International audienceIn this paper we study the reachability problem for parametric flat counter automata, in relation with the satisfiability problem of three fragments of integer arithmetic. The equivalence between non-parametric flat counter automata and Presburger arithmetic has been established previously by Comon and Jurski. We simplify their proof by introducing finite state automata defined over alphabets of a special kind of graphs (zigzags). This framework allows one to express also the reach-ability problem for parametric automata with one control loop as the satisfiability of a 1-parametric linear Diophantine systems. The latter problem is shown to be decidable, using a number-theoretic argument. In general, the reachability pr...
This paper establishes a relationship between reachability problems in timed automata and space-boun...
IN computations by abstract computing devices such as the Turing machine, head reversals are require...
Theoretical and practical aspects of the verification of infinite-state systems have attracted a lot...
International audienceIn this paper we study the reachability problem for parametric flat counter au...
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...
Two decades ago, Alur, Henzinger, and Vardi introduced the reachability problem for parametric timed...
AbstractThe class of deterministic two-way finite automata augmented by reversal-bounded counters op...
International audienceThis paper proves the NP-completeness of the reachability problem for the clas...
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...
International audienceIn this paper we prove that the transitive closure of a non-deterministic octa...
Abstract. This paper proves the NP-completeness of the reachability problem for the class of flat co...
We study the computational complexity of model checking EF logic and modal logic on parametric one-c...
Abstract. We study the decidability and complexity of the reachability problem in parametric timed a...
This paper establishes a relationship between reachability problems in timed automata and space-boun...
IN computations by abstract computing devices such as the Turing machine, head reversals are require...
Theoretical and practical aspects of the verification of infinite-state systems have attracted a lot...
International audienceIn this paper we study the reachability problem for parametric flat counter au...
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...
Two decades ago, Alur, Henzinger, and Vardi introduced the reachability problem for parametric timed...
AbstractThe class of deterministic two-way finite automata augmented by reversal-bounded counters op...
International audienceThis paper proves the NP-completeness of the reachability problem for the clas...
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...
International audienceIn this paper we prove that the transitive closure of a non-deterministic octa...
Abstract. This paper proves the NP-completeness of the reachability problem for the class of flat co...
We study the computational complexity of model checking EF logic and modal logic on parametric one-c...
Abstract. We study the decidability and complexity of the reachability problem in parametric timed a...
This paper establishes a relationship between reachability problems in timed automata and space-boun...
IN computations by abstract computing devices such as the Turing machine, head reversals are require...
Theoretical and practical aspects of the verification of infinite-state systems have attracted a lot...