We propose a new pumping technique for 2-dimensional vector addition systems with states (2-VASS) building on natural geometric properties of runs. We illustrate its applicability by reproving an exponential bound on the length of the shortest accepting run, and by proving a new pumping lemma for languages of 2-VASS. The technique is expected to be useful for settling questions concerning languages of 2-VASS, e.g., for establishing decidability status of the regular separability problem
Blondin et al. showed at LICS 2015 that two-dimensional vector addition systems with states have rea...
A vector addition system with states (VASS) consists of a finite set of states and counters. A trans...
Branching VASS (BVASS) generalise vector addition systems with states by allowing for special branch...
The reachability problem is a central decision problem in verification of vector addition systems wi...
A vector addition system with states (VASS) consists of a finite set of states and counters. A confi...
AbstractLet VASS(k, l, n) denote the class of k-dimensional n-state Vector Addition Systems with Sta...
A vector addition system with states (VASS) consists of a finite set of states and counters. A confi...
International audienceAlternating vector addition systems are obtained by equipping vector addition ...
We study the geometry of reachability sets of continuous vector addition systems with states (VASS)....
AbstractIn this paper, we analyse the complexity of the reachability, containment, and equivalence p...
We prove that the reachability problem for two-dimensional vector addition systems with states is NL...
Branching VASS (BVASS) generalise vector addition systems with states by allowing for special branch...
Seminal results establish that the coverability problem for Vector Addition Systems with States (VAS...
Blondin et al. showed at LICS 2015 that two-dimensional vector addition systems with states have rea...
Abstract. Determining the complexity of the reachability problem for vector addition systems with st...
Blondin et al. showed at LICS 2015 that two-dimensional vector addition systems with states have rea...
A vector addition system with states (VASS) consists of a finite set of states and counters. A trans...
Branching VASS (BVASS) generalise vector addition systems with states by allowing for special branch...
The reachability problem is a central decision problem in verification of vector addition systems wi...
A vector addition system with states (VASS) consists of a finite set of states and counters. A confi...
AbstractLet VASS(k, l, n) denote the class of k-dimensional n-state Vector Addition Systems with Sta...
A vector addition system with states (VASS) consists of a finite set of states and counters. A confi...
International audienceAlternating vector addition systems are obtained by equipping vector addition ...
We study the geometry of reachability sets of continuous vector addition systems with states (VASS)....
AbstractIn this paper, we analyse the complexity of the reachability, containment, and equivalence p...
We prove that the reachability problem for two-dimensional vector addition systems with states is NL...
Branching VASS (BVASS) generalise vector addition systems with states by allowing for special branch...
Seminal results establish that the coverability problem for Vector Addition Systems with States (VAS...
Blondin et al. showed at LICS 2015 that two-dimensional vector addition systems with states have rea...
Abstract. Determining the complexity of the reachability problem for vector addition systems with st...
Blondin et al. showed at LICS 2015 that two-dimensional vector addition systems with states have rea...
A vector addition system with states (VASS) consists of a finite set of states and counters. A trans...
Branching VASS (BVASS) generalise vector addition systems with states by allowing for special branch...