Computing the Mostar index in networks with applications to molecular graphs

Abstract

Recently, a bond-additive topological descriptor, named as the Mostar index, has been introduced as a measure of peripherality in networks. For a connected graph G, the Mostar index is defined as Mo(G) = Σe=uv ∈ E(G) |nu(e) - nv(e)|, where for an edge e=uv we denote by nu(e) the number of vertices of G that are closer to u than to v and by nv(e) the number of vertices of G that are closer to v than to u. In this paper, we generalize the definition of the Mostar index to weighted graphs and prove that the Mostar index of a weighted graph can be computed in terms of Mostar indices of weighted quotient graphs. As a consequence, we show that the Mostar index of a benzenoid system can be computed in sub-linear time with respect to the number of vertices. Finally, our method is applied to some benzenoid systems and to a fullerene patch.