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Extremal results on feedback arc sets in digraphs

Combinatorics 2022-04-20 v2 Discrete Mathematics

Abstract

A directed graph is oriented if it can be obtained by orienting the edges of a simple, undirected graph. For an oriented graph GG, let β(G)\beta(G) 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 GG with mm edges satisfies β(G)=m/2Ω(m3/4)\beta(G) = m/2 - \Omega(m^{3/4}). We observe that if an oriented graph GG has a fixed forbidden subgraph BB, the upper bound of β(G)=m/2Ω(m3/4)\beta(G) = m/2 - \Omega(m^{3/4}) is best possible as a function of the number of edges if BB is not bipartite, but the exponent 3/43/4 in the lower order term can be improved if BB is bipartite. We also show that for every rational number rr between 3/43/4 and 11, there is a finite collection of digraphs B\mathcal{B} such that every B\mathcal{B}-free digraph GG with mm edges satisfies β(G)=m/2Ω(mr)\beta(G) = m/2 - \Omega(m^r), 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.

Keywords

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}
}

Comments

23 pages

R2 v1 2026-06-24T10:37:55.737Z