Note on rainbow cycles in edge-colored graphs

Abstract

Let G be a graph of order n with an edge-coloring c, and let δc(G) denote the minimum color degree of G. A subgraph F of G is called rainbow if all edges of F have pairwise distinct colors. There have been a lot results on rainbow cycles of edge-colored graphs. In this paper, we show that (i) if δc(G)>3n-34, then every vertex of G is contained in a rainbow triangle; (ii) δc(G)>3n4, then every vertex of G is contained in a rainbow C4; and (iii) if G is complete, n≥ 8k-18 and δc(G)>n-12+k, then G contains a rainbow cycle of length at least k. Some gaps in previous publications are also found and corrected.