DAG Covers: The Steiner Point Effect

Abstract

Given a weighted digraph G, a (t,g,μ)-DAG cover is a collection of g dominating DAGs D1,…,Dg such that all distances are approximately preserved: for every pair (u,v) of vertices, idDi(u,v) t· dG(u,v), and the total number of non-G edges is bounded by |(i Di) G| μ. Assadi, Hoppenworth, and Wein [STOC 25] and Filtser [SODA 26] studied DAG covers for general digraphs. This paper initiates the study of Steiner DAG cover, where the DAGs are allowed to contain Steiner points. We obtain Steiner DAG covers on the important classes of planar digraphs and low-treewidth digraphs. Specifically, we show that any digraph with treewidth tw admits a (1,2,O(n· tw))-Steiner DAG cover. For planar digraphs we provide a (1+,2,O(n))-Steiner DAG cover. We also demonstrate a stark difference between Steiner and non-Steiner DAG covers. As a lower bound, we show that any non-Steiner DAG cover for graphs with treewidth 1 with stretch t<2 and sub-quadratic number of extra edges requires ( n) DAGs.