A note on heterochromatic cycles of length 4 in edge-colored graphs
Abstract
Let G be an edge-colored graph. A heterochromatic cycle of G is one in which every two edges have different colors. For a vertex v∈ V(G), let CN(v) denote the set of colors which are assigned to the edges incident to v. In this note we prove that G contains a heterochromatic cycle of length 4 if G has n≥ 60 vertices and |CN(u) CN(v)|≥ n-1 for every pair of vertices u and v of G. This extends a result of Broersma et al. on the existence of heterochromatic cycles of length 3 or 4.
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