English

An Upper Bound on the Complexity of Recognizable Tree Languages

Formal Languages and Automata Theory 2015-03-12 v2 General Topology Logic

Abstract

The third author noticed in his 1992 PhD Thesis [Sim92] that every regular tree language of infinite trees is in a class (D_n(Σ0_2))\Game (D\_n({\bf\Sigma}^0\_2)) for some natural number n1n\geq 1, where \Game is the game quantifier. We first give a detailed exposition of this result. Next, using an embedding of the Wadge hierarchy of non self-dual Borel subsets of the Cantor space 2ω2^\omega into the class Δ1_2{\bf\Delta}^1\_2, and the notions of Wadge degree and Veblen function, we argue that this upper bound on the topological complexity of regular tree languages is much better than the usual Δ1_2{\bf\Delta}^1\_2.

Cite

@article{arxiv.1503.02840,
  title  = {An Upper Bound on the Complexity of Recognizable Tree Languages},
  author = {Olivier Finkel and Dominique Lecomte and Pierre Simonnet},
  journal= {arXiv preprint arXiv:1503.02840},
  year   = {2015}
}
R2 v1 2026-06-22T08:48:33.706Z