par Dartois, Luc 
;Filiot, Emmanuel ;Reynier, Pierre-Alain ;Talbot, Jean-Marc
Référence Proceedings - Symposium on Logic in Computer Science, 05-08-July-2016, page (217-226)
Publication Publié, 2016-07
;Filiot, Emmanuel ;Reynier, Pierre-Alain ;Talbot, Jean-MarcRéférence Proceedings - Symposium on Logic in Computer Science, 05-08-July-2016, page (217-226)
Publication Publié, 2016-07
Article révisé par les pairs
| Résumé : | Automata-logic connections are pillars of the theory of regular languages. Such connections are harder to obtain for transducers, but important results have been obtained recently for word-to-word transformations, showing that the three following models are equivalent: deterministic two-way transducers, monadic second-order (MSO) transducers, and deterministic one-way automata equipped with a finite number of registers. Nested words are words with a nesting structure, allowing to model unranked trees as their depth-first-search linearisations. In this paper, we consider transformations from nested words to words, allowing in particular to produce unranked trees if output words have a nesting structure. The model of visibly pushdown transducers allows to describe such transformations, and we propose a simple deterministic extension of this model with two-way moves that has the following properties: i) it is a simple computational model, that naturally has a good evaluation complexity; ii) it is expressive: it subsumes nested word-to-word MSO transducers, and the exact expressiveness of MSO transducers is recovered using a simple syntactic restriction; iii) it has good algorithmic/closure properties: the model is closed under composition with a unambiguous one-way letter-to-letter transducer which gives closure under regular look-around, and has a decidable equivalence problem. |
