Topological indices of non-commuting graph of dihedral groups

Assume G is a non-abelian group. A dihedral group is the group of symmetries of a regular polygon, which includes rotations and reflections. The non-commuting graph of G, denoted by Gamma(G), is the graph of vertex set G - Z(G), whose vertices are non-central elements, in which Z(G) is the center of.. and two distinct vertices nu(1) and nu(2) are joined by an edge if and only if nu(1)nu(2) not equal nu(1)nu(2). In this paper, some topological indices of the non-commuting graph, Gamma(G) of the dihedral groups, D-2n are presented. In order to determine the Edge-Wiener index, First Zagreb index and Second Zagreb index of the non-commuting graph, Gamma(G) of the dihedral groups, D-2n previous results of some of the topological indices of non-commuting graph of finite group are used. Then, the non-commuting graphs of dihedral groups of different orders are found. Finally, the generalisation of Edge-Wiener index, First Zagreb index and Second Zagreb index of the non-commuting graphs of dihedral groups are determined.