On a Conjecture of Randi\'c Index and Graph Radius

Abstract

The Randi\'c index R(G) of a graph G is defined as the sum of (di dj)-1/2 over all edges vi vj of G, where di is the degree of the vertex vi in G. The radius r(G) of a graph G is the minimum graph eccentricity of any graph vertex in G. Fajtlowicz(1988) conjectures R(G) r(G)-1 for all connected graph G. A stronger version, R(G) r(G), is conjectured by Caporossi and Hansen(2000) for all connected graphs except even paths. In this paper, we make use of Harmonic index H(G), which is defined as the sum of 2di+dj over all edges vi vj of G, to show that R(G) r(G)-31/105(k-1) for any graph with cyclomatic number k 1, and R(T)> r(T)+1/15 for any tree except even paths. These results improve and strengthen the known results on these conjectures.