Non-monochromatic Triangles in a 2-Edge-Coloured Graph
Abstract
Let G = (V,E) be a simple graph and let \R,B\ be a partition of E. We prove that whenever |E| + \ |R|, |B| \ > |V| 2 , there exists a subgraph of G isomorphic to K3 which contains edges from both R and B. We conjecture a natural generalization to partitions with more blocks.
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