English

$\delta_k$-small sets in graphs

Combinatorics 2012-11-16 v1

Abstract

Let GG be a simple nn-vertex graph and W\V(G)W\subseteq\V(G). We say that WW is a δk\delta_k-small set if vWdk(v)\absWkn\absW. \sqrt[k]{\frac{\sum_{v\in W}d^k(v)}{\abs W}}\leq n-\abs W. Let φ(k)(G)\varphi^{(k)}(G) denote the smallest natural number rr such that \V(G)\V(G) decomposes into rr δk\delta_k-small sets, and let α(k)(G)\alpha^{(k)}(G) denote the maximal number of vertices in a δk\delta_k-small set of GG. In this paper we obtain bounds for α(k)(G)\alpha^{(k)}(G) and φ(k)(G)\varphi^{(k)}(G). Since φ(k)(G)ω(G)χ(G)\varphi^{(k)}(G)\leq\omega(G)\leq\chi(G) and α(G)α(k)(G)\alpha(G)\leq\alpha^{(k)}(G), we obtain also bounds for the clique number ω(G)\omega(G), the chromatic number χ(G)\chi(G) and the independence number α(G)\alpha(G).

Keywords

Cite

@article{arxiv.1211.3689,
  title  = {$\delta_k$-small sets in graphs},
  author = {Asen Bojilov and Nedyalko Nenov},
  journal= {arXiv preprint arXiv:1211.3689},
  year   = {2012}
}
R2 v1 2026-06-21T22:39:09.090Z