Covering vertices by sequential stars
摘要
We study the problem of covering the maximum number of vertices in a graph by a collection of vertex-disjoint stars, each with a number of satellites in a given interval , where and can be infinity. This is referred to as sequential {\sc -Star Packing} problem. It is solvable in polynomial time when , but becomes strongly NP-hard when . In this paper, we propose either the first or an improved approximation algorithm for the following four sequential settings: 1) a -approximation algorithm when and , improving the previous best ratio of ; 2) a -approximation algorithm when and , improving the previous best ratio of ; 3) the first -approximation algorithm when ; and 4) the first -approximation algorithm when . Besides the main algorithmic techniques being local search coupled with amortized analysis, we observe augmenting configurations to bridge two distant neighborhoods for a local improvement operation. Additionally, the problem has been shown APX-hard when ; we prove its APX-hardness for the last remaining case where .
引用
@article{arxiv.2605.24711,
title = {Covering vertices by sequential stars},
author = {Mengyuan Hu and An Zhang and Yong Chen and Zhikai Chen and Wei Ding and Guohui Lin and Jiaxuan Ma and Yue Sun},
journal= {arXiv preprint arXiv:2605.24711},
year = {2026}
}
备注
24 pages; submitted for publication