Universal Lyndon Words
Abstract
A word over an alphabet is a Lyndon word if there exists an order defined on for which is lexicographically smaller than all of its conjugates (other than itself). We introduce and study \emph{universal Lyndon words}, which are words over an -letter alphabet that have length and such that all the conjugates are Lyndon words. We show that universal Lyndon words exist for every and exhibit combinatorial and structural properties of these words. We then define particular prefix codes, which we call Hamiltonian lex-codes, and show that every Hamiltonian lex-code is in bijection with the set of the shortest unrepeated prefixes of the conjugates of a universal Lyndon word. This allows us to give an algorithm for constructing all the universal Lyndon words.
Cite
@article{arxiv.1406.5895,
title = {Universal Lyndon Words},
author = {Arturo Carpi and Gabriele Fici and Stepan Holub and Jakub Oprsal and Marinella Sciortino},
journal= {arXiv preprint arXiv:1406.5895},
year = {2014}
}
Comments
To appear in the proceedings of MFCS 2014