English

On bounds for some graph invariants

Combinatorics 2013-09-02 v3

Abstract

Let GG be a graph without isolated vertices and let α(G)\alpha(G) be its stability number and τ(G)\tau(G) its covering number. The {\it αv\alpha_{v}-cover} number of a graph, denoted by αv(G)\alpha_{v}(G), is the maximum natural number mm such that every vertex of GG belongs to a maximal independent set with at least mm vertices. In the first part of this paper we prove that α(G)τ(G)[1+α(G)αv(G)]\alpha(G)\leq \tau(G)[1+\alpha(G)-\alpha_{v}(G)]. We also discuss some conjectures analogous to this theorem. In the second part we give a lower bound for the number of edges of a graph GG as a function of the stability number α(G)\alpha(G), the covering number τ(G)\tau(G) and the number of connected components c(G)c(G) of GG. Namely, let α\alpha and τ\tau be two natural numbers and let Γ(α,τ)=mini=1α\binzi2z1+...+zα=α+τandzi0i=1,...,α. \Gamma(\alpha,\tau)= \min{\sum_{i=1}^{\alpha}\bin{z_i}{2} | z_1+...+z_{\alpha}= \alpha+\tau {and} z_i \geq 0 \forall i=1,..., \alpha}. Then if GG is any graph, we have: E(G)α(G)c(G)+Γ(α(G),τ(G)). |E(G)| \geq \alpha(G)-c(G)+ \Gamma(\alpha(G), \tau(G)).

Keywords

Cite

@article{arxiv.math/0510387,
  title  = {On bounds for some graph invariants},
  author = {Isidoro Gitler and Carlos E. Valencia},
  journal= {arXiv preprint arXiv:math/0510387},
  year   = {2013}
}

Comments

22 pages, 11 figures, Major changes