A note on the 3-rainbow index of K2,t

Abstract

A tree T, in an edge-colored graph G, is called a rainbow tree if no two edges of T are assigned the same color. For a vertex subset S∈ V(G), a tree that connects S in G is called an S-tree. A k-rainbow coloring of G is an edge coloring of G having the property that for every set S of k vertices of G, there exists a rainbow S-tree T in G. The minimum number of colors needed in a k-rainbow coloring of G is the k-rainbow index of G, denoted by rxk(G). In this paper, we obtain the exact values of rx3(K2,t) for any t≥ 1.