Solving one variable word equations in the free group in cubic time
Abstract
A word equation with one variable in a free group is given as , where both and are words over the alphabet of generators of the free group and , for a fixed variable . An element of the free group is a solution when substituting it for yields a true equality (interpreted in the free group) of left- and right-hand sides. It is known that the set of all solutions of a given word equation with one variable is a finite union of sets of the form , where are reduced words over the alphabet of generators, and a polynomial-time algorithm (of a high degree) computing this set is known. We provide a cubic time algorithm for this problem, which also shows that the set of solutions consists of at most a quadratic number of the above-mentioned sets. The algorithm uses only simple tools of word combinatorics and group theory and is simple to state. Its analysis is involved and focuses on the combinatorics of occurrences of powers of a word within a larger word.
Cite
@article{arxiv.2101.06201,
title = {Solving one variable word equations in the free group in cubic time},
author = {Robert Ferens and Artur Jeż},
journal= {arXiv preprint arXiv:2101.06201},
year = {2021}
}
Comments
52 pages, accepted to STACS 2021