The generalized Ramsey number f(n, 5, 8) = 67 n + o(n)
Abstract
A (p, q)-coloring of Kn is a coloring of the edges of Kn such that every p-clique has at least q distinct colors among its edges. The generalized Ramsey number f(n, p, q) is the minimum number of colors such that Kn has a (p, q)-coloring. Gomez-Leos, Heath, Parker, Schweider and Zerbib recently proved f(n, 5, 8) 67 (n-1). Here we prove an asymptotically matching upper bound.
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