Embedding Graphs of Simple Treewidth into Sparse Products

Abstract

We study embeddings of graphs with bounded treewidth or bounded simple treewidth into the undirected graph underlying the directed product of two directed graphs. If the factors have bounded maximum indegrees, then the product graph has bounded maximum indegree and therefore is sparse. We prove that every graph of simple treewidth k is contained in (ignoring edge directions) the directed product of directed graphs H1 and H2, with -( H1), -( H2) ≤ k-1 and tw(H1), tw(H2) ≤ k-1. Further, we show that this treewidth bound is best possible. Several corollaries follow from our results: every outerplanar graph is contained in the directed product of trees with maximum indegree 1, and every planar graph with treewidth 3 is contained in a directed product of graphs with treewidth 2 and maximum indegree 2. However, for graphs of treewidth k, we prove a negative result: for any integers s, t, k ≥ 1, there is a graph G with treewidth k not contained in the directed product of H1 and H2 for any directed graphs H1 and H2 with -( H1) ≤ s, -( H2) ≤ t, and tw(H1), tw(H2) ≤ k-1. This result stands in stark contrast to the strong product case, where Liu, Norin and Wood [arXiv:2410.20333] proved that the optimal lower bound on the factors is about half the treewidth.