Extremal results on feedback arc sets in digraphs
Abstract
A directed graph is oriented if it can be obtained by orienting the edges of a simple, undirected graph. For an oriented graph , let denote the size of a minimum feedback arc set, a smallest subset of edges whose deletion leaves an acyclic subgraph. A simple consequence of a result of Berger and Shor is that any oriented graph with edges satisfies . We observe that if an oriented graph has a fixed forbidden subgraph , the upper bound of is best possible as a function of the number of edges if is not bipartite, but the exponent in the lower order term can be improved if is bipartite. We also show that for every rational number between and , there is a finite collection of digraphs such that every -free digraph with edges satisfies , and this bound is best possible up to the implied constant factor. The proof uses a connection to Tur\'an numbers and a result of Bukh and Conlon. Both of our upper bounds come equipped with randomized linear-time algorithms that construct feedback arc sets achieving those bounds. Finally, we give a characterization of quasirandom directed graphs via minimum feedback arc sets.
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Cite
@article{arxiv.2204.01938,
title = {Extremal results on feedback arc sets in digraphs},
author = {Jacob Fox and Zoe Himwich and Nitya Mani},
journal= {arXiv preprint arXiv:2204.01938},
year = {2022}
}
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23 pages