Monochromatic arithmetic progressions in automatic sequences with group structure
Abstract
We determine asymptotic growth rates for lengths of monochromatic arithmetic progressions in certain automatic sequences. In particular, we look at (one-sided) fixed points of aperiodic, primitive, bijective substitutions and spin substitutions, which are generalisations of the Thue--Morse and Rudin--Shapiro substitutions, respectively. For such infinite words, we show that there exists a subsequence of differences along which the maximum length of a monochromatic arithmetic progression (with fixed difference ) grows at least polynomially in . Explicit upper and lower bounds for the growth exponent can be derived from a finite group associated to the substitution. As an application, we obtain bounds for a van der Waerden-type number for a class of colourings parametrised by the size of the alphabet and the length of the substitution.
Cite
@article{arxiv.2302.12908,
title = {Monochromatic arithmetic progressions in automatic sequences with group structure},
author = {Ibai Aedo and Uwe Grimm and Neil Mañibo and Yasushi Nagai and Petra Staynova},
journal= {arXiv preprint arXiv:2302.12908},
year = {2023}
}
Comments
29 pages, comments are welcome