English

Minimum Selective Subset on Unit Disk Graphs and Circle Graphs

Computational Geometry 2026-02-20 v4 Computational Complexity

Abstract

In a connected simple graph G = (V(G),E(G)), each vertex is assigned one of c colors, where V(G) can be written as a union of a total of c subsets V_{1},...,V_{c} and V_{i} denotes the set of vertices of color i. A subset S of V(G) is called a selective subset if, for every i, every vertex v in V_{i} has at least one nearest neighbor in S(V(G)Vi)S \cup (V(G) \setminus V_{i}) that also lies in V_{i}. The Minimum Selective Subset (MSS) problem asks for a selective subset of minimum size. We show that the MSS problem is log-APX-hard on general graphs, even when c=2. As a consequence, the problem does not admit a polynomial-time approximation scheme (PTAS) unless P = NP. On the positive side, we present a PTAS for unit disk graphs, which works without requiring a geometric representation and applies for arbitrary c. We further prove that MSS remains NP-complete in unit disk graphs for arbitrary c. In addition, we show that the MSS problem is log-APX-hard on circle graphs, even when c=2.

Keywords

Cite

@article{arxiv.2510.01931,
  title  = {Minimum Selective Subset on Unit Disk Graphs and Circle Graphs},
  author = {Bubai Manna},
  journal= {arXiv preprint arXiv:2510.01931},
  year   = {2026}
}

Comments

This work has been accepted in the conference CALDAM 2026

R2 v1 2026-07-01T06:13:03.154Z