English

Sparse graphs with bounded induced cycle packing number have logarithmic treewidth

Combinatorics 2024-09-13 v5 Data Structures and Algorithms

Abstract

A graph is Ok\mathcal{O}_k-free if it does not contain kk pairwise vertex-disjoint and non-adjacent cycles. We prove that "sparse" (here, not containing large complete bipartite graphs as subgraphs) Ok\mathcal{O}_k-free graphs have treewidth (even, feedback vertex set number) at most logarithmic in the number of vertices. This is optimal, as there is an infinite family of O2\mathcal{O}_2-free graphs without K2,3K_{2,3} as a subgraph and whose treewidth is (at least) logarithmic. Using our result, we show that Maximum Independent Set and 3-Coloring in Ok\mathcal{O}_k-free graphs can be solved in quasi-polynomial time. Other consequences include that most of the central NP-complete problems (such as Maximum Independent Set, Minimum Vertex Cover, Minimum Dominating Set, Minimum Coloring) can be solved in polynomial time in sparse Ok\mathcal{O}_k-free graphs, and that deciding the Ok\mathcal{O}_k-freeness of sparse graphs is polynomial time solvable.

Keywords

Cite

@article{arxiv.2206.00594,
  title  = {Sparse graphs with bounded induced cycle packing number have logarithmic treewidth},
  author = {Marthe Bonamy and Édouard Bonnet and Hugues Déprés and Louis Esperet and Colin Geniet and Claire Hilaire and Stéphan Thomassé and Alexandra Wesolek},
  journal= {arXiv preprint arXiv:2206.00594},
  year   = {2024}
}

Comments

30 pages, 6 figures. v5: revised version

R2 v1 2026-06-24T11:36:10.515Z