English

Sharp bounds for the generalized connectivity $\kappa_3(G)$

Combinatorics 2009-06-18 v1

Abstract

Let GG be a nontrivial connected graph of order nn and let kk be an integer with 2kn2\leq k\leq n. For a set SS of kk vertices of GG, let κ(S)\kappa (S) denote the maximum number \ell of edge-disjoint trees T1,T2,...,TT_1,T_2,...,T_\ell in GG such that V(Ti)V(Tj)=SV(T_i)\cap V(T_j)=S for every pair i,ji,j of distinct integers with 1i,j1\leq i,j\leq \ell. A collection {T1,T2,...,T}\{T_1,T_2,...,T_\ell\} of trees in GG with this property is called an internally disjoint set of trees connecting SS. Chartrand et al. generalized the concept of connectivity as follows: The kk-connectivityconnectivity, denoted by κk(G)\kappa_k(G), of GG is defined by κk(G)=\kappa_k(G)=min{κ(S)}\{\kappa(S)\}, where the minimum is taken over all kk-subsets SS of V(G)V(G). Thus κ2(G)=κ(G)\kappa_2(G)=\kappa(G), where κ(G)\kappa(G) is the connectivity of GG. In general, the investigation of κk(G)\kappa_k(G) is very difficult. We therefore focus on the investigation on κ3(G)\kappa_3(G) in this paper. We study the relation between the connectivity and the 3-connectivity of a graph. First we give sharp upper and lower bounds of κ3(G)\kappa_3(G) for general graphs GG, and construct two kinds of graphs which attain the upper and lower bound, respectively. We then show that if GG is a connected planar graph, then κ(G)1κ3(G)κ(G)\kappa(G)-1 \leq \kappa_3(G)\leq \kappa(G), and give some classes of graphs which attain the bounds. In the end we show that the problem whether κ(G)=κ3(G)\kappa(G)=\kappa_3(G) for a planar graph GG can be solved in polynomial time.

Keywords

Cite

@article{arxiv.0906.3053,
  title  = {Sharp bounds for the generalized connectivity $\kappa_3(G)$},
  author = {Shasha Li and Xueliang Li and Wenli Zhou},
  journal= {arXiv preprint arXiv:0906.3053},
  year   = {2009}
}

Comments

18 pages

R2 v1 2026-06-21T13:14:03.902Z