The extremal unicyclic graphs of the revised edge Szeged index with given diameter

Abstract

Let G be a connected graph. The revised edge Szeged index of G is defined as Sze(G)=Σe=uv∈ E(G)(mu(e|G)+m0(e|G)2)(mv(e|G)+m0(e|G)2), where mu(e|G) (resp., mv(e|G)) is the number of edges whose distance to vertex u (resp., v) is smaller than the distance to vertex v (resp., u), and m0(e|G) is the number of edges equidistant from both ends of e, respectively. In this paper, the graphs with minimum revised edge Szeged index among all the unicyclic graphs with given diameter are characterized.