Percentile Queries in Multi-Dimensional Markov Decision Processes
Abstract
Markov decision processes (MDPs) with multi-dimensional weights are useful to analyze systems with multiple objectives that may be conflicting and require the analysis of trade-offs. We study the complexity of percentile queries in such MDPs and give algorithms to synthesize strategies that enforce such constraints. Given a multi-dimensional weighted MDP and a quantitative payoff function , thresholds (one per dimension), and probability thresholds , we show how to compute a single strategy to enforce that for all dimensions , the probability of outcomes satisfying is at least . We consider classical quantitative payoffs from the literature (sup, inf, lim sup, lim inf, mean-payoff, truncated sum, discounted sum). Our work extends to the quantitative case the multi-objective model checking problem studied by Etessami et al. in unweighted MDPs.
Cite
@article{arxiv.1410.4801,
title = {Percentile Queries in Multi-Dimensional Markov Decision Processes},
author = {Mickael Randour and Jean-François Raskin and Ocan Sankur},
journal= {arXiv preprint arXiv:1410.4801},
year = {2016}
}
Comments
Extended version of CAV 2015 paper