English

Three remarks on $\mathbf{W_2}$ graphs

Combinatorics 2023-11-16 v2 Discrete Mathematics

Abstract

Let k1k \geq 1. A graph GG is Wk\mathbf{W_k} if for any kk pairwise disjoint independent vertex subsets A1,,AkA_1, \dots, A_k in GG, there exist kk pairwise disjoint maximum independent sets S1,,SkS_1, \dots, S_k in GG such that AiSiA_i \subseteq S_i for i[k]i \in [k]. Recognizing W1\mathbf{W_1} graphs is co-NP-hard, as shown by Chv\'atal and Slater (1993) and, independently, by Sankaranarayana and Stewart (1992). Extending this result and answering a recent question of Levit and Tankus, we show that recognizing Wk\mathbf{W_k} graphs is co-NP-hard for k2k \geq 2. On the positive side, we show that recognizing Wk\mathbf{W_k} graphs is, for each k2k\geq 2, FPT parameterized by clique-width and by tree-width. Finally, we construct graphs GG that are not W2\mathbf{W_2} such that, for every vertex vv in GG and every maximal independent set SS in GN[v]G - N[v], the largest independent set in N(v)SN(v) \setminus S consists of a single vertex, thereby refuting a conjecture of Levit and Tankus.

Keywords

Cite

@article{arxiv.2307.15573,
  title  = {Three remarks on $\mathbf{W_2}$ graphs},
  author = {Carl Feghali and Malory Marin},
  journal= {arXiv preprint arXiv:2307.15573},
  year   = {2023}
}

Comments

7 pages

R2 v1 2026-06-28T11:42:54.221Z