English

On the complete width and edge clique cover problems

Discrete Mathematics 2016-12-28 v1 Combinatorics

Abstract

A complete graph is the graph in which every two vertices are adjacent. For a graph G=(V,E)G=(V,E), the complete width of GG is the minimum kk such that there exist kk independent sets NiV\mathtt{N}_i\subseteq V, 1ik1\le i\le k, such that the graph GG' obtained from GG by adding some new edges between certain vertices inside the sets Ni\mathtt{N}_i, 1ik1\le i\le k, is a complete graph. The complete width problem is to decide whether the complete width of a given graph is at most kk or not. In this paper we study the complete width problem. We show that the complete width problem is NP-complete on 3K23K_2-free bipartite graphs and polynomially solvable on 2K22K_2-free bipartite graphs and on (2K2,C4)(2K_2,C_4)-free graphs. As a by-product, we obtain the following new results: the edge clique cover problem is NP-complete on 3K2\overline{3K_2}-free co-bipartite graphs and polynomially solvable on C4C_4-free co-bipartite graphs and on (2K2,C4)(2K_2, C_4)-free graphs. We also give a characterization for kk-probe complete graphs which implies that the complete width problem admits a kernel of at most 2k2^k vertices. This provides another proof for the known fact that the edge clique cover problem admits a kernel of at most 2k2^k vertices. Finally we determine all graphs of small complete width k3k\le 3.

Keywords

Cite

@article{arxiv.1612.08057,
  title  = {On the complete width and edge clique cover problems},
  author = {Van Bang Le and Sheng-Lung Peng},
  journal= {arXiv preprint arXiv:1612.08057},
  year   = {2016}
}

Comments

Extended version of COCOON 2015 paper. Accepted by Journal of Combinatorial Optimization

R2 v1 2026-06-22T17:33:34.263Z