Automatic winning shifts
Abstract
To each one-dimensional subshift , we may associate a winning shift which arises from a combinatorial game played on the language of . Previously it has been studied what properties of does inherit. For example, and have the same factor complexity and if is a sofic subshift, then is also sofic. In this paper, we develop a notion of automaticity for , that is, we propose what it means that a vector representation of is accepted by a finite automaton. Let be an abstract numeration system such that addition with respect to is a rational relation. Let be a subshift generated by an -automatic word. We prove that as long as there is a bound on the number of nonzero symbols in configurations of (which follows from having sublinear factor complexity), then is accepted by a finite automaton, which can be effectively constructed from the description of . We provide an explicit automaton when is generated by certain automatic words such as the Thue-Morse word.
Cite
@article{arxiv.2106.07249,
title = {Automatic winning shifts},
author = {Jarkko Peltomäki and Ville Salo},
journal= {arXiv preprint arXiv:2106.07249},
year = {2022}
}
Comments
28 pages, 5 figures, 1 table