International audienceIn this paper we prove that the transitive closure of a nondeterministic octagonal relation using integer counters can be expressed in Presburger arithmetic. The direct consequence of this fact is that the reachability problem is decidable for flat counter automata with octagonal transition relations. This result improves the previous results of Comon and Jurski [7] and Bozga, Iosif and Lakhnech [6] concerning the computation of transitive closures for difference bound relations. The importance of this result is justified by the wide use of octagons to computing sound abstractions of real-life systems [15]. We have implemented the octagonal transitive closure algorithm in a prototype system for the analysis of counter ...
Abstract. The octagon abstract domain, devoted to discovering octagonal con-straints (also called Un...
International audienceThis paper proposes a method to compute the transitive clo- sure of a union of...
We define 2 operators on relations over natural numbers such that they generalize the operators ’+ ’...
International audienceIn this paper we prove that the transitive closure of a non-deterministic octa...
Abstract. Computing transitive closures of integer relations is the key to find-ing precise invarian...
Abstract. In this paper we study the reachability problem for parametric flatcounter automata, in re...
Abstract. This paper proves the NP-completeness of the reachability problem for the class of flat co...
International audienceThis paper proves the NP-completeness of the reachability problem for the clas...
The numerical domain of Octagons can be viewed as an exercise in simplicity: it trades expressivenes...
International audienceComputing transitive closures of integer relations is the key to finding preci...
This paper argues that flatness appears as a central notion in the verification of counter automata....
This thesis concerns decision procedures for fragments of linear arithmetic and their application to...
One-counter automata are a fundamental and widely-studied class of infinite-state systems. In this p...
One-counter automata are a fundamental and widely-studied class of infinite-state systems. In this p...
Abstract. We show that model-checking flat counter systems over CTL* (with arithmetical constraints ...
Abstract. The octagon abstract domain, devoted to discovering octagonal con-straints (also called Un...
International audienceThis paper proposes a method to compute the transitive clo- sure of a union of...
We define 2 operators on relations over natural numbers such that they generalize the operators ’+ ’...
International audienceIn this paper we prove that the transitive closure of a non-deterministic octa...
Abstract. Computing transitive closures of integer relations is the key to find-ing precise invarian...
Abstract. In this paper we study the reachability problem for parametric flatcounter automata, in re...
Abstract. This paper proves the NP-completeness of the reachability problem for the class of flat co...
International audienceThis paper proves the NP-completeness of the reachability problem for the clas...
The numerical domain of Octagons can be viewed as an exercise in simplicity: it trades expressivenes...
International audienceComputing transitive closures of integer relations is the key to finding preci...
This paper argues that flatness appears as a central notion in the verification of counter automata....
This thesis concerns decision procedures for fragments of linear arithmetic and their application to...
One-counter automata are a fundamental and widely-studied class of infinite-state systems. In this p...
One-counter automata are a fundamental and widely-studied class of infinite-state systems. In this p...
Abstract. We show that model-checking flat counter systems over CTL* (with arithmetical constraints ...
Abstract. The octagon abstract domain, devoted to discovering octagonal con-straints (also called Un...
International audienceThis paper proposes a method to compute the transitive clo- sure of a union of...
We define 2 operators on relations over natural numbers such that they generalize the operators ’+ ’...