Comparison of Wiener index and Zagreb eccentricity indices

Abstract

The first and the second Zagreb eccentricity index of a graph G are defined as E1(G)=Σv∈ V(G)G(v)2 and E2(G)=Σuv∈ E(G)G(u)G(v), respectively, where G(v) is the eccentricity of a vertex v. In this paper the invariants E1, E2, and the Wiener index are compared on graphs with diameter 2, on trees, on a newly introduced class of universally diametrical graphs, and on Cartesian product graphs. In particular, if the diameter of a tree T is not too big, then W(T) E2(T) holds, and if the diameter of T is large, then W(T) < E1(T) holds.