DAG Covers: The Steiner Point Effect
Abstract
Given a weighted digraph , a -DAG cover is a collection of dominating DAGs such that all distances are approximately preserved: for every pair of vertices, , and the total number of non- edges is bounded by . Assadi, Hoppenworth, and Wein [STOC 25] and Filtser [SODA 26] studied DAG covers for general digraphs. This paper initiates the study of \emph{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 -Steiner DAG cover. For planar digraphs we provide a -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 with stretch and sub-quadratic number of extra edges requires DAGs.
Keywords
Cite
@article{arxiv.2604.04186,
title = {DAG Covers: The Steiner Point Effect},
author = {Sujoy Bhore and Hsien-Chih Chang and Jonathan Conroy and Arnold Filtser and Eunjin Oh and Nicole Wein and Da Wei Zheng},
journal= {arXiv preprint arXiv:2604.04186},
year = {2026}
}