The 4-Component Connectivity of Alternating Group Networks

Abstract

The -component connectivity (or -connectivity for short) of a graph G, denoted by (G), is the minimum number of vertices whose removal from G results in a disconnected graph with at least components or a graph with fewer than vertices. This generalization is a natural extension of the classical connectivity defined in term of minimum vertex-cut. As an application, the -connectivity can be used to assess the vulnerability of a graph corresponding to the underlying topology of an interconnection network, and thus is an important issue for reliability and fault tolerance of the network. So far, only a little knowledge of results have been known on -connectivity for particular classes of graphs and small 's. In a previous work, we studied the -connectivity on n-dimensional alternating group networks ANn and obtained the result 3(ANn)=2n-3 for n≥slant 4. In this sequel, we continue the work and show that 4(ANn)=3n-6 for n≥slant 4.