Infinite Self-Shuffling Words
Abstract
In this paper we introduce and study a new property of infinite words: An infinite word , with values in a finite set , is said to be -self-shuffling if admits factorizations: . In other words, there exists a shuffle of -copies of which produces . We are particularly interested in the case , in which case we say is self-shuffling. This property of infinite words is shown to be an intrinsic property of the word and not of its language (set of factors). For instance, every aperiodic word contains a non self-shuffling word in its shift orbit closure. While the property of being self-shuffling is a relatively strong condition, many important words arising in the area of symbolic dynamics are verified to be self-shuffling. They include for instance the Thue-Morse word and all Sturmian words of intercept (while those of intercept are not self-shuffling). Our characterization of self-shuffling Sturmian words can be interpreted arithmetically in terms of a dynamical embedding and defines an arithmetic process we call the {\it stepping stone model}. One important feature of self-shuffling words stems from its morphic invariance, which provides a useful tool for showing that one word is not the morphic image of another. The notion of self-shuffling has other unexpected applications particularly in the area of substitutive dynamical systems. For example, as a consequence of our characterization of self-shuffling Sturmian words, we recover a number theoretic result, originally due to Yasutomi, on a classification of pure morphic Sturmian words in the orbit of the characteristic.
Cite
@article{arxiv.1302.3844,
title = {Infinite Self-Shuffling Words},
author = {Émilie Charlier and Teturo Kamae and Svetlana Puzynina and Luca Q. Zamboni},
journal= {arXiv preprint arXiv:1302.3844},
year = {2014}
}