On a relation between the Szeged index and the Wiener index for bipartite graphs

Abstract

The Wiener index W(G) of a graph G is the sum of the distances between all pairs of vertices in the graph. The Szeged index Sz(G) of a graph G is defined as Sz(G)=Σe=uv ∈ Enu(e)nv(e) where nu(e) and nv(e) are, respectively, the number of vertices of G lying closer to vertex u than to vertex v and the number of vertices of G lying closer to vertex v than to vertex u. Hansen used the computer programm AutoGraphiX and made the following conjecture about the Szeged index and the Wiener index for a bipartite connected graph G with n ≥ 4 vertices and m ≥ n edges: Sz(G)-W(G) ≥ 4n-8. Moreover the bound is best possible as shown by the graph composed of a cycle on 4 vertices C4 and a tree T on n-3 vertices sharing a single vertex. This paper is to give a confirmative proof to this conjecture.