Bounds on Coloring Trees without Rainbow Paths

Abstract

For a graph with colored vertices, a rainbow subgraph is one where all vertices have different colors. For graph G, let ck(G) denote the maximum number of different colors in a coloring without a rainbow path on k vertices, and cpk(G) the maximum number of colors if the coloring is required to be proper. The parameter c3 has been studied by multiple authors. We investigate these parameters for trees and k 4. We first calculate them when G is a path, and determine when the optimal coloring is unique. Then for trees T of order n, we show that the minimum value of c4(T) and cp4(T) is (n+2)/2, and the trees with the minimum value of cp4(T) are the coronas. Further, the minimum value of c5(T) and cp5(T) is (n+3)/2 , and the trees with the minimum value of either parameter are octopuses.