English

Sublinear hitting sets for some geometric graphs

Combinatorics 2024-12-06 v2

Abstract

For an nn-vertex graph GG, let h(G)h(G) denote the smallest size of a subset of V(G)V(G) such that it intersects every maximum independent set of GG. A conjecture posed by Bollob\'{a}s, Erd\H{o}s and Tuza in early 90s remains widely open, asserting that for any nn-vertex graph GG, if the independence number α(G)=Ω(n)\alpha(G) =\Omega(n) , then h(G)=o(n)h(G) = o(n). In this paper, we establish the validity of this conjecture for various classes of graphs, Our main contributions include: \begin{enumerate} \item We provide a novel unified framework to find sub-linear hitting sets for graphs with certain locally sparse properties. Based on this framework, we can find hitting sets of size at most O(nlogn)O(\frac{n}{\log{n}}) in any nn-vertex even-hole-free graph (in particular, chordal graph) and in any nn-vertex disk graph, with linear independence numbers. \item Utilizing geometric observations and combinatorial arguments, we show that any nn-vertex circle graph GG with linear independence number satisfies h(G)O(n)h(G)\le O(\sqrt{n}). Moreover, we extend this methodology to more general classes of graphs. \item We show the conjecture holds for those hereditary graphs having sublinear balanced separators. \end{enumerate} We also show that h(G)h(G) can be upper bounded by constants for several sporadic families of graphs with large independence numbers.

Keywords

Cite

@article{arxiv.2404.10379,
  title  = {Sublinear hitting sets for some geometric graphs},
  author = {Xinbu Cheng and Xinqi Huang and Mingyuan Rong and Zixiang Xu},
  journal= {arXiv preprint arXiv:2404.10379},
  year   = {2024}
}

Comments

The results on (in)comparability graphs have been removed, as we were informed that perfect graphs satisfy the conjecture. Meanwhile, the results on circle graphs have been strengthened and extended

R2 v1 2026-06-28T15:55:33.212Z