On extremal cacti with respect to the edge Szeged index and edge-vertex Szeged index

Abstract

The edge Szeged index and edge-vertex Szeged index of a graph are defined as Sze(G)=Σuv∈ E(G)mu(uv|G)mv(uv|G) and Szev(G)=12 Σuv ∈ E(G)[nu(uv|G)mv(uv|G)+nv(uv|G)mu(uv|G)], respectively, where mu(uv|G) (resp., mv(uv|G)) is the number of edges whose distance to vertex u (resp., v) is smaller than the distance to vertex v (resp., u), and nu(uv|G) (resp., nv(uv|G)) is the number of vertices whose distance to vertex u (resp., v) is smaller than the distance to vertex v (resp., u), respectively. A cactus is a graph in which any two cycles have at most one common vertex. In this paper, the lower bounds of edge Szeged index and edge-vertex Szeged index for cacti with order n and k cycles are determined, and all the graphs that achieve the lower bounds are identified.