Graphs with large generalized 3-connectivity

Abstract

Let S be a nonempty set of vertices of a connected graph G. A collection T1,..., T of trees in G is said to be internally disjoint trees connecting S if E(Ti) E(Tj)= and V(Ti) V(Tj)=S for any pair of distinct integers i, j, where 1 ≤ i, j ≤ r. For an integer k with 2 ≤ k ≤ n, the generalized k-connectivity k(G) of G is the greatest positive integer r such that G contains at least r internally disjoint trees connecting S for any set S of k vertices of G. Obviously, 2(G) is the connectivity of G. In this paper, sharp upper and lower bounds of 3(G) are given for a connected graph G of order n, that is, 1 ≤ 3(G) ≤ n - 2. Graphs of order n such that 3(G) = n - 2, n - 3 are characterized, respectively.