Regular sequences and synchronized sequences in abstract numeration systems
Abstract
The notion of -regular sequences was generalized to abstract numeration systems by Maes and Rigo in 2002. Their definition is based on a notion of -kernel that extends that of -kernel. However, this definition does not allow us to generalize all of the many characterizations of -regular sequences. In this paper, we present an alternative definition of -kernel, and hence an alternative definition of -regular sequences, which enables us to use recognizable formal series in order to generalize most (if not all) known characterizations of -regular sequences to abstract numeration systems. We then give two characterizations of -automatic sequences as particular -regular sequences. Next, we present a general method to obtain various families of -regular sequences by enumerating -recognizable properties of -automatic sequences. As an example of the many possible applications of this method, we show that, provided that addition is -recognizable, the factor complexity of an -automatic sequence defines an -regular sequence. In the last part of the paper, we study -synchronized sequences. Along the way, we prove that the formal series obtained as the composition of a synchronized relation and a recognizable series is recognizable. As a consequence, the composition of an -synchronized sequence and a -regular sequence is shown to be -regular. All our results are presented in an arbitrary dimension and for an arbitrary semiring .
Keywords
Cite
@article{arxiv.2012.04969,
title = {Regular sequences and synchronized sequences in abstract numeration systems},
author = {Émilie Charlier and Célia Cisternino and Manon Stipulanti},
journal= {arXiv preprint arXiv:2012.04969},
year = {2020}
}
Comments
38 pages, 13 figures