English

Structure and algorithms for (cap, even hole)-free graphs

Discrete Mathematics 2016-11-28 v1

Abstract

A graph is even-hole-free if it has no induced even cycles of length 4 or more. A cap is a cycle of length at least 5 with exactly one chord and that chord creates a triangle with the cycle. In this paper, we consider (cap, even hole)-free graphs, and more generally, (cap, 4-hole)-free odd-signable graphs. We give an explicit construction of these graphs. We prove that every such graph GG has a vertex of degree at most 32ω(G)1\frac{3}{2}\omega (G) -1, and hence χ(G)32ω(G)\chi(G)\leq \frac{3}{2}\omega (G), where ω(G)\omega(G) denotes the size of a largest clique in GG and χ(G)\chi(G) denotes the chromatic number of GG. We give an O(nm)O(nm) algorithm for qq-coloring these graphs for fixed qq and an O(nm)O(nm) algorithm for maximum weight stable set. We also give a polynomial-time algorithm for minimum coloring. Our algorithms are based on our results that triangle-free odd-signable graphs have treewidth at most 5 and thus have clique-width at most 48, and that (cap, 4-hole)-free odd-signable graphs GG without clique cutsets have treewidth at most 6ω(G)16\omega(G)-1 and clique-width at most 48.

Keywords

Cite

@article{arxiv.1611.08066,
  title  = {Structure and algorithms for (cap, even hole)-free graphs},
  author = {Kathie Cameron and Murilo V. G. da Silva and Shenwei Huang and Kristina Vušković},
  journal= {arXiv preprint arXiv:1611.08066},
  year   = {2016}
}

Comments

19pages

R2 v1 2026-06-22T17:03:06.341Z