Maximum number of edge colorings avoiding rainbow copies of K4
Abstract
In this paper we show that for r≥ 12 and any sufficiently large n-vertex graph G the number of r-edge-colorings of G with no rainbow K4 is at most rex(n,K4), where ex(n,K4) denotes the Tur\'an number of K4. Moreover, G attains equality if and only if it is the Tur\'an graph T3(n). The bound on the number of colors r≥ 12 is best possible. It improves upon a result of H. Lefmann, D.A. Nolibos, and the second author who showed the same result for r ≥ 5434 and it confirms a conjecture by Gupta, Pehova, Powierski and Staden.
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