On the structure of solution-sets to regular word equations
For quadratic word equations, there exists an algorithm based on rewriting
rules which generates a directed graph describing all solutions to the equation. For
regular word equations – those for which each variable occurs at most once on each
side of the equation – we investigate the properties of this graph, such as bounds on its
diameter, size, and DAG-width, as well as providing some insights into symmetries
in its structure. As a consequence, we obtain a combinatorial proof that the problem
of deciding whether a regular word equation has a solution is in NP.
History
School
- Science
Department
- Mathematical Sciences
Published in
Theory of Computing SystemsVolume
68Issue
AugustPages
662 - 739Publisher
Springer (part of Springer Nature)Version
- VoR (Version of Record)
Rights holder
© The authorsPublisher statement
This is an Open Access Article. It is published by Springer under the Creative Commons Attribution 4.0 Unported Licence (CC BY). Full details of this licence are available at: http://creativecommons.org/licenses/by/4.0/Acceptance date
2021-08-04Publication date
2021-10-28Copyright date
2021Notes
This article belongs to the Topical Collection: Special Issue on International Colloquium on Automata, Languages and Programming (ICALP 2020)ISSN
1432-4350eISSN
1433-0490Publisher version
Language
- en
