Randi\'c index, diameter and the average distance

Abstract

The Randi\'c index of a graph G, denoted by R(G), is defined as the sum of 1/d(u)d(v) over all edges uv of G, where d(u) denotes the degree of a vertex u in G. In this paper, we partially solve two conjectures on the Randi\'c index R(G) with relations to the diameter D(G) and the average distance μ(G) of a graph G. We prove that for any connected graph G of order n with minimum degree δ(G), if δ(G)≥ 5, then R(G)-D(G)≥ 2-n+1 2; if δ(G)≥ n/5 and n≥ 15, R(G)D(G) ≥ n-3+2 22n-2 and R(G)≥ μ(G). Furthermore, for any arbitrary real number \ (0<<1), if δ(G)≥ n, then R(G)D(G) ≥ n-3+2 22n-2 and R(G)≥ μ(G) hold for sufficiently large n.