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ICALP
2007
Springer

A Combinatorial Theorem for Trees

14 years 5 months ago
A Combinatorial Theorem for Trees
Following the idea developed by I. Simon in his theorem of Ramseyan factorisation forests, we develop a result of ‘deterministic factorisations’. This extra determinism property makes it usable on trees (finite or infinite). We apply our result for proving that, over trees, every monadic interpretation is equivalent to the composition of a first-order interpretation (with access to the ancestor relation) and a monadic marking. Using this remark, we give new characterisations for prefix-recognisable structures and for the Caucal hierarchy. Furthermore, we believe that this approach has other potential applications.
Thomas Colcombet
Added 08 Jun 2010
Updated 08 Jun 2010
Type Conference
Year 2007
Where ICALP
Authors Thomas Colcombet
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