Note on the minimal size of a graph with generalized connectivity kappa3= 2

Abstract

The concept of generalized k-connectivity k(G) of a graph G was introduced by Chartrand et al. in recent years. In our early paper, extremal theory for this graph parameter was started. We determined the minimal number of edges of a graph of order n with 3= 2, i.e., for a graph G of order n and size e(G) with 3(G)= 2, we proved that e(G)≥ (6/5)n, and the lower bound is sharp by constructing a class of graphs, only for n 0 \ (mod \ 5) and n≠ 10. In this paper, we improve the lower bound to (6/5)n. Moreover, we show that for all n≥ 4 but n= 9, 10, there always exists a graph of order n with 3= 2 whose size attains the lower bound (6/5)n. Whereas for n= 9, 10 we give examples to show that (6/5)n+1 is the best possible lower bound. This gives a clear picture on the minimal size of a graph of order n with generalized connectivity 3= 2.