Monochromatic triangle packings in red-blue graphs
Abstract
We prove that in every 2-edge-colouring of Kn there is a collection of n2/12 + o(n2) edge-disjoint monochromatic triangles, thus confirming a conjecture of Erdos. We also prove a corresponding stability result, showing that 2-colourings that are close to attaining the aforementioned bound have a colour class which is close to bipartite. As part of our proof, we confirm a recent conjecture of Tyomkyn about the fractional version of this problem.
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