International audienceKarp and Miller's algorithm is based on an exploration of the reachability tree of aPetri net where, the sequences of transitions with positive incidence are accelerated. The tree nodes of Karp and Miller are labeled with omega-markings representing (potentially infinite) coverability sets. This set of omega-markings allows us to decide several properties of the Petri net, such as whether a marking is coverable or whether the reachability set is finite.The edges of the Karp and Miller tree are labeled by transitions but the associated semanticis unclear which yields to a complex proof of the algorithm correctness. In this work weintroduce three concepts: abstraction, acceleration and exploration sequence. In partic...
High-level Petri nets have been introduced as a powerful net type, by which it is possible to handle...
International audienceIn this paper, we define a class of Petri nets, called Petri nets with counter...
AbstractIn this paper, we define a class of Petri nets, called Petri nets with counters, that can be...
International audienceKarp and Miller's algorithm is based on an exploration of the reachability tre...
International audienceThe verification of infinite-state systems is a challenging task. A prominent ...
We introduce ω-Petri nets (ωPN), an extension of plain Petri nets with ω-labeled input and output ar...
This paper presents the Monotone-Pruning algorithm (MP) for computing the minimal coverability set o...
This paper presents the Monotone-Pruning algorithm (MP) for computing the minimal coverability set o...
The minimal coverability set (MCS) of a Petri net is a finite representation of the downward-closure...
The reachability problem for Petri nets is a central problem of net theory. The problem is known to ...
International audienceDownward closures of Petri net reachability sets can be finitely represented b...
transitions that merge two configurations. Runs in BVASS are tree-like structures instead of linear ...
Time Basic Petri nets are an expressive extension of Petri nets, suitable to model real-time systems...
We show in this paper that timed Petri nets, with one resource shared by all the transitions, are di...
Summary: The Petri net is a very efficient model to describe and analyse the behaviour of Discrete E...
High-level Petri nets have been introduced as a powerful net type, by which it is possible to handle...
International audienceIn this paper, we define a class of Petri nets, called Petri nets with counter...
AbstractIn this paper, we define a class of Petri nets, called Petri nets with counters, that can be...
International audienceKarp and Miller's algorithm is based on an exploration of the reachability tre...
International audienceThe verification of infinite-state systems is a challenging task. A prominent ...
We introduce ω-Petri nets (ωPN), an extension of plain Petri nets with ω-labeled input and output ar...
This paper presents the Monotone-Pruning algorithm (MP) for computing the minimal coverability set o...
This paper presents the Monotone-Pruning algorithm (MP) for computing the minimal coverability set o...
The minimal coverability set (MCS) of a Petri net is a finite representation of the downward-closure...
The reachability problem for Petri nets is a central problem of net theory. The problem is known to ...
International audienceDownward closures of Petri net reachability sets can be finitely represented b...
transitions that merge two configurations. Runs in BVASS are tree-like structures instead of linear ...
Time Basic Petri nets are an expressive extension of Petri nets, suitable to model real-time systems...
We show in this paper that timed Petri nets, with one resource shared by all the transitions, are di...
Summary: The Petri net is a very efficient model to describe and analyse the behaviour of Discrete E...
High-level Petri nets have been introduced as a powerful net type, by which it is possible to handle...
International audienceIn this paper, we define a class of Petri nets, called Petri nets with counter...
AbstractIn this paper, we define a class of Petri nets, called Petri nets with counters, that can be...