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~$T$, the class of graphs that do not contain $T$ 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~$T$, the class of graphs that do not contain $T$ as a pivot-minor has bounded linear rank-width. We first prove that this statement is false whenever $T$ is a tree that is not a caterpillar. We conjecture that the statement is true if $T$ is a caterpillar. We are also able to give partial confirmation of this conjecture by proving: (1) for every tree $T$, the class of $T$-pivot-minor-free distance-hereditary graphs has bounded linear rank-width if and only if $T$ is a caterpillar; (2) for every caterpillar $T$ on at most four vertices, the class of $T$-pivot-minor-free graphs has bounded linear rank-width. To prove our second result, we only need to consider $T=P_4$ and $T=K_{1,3}$, but we follow a general strategy: first we show that the class of $T$-pivot-minor-free graphs is contained in some class of $(H_1,H_2)$-free graphs, which we then show to have bounded linear rank-width. In particular, we prove that the class of $(K_3,S_{1,2,2})$-free graphs has bounded linear rank-width, which strengthens a known result that this graph class has bounded rank-width.
翻译:树形宽度及其线性变异路径- 路径宽度对图形轻微关系起着核心作用。 特别是, 罗伯逊 和 西摩尔 (1983) 证明, 对于每棵树 ~ $ 美元, 对于每棵树来说, 并不包含$T的图表类别都存在路径宽度。 对于边线- 小关系, 级宽度和线性级宽度从树形宽度和路径宽度中接管角色。 因此, 自然要检查是否每棵树 ~ 美元, 并不包含$T$的图表类别, 作为直线- 美元 美元 。 我们首先证明, 当$T 是一棵不是毛毛线性树时, 这一声明是虚假的。 我们推测, 如果每棵树 美元, 直线性平面平面图显示的是美元, 则在普通的平面平面平面图上显示 。