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Reachability Games Modulo Theories with a Bounded Safety Player

Marco Faella, Gennaro Parlato

2023Proceedings of the AAAI Conference on Artificial Intelligence12 citationsDOIOpen Access PDF

Abstract

Solving reachability games is a fundamental problem for the analysis, verification, and synthesis of reactive systems. We consider logical reachability games modulo theories (in short, GMTs), i.e., infinite-state games whose rules are defined by logical formulas over a multi-sorted first-order theory. Our games have an asymmetric constraint: the safety player has at most k possible moves from each game configuration, whereas the reachability player has no such limitation. Even though determining the winner of such a GMT is undecidable, it can be reduced to the well-studied problem of checking the satisfiability of a system of constrained Horn clauses (CHCs), for which many off-the-shelf solvers have been developed. Winning strategies for GMTs can also be computed by resorting to suitable CHC queries. We demonstrate that GMTs can model various relevant real-world games, and that our approach can effectively solve several problems from different domains, using Z3 as the backend CHC solver.

Topics & Concepts

ReachabilityUndecidable problemModuloComputer scienceModel checkingBounded functionTheoretical computer scienceSatisfiability modulo theoriesSolverDecidabilityReachability problemDiscrete mathematicsMathematicsProgramming languageMathematical analysisFormal Methods in VerificationLogic, programming, and type systemsModel-Driven Software Engineering Techniques
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