Product Structure and Tree-Decompositions

TL;DR

This paper investigates the structure of graphs excluding certain minors using tree-decompositions and graph products, providing bounds on treewidth, treedepth, and orthogonal decompositions, with implications for graph theory and algorithms.

Contribution

It establishes new structural theorems linking minor-exclusion to graph products, bounded treewidth, and orthogonal tree-decompositions, advancing understanding of graph structure.

Findings

Graphs excluding a fixed odd minor are contained in the strong product of two graphs with bounded treewidth.

Every $K_t$-minor-free graph is contained in a 3-term product with bounded treewidth, close to tight bounds.

Graphs excluding a fixed odd-minor have $O(1)$-orthogonal tree- and path-decompositions, with bags of bounded pathwidth.

Abstract

This paper explores the structure of graphs defined by an excluded minor or an excluded odd minor through the lens of graph products and tree-decompositions. We prove that every graph excluding a fixed odd minor is contained in the strong product of two graphs each with bounded treewidth. For graphs excluding a fixed minor, we strengthen the result by showing that every such graph is contained in the strong product of two digraphs with bounded indegree and with bounded treewidth. This result has the advantage that the product now has bounded degeneracy. In the setting of 3-term products, we show that every $K_t$-minor-free graph is contained in $H_1\boxtimes H_2 \boxtimes K_{c(t)}$ where $\text{tw}(H_i)\leq t-2$. This treewidth bound is close to tight: in any such result with $\text{tw}(H_i)$ bounded, both $H_1$ and $H_2$ can be forced to contain any graph of treewidth $t-5$, implying $\text{tw}(H_1)\geq t-5$ and $\text{tw}(H_2)\geq t-5$. Analogous lower and upper bounds are shown for any excluded minor, where the minimum possible bound on $\text{tw}(H_i)$ is tied to the treedepth of the excluded minor. Subgraphs of the product of two graphs with bounded treewidth have two tree-decompositions where any bag from the first decomposition intersects any bag from the second decomposition in a bounded number, $k$, of vertices, so called $k$-orthogonal tree-decompositions. We show that graphs excluding a fixed odd-minor have a tree-decomposition and a path-decomposition that are $O(1)$-orthogonal. This implies that such graphs have a tree-decomposition in which each bag has bounded pathwidth. This result is best possible in that `pathwidth' cannot be replaced by `bandwidth' or `treedepth'. Moreover, we characterize the minor-closed classes that have a tree-decomposition in which each bag has bounded bandwidth, or each bag has bounded treedepth.