On the difference between the Szeged and Wiener index

Abstract

We prove a conjecture of Nadjafi-Arani, Khodashenas and Ashrafi on the difference between the Szeged and Wiener index of a graph. Namely, if G is a 2-connected non-complete graph on n vertices, then Sz(G)-W(G) 2n-6. Furthermore, the equality is obtained if and only if G is the complete graph Kn-1 with an extra vertex attached to either 2 or n-2 vertices of Kn-1. We apply our method to strengthen some known results on the difference between the Szeged and Wiener index of bipartite graphs, graphs of girth at least five, and the difference between the revised Szeged and Wiener index. We also propose a stronger version of the aforementioned conjecture.