The Edge-Szeged Index and the PI Index of Benzenoid Systems in Linear Time

Abstract

The edge-Szeged index of a graph G is defined as Sze(G) = Σe=uv ∈ E(G)mu(e)mv(e), where mu(e) denotes the number of edges of G whose distance to u is smaller than the distance to v and mv(e) denotes the number of edges of G whose distance to v is smaller than the distance to u. Similarly, the PI index is defined as PI(G) = Σe=uv ∈ E(G)(mu(e) + mv(e)). In this paper it is shown how the problem of calculating the indices of a benzenoid system can be reduced to the problem of calculating weighted indices of three different weighted quotient trees. Furthermore, using these results, algorithms are established that, for a given benzenoid system G with m edges, compute the edge-Szeged index and the PI index of G in O(m) time. Moreover, it is shown that the results can also be applied to weighted benzenoid systems.