Rainbow cycles in triangle-free graphs

Abstract

Let G = (V,E) be an edge-colored graph, and let δc(G) = v ∈ V \ dc(v) \ where dc(v) is the number of colors on edges incident to a vertex v. We show that for a sufficiently large n if G is an edge-colored triangle-free graph of order n that satisfies δc(G)≥ (n+7)/5, then G contains a rainbow cycle of length four, which improves a bound of Ding et al. and is best possible. In addition, we show that given k, there is n0 such that for n≥ n0, if G is an edge-colored triangle-free graph with δc(G)> n/5+3, then G contains a rainbow cycle of length 4k.