The 3-rainbow index and connected dominating sets

Abstract

A tree in an edge-colored graph is said to be rainbow if no two edges on the tree share the same color. An edge-coloring of G is called 3-rainbow if for any three vertices in G, there exists a rainbow tree connecting them. The 3-rainbow index rx3(G) of G is defined as the minimum number of colors that are needed in a 3-rainbow coloring of G. This concept, introduced by Chartrand et al., can be viewed as a generalization of the rainbow connection. In this paper, we study the 3-rainbow index by using connected three-way dominating sets and 3-dominating sets. We shown that for every connected graph G on n vertices with minimum degree at least δ (3≤δ≤5), rx3(G)≤ 3nδ+1+4, and the bound is tight up to an additive constant; whereas for every connected graph G on n vertices with minimum degree at least δ (δ≥3), we get that rx3(G)≤ nln(δ+1)δ+1(1+oδ(1))+5. In addition, we obtain some tight upper bounds of the 3-rainbow index for some special graph classes, including threshold graphs, chain graphs and interval graphs.