Computing weighted Szeged and PI indices from quotient graphs

Abstract

The weighted Szeged index and the weighted vertex-PI index of a connected graph G are defined as wSz(G) = Σe=uv ∈ E(G) (deg (u) + deg (v))nu(e)nv(e) and wPIv(G) = Σe=uv ∈ E(G) (deg(u) + deg(v))( nu(e) + nv(e)), respectively, where nu(e) denotes the number of vertices closer to u than to v and nv(e) denotes the number of vertices closer to v than to u. Moreover, the weighted edge-Szeged index and the weighted PI index are defined analogously. As the main result of this paper, we prove that if G is a connected graph, then all these indices can be computed in terms of the corresponding indices of weighted quotient graphs with respect to a partition of the edge set that is coarser than the *-partition. If G is a benzenoid system or a phenylene, then it is possible to choose a partition of the edge set in such a way that the quotient graphs are trees. As a consequence, it is shown that for a benzenoid system the mentioned indices can be computed in sub-linear time with respect to the number of vertices. Moreover, closed formulas for linear phenylenes are also deduced. However, our main theorem is proved in a more general form and therefore, we present how it can be used to compute some other topological indices.