Edge open packing: complexity, algorithmic aspects, and bounds
Abstract
Given a graph , two edges are said to have a common edge if joins an endvertex of to an endvertex of . A subset is an edge open packing set in if no two edges of have a common edge in , and the maximum cardinality of such a set in is called the edge open packing number, , of . In this paper, we prove that the decision version of the edge open packing number is NP-complete even when restricted to graphs with universal vertices, Eulerian bipartite graphs, and planar graphs with maximum degree , respectively. In contrast, we present a linear-time algorithm that computes the edge open packing number of a tree. We also resolve two problems posed in the seminal paper [Edge open packing sets in graphs, RAIRO-Oper.\ Res.\ 56 (2022) 3765--3776]. Notably, we characterize the graphs that attain the upper bound , and provide lower and upper bounds for the edge-deleted subgraph of a graph and establish the corresponding realization result.
Keywords
Cite
@article{arxiv.2403.00750,
title = {Edge open packing: complexity, algorithmic aspects, and bounds},
author = {Boštjan Brešar and Babak Samadi},
journal= {arXiv preprint arXiv:2403.00750},
year = {2024}
}
Comments
12 pages, 1 figure