On the number of geodesics of Petersen graph GP(n,2)

Abstract

In any network, the interconnection of nodes by means of geodesics and the number of geodesics existing between nodes are important. There exists a class of centrality measures based on the number of geodesics passing through a vertex. Betweenness centrality indicates the betweenness of a vertex or how often a vertex appears on geodesics between other vertices. It has wide applications in the analysis of networks. Consider GP(n,k). For each n and k \,(n > 2k), the generalized Petersen graph GP ( n , k ) is a trivalent graph with vertex set \ u i ,\, v i \,|\, 0 ≤ i ≤ n - 1 \ and edge set \ u i u i + 1 , u i v i , v i v i + k\, |\, 0≤ i ≤ n - 1, subscripts reduced modulo n \. There are three kinds of edges namely outer edges, spokes and inner edges. The outer vertices generate an n-cycle called outer cycle and inner vertices generate one or more inner cycles. In this paper, we consider GP(n,2) and find expressions for the number of geodesics and betweenness centrality.