player one-clock STGs are decidable for qualitative objectives, and that -player three-clock STGs are undecidable for quantitative reachability objectives. This paper further refines the gap in this decidability spectrum. We show that quantitative reachability objectives are already undecidable for player four-clock STGs, and even under the time-bounded restriction for -player five-clock STGs. We also obtain a class of , player STGs for which the quantitative reachability problem is decidable.
Keywords
Cite
@article{arxiv.1607.05671,
title = {Stochastic Timed Games Revisited},
author = {S Akshay and Patricia Bouyer and Shankara Narayanan Krishna and Lakshmi Manasa and Ashutosh Trivedi},
journal= {arXiv preprint arXiv:1607.05671},
year = {2016}
}