On extremal graphs with at most internally disjoint Steiner trees connecting any n-1 vertices

Abstract

The concept of maximum local connectivity of a graph was introduced by Bollob\'as. One of the problems about it is to determine the largest number of edges f(n;≤ ) for graphs of order n that have local connectivity at most . We consider a generalization of the above concept and problem. For S⊂eq V(G) and |S|≥ 2, the generalized local connectivity (S) is the maximum number of internally disjoint trees connecting S in G. The parameter k(G)=max\(S)|S⊂eq V(G),|S|=k\ is called the maximum generalized local connectivity of G. This paper it to consider the problem of determining the largest number f(n;k≤ ) of edges for graphs of order n that have maximum generalized local connectivity at most . The exact value of f(n;k≤ ) for k=n,n-1 is determined. For a general k, we construct a graph to obtain a sharp lower bound.