Bounds for Rainbow-uncommon Graphs
Abstract
We say a graph H is r-rainbow-uncommon if the maximum number of rainbow copies of H under an r-coloring of E(Kn) is asymptotically (as n ∞) greater than what is expected from uniformly random r-colorings. Via explicit constructions, we show that for H∈\K3,K4, K5\, H is r-rainbow-uncommon for all r≥ |V(H)| 2. We also construct colorings to show that for t ≥ 6, Kt is r-rainbow-uncommon for sufficiently large r.
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