Sharp bounds for the Randic index of graphs with given minimum and maximum degree

Abstract

The Randi\' c index of a graph G, written R(G), is the sum of 1d(u)d(v) over all edges uv in E(G). %let R(G)=Σuv ∈ E(G) 1d(u)d(v), which is called the Randi\' c index of it. Let d and D be positive integers d < D. In this paper, we prove that if G is a graph with minimum degree d and maximum degree D, then R(G) dDd+Dn; equality holds only when G is an n-vertex (d,D)-biregular. Furthermore, we show that if G is an n-vertex connected graph with minimum degree d and maximum degree D, then R(G) n2- Σi=dD-1 12 ( 1i - 1i+1)2; it is sharp for infinitely many n, and we characterize when equality holds in the bound.