Sparse Graphs of Twin-width 2 Have Bounded Tree-width
Abstract
Twin-width is a structural width parameter introduced by Bonnet, Kim, Thomass\'e and Watrigant [FOCS 2020]. Very briefly, its essence is a gradual reduction (a contraction sequence) of the given graph down to a single vertex while maintaining limited difference of neighbourhoods of the vertices, and it can be seen as widely generalizing several other traditional structural parameters. Having such a sequence at hand allows to solve many otherwise hard problems efficiently. Our paper focuses on a comparison of twin-width to the more traditional tree-width on sparse graphs. Namely, we prove that if a graph of twin-width at most contains no subgraph for some integer , then the tree-width of is bounded by a polynomial function of . As a consequence, for any sparse graph class we obtain a polynomial time algorithm which for any input graph either outputs a contraction sequence of width at most (where depends only on ), or correctly outputs that has twin-width more than . On the other hand, we present an easy example of a graph class of twin-width with unbounded tree-width, showing that our result cannot be extended to higher values of twin-width.
Keywords
Cite
@article{arxiv.2307.01732,
title = {Sparse Graphs of Twin-width 2 Have Bounded Tree-width},
author = {Benjamin Bergougnoux and Jakub Gajarský and Grzegorz Guśpiel and Petr Hliněný and Filip Pokrývka and Marek Sokołowski},
journal= {arXiv preprint arXiv:2307.01732},
year = {2023}
}