Tree pivot-minors and linear rank-width
Abstract
Tree-width and its linear variant path-width play a central role for the graph minor relation. In particular, Robertson and Seymour (1983) proved that for every tree~, the class of graphs that do not contain as a minor has bounded path-width. For the pivot-minor relation, rank-width and linear rank-width take over the role from tree-width and path-width. As such, it is natural to examine if for every tree~, the class of graphs that do not contain as a pivot-minor has bounded linear rank-width. We first prove that this statement is false whenever is a tree that is not a caterpillar. We conjecture that the statement is true if is a caterpillar. We are also able to give partial confirmation of this conjecture by proving: (1) for every tree , the class of -pivot-minor-free distance-hereditary graphs has bounded linear rank-width if and only if is a caterpillar; (2) for every caterpillar on at most four vertices, the class of -pivot-minor-free graphs has bounded linear rank-width. To prove our second result, we only need to consider and , but we follow a general strategy: first we show that the class of -pivot-minor-free graphs is contained in some class of -free graphs, which we then show to have bounded linear rank-width. In particular, we prove that the class of -free graphs has bounded linear rank-width, which strengthens a known result that this graph class has bounded rank-width.
Keywords
Cite
@article{arxiv.2008.00561,
title = {Tree pivot-minors and linear rank-width},
author = {Konrad K. Dabrowski and François Dross and Jisu Jeong and Mamadou Moustapha Kanté and O-joung Kwon and Sang-il Oum and Daniël Paulusma},
journal= {arXiv preprint arXiv:2008.00561},
year = {2022}
}
Comments
26 pages, 5 figures; accepted to SIAM Journal on Discrete Mathematics