English

Highly Undecidable Problems about Recognizability by Tiling Systems

Computational Complexity 2009-08-04 v1 Logic in Computer Science Logic

Abstract

Altenbernd, Thomas and W\"ohrle have considered acceptance of languages of infinite two-dimensional words (infinite pictures) by finite tiling systems, with usual acceptance conditions, such as the B\"uchi and Muller ones [1]. It was proved in [9] that it is undecidable whether a B\"uchi-recognizable language of infinite pictures is E-recognizable (respectively, A-recognizable). We show here that these two decision problems are actually Π21\Pi_2^1-complete, hence located at the second level of the analytical hierarchy, and "highly undecidable". We give the exact degree of numerous other undecidable problems for B\"uchi-recognizable languages of infinite pictures. In particular, the non-emptiness and the infiniteness problems are Σ11\Sigma^1_1-complete, and the universality problem, the inclusion problem, the equivalence problem, the determinizability problem, the complementability problem, are all Π21\Pi^1_2-complete. It is also Π21\Pi^1_2-complete to determine whether a given B\"uchi recognizable language of infinite pictures can be accepted row by row using an automaton model over ordinal words of length ω2\omega^2.

Keywords

Cite

@article{arxiv.0811.3704,
  title  = {Highly Undecidable Problems about Recognizability by Tiling Systems},
  author = {Olivier Finkel},
  journal= {arXiv preprint arXiv:0811.3704},
  year   = {2009}
}

Comments

to appear in a Special Issue of the journal Fundamenta Informaticae on Machines, Computations and Universality

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