$t$-sails and sparse hereditary classes of unbounded tree-width
Abstract
It has long been known that the following basic objects are obstructions to bounded tree-width: for arbitrarily large , the complete graph , the complete bipartite graph , a subdivision of the -wall and the line graph of a subdivision of the -wall. We now add a further \emph{boundary object} to this list, a \emph{-sail}. These results have been obtained by studying sparse hereditary \emph{path-star} graph classes, each of which consists of the finite induced subgraphs of a single infinite graph whose edges can be partitioned into a path (or forest of paths) with a forest of stars, characterised by an infinite word over a possibly infinite alphabet. We show that a path-star class whose infinite graph has an unbounded number of stars, each of which connects an unbounded number of times to the path, has unbounded tree-width. In addition, we show that such a class is not a subclass of the hereditary class of circle graphs. We identify a collection of \emph{nested} words with a recursive structure that exhibit interesting characteristics when used to define a path-star graph class. These graph classes do not contain any of the four basic obstructions but instead contain graphs that have large tree-width if and only if they contain arbitrarily large -sails. We show that these classes are infinitely defined and, like classes of bounded degree or classes excluding a fixed minor, do not contain a minimal class of unbounded tree-width.
Keywords
Cite
@article{arxiv.2302.04783,
title = {$t$-sails and sparse hereditary classes of unbounded tree-width},
author = {Daniel Cocks},
journal= {arXiv preprint arXiv:2302.04783},
year = {2024}
}