We investigate structures that can be represented by omega-automata, so called omega-automatic structures, and prove that relations defined over such structures in first-order logic expanded by the first-order quantifiers `there exist at most \\aleph_0 many', 'there exist finitely many' and 'there exist k modulo m many' are omega-regular. The proof identifies certain algebraic properties of omega-semigroups. As a consequence an omega-regular equivalence relation of countable index has an omega-regular set of representatives. This implies Blumensath's conjecture that a countable structure with an ømega-automatic presentation can be represented using automata on finite words. This also complements a very recent result of Hj�rth, Khoussainov, ...
This paper is a survey on the algebraic approach to the theory of automata accepting infinite words....
To appear in the Proceedings of the 16th EACSL Annual Conference on Computer Science and Logic, CSL ...
To appear in the journal RAIRO-Theoretical Informatics and ApplicationsInternational audienceWe prov...
International audienceWe investigate structures that can be represented by omega-automata, so called...
The logic L(Qu) extends first-order logic by a generalized form of counting quantifiers (“the number...
In 1997, following the works of Klaus W. Wagner on omega-regular sets, Olivier Carton and Dominique ...
to appear in Archive for Mathematical LogicInternational audienceLocally finite omega-languages were...
The work at hand studies the possibilities and limitations of the use of finite automata in the desc...
The paper presents some automata and logics on $omega$-words, which capture all $omega$-regular lang...
In this work, we provide a simple coalgebraic characterisation of regular omega-languages based on l...
International audienceWe extend the concept of factorization on finite words to omega-rational langu...
Automatic structures are countable structures finitely presentable by a collection of automata. We s...
We investigate automatic presentations of omega-words. Starting points of our study are the works of...
The Myhill-Nerode Theorem (that for any regular language, there is a canonical recognizing device) i...
The evaluation of a logical formula can be viewed as a game played by two opponents, one trying to s...
This paper is a survey on the algebraic approach to the theory of automata accepting infinite words....
To appear in the Proceedings of the 16th EACSL Annual Conference on Computer Science and Logic, CSL ...
To appear in the journal RAIRO-Theoretical Informatics and ApplicationsInternational audienceWe prov...
International audienceWe investigate structures that can be represented by omega-automata, so called...
The logic L(Qu) extends first-order logic by a generalized form of counting quantifiers (“the number...
In 1997, following the works of Klaus W. Wagner on omega-regular sets, Olivier Carton and Dominique ...
to appear in Archive for Mathematical LogicInternational audienceLocally finite omega-languages were...
The work at hand studies the possibilities and limitations of the use of finite automata in the desc...
The paper presents some automata and logics on $omega$-words, which capture all $omega$-regular lang...
In this work, we provide a simple coalgebraic characterisation of regular omega-languages based on l...
International audienceWe extend the concept of factorization on finite words to omega-rational langu...
Automatic structures are countable structures finitely presentable by a collection of automata. We s...
We investigate automatic presentations of omega-words. Starting points of our study are the works of...
The Myhill-Nerode Theorem (that for any regular language, there is a canonical recognizing device) i...
The evaluation of a logical formula can be viewed as a game played by two opponents, one trying to s...
This paper is a survey on the algebraic approach to the theory of automata accepting infinite words....
To appear in the Proceedings of the 16th EACSL Annual Conference on Computer Science and Logic, CSL ...
To appear in the journal RAIRO-Theoretical Informatics and ApplicationsInternational audienceWe prov...