Long heterochromatic paths in heterochromatic triangle free graphs

Abstract

In this paper, graphs under consideration are always edge-colored. We consider long heterochromatic paths in heterochromatic triangle free graphs. Two kinds of such graphs are considered, one is complete graphs with Gallai colorings, i.e., heterochromatic triangle free complete graphs; the other is heterochromatic triangle free graphs with k-good colorings, i.e., minimum color degree at least k. For the heterochromatic triangle free graphs Kn, we obtain that for every vertex v∈ V(Kn), Kn has a heterochromatic v-path of length at least dc(v); whereas for the heterochromatic triangle free graphs G we show that if, for any vertex v∈ V(G), dc(v)≥ k≥ 6, then G a heterochromatic path of length at least 3k4.