Computer Science and the Fine Structure of Borel Sets
Détails
ID Serval
serval:BIB_C9325240D05B
Type
Article: article d'un périodique ou d'un magazine.
Collection
Publications
Institution
Titre
Computer Science and the Fine Structure of Borel Sets
Périodique
Theoretical Computer Science
ISSN
0304-3975
Statut éditorial
Publié
Date de publication
04/2001
Peer-reviewed
Oui
Volume
257
Numéro
1-2
Pages
85-105
Langue
anglais
Résumé
I) Wadge defined a natural refinement of the Borel hierarchy, now called the Wadge hierarchy WH. The fundamental properties of WH follow from results of Kuratowski, Martin, Wadge and Louveau. We give a transparent restatement and proof of Wadge's main theorem. Our method is new for it yields a wide and unexpected extension: from Borel sets of reals to a class of natural but non Borel sets of infinite sequences. Wadge's theorem is quite uneffective and our generalization clearly worse in this respect. Yet paradoxically our method is appropriate to effectivize this whole theory in the context discussed below. II) Wagner defined on Büchi automata (accepting words of length ω) a hierarchy and proved for it an effective analog of Wadge's results. We extend Wagner's results to more general kinds of Automata: Counters, Push Down Automata and Büchi Automata reading transfinite words. The notions and methods developed in (I) are quite useful for this extension. And we start to use them in order to look for extensions of the fundamental effective determinacy results of Büchi-Landweber, Rabin; and of Courcelle-Walukiewicz.
Web of science
Open Access
Oui
Création de la notice
23/01/2008 19:07
Dernière modification de la notice
20/08/2019 15:44