English

Certifying Inexpressibility

Formal Languages and Automata Theory 2022-01-26 v2

Abstract

Different classes of automata on infinite words have different expressive power. Deciding whether a given language LΣωL \subseteq \Sigma^\omega can be expressed by an automaton of a desired class can be reduced to deciding a game between Prover and Refuter: in each turn of the game, Refuter provides a letter in Σ\Sigma, and Prover responds with an annotation of the current state of the run (for example, in the case of B\"uchi automata, whether the state is accepting or rejecting, and in the case of parity automata, what the color of the state is). Prover wins if the sequence of annotations she generates is correct: it is an accepting run iff the word generated by Refuter is in LL. We show how a winning strategy for Refuter can serve as a simple and easy-to-understand certificate to inexpressibility, and how it induces additional forms of certificates. Our framework handles all classes of deterministic automata, including ones with structural restrictions like weak automata. In addition, it can be used for refuting separation of two languages by an automaton of the desired class, and for finding automata that approximate LL and belong to the desired class.

Keywords

Cite

@article{arxiv.2101.08756,
  title  = {Certifying Inexpressibility},
  author = {Orna Kupferman and Salomon Sickert},
  journal= {arXiv preprint arXiv:2101.08756},
  year   = {2022}
}

Comments

This is the full version of an article with the same title that appears in the FoSSaCS 2021 conference proceedings

R2 v1 2026-06-23T22:23:58.591Z