Pairs of square-free arithmetic progressions in infinite words

Abstract

We study a question of Harju from 2019 regarding the existence of infinite ternary square-free words whose subsequences modulo p and q are also square-free for relatively prime integers p and q. Among such pairs (p, q) with p, q ≥ 3, the only two pairs with this property known prior to this work were (3, 11) and (5, 6). We prove that there are finitely many pairs (p, q) of relatively prime integers with p, q ≥ 3 for which there is no infinite ternary square-free word whose subsequences modulo p and q are square-free. To prove our result, we combine different techniques, including the construction of words from multi-valued square-free morphisms and circular square-free morphisms. We also introduce the notion of square-free transducers, a generalization of square-free morphisms that may be of independent interest.