Sublinear hitting sets for some geometric graphs
Abstract
For an -vertex graph , let denote the smallest size of a subset of such that it intersects every maximum independent set of . A conjecture posed by Bollob\'{a}s, Erd\H{o}s and Tuza in early 90s remains widely open, asserting that for any -vertex graph , if the independence number , then . 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 in any -vertex even-hole-free graph (in particular, chordal graph) and in any -vertex disk graph, with linear independence numbers. \item Utilizing geometric observations and combinatorial arguments, we show that any -vertex circle graph with linear independence number satisfies . 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 can be upper bounded by constants for several sporadic families of graphs with large independence numbers.
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