English

Complexity and Algorithm for the Matching vertex-cutset Problem

Data Structures and Algorithms 2025-01-24 v1 Combinatorics

Abstract

In 1985, Chv\'{a}tal introduced the concept of star cutsets as a means to investigate the properties of perfect graphs, which inspired many researchers to study cutsets with some specific structures, for example, star cutsets, clique cutsets, stable cutsets. In recent years, approximation algorithms have developed rapidly, the computational complexity associated with determining the minimum vertex cut possessing a particular structural property have attracted considerable academic attention. In this paper, we demonstrate that determining whether there is a matching vertex-cutset in HH with size at most kk, is NP\mathbf{NP}-complete, where kk is a given positive integer and HH is a connected graph. Furthermore, we demonstrate that for a connected graph HH, there exists a 22-approximation algorithm in O(nm2)O(nm^2) for us to find a minimum matching vertex-cutset. Finally, we show that every plane graph HH satisfying H∉{K2,K4}H\not\in\{K_2, K_4\} contains a matching vertex-cutset with size at most three, and this bound is tight.

Keywords

Cite

@article{arxiv.2501.13217,
  title  = {Complexity and Algorithm for the Matching vertex-cutset Problem},
  author = {Hengzhe Li and Qiong Wang and Jianbing Liu and Yanhong Gao},
  journal= {arXiv preprint arXiv:2501.13217},
  year   = {2025}
}
R2 v1 2026-06-28T21:14:09.120Z