We extend previous results on the complexity of solving language equa-tions with one-sided concatenation and all Boolean operations to the case where also disequations (i.e., negated equations) may occur. To show that solvability of systems of equations and disequations is still in ExpTime, we introduce a new type of automata working on infinite trees, which we call looping automata with colors. As applications of these results, we show new complexity results for disunification in the description logic FL0 and for monadic set constraints with negation. We believe that looping automata with colors may also turn out to be useful in other applications
We define a class of ranked tree automata TABG generalizing both the treeautomata with local tests b...
The first part of the thesis concerns problems related to the question: "when can a regular tre...
AbstractThis paper studies the nonterminal complexity of tree controlled grammars. It is proved that...
We extend previous results on the complexity of solving language equations with one-sided concatenat...
International audienceThis article is inspired by two works from the early 90s. The first one is by ...
Abstract. The complexity of testing nonemptiness of finite state automata on infinite trees is inves...
In the paper, we introduce a new tree automata framework, called propositional tree automata, captur...
In this paper, we study combining equational tree automata in two different senses: (1) whether deci...
Abstract. A new tree automata framework, called equational tree au-tomata, is presented. In the newl...
We propose a realizability semantics for automata on infinite trees, based on categories of games bu...
AbstractThis paper presents new classes of tree automata combining automata with equality test and a...
Abstract µ-Calculus and automata on infinite trees are complementary ways of de-scribing infinite tr...
Abstract. In this paper, we study combining equational tree automata in two different senses: (1) wh...
AbstractWe give a proof that alternating tree automata can be simulated by nondeterministic tree aut...
This work shows that for each i ∈ ω there exists a Σ1i-hard ω-word language definable in Monadic Sec...
We define a class of ranked tree automata TABG generalizing both the treeautomata with local tests b...
The first part of the thesis concerns problems related to the question: "when can a regular tre...
AbstractThis paper studies the nonterminal complexity of tree controlled grammars. It is proved that...
We extend previous results on the complexity of solving language equations with one-sided concatenat...
International audienceThis article is inspired by two works from the early 90s. The first one is by ...
Abstract. The complexity of testing nonemptiness of finite state automata on infinite trees is inves...
In the paper, we introduce a new tree automata framework, called propositional tree automata, captur...
In this paper, we study combining equational tree automata in two different senses: (1) whether deci...
Abstract. A new tree automata framework, called equational tree au-tomata, is presented. In the newl...
We propose a realizability semantics for automata on infinite trees, based on categories of games bu...
AbstractThis paper presents new classes of tree automata combining automata with equality test and a...
Abstract µ-Calculus and automata on infinite trees are complementary ways of de-scribing infinite tr...
Abstract. In this paper, we study combining equational tree automata in two different senses: (1) wh...
AbstractWe give a proof that alternating tree automata can be simulated by nondeterministic tree aut...
This work shows that for each i ∈ ω there exists a Σ1i-hard ω-word language definable in Monadic Sec...
We define a class of ranked tree automata TABG generalizing both the treeautomata with local tests b...
The first part of the thesis concerns problems related to the question: "when can a regular tre...
AbstractThis paper studies the nonterminal complexity of tree controlled grammars. It is proved that...