On the g-extra connectivity of graphs

Abstract

Connectivity and diagnosability are two important parameters for the fault tolerant of an interconnection network G. In 1996, F\`abrega and Fiol proposed the g-extra connectivity of G. A subset of vertices S is said to be a cutset if G-S is not connected. A cutset S is called an Rg-cutset, where g is a non-negative integer, if every component of G-S has at least g+1 vertices. If G has at least one Rg-cutset, the g-extra connectivity of G, denoted by g(G), is then defined as the minimum cardinality over all Rg-cutsets of G. In this paper, we first obtain the exact values of g-extra connectivity of some special graphs. Next, we show that 1≤ g(G)≤ n-2g-2 for 0≤ g≤ n-32, and graphs with g(G)=1,2,3 and trees with g(Tn)=n-2g-2 are characterized, respectively. In the end, we get the three extremal results for the g-extra connectivity.