We study languages of unambiguous VASS, that is, Vector Addition Systems with States, whose transitions read letters from a finite alphabet, and whose acceptance condition is defined by a set of final states (i.e., the coverability language). We show that the problem of universality for unambiguous VASS is ExpSpace-complete, in sheer contrast to Ackermann-completeness for arbitrary VASS, even in dimension 1. When the dimension d ? ? is fixed, the universality problem is PSpace-complete if d ? 2, and coNP-hard for 1-dimensional VASSes (also known as One Counter Nets)
Blondin et al. showed at LICS 2015 that two-dimensional vector addition systems with states have rea...
In this paper we combine two classical generalisations of finite automata (weighted automata and aut...
Whether the reachability problem for branching vector addition systems, or equivalently the provabil...
We study the language universality problem for One-Counter Nets, also known as 1-dimensional Vector ...
We consider the problems of language inclusion and language equivalence for Vector Addition Systems ...
We study the class of languages recognized by multi-counter finite state automata. These are finite ...
A vector addition system (VAS) with an initial and a final marking and transition labels induces a l...
The reachability problem is a central decision problem in verification of vector addition systems wi...
Seminal results establish that the coverability problem for Vector Addition Systems with States (VAS...
The universality problem asks whether a given finite state automaton accepts all the input words. Fo...
AbstractWe present a general result, similar to Rice’s theorem, concerning the complexity of detecti...
AbstractThe paper focuses on deterministic and unambiguous finite automata (DFAʼs and UNFAʼs respect...
We prove that the reachability problem for two-dimensional vector addition systems with states is NL...
AbstractWe compare the nondeterministic state complexity of unary regular languages and that of thei...
Whether the reachability problem for branching vector addition systems, or equivalently the provabil...
Blondin et al. showed at LICS 2015 that two-dimensional vector addition systems with states have rea...
In this paper we combine two classical generalisations of finite automata (weighted automata and aut...
Whether the reachability problem for branching vector addition systems, or equivalently the provabil...
We study the language universality problem for One-Counter Nets, also known as 1-dimensional Vector ...
We consider the problems of language inclusion and language equivalence for Vector Addition Systems ...
We study the class of languages recognized by multi-counter finite state automata. These are finite ...
A vector addition system (VAS) with an initial and a final marking and transition labels induces a l...
The reachability problem is a central decision problem in verification of vector addition systems wi...
Seminal results establish that the coverability problem for Vector Addition Systems with States (VAS...
The universality problem asks whether a given finite state automaton accepts all the input words. Fo...
AbstractWe present a general result, similar to Rice’s theorem, concerning the complexity of detecti...
AbstractThe paper focuses on deterministic and unambiguous finite automata (DFAʼs and UNFAʼs respect...
We prove that the reachability problem for two-dimensional vector addition systems with states is NL...
AbstractWe compare the nondeterministic state complexity of unary regular languages and that of thei...
Whether the reachability problem for branching vector addition systems, or equivalently the provabil...
Blondin et al. showed at LICS 2015 that two-dimensional vector addition systems with states have rea...
In this paper we combine two classical generalisations of finite automata (weighted automata and aut...
Whether the reachability problem for branching vector addition systems, or equivalently the provabil...