Counterexamples to statements on isometric graph coverings

Abstract

A connected subgraph of a graph is isometric if it preserves distances. In this short note, we provide counterexamples to several variants of the following general question: When a graph G is edge covered by connected isometric subgraphs H1,…,Hk, which properties of G can we infer from properties of H1,…,Hk? For example, Dumas, Foucaud, Perez and Todinca (SIDMA, 2024) proved that when H1,…,Hk are paths, then the pathwidth of G is bounded in terms of k. Among others, we show that there are graphs of arbitrarily large treewidth that can be isometrically edge covered by four trees.

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