A polynomial bound on the pathwidth of graphs edge-coverable by k shortest paths

Abstract

Dumas, Foucaud, Perez and Todinca (2024) recently proved that every graph whose edges can be covered by k shortest paths has pathwidth at most O(3k). In this paper, we improve this upper bound on the pathwidth to a polynomial one; namely, we show that every graph whose edge set can be covered by k shortest paths has pathwidth O(k4), answering a question from the same paper. Moreover, we prove that when k≤ 3, every such graph has pathwidth at most k (and this bound is tight). Finally, we show that even though there exist graphs with arbitrarily large treewidth whose vertex set can be covered by 2 isometric trees, every graph whose set of edges can be covered by 2 isometric trees has treewidth at most 2.

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